TS 10th Class Maths Notes Chapter 11 Trigonometry

We are offering TS 10th Class Maths Notes Chapter 11 Trigonometry to learn maths more effectively.

TS 10th Class Maths Notes Chapter 11 Trigonometry

→ Trigonometry is the study of relationship between the sides and angle of a triangle.

→ Ratios of the sides of a right triangle with respect to its acute angle are called trigonometric ratios of the angle.

→ An equation involving trigonometric ratios of an angle is called a trigonometric identity. If it is true of all values of the angle.

→ Let us consider ΔABC in which ∠B = 90°, A and C are acute angles. Let us study the ratios of the sides of ΔABC with respect to the acute angle A.
TS 10th Class Maths Notes Chapter 11 Trigonometry 1
sine of ∠A = sin A = \(\frac{\text { Side opposite to angle } \mathrm{A}}{\text { Hypotenuse }}=\frac{\mathrm{BC}}{\mathrm{AC}}\)
cosine of ∠A = cos A = \(\frac{\text { Side adjacent to angle } \mathrm{A}}{\text { Hypotenuse }}=\frac{\mathrm{AB}}{\mathrm{AC}}\)
tangent of ∠A =tan A = \(\frac{\text { Side opposite to angle } A}{\text { Side adjacent to angle } A}=\frac{B C}{A B}\)

→ cosec A = \(\frac{1}{\sin A}\)
sec A = \(\frac{1}{\cos A}\)
cot A = \(\frac{1}{\tan A}\)

TS 10th Class Maths Notes Chapter 11 Trigonometry

→ If one of trigonometric ratios of an acute angle is known the remaining trigonometric ratios of the angle can be easily determined.

→ Trigonometric ratios of 0°, 30°, 45°, 60° and 90°.
TS 10th Class Maths Notes Chapter 11 Trigonometry 2
Note : From the above table we can observe that ∠A increases from 0° to 90°, sin A increases from 0 to 1 and cos A decreases from 1 to 0.

→ Trigonometric ratios of complementary angles : Two angles are said to be complementary angle if their sum equals to 90°.

  • sin (90° – A) = cos A;
  • cosec(90° – A) = sec A
  • cos (90° – A) = sin A;
  • sec(90°- A) = cosec A
  • tan (90° – A) = cot A;
  • cot(90° – A) = tan A

→ Trigonometric identities :

  • sin2A + cos2A = 1
  • sec2A – tan2A = 1 for 0°< A < 90°
  • cosec2A – cot2A = 1 for 0° < A < 90°

Note : sin2θ = (sin θ)2 but sinθ2 ≠ (sin θ)2

Important Formula:

  • sin(90° – A) = cos A;
  • cosec (90° – A) = sec A
  • cos(90° – A) = sin A
  • sec(90° – A) = cosec A
  • tan(90° – A) = cot A
  • cot(90° – A) = tan A
  • sin2A + cos2A = 1
  • sec2A – tan2A = 1
  • cosec2A – cot2A = 1

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TS 10th Class Maths Notes Chapter 11 Trigonometry 3

TS 10th Class Maths Notes Chapter 11 Trigonometry

Aryabhatta (476 – 550 A.D):

  • The first use of the idea of ‘sine’ in the way we use it today was in the book Aryabhatiyam by Aryabhatta, in A.D. 500.
  • Aryabhatta used the word ‘ardhajya1 for the half-chord, which was shortened to jya or jiva in due course.
  • When the Aryabhatiyam was translated into Arabic, the word jiva was retained as it is. The word jiva was translated into sinus, which means curve, when the Arabic version was translated into Latin.
  • Soon the word sinus, also used as sine, became common in mathematical texts throughout Europe. An English Professor of astronomy Edumund Gunter (1581¬1626), first used the abbreviated notation ‘sin’.

TS 10th Class Maths Notes Chapter 10 Mensuration

We are offering TS 10th Class Maths Notes Chapter 10 Mensuration to learn maths more effectively.

TS 10th Class Maths Notes Chapter 10 Mensuration

Cuboid :
TS 10th Class Maths Notes Chapter 10 Mensuration 1
l, b and h denote respectively the length, breadth and height of a cuboid then

  • Lateral surface area = 2h(l + b)
  • Total surface area = 2(lb + bh + hl)
  • Volume = lbh
  • Diagonal of the cuboid = \(\sqrt{l^2+b^2+h^2}\)

Cube :
TS 10th Class Maths Notes Chapter 10 Mensuration 2
If the length of each edge of cube is “a” units then

  • Lateral surface area = 4a2
  • Total surface area = 6a2
  • Volume = a3
  • Diagonal of the cube = √3 × a = a√3

Right Prism :
TS 10th Class Maths Notes Chapter 10 Mensuration 3

  • Lateral surface area = Perimeter of base × height
  • Total Surface area = Lateral Surface area + 2(Area of end Surface)
  • Volume = Area of base × height

Right Circular Cylinder:
TS 10th Class Maths Notes Chapter 10 Mensuration 4
If r is the radius of the base and ‘h’ is the height, then

  • Lateral surface area = 2πrh
  • Total surface area = 2πr(h + r)
  • Volume = πr2h

TS 10th Class Maths Notes Chapter 10 Mensuration

Right Pyramid :
TS 10th Class Maths Notes Chapter 10 Mensuration 5

  • Lateral surface area = \(\frac{1}{2}\) × perimeter of base × slant height
  • Total Surface area = Lateral surface area + area of base
  • Volume = \(\frac{1}{3}\) × area of base × height

Right Circular Cone :
TS 10th Class Maths Notes Chapter 10 Mensuration 6
If ‘r’ is the radius of the base, ‘h’ is the height and is slant height, then

  • Lateral surface area = πrl.
  • Total Surface area = πr(l + r)
  • Volume = \(\frac{1}{3}\)πr2h
  • l2 = h2 + r2

Sphere :
TS 10th Class Maths Notes Chapter 10 Mensuration 7
If ‘r’ is radius of sphere, then

  • Lateral surface area = 4πr2
  • Total surface area = 4πr2
  • Volume = \(\frac{4}{3}\) πr3

Hemisphere :
TS 10th Class Maths Notes Chapter 10 Mensuration 8
If Y is the radius of hemi-sphere, then

  • Lateral surface area = 2πr2
  • Total surface area = 3πr2
  • Volume = \(\frac{4}{3}\)πr3

Right Circular Hollow Cylinder:
TS 10th Class Maths Notes Chapter 10 Mensuration 9

  • Area of each end = π(R2 – r2)
  • Curved surface area of hollow Cylinder = External area + Internal area
    = 2πrh + 2πRh = 2πh(R + r)
  • Total surface area = 2πRh + 2πrh + 2(πR2 – πr2)
    = 2πh(R + r) + 2π(R + r)(R – r)
    = 2π(R + r) (R + h – r)
  • Volume of the material = External volume – Internal volume
    = πR2h – πr2h = 7th(R2 – r2)

TS 10th Class Maths Notes Chapter 10 Mensuration

Spherical Shell:
TS 10th Class Maths Notes Chapter 10 Mensuration 10
If R and r are the outer and inner radii of a spherical shell, then

  • Outer surface area = 4πR2
  • Volume of material = \(\frac{4}{3}\) π

→ The volume of the solid-formed by joining two basic solids is the sum of the volumes of the constituents.

→ In calculating the S.A of a combination of solids, we cannot add the surface area of the two constituents, because some part of the surface area disappears in the process of joining them.

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TS 10th Class Maths Notes Chapter 10 Mensuration 11

Brahmagupta (598 – 668):

  • Brahmagupta was born in the state of Rajasthan.
  • He worked in the great astronomical centre of ancient India – Ujjain.
  • He made significant contributions to Trigonometry.

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d)

Students must practice this TS Intermediate Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) to find a better approach to solving the problems.

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d)

I.
Solve the following differential equations.

Question 1.
\(\frac{d y}{d x}=-\left(\frac{12 x+5 y-9}{5 x+2 y-4}\right)\)
Solution:
A non – homogeneous model of the type \(\frac{d y}{d x}=\frac{a x+b y+c}{a^{\prime} x+b^{\prime} y+c^{\prime}}\), where b = – a’
Here a = – 12, b = – 5, c = 9
a’ = 5, b’ = 2, c’ = – 4
So the solution of the differenüal equation can be obtained by Integrating each term alter regrouping
Given \(\frac{d y}{d x}=-\left(\frac{12 x+5 y-9}{5 x+2 y-4}\right)\)
∴ (5x + 2y – 4) dy = – (12x + 5y – 9) dx
∴ 5x dy + 2y dy – 4dy = – 12x dx – 5ydx + 9dx
⇒ 5 (x dy + y dx) + 2y dy – 4dy + 12x dx – 9 dx = 0
∴ 5 ∫ (x dy + y dx) + 2 ∫ y dy – 4 ∫ dy + 12 ∫ x dx – 9 ∫ dx = c
⇒ 5 ∫ d(xy) + 2 \(\frac{y^2}{2}\) – 4y + 12 \(\frac{x^2}{2}\) – 9x = c
⇒ 5xy + y2 – 4y + 6x2 – 9x = c
⇒ y2 + 6x2 + 5xy – 4y – 9x = c

Question 2.
\(\frac{d y}{d x}=\frac{-3 x-2 y+5}{2 x+3 y+5}\)
Solution:
Here a = – 3, b = – 2, c = 5
and a’ = 2, b’ = 3, c = 5
It is clear that b = – a’
∴ Solution is obtained by regrouping
2x dy + 3y dy + 5dy = – 3x dx – 2y dx + 5dx
⇒ 2(x dy + y dx) + 3(y dy + x dx) + 5dy – 5 dx = 0
Solution is
2 ∫ d(xy) + 3(\(\frac{y^2}{2}+\frac{x^2}{2}\)) + 5y – 5x = c
⇒ 2xy + \(\frac{3}{2}\) (x2 + y2) + 5 (y – x) = c
⇒ 4xy + 3x2 + 3y2 + 10 (y – x) = 2c
⇒ 4xy + 3(x2 + y2) – 10(x – y) = k.

Question 3.
\(\frac{d y}{d x}=\frac{-3 x-2 y+5}{2 x+3 y-5}\)
Solution:
Here a = – 3, b = – 2, c = 5
and a’ = – 2, b’ = 3, c = – 5
Here b = – a’ and hence solution can be obtained by regrouping
∴ 2x dy + 3y dy – 5dy = – 3x dx – 2y dx + 5dx
⇒ 2(x dy + y dx) + 3(y dy + x dx) – 5 dy – 5dx = 0
⇒ 2 ∫ d(xy) + 3 \(\left(\frac{y^2}{2}+\frac{x^2}{2}\right)\) – 5y – 5x = c
⇒ 2xy + 3 \(\left(\frac{y^2}{2}+\frac{x^2}{2}\right)\) – 5y – 5x = c
⇒ 4xy + 3(x2 + y2) – 10y – 10x = k where k = 2c.

TS Board Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d)

Question 4.
2 (x – 3y + 1) \(\frac{d y}{d x}\) = 4x – 2y + 1.
Solution:
\(\frac{d y}{d x}=\frac{4 x-2 y+1}{2 x-6 y+2}\)
Here a = 4, b = – 2, c = 1
and a’ = 2, b’ = – 6, c’ = 2
Here also b = – a’ and solution can be obtained by regrouping
∴ 2x dy – 6y dy + 2dy – 4x dx – 2y dx + dx
2 (x dy + y dx) – 6y dy – 4x dx + 2 dy – dx = 0
2 d(xy) – 6y dy – 4x dx + 2 dy – dx = 0
∴ 2 ∫ d(xy) – ∫ 6y dy – 4 ∫ x dx + 2 ∫ dy – ∫ dx = c
⇒ 2xy – 3y2 – 2x2 + 2y – x = c

Question 5.
\(\frac{d y}{d x}=\frac{x-y+2}{x+y-1}\)
Solution:
Here a = 1, b = – 1, c = 2
and a’ = 1, b’ = 1, c’ = – 1
Here b = – a’ and hence the solution can be obtained by regrouping of terms.
∴ x dy + y dy – dy = x dx – y dx + 2 dx
⇒ x dy + y dx + y dy – x dx – dy – 2dx = 0
⇒ ∫ d(xy) + ∫ y dy – ∫ x dx – ∫ dy – 2∫ dx = c
⇒ xy + \(\frac{y^2}{2}-\frac{x^2}{2}\) – y – 2x = c
⇒ 2xy + y2 – x2 – 2y – 4x = k where k = 2c
Solution is 2xy + y2 – x2 – 2y – 4x = k.

Question 6.
\(\frac{d y}{d x}=\frac{2 x-y+1}{x+2 y-3}\)
Solution:
Here a = 2, b = – 1, c = 1
and a’ = 1, b’ = 2, c’ = – 3
We have b = – a’ and the solution can be obtained by regrouping of terms.
∴ x dy + 2y dy – 3dy = 2x dx – y dx + dx
⇒ x dy + y dx + 2y dy – 2x dx – 3dy – dx = 0
⇒ d(xy) + 2y dy – 2x dx – 3 dy – dx = 0
∫ d(xy) + 2 ∫ y dy – 2 ∫ x dx – 3 ∫ dy – ∫ dx = c
⇒ xy + 2\(\left(\frac{y^2}{2}\right)\) 2 \(\left(\frac{x^2}{2}\right)\) – 3y – x = c
⇒ xy + y2 – x2 – 3y – x = c.

TS Board Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d)

II.
Solve the following differential equations.
Question 1.
(2x + 2y + 3) \(\frac{d y}{d x}\) = x + y + 1
Solution:
\(\frac{d y}{d x}=\frac{x+y+1}{2 x+2 y+3}=\frac{x+y+1}{2(x+y)+3}\)
Let x + y = z then 1 + \(\frac{d y}{d x}\) = \(\frac{d z}{d x}\)

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 1

⇒ \(\frac{2}{3}\) z + \(\frac{1}{9}\) log (3z + 4) = x + c
⇒ \(\frac{2}{3}\) (x + y) + \(\frac{1}{9}\) log (3x + 3y + 4) = x + c
⇒ 6 (x + y) + log (3x + 3y + 4) = 9x + 9c
⇒ 6y – 3x + log (3x + 3y + 4) + c = 0 where c’ = – 9c.

Question 2.
\(\frac{d y}{d x}=\frac{4 x+6 y+5}{3 y+2 x+4}\)
Solution:

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 2

⇒ \(\frac{1}{8}\) (2x + 3y) + \(\frac{9}{64}\) log [8 (2x + 3y) + 23] = x + c
⇒ 8(2x + 3y) + \(\frac{9}{8}\) log(16x + 24y + 23) = 64x + 64c
⇒ 8[2x + 3y + log(16x + 24y + 23)] = 8 (8x + 8c)
⇒ 2x + 3y + \(\frac{9}{8}\) log (16x + 24y + 23) = 8x + 8c
⇒ 3y – 6x + \(\frac{9}{8}\) log (16x + 24y + 23) = k where k = 8c.

TS Board Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d)

Question 3.
(2x + y + 1) dx + (4x + 2y – 1) dy = 0.
Solution:
From the given equation
\(\frac{d y}{d x}=-\left(\frac{2 x+y+1}{2(2 x+y)-1}\right)\)

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 3

⇒ \(\frac{2}{3}\) ∫ dz + \(\frac{1}{3} \int \frac{d z}{z-3}\) = x + c
⇒ \(\frac{2}{3}\) z + \(\frac{1}{3}\) log(z – 3) = x + c
⇒ \(\frac{2}{3}\) (2x + y) + \(\frac{1}{3}\) log(2x + y – 3) = x + c
⇒ (4x + 2y) + log (2x + y – 3) = 3x + 3c
⇒ (x + 2y) + log (2x + y + 3) = k where k = 3c

Question 4.
\(\frac{d y}{d x}=\frac{(2 y+x)+1}{2(x+2 y)+3}\)
Solution:
\(\frac{d y}{d x}=\frac{(2 y+x)+1}{2(x+2 y)+3}\)
Let x + 2y = z then 1 + 2 \(\frac{d y}{d x}\) = \(\frac{d z}{d x}\)

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 4

⇒ \(\frac{z}{2}\) + \(\frac{1}{8}\) log (4z + 5) = x + c
⇒ \(\frac{x+2 y}{2}\) + \(\frac{1}{8}\) [4(x + 2y) + 5] = x + c
⇒ 4x + 8y + log [4x + 8y + 5] = 8x + 8c
⇒ 8y – 4x + log (4x + 8y + 5) = 8k.

Question 5.
(x + y – 1) dy = (x + y + 1) dx
Solution:
\(\frac{d y}{d x}=\frac{x+y+1}{x+y-1}\)
Let x + y = z then 1 + \(\frac{d y}{d x}\) = \(\frac{d z}{d x}\)

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 5

⇒ \(\frac{1}{2}\) z – \(\frac{1}{2}\) log z = x + c
⇒ \(\frac{1}{2}\) (x + y) – \(\frac{1}{2}\) log (x + y) = x + c
⇒ x + y – log (x + y) = 2x + 2c
⇒ y – x – log (x + y) = k. where k = 2c.

TS Board Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d)

III. Solve the following differential equations.

Question 1.
\(\frac{d y}{d x}=\frac{3 y-7 x+7}{3 x-7 y-3}\)
Solution:
\(\frac{d y}{d x}=-\left(\frac{7 x-3 y-7}{3 x-7 y-3}\right)\)
a = – 7, b = 3, c = 7
a’ = 3, b’ = – 7, c’ = – 3
b ≠ – a’ and \(\frac{a}{a^{\prime}} \neq \frac{b}{b^{\prime}}\)

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 6

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 7

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 8

TS Board Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d)

Question 2.
\(\frac{d y}{d x}=\frac{6 x+5 y-7}{2 x+18 y-14}\)
Solution:
Let x = X + h and y = Y + k then
\(\frac{d y}{d x}=\frac{d Y}{d X}\)
and \(\frac{d Y}{d X}=\frac{6(X+h)+5(Y+k)-7}{2(X+h)+18(Y+k)-14}\)
= \(\frac{(6 \mathrm{X}+5 \mathrm{Y})+(6 \mathrm{~h}+5 \mathrm{k}-7)}{(2 \mathrm{X}+18 \mathrm{Y})+(2 \mathrm{~h}+18 \mathrm{k}-14)}\)
The equation becomes Non-homogeneous if
6h + 5k – 7 = 0
and 2h + 18k – 14 = 0
⇒ h + 9k – 7 = 0
Solving equations we get h = \(\frac{4}{7}\) and k = \(\frac{5}{7}\)

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 9

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 10

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 11

⇒ (2x – 3y + 1)2 (x + 2y – 2) = k
⇒ (3y – 2x + 1)2 (x + 2y – 2) = k is the solution of the given equation.

TS Board Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d)

Question 3.
\(\frac{d y}{d x}+\frac{10 x+8 y-12}{7 x+5 y-9}\) = 0
Solution:
Given equation is \(\frac{d y}{d x}=-\frac{10 x+8 y-12}{7 x+5 y-9}\)

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 12

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 13

⇒ 3 log (v + 2) + 2 log (y + 1) = log X-5 + log c
⇒ (v + 1)2 (v + 2)3 X5 = c
⇒ (\(\frac{\mathrm{Y}}{\mathrm{X}}\) + 1)2 (\(\frac{\mathrm{Y}}{\mathrm{X}}\) + 2)3 X5 = c
⇒ (Y + X)2 (Y + 2X)3 = c
⇒ (y + 1 + x – 2)2 [y + 1 + 2 (x – 2)]3 = c
⇒ (x + y – 1)2 (2x + y – 3)3 = c is the solution of the equation.

TS Board Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d)

Question 4.
(x – y – 2) dx + (x – 2y – 3) dy = 0
Solution:

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 14

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 15

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 16

TS Board Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d)

Question 5.
(x – y) dy = (x + y + 1) dx
Solution:
The given equation can be written as \(\frac{d y}{d x}=\frac{x+\dot{y}+1}{x-y}\)
Let x = X + h, y = Y + k then

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 17

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 18

TS Board Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d)

Question 6.
(2x + 3y – 8) dx = (x + y – 3)dy
Solution:
The given equation can be written as
\(\frac{d y}{d x}=\frac{2 x+3 y-8}{x+y-3}\)
Let x = X + h, y – Y + k then

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 19

Let 1 + v = A (2 – 2v) + B
then A = – \(\frac{1}{2}\) and 2A + B = 1
⇒ B = 1 – 2A
= 1 + 1 = 2
∴ 1 + v = – \(\frac{1}{2}\) (2 – 2v) + 2
∴ From (1)

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 20

TS Board Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d)

Question 7.
\(\frac{d y}{d x}=\frac{x+2 y+3}{2 x+3 y+4}\)
Solution:
Let x = X + h, y = Y + k then
\(\frac{d Y}{d X}=\frac{X+h+2(Y+k)+3}{2(X+h)+3(Y+k)+4}\)
= \(\frac{X+2 Y+h+2 k+3}{2 X+3 Y+2 h+3 k+4}\)
Choose h and k such that h + 2k + 3 = 0 and 2h + 3k + 4 = 0
Solving we get h = 1, k = – 2

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 21

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 22

TS Board Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d)

Question 8.
\(\frac{d y}{d x}=\frac{2 x+9 y-20}{6 x+2 y-10}\)
Solution:
Let x = X + h, y = Y + k then
\(\frac{\mathrm{dY}}{\mathrm{dX}}=\frac{2(\mathrm{X}+\mathrm{h})+9(\mathrm{Y}+\mathrm{k})-20}{6(\mathrm{X}+\mathrm{h})+2(\mathrm{Y}+\mathrm{k})-10}\)
= \(\frac{2 X+9 Y+(2 h+9 k-20)}{6 X+2 Y+(6 h+2 k-10)}\)
Choose h and k such that
2h + 9k – 20 = 0
and 6h + 2k – 10 = 0
Solving h = 1, k = 2

TS Inter 2nd Year Maths 2B Solutions Chapter 8 Differential Equations Ex 8(d) 23

∴ 6 + 2v = A (1 + 2v) + B (2 – v)
Put v = 2 then 10 = 5A
⇒ A = 2
Also 2A – B = 2
⇒ – B = 2 – 2A = – 2
⇒ B = 2
∴ \(\frac{6+2 v}{2+3 v-2 v^2}=\frac{2}{2-v}+\frac{2}{1+2 v}\)
∴ From (1)
\(\int \frac{2}{2-v} \mathrm{~d} v+\int \frac{2}{1+2 v} \mathrm{~d} v=\int \frac{\mathrm{dX}}{\mathrm{X}}\)
⇒ – 2 log (2 – v) + log (1 + 2v) = log X + log c
⇒ log \(\frac{1}{(2-v)^2}\) + log (1 + 2v) = log cX
⇒ \(\frac{1}{(2-v)^2}\) . (1 + 2v) = cX
⇒ \(\frac{1}{\left(2-\frac{Y}{X}\right)^2}\left(1+\frac{2 Y}{X}\right)\) = cX
⇒ \(\frac{X^2}{(2 X-Y)^2}\left(\frac{X+2 Y}{X}\right)\) = cX
⇒ X + 2Y = c (2X – Y)2
⇒ [x – 1 + 2 (y – 2)] = c [2 (x – 1) – (y – 2)]2
⇒ (x + 2y – 5) = c [2x – y]2
⇒ (2x – y)2 = \(\frac{1}{c}\) (x + 2y – 5) = c’ (x + 2y -5).

TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy

Telangana SCERT TS 10th Class Physical Science Study Material Pdf 11th Lesson Principles of Metallurgy Textbook Questions and Answers.

TS 10th Class Physical Science 11th Lesson Questions and Answers Principles of Metallurgy

Improve Your Learning
I. Reflections on concepts

Question 1.
List three metals that are found In nature as Oxide ores.
Answer:
Zinc, Ferrous, Aluminium, and Magnesium are metals which are found in nature as oxide ores.
They are :

Oxide oreMetalFormula
ZinciteZincZnO
HaematiteFerrousFe2O3
BauxiteAluminiumAl23O2H2O
MagnetiteMagnesiumMgCO3

 

Question 2.
List three metals that are found in nature n uncombined form.
Answer:

  1. Gold
  2. Platinum
  3. Silver
  4. Copper

Question 3.
Write a note on dressing of ore in metallurgy.
Answer:

  1. Dressing is the first step in extraction of metals.
  2. Ores that are mined from earth are usually contaminated with impurities such as soil and sand etc.
  3. Dressing means, simply getting rid of as much of the unwanted rocky material as possible before the ore is converted into the metal.
  4. Physical methods are used to enrich the ore.
  5. These methods adopted in dressing the ore depend upon difference between physical properties of ore and gangue.
  6. The following physical methods involved in dressing are 1) Hand picking 2) Washing 3) Froth floatation 4) Magnetic separation.

Question 4.
How do metals occur in nature? Give examples to any two types of minerals.
Answer:
The earth’s crust is the major source of metals. Sea water also contains some soluble salts such as sodium chloride and magnesium chloride etc. Some metals like Gold (Au), Silver (Ag) etc., are available in nature in a free state (native) as they are least reactive.

Other metals mostly are found in nature in the combined form due to their reactivity. The elements or compounds of the metals which occur in nature ¡n the earth’s crust are called ‘minerals’. Minerals in oxide form: Bauxite, Zincite, Magnetite, etc.

TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy

Question 5.
What is the difference between roasting and calcination? Give one example for each.
Answer:

RoastingCalcination
1. Roasting is a pyrochemical process in which the ore is heated in the presence of air below its melting1. Calcination ¡s a pyrochemical process in which the ore is heated in the absence of air.
2. The product is metal oxide obtained from sulphide ore.2. The product is metal oxide, obtained by decomposition of ore.
3. Eg: 2ZnS + 3O2 2ZnO +2SO23. Eg : CaCO3CaO+CO2

Question 6.
Draw the diagram showing i) Froth floatation ii) Magnetic separation.
Answer:
i) Froth floats tian
TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy 1
ii) Magnetic separation
TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy 2

Question 7.
Draw a neat diagram of the Reverberatory furnace and label it neatly.
Answer:
TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy 3

Question 8.
What is an ore? On what basis a mineral is chosen as an ore?
Answer:
Ore: A mineral from which a metal can be extracted economically and conveniently is called ‘ore’.
To choose a mineral as an ore the following are considered

  • The percentage of the metal in that mineral.
  • Whether metal can be profitably extracted from it or not.
  • The convenience of extraction of metal.

Question 9.
Write the names of any two ores of iron.
Answer:

  1. Haematite – Fe2O3
  2. Magnetite – Fe3O4

Question 10.
How do metals occur In nature? Give examples of any two types of minerals.
Answer:
The earth’s crust is the major source of metals. Sea water also contains some soluble salts such as sodium chloride and magnesium chloride etc. Some metals like Gold (Au), Silver (Ag) etc., are available in nature in free state (native) as they are least reactive. Other metals mostly are found in nature in the combined form due to their reactivity.

The elements or compounds of the metals which occur in nature in the earth’s crust are called ‘minerals’.
Minerals in oxide form: Bauxite, Ziricite, Magnetite, etc.
Minerals in sulphide form: Copper iron pyrites, Gatena, etc.

Question 11.
Write short notes on froth floatation process.
Answer:
Froth Floatation process:
TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy 4
Froth Floatation process for the concentration of sulphide ores.

  1. This method is mainly useful for sulphide ores which have no wetting property whereas impurities get wetted.
  2. The ore with impurities is finely powdered and kept ¡n water taken in a floatation cell.
  3. Air under pressure is blown to produce froth in water.
  4. Froth so produced takes the ore particles to the surface whereas, impurities settle at the bottom.
  5. Froth is separated and washed to get ore particles.

Question 12.
When do we use magnetic separation method for concentration of an ore? Explain with an example.
Answer:
Magnetic Separation Method:
If the ore contains impurities such that one, of them, is magnetic and the other is non – magnetic they are separated by magnetic separation method.
Eg: Magnetic ores like iron pyrites, (FeS) and magnetite (Fe3O4) are concentrated by this method. The crushed ore is allowed to pass through electromagnetic belts. The mineral particles are retained and gangue particles are thrown away as a separate heap.
TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy 5

Question 13.
Write short notes on each of the following:
(i) Roasting.
(ii) Calcination.
(iii) Smelting.
Answer:
(i) Roasting:

  • Roasting is a pyrochemical process in which the ore is heated in the presence of oxygen or air below its melting point.
  • The products obtained in the process are also produced in solid state.
  • Generally, reverberatory furnace is used for roasting.
    Eg : 2ZnS + 3O2 → 2ZnO + 2SO2

(ii) Calcination:

  • Calcination is a pyrochemical process in which the ore is heated in the absence of air.
  • The ore gets generally decomposed n the process.
    Eg: MgCO3 → MgO + CO2

(iii) Smelting:

  • Smelting is a pyrochemical process ¡n which the ore is mixed with flux and fuel and strongly heated.
  • The heat is so strong that the ore is reduced to even metal and the metal is obtained in molten state.
  • During smelting, the impurities (gangue) in the ore react with flux to form slag which is removed.
  • The smelting is carried out n a specially built furnace known as blast furnace.

Question 14.
What is gangue and slag?
Answer:

  • Gangue: The impurity present in the ore is called gangue.
  • Slag: A flux is a chemical substance added to convert gangue into fusible mass. This fusible mass is called slag.
    Gangue + Flux Slag

Application of concepts

Question 1.
Magnesium is an active metal, if it occurs as a chloride in nature, which method of reduction is suitable for its extraction?
Answer:
Magnesium is an active metal. If it occurs as chloride in nature, the only method viable to extract magnesium ( any active metal) is electrolysis of fused Magnesium chloride. In electrolysis of fused Magnesium chloride, magnesium is deposited at cathode and chlorine gas is liberated at the anode.
MgCl2 → Mg+2 + 2Cl
At cathode, Mg+2+ 2e → Mg
At anode, 2Cl → Cl2 + 2e

Question 2.
Mention two methods which produce very pure metals from impure metals.
Answer:
Electrolysis and reduction are the two methods which produce pure metals.

TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy

Question 3.
Which method do you suggest for extracting of high reactivity metals? Why?
Answer:
High reactivity metals like K. Na, Ca, Mg, etc., can be extracted by electrolysis.
Reasons:

  1. Simple reduction methods like heating with C, CO, etc., to reduce the ores of these metals are not feasible.
  2. The temperature required for the reduction is too high and more expensive.,
  3. Hence electrolysis is the suggestable method to extract high reactive metals.

Question 4.
Explain Thermite process and mention its applications in our daily life.
Answer:
Thermite process

  1. When highly reactive metals such as Na, Ca, Al are used as reducing agents they displace metals of lower reactivity from their compounds.
  2. These displacement reactions are highly exothermic. The amount of heat evolved s so large that the metals produced will be in molten state.
  3. The reaction of iron oxide (Fe2O3), with aluminium is used to join railings of railway tracks or cracked machine parts. This reaction is known as the thermite reaction.
    2Al + Fe2O3 → Al2O3 + 2Fe + Heat

Applications in daily life
1. To join railings of railway tracks.
2. Used to join cracked machine parts.

Question 5.
Where do we use handpicking and washing methods in our daily life? Give examples. How do you correlate these examples with enrichment of ore?
Answer:
We use hand picking in separating stones from rice and da I. We use washing methods to separate dust from rice, dal, vegetables, fruits etc.

Hand-picking: The colour and size of impurities is different from rice or dal. So we can easily separate them by hand-picking. In the same way if the ore particles and the impurities are n different sizes, colour etc., we can see this hand-picking method to separate ore from impurities.

Washing: Less-density particles like dust is separated from more density particles like rice, vegetables etc., by washing. In the same way ore particles are crushed and kept on a slopy surface. They are washed with a controlled flow of water. Less sensitive impurities are carried away by water flow, leaving the more sensitive ore particles behind.

Question 6.
What is activity series? How it helps in extraction of metals?
Answer:
Activity series: The arrangement of the metals in decreasing order of their reactivity is known as ‘activity series’.
Use of Activity series in extraction of metals
1. The method used for a particular metal for the reduction of its ore to the metal depends mainly on the position of the metal in the activity series.
Eg:
The metals at the top of the activity series (highly reactive) can be extracted by electrolysis.
The metals at the middle of the activity series can be extracted by

  • reduction of metal oxide with carbon
  • reduction of oxide ores with Co,
  • self-reduction of sulphide ores
  • reduction of ores with more reactive metals (thermite process).

3. The metals at the bottom of the activity series (less reactive) can be extracted by heating along, and displacement from their aqua solution.

Multiple choice questions

Question 1.
The impurity present in the ore is called as [ ]
(a) Ganguc
(b) fluid
(c) Slag
(d) Mineral
Answer:
(a) Ganguc

Question 2.
Which of the following is a carbonate ore? [ ]
(a) Magncsitc
(b) Bauxitc
(c) Gypsum
(d) tiaicna
Answer:
(a) Magncsitc

Question 3.
Which of the following is the corrcct formula of Gypsum [ ]
(a) CuSO4. 2H2O
(b) CaSO4. 1/2H2O
(c) CuSO4. 5H2O
(d) CaSO4. 2H2O
Answer:
(d) CaSO4. 2H2O

Question 4.
The oil used in the froth floatation process is [ ]
(a) kerosene oil
(b) pencil
(c) coconut oil
(d) olive coil.
Answer:
(b) pencil

Question 5.
Froth floatation is method used for the purification of …………………….. ore. [ ]
(a) sulphide
(b) oxide
(c) carbonate
(d) nitrate
Answer:
(a) sulphide

Question 6.
Galena is an ore of [ ]
(a) Zn
(b) Pb
(c) Hg
(d) Al
Answer:
(b) Pb

TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy

Question 7.
The metal that occurs in the native form is [ ]
(a) Pb
(b) Au
(c) Fc
(d) Hg
Answer:
(b) Au

Question 8.
The most abundant metal in th earth’s cruat is [ ]
(a) Silver
(b) Aluminium
(c) zinc
(d) iron
Answer:
(b) Aluminium

Question 9.
The reducing agent in thermite process is [ ]
(a) Al
(b) Mg
(c) Fe
(d) Si
Answer:
(a) Al

Question 10.
The purpose of smelting an ore is [ ]
(a) Oxidisc
(b) Reduce
(c) Neutndisc
(d) one of these
Answer:
(b) Reduce

Suggested Experiments

Question 1.
Suggest an experiment to prove that the presence of air and water are essential for corrosion. Explain the procedure.
Answer:
Corrosion: Corrosion is the deterioration of a metal, as a result of chemical reaction between it and the surrounding environment.

Experiment:
Aim: To prove that the presence of air and water are essential for corrosion. Materials required : 3 test tubes, 3 iron nails, oil, water, anhydrous calcium chloride, rubber corks.

Procedure:
1. Take three test tubes and place clean iron nails in each of them.
2. Label these tests tubes A, B and C. Pour some water in test tube A and cork it.
3. Pour boiled distilled water in test tube B, add about 1 ml of oil and cork it. The oil will float on water and prevent the air from dissolving in the water.
4. Put some anhydrous calcium chloride in test tube C and cork it. Anhydrous calcium chloride will absorb the moisture.
5. Leave these test tubes for a few days and then observe.
TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy 6
6. We will observe that ¡ron nails rust in test tube A, but they do not rust in test tubes B and C.
7. In the test tube A the nails are exposed to both air and water whereas in the test tube ‘B’ the nails are exposed to only water and in the test tube ‘C’ the nails are exposed to dry air.
8. This shows air and water are essential for corrosion.

Suggested Projects

Question 1.
Collect information about extraction of metals of low reactivity silver, platinum and gold and prepare a report.
Answer:
Extraction of Silver:

  1. Silver occurs both in combined state as well as In free state. The important ores of silver are Argentite (or) Silver glance (Ag2S) Pyrargyrite (or) Ruby silver 3 Ag2S Sb2S3 silver copper glance (CuAg)2S
  2. Silver is extracted from the ore-Argentite (Ag2S).
  3. The process of extraction of silver is called cyanide process, as sodium cyanide solution is used.
  4. The ore Is crushed, concentrated and then treated with sodium cyanide solution.
  5. This reaction forms sodium argent cyanide [Na[Ag(CN)2]]
    Ag2S + 4 NaCN → 2Na[Ag(CN)2] + Na2S
  6. This solution of sodium argent cyanide combines with zinc dust and forms tetra cyano zincate and precipitated silver. This precipitated silver is called spongy silver.
    Zn + 2Na[Ag(CN)2] → Na2[Zn(CN)4)] + 2Ag
  7. This spongy silver is fused with potassium nitrate to obtain pure silver. Then the silver obtained is purified by electrolytic process.

Extraction of platinum

  • Platinum is rarely found on its own, but In combination with other base and precious metals.
  • The extraction process of platinum is a complex process which includes milling the ore and smelting at high temperatures. This removes base metals notably sulphur and concentrates PGM (Platinum Group Metals) – Gold, Platinum and Palladium.
  • The PGM matter is further processed by electrolysis to remove Nickel, Cobalt and Copper.
  • The high-grade concentrate is treated by solvent extraction, distilling, and ion- exchange treatments to separate the PGMs Into its separated metals.

Extraction of Gold:

  1. Gold is usually found alone or alloyed with mercury or silver.
  2. In all methods of gold ore refining, the ore is usually washed and filtered at the mine, then sent to the mill. At the mill, the ore is ground into smaller particles with water, then ground again in a ball mill to further pulverize the ore.
  3. Several processes can be used to separate the Gold from its ore. They are:

a) Cyanide process:

  • The ground ore Is put In a tank containing a weak cyanide solution and zinc is added.
  • The zinc causes a chemical reaction which separates the gold from the ore.
  • The gold is then removed from the solution with a filter press.

b) Carbon-in-pulp method:

  1. In this method, the ground ore is mixed with water before cyanide Is added. Then carbon is added to bond with the gold.
  2. The carbon-gold particles are put into a caustic carbon solution, separating out the gold.

c) Heap leaching:

  1. The ore is placed on open-air pads and cyanide is sprayed over It, taking several weeks to leach down to an imperious base.
  2. The solution then pours off and pad into a pond and is pumped from there to a recovery plant, where the gold is recovered.
  3. Heap-leaching helps recover gold from ore that would otherwise be to expensive to process.

TS 10th Class Physical Science Principles of Metallurgy Intext Questions

Page 237

Question 1.
Can you mention some articles that are made up of metals?
Answer:
Utensils in kitchen, window gnUs, pots, chairs, iron gates, bodies of motor cars, etc.

Question 2.
Do metals exist in nature in the same form as that we use ¡n our daily life?
Answer:
No, metals do not exist in nature ¡n the form same as that we use in our daily life.

Question 3.
Have you ever heard the words like ore, mineral and metallurgy?
Answer:
Yes.

TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy

Question 4.
Do you know how these metals are obtained?
Answer:
The metals are extracted from their ores mainly in three stages.

  1. The concentration of ore.
  2. Extraction of crude metal.
  3. Refining of the metal.

Question 5.
How the metals are present In nature?
Answer:
The metals are present in nature In combined form as their compounds.

Page 239

Question 6.
What metals can we get from the ore mentioned in Table-1?
Answer:
TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy 7

Question 7.
Can you arrange these metals in the order of their reactivity.
Answer:
K>Na>Ca>Mg>Al >Zn>Fe>Pb>Cu>Ag>Au

Question 8.
What do you notice In table-2?
Answer:
I noticed that the ores of many metals are oxides and sulphides.

Question 9.
Can you think how do we get these metals from their ores?
Answer:
These metals are obtained from their ores by suitable metallurgical processes.

Question 10.
Does the reactivity of a metal and form of its ore (oxides, sulphides, chlorides, carbonates, sulphates) has any relation with process of extraction?
Answer:
Yes, highly reactive metals are obtained by electrolysis from their molten salts, moderately reactive metals are obtained by reducing with suitable reagents whereas least reactive metals are available in native form.

Question 11.
How are metals extracted from mineral ores?
Answer:
Metals are extracted from mineral ores In three steps.

  1. Concentration of ore or Dressing.
  2. Extraction of crude metal.
  3. Refining of the metal.

Question 12.
What methods are to be used?
Answer:
Hand-picking, Washing, Froth floatation and Magnetic Separation methods are to be used.

Page 247

Question 13.
Do you know why corrosion occurs?
Answer:
Metals are stable in the form In which they are available in nature. So by means of corrosion, they change to the form as they occur n nature.

Question 14.
What does this tell us about the conditions under which iron articles rust?
Answer:
Corrosion of iron ( commonly known as rusting ) occurs in presence of moisture and air.

Page 250

Question 15.
What is the role of furnace in metallurgy?
Answer:
A furnace is used for heating the ores and crude metals to required temperatures in metallurgical operations.

Question 16.
How they bear large amounts of heat?
Answer:
The furnaces are lined inside with refractory materials and hence they can bear large amounts of heat.
The substances which are capable of withstanding very high temperatures without melting or becoming soft are called refractory materials.

TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy

Question 17.
Do all furnaces have same structure?
Answer:
No, all furnaces do not have same structure.

TS 10th Class Physical Science Principles of Metallurgy Activities

Activity 1

Question 1.
How do you classify ores based on their formula?
1) Look at the following ores.
2) Identify the metal present in each ore.
TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy 8
Now classify them as shown in the table.
Answer:
Classification of ores as oxides, sulphides, chlorides, carbonates, and sulphates is done as follows.
TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy 9

Activity 2

Question 2.
Show that both air and water are necessary for corrosion of iron.
Answer:

  1. Take three test tubes and place clean iron nails in each of them.
  2. Label these test tubes as A, B and C. Pour cork it.
  3. Pour boiled distilled water in test tube. B Add about 1 ml of oil and cork it. The oil will float on water and prevent the air from dissolving in the water.
  4. Put some anhydrous calcium chloride in test tube C and cork it. Anhydrous calcium chloride will absorb the moisture if any from the air. Leave these test tubes for a few days and then observe.

Observation: Iron nails rust in test tube A but they do not rust in test tubes B and C. In the test tube A the nails are exposed to both air and water. In the test tube B the nails are exposed to distilled water and the nails in test tube C are exposed to dry air only.

Inference: From this we can conclude that both air and water are necessary for corrosion of iron.
TS 10th Class Physical Science Solutions Chapter 11 Principles of Metallurgy 10

TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle

We are offering TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle to learn maths more effectively.

TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle

→ Secant: A line which intersects a circle in two distinct points is called a secant.
TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle 1
PAB is secant of the circle with centre ‘o’

→ Tangent: A tangent to a circle is a line that intersects the circle is exactly one point.
TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle 2
Tt is the tangent to the circle with centre ‘o’

  • No tangent can be drawn to a circle from a point lying inside it.
  • One and only one tangent can be drawn to a circle at a point on a circle.
  • Two tangents can be drawn to a circle from a point lying outside it.
  • The lengths of two tangents drawn from an external point to a circle are equal.
  • A tangent to a circle is perpendicular to the radius drawn through the point of contact.
  • A line drawn through the end point of a radius and perpendicular to it is a tangent to the circle.
  • The common point of a tangent to a circle is called point of contact.
  • The line containing the radius through the point of contact the normal to the circle at the point.

TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle

→ Sector: The portion of the circular region enclosed between a chord and the corresponding arc is called a segment of the circle.
OAPB is a sector of the circle with centre ‘O’
∠AOB is called the angle of the sector. OAPB is called the minor sector and OAQB is called the major sector.
TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle 3
Area of the sector = \(\frac{\mathrm{x}^{\circ}}{360^{\circ}}\) × πr2 where x° is the angle of the sector & ‘r’ is the radius.
Length of arc = \(\frac{\mathrm{x}^{\circ}}{360^{\circ}}\) × 2πr

→ Segment: The chord AB divides the circle with centre ‘O’ into two parts. APB is called the minor segment where as AQB is called the major segment.
TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle 4
Area of the segment: Area of the segment APB = Area of the sector OAPB – Area of OAB.
Area of the major sector OAQB = Area of the circle – Area of the minor sector OAPB
Area of major segment of a circle = Area of the corresponding sector – Area of the corresponding triangle.

→ The locus of points which are joined by a curve and are equidistant from a fixed point is called a circle. The fixed point here is called the centre of the circle.
TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle 5
(Or)
A simple closed curve consisting of all points in a plane which are equidistant from a fixed point is called a circle. The fixed point is its centre and the fixed distance is its radius.

→ The path followed by circular object is a straight line.
TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle 6

→ The line segment joining any two points on a circle is called a ‘chord’. The longest of all chords of a circle passes through the centre and is called a diameter.
TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle 7
\(\overline{\mathrm{AB}}\) is a chord and \(\overline{\mathrm{PQ}}\) is a diameter. (PO and OQ is the radius of the circle.
Diameter = 2 × radius
d = 2r
r = \(\frac{r}{2}\)

→ There are three different possibilities for a given line and a circle.
TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle 8
Case (i): The line PQ and the circle have no point in common (or) they do not touch each other.
Case (ii): The line PQ and the circle have two common points (or) a line which intersects a circle at two distinct points is called a “secant” of the circle.
The line PQ intersects the circle at two distinct points A and B. Here the line PQ is a “secant” of the circle.
Case (iii): The line PQ touches the circle at an unique point A(or) there is one and only one point common to both the line and circle.
Here \(\overleftrightarrow{\mathrm{PQ}}\) is called a tangent to the circle at ‘A’.

→ The word tangent is derived from the Latin word “TANGERE” which means “to touch” and was introduced by Danish mathematician “Thomas Fineke” in 1583.

→ There is only one tangent to the circle at one point.

→ The tangent at any point of a circle is perpendicular to the radius through the point of contact.
TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle 9
The radius OP is perpendicular to \(\stackrel{\leftrightarrow}{\mathrm{AB}}\) at P. i.e., OP ⊥ AB.

→ Construction of a tangent to a circle :
TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle 10

  • Draw a circle with centre ‘O’.
  • Draw a perpendicular line to OP through ‘P’.
  • Let it be \(\stackrel{\leftrightarrow}{\mathrm{XY}}\).
  • XY is the required tangent to the given circle passing through P.

TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle

→ Let ‘O’ be the centre of the given circle and \(\overline{\mathrm{AP}}\) is a tangent through a Where OA is the radius, then the length of the tangent AP = \(\sqrt{O P^2-\mathrm{OA}^2}\)
TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle 11

→ Two tangents can be drawn to a circle from an external point.

Important Formula:

  • Area of Sector = \(\frac{\mathrm{X}^{\circ}}{360^{\circ}}\) × πr2
  • Length of arc = \(\frac{\mathrm{X}^{\circ}}{360^{\circ}}\) × 2πr
  • A line which intersects a circle In two distinct points Is called a secant.
  • A tangent to a circle is a line that Intersects the circle Is exactly one point.

Flow Chat:
TS 10th Class Maths Notes Chapter 9 Tangents and Secants to a Circle 12

Archimedes (287 – 212 B.C):

  • “Archimedes of Syracuse” was a Greek mathematician, physicist and engineer.
  • He is regarded as one of the leading scientists in classical antiquity.
  • He made several discoveries in the fields of mathematics particularly in geometry.

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Solving these TS 10th Class Maths Bits with Answers Chapter 8 Similar Triangles Bits for 10th Class will help students to build their problem-solving skills.

Similar Triangles Bits for 10th Class

Question 1.
From the figure ∠DAC = ……………….
TS 10th Class Maths Bits Chapter 8 Similar Triangles 1
A) 35°
B) 55°
C) 45°
D) 60°
Answer:
A) 35°

Question 2.
The ratio of the corresponding sides of two similar triangles is 5 : 3 then the ratio of their areas
A) 5 : 3
B) 3 : 5
C) 6 : 10
D) 25 : 9
Answer:
D) 25 : 9

Question 3.
If ∆ABC ~ ∆DEF; BC = 4 cm, EF = 5 cm and ∆ABC = 80 cm2 then ∆DEF = ………………….
A) 100 cm2
B) 150 cm2
C) 125 cm2
D) 225 cm2
Answer:
C) 125 cm2

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 4.
In the figure DE // BC and AD : DB = 1 : 2 then ∆ADE : ∆ABC =
A) 1 : 4
B) 4 : 1
C) 1 : 9
D) 2 : 9
Answer:
C) 1 : 9

Question 5.
∆ABC ~ ∆PQR. M is the mid point of BC. N is the mid point of QR. If the area of ∆ABC = 100 cm2 and area of ∆PQR = 144 cm2 and AM = 4 cm then PN = ………………… cm
A) 5 cm
B) 4.8 cm
C) 4 cm
D) 3.8 cm
Answer:
B) 4.8 cm

Question 6.
In ∆PQR, PQ = 6\(\sqrt{3}\) cm; PR = 12 cm, QR = 6 cm then ∠B = ………………..
A) 30°
B) 45°
C) 90°
D) 60°
Answer:
B) 45°

Question 7.
The lengths of diagonals of a rhombus are 24 cm and 32 cm then the perimeter of rhombus
A) 180°
B) 120°
C) 220°
D) 112°
Answer:
A) 180°

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 8.
Which of the following does not belongs to side of right triangle ?
A) 9cm, 15cm, 12cm
B) 9cm, 5cm, 7cm
C) 400mm, 300mm, 500mm
D) 2cm, \(\sqrt{5}\) cm, 1cm
Answer:
B) 9cm, 5cm, 7cm

Question 9.
In an isosceles ∆PQR, PR = QR and PQ2 = 2PR2 then ∠R = ……………….
A) 60°
B) 30°
C) 90°
D) 45°
Answer:
C) 90°

Question 10.
In ∆ABC the mid points are D, E and F of the sides AB, BC, CA then ∆DEF : ∆ABC
A) 1 : 1
B) 1 : 3
C) 1 : 2
D) 1 : 4
Answer:
D) 1 : 4

Question 11.
The diagonal of a square is 7\(\sqrt{2}\) cm then its area
A) 28 cm2
B) 14\(\sqrt{2}\) cm2
C) 21 cm2
D) 49 cm2
Answer:
D) 49 cm2

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 12.
In the figure AB = 2.5 cm, AC = 3.5 cm. If AD is the bisector of ∠BAC then BD : DC = …………..
TS 10th Class Maths Bits Chapter 8 Similar Triangles 2
A) 5 : 3
B) 3 : 5
C) 5 : 7
D) 2 : 7
Answer:
C) 5 : 7

Question 13.
In the figure DE divides AB and AC in the ratio 1 : 3 If DE = 2.4 cm then BC = ………………
TS 10th Class Maths Bits Chapter 8 Similar Triangles 3
A) 4.8 cm
B) 7.2 cm
C) 9.6 cm
D) 12 cm
Answer:
B) 7.2 cm

Question 14.
The height of an equilateral triangle whose side is a unit
A) \(\frac{\mathrm{a}}{2}\)
B) \(\frac{\sqrt{3}}{2}\)a
C) \(\sqrt{3}\)a
D) \(\frac{\sqrt{3}}{4}\)a
Answer:
B) \(\frac{\sqrt{3}}{2}\)a

Question 15.
If ∆ABC ~ ∆XYZ, ∠C = 60° ∠B = 75° then ∠Z = ……………….
A) 90°
B) 75°
C) 45°
D) 60°
Answer:
D) 60°

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 16.
Maximum possible tangents that can drawn to a circle is ………. (A.P. Mar. ’15)
A) Infinity
B) 4
C) 100
D) 2
Answer:
A) Infinity

Question 17.
∆ABC ~ ∆DEF and areas of ∆ABC, ∆DEF are 64 cm2 and 121 cm2 then the ratio of corresponding sides. (A.P. Mar. ’15)
A) 11 : 8
B) 8 : 11
C) 3 : 11
D) 19 : 8
Answer:
B) 8 : 11

Question 18.
Area of a regular hexagon whose side is ‘a’ cm is ………………. (A.P. Mar. ’15)
A) 6 \(\left(\frac{\sqrt{3}}{4} a^2\right)\)
B) 6 \(\left(\frac{3}{4} a^2\right)\)
C) \(\sqrt{6}\left(\frac{3}{4} a^2\right)\)
D) 6\(\left(\frac{\sqrt{3}}{4} a^2\right)\)
Answer:
D) 6\(\left(\frac{\sqrt{3}}{4} a^2\right)\)

Question 19.
If a man walks 6 m to East and 8m to North. Now he is at a distance of ……………… from origin point. (A.P. Mar.’15 )
A) 10 m
B) 48 m
C) 14 m
D) 2 m
Answer:
A) 10 m

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 20.
∠CAD in the given figure is …………………
TS 10th Class Maths Bits Chapter 8 Similar Triangles 4
A) 50°
B) 60°
C) 40°
D) 90°
Answer:
A) 50°

Question 21.
Example for the sides of a Right angled triangle is …………….. (A.P. June ’15)
A) 5, 6, 9
B) 5, 12, 13
C) 5, 11, 12
D) 7, 8, 9
Answer:
B) 5, 12, 13

Question 22.
Height of an equilateral triangle whose side is ‘a’ cm is ……………. (A.P. Mar. ’16)
A) \(\frac{\sqrt{3}}{2}\)a
B) \(\frac{2}{\sqrt{3}}\)a2
C) \(\sqrt{\frac{3}{2}}\)a
D) \(\frac{\sqrt{3}}{2}\)a2
Answer:
A) \(\frac{\sqrt{3}}{2}\)a

Question 23.
∆ABC ~ ∆XYZ, ∠C = 60° ∠B = 70° then ∠ X = ……………… (A.P. Mar.’16)
A) ∠ X = 70°
B) ∠ X = 50°
C) ∠X = 60°
D) ∠X = 10°
Answer:
B) ∠ X = 50°

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 24.
When we construct a triangle similar to a given triangle as per given scale factor, we construct on the basis of ………….. (T.S. Mar. ’15)
A) SSS similarity
B) AAA similarity
C) Basic proportionality theorem
D) A and C are correct
Answer:
C) Basic proportionality theorem

Question 25.
∆ABC ~ ∆DEF is given then which of the following is correct. (T.S. Mar. ’15)
TS 10th Class Maths Bits Chapter 8 Similar Triangles 5
TS 10th Class Maths Bits Chapter 8 Similar Triangles 6
Answer:
(A)

Question 26.
In ∆ABC ∠C = 90°, BC = a, AB = c, AC = b and ‘p‘ is length of height drawn from ‘C’ to AB then ……… is correct. (T.S. Mar. ’15)
A) \(\frac{1}{\mathrm{p}^2}\) = \(\frac{1}{\mathrm{a}^2}\) – \(\frac{1}{\mathrm{b}^2}\)
B) \(\frac{1}{\mathrm{p}^2}\) = \(\frac{1}{\mathrm{b}^2}\) – \(\frac{1}{\mathrm{a}^2}\)
C) \(\frac{1}{\mathrm{p}^2}\) = \(\frac{1}{\mathrm{a}^2}\) + \(\frac{1}{\mathrm{b}^2}\)
D) \(\frac{2}{\mathrm{p}^2}\) = \(\frac{1}{\mathrm{a}^2}\) + \(\frac{1}{\mathrm{b}^2}\)
Answer:
C) \(\frac{1}{\mathrm{p}^2}\) = \(\frac{1}{\mathrm{a}^2}\) + \(\frac{1}{\mathrm{b}^2}\)

Question 27.
From the figure, x = …………………
TS 10th Class Maths Bits Chapter 8 Similar Triangles 7
A) 10
B) 15
C) 12
D) 25
Answer:
B) 15

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 28.
In the given figure, DE // BC and AD : DB = 5 : 4, then \(\frac{\text { D DEF }}{\text { D CFB }}\) =
TS 10th Class Maths Bits Chapter 8 Similar Triangles 8
A) \(\frac{81}{25}\)
B) \(\frac{5}{9}\)
C) \(\frac{5}{4}\)
D) \(\frac{25}{81}\)
Answer:
D) \(\frac{25}{81}\)

Question 29.
In the figure, ∆ ABC is an isosceles triangle right angled at B. Two equilateral triangles are constructed with sides AC and BC. Then ∆ BCD = …………
TS 10th Class Maths Bits Chapter 8 Similar Triangles 9
A) ∆ ACE
B) ∆ ABC
C) \(\frac{1}{2}\) (∆ ABC)
D) \(\frac{1}{2}\) (∆ ACE)
Answer:
D) \(\frac{1}{2}\) (∆ ACE)

Question 30.
In the figure ∆PQR and ∆SQR are two triangles on the same base QR. If PS intersects QR at ‘O’, then ∆PQR : ∆SQR = …………
TS 10th Class Maths Bits Chapter 8 Similar Triangles 10
A) PO : SO
B) PQ : QS
C) PR : SR
D) PQ : SR
Answer:
A) PO : SO

Question 31.
In the figure, ∠BAD = ∠CAD; AB = 3.4 cm, BD = 4 cm, BC = 10 cm, then AC = ……………
TS 10th Class Maths Bits Chapter 8 Similar Triangles 11
A) 5.1 cm
B) 3.4 cm
C) 6 cm
D) 5.3 cm
Answer:
A) 5.1 cm

Question 32.
All ……………… triangles similar.
A) equilateral
B) scalene
C) isosceles
D) none
Answer:
A) equilateral

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 33.
Two polygons are similar if …………………
A) corresponding angles are equal
B) corresponding sides are equal
C) both A & B
D) none
Answer:
C) both A & B

Question 34.
The ratio of areas of two similar triangles is equal to the ratio of the squares of corresponding ……………
A) sides
B) areas
C) angles
D) none
Answer:
A) sides

Question 35.
A perpendicular is drawn from the vertex of a right angle to the hypotenuse then the tri-angles on each side of the perpendicular are ……………..
A) similar
B) not similar
C) square
D) none
Answer:
A) similar

Question 36.
If one angle of a triangle is equal to one angle of another triangle and the sides including these angles are proportional, the two triangles are similar. This property is …………………
A) SSS
B) ASA
C) AAA
D) SAS
Answer:
D) SAS

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 37.
If the sides of two similar triangles are in the ratio 7 : 2 then the ratio of their areas is …………….
A) 9 : 2
B) 8 : 9
C) 4 : 49
D) 49 : 4
Answer:
D) 49 : 4

Question 38.
∆ABC ~ ∆PQR, ∠A = 32°, ∠R = 65° then ∠B = ………………
A) 64°
B) 73°
C) 83°
D) none
Answer:
C) 83°

Question 39.
TS 10th Class Maths Bits Chapter 8 Similar Triangles 12
If ∆ABC ~ ∆PQR then y + z = ……………..
A) 1 + 3\(\sqrt{3}\)
B) 4 + 3\(\sqrt{3}\)
C) 3\(\sqrt{3}\) + 7
D) 9 + \(\sqrt{3}\)
Answer:
B) 4 + 3\(\sqrt{3}\)

Question 40.
In ∆LMN, ∠L = 60°, ZM = 50° and ∆LMN ~ ∆PQR then ∠R = ……………..
A) 70°
B) 80°
C) 90°
D) none
Answer:
A) 70°

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 41.
The perimeter of ∆ABC ~ ∆LMN are 60 cm and 48 cm of LM = 8 cm then AB = ………………. cm.
A) 19
B) 11
C) 7
D) 10
Answer:
D) 10

Question 42.
In ∆ABC, BC2 + AB2 = AC2 then ……………… is the right angle.
A) ∠B
B) ∠A
C) ∠C
D) none
Answer:
A) ∠B

Question 43.
The bisector of ∠A of ∆ABC intersects BC at D. If BD : DC = 4 : 7 and AC = 3.5. Then AB = ……………..
A) 2
B) 8
C) 10
D) 11
Answer:
A) 2

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 44.
∆ABC ~ ∆PQR, ∠A = 50° then ∠Q + ∠R = ……………….
A) 120°
B) 110°
C) 130°
D) 180°
Answer:
C) 130°

Question 45.
In the figure, CD = …………….. cm.
TS 10th Class Maths Bits Chapter 8 Similar Triangles 13
A) \(\sqrt{3}\)
B) 2\(\sqrt{3}\)
C) 3\(\sqrt{3}\)
D) 6\(\sqrt{3}\)
Answer:
D) 6\(\sqrt{3}\)

Question 46.
In the figure, AC = ……………. cm.
TS 10th Class Maths Bits Chapter 8 Similar Triangles 14
A) 19
B) 9
C) 12
D) 10
Answer:
C) 12

Question 47.
The ratio of corresponding sides of two similar triangles is 3 : 2 then the ratio of their corresponding heights is …………….
A) 3 : 2
B) 2 : 3
C) 1 : 4
D) 1 : 7
Answer:
A) 3 : 2

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 48.
In the figure, ∠ABC = ………………..
TS 10th Class Maths Bits Chapter 8 Similar Triangles 15
A) 30°
B) 70°
C) 50°
D) 60°
Answer:
D) 60°

Question 49.
In ∆ABC, XY || BC, AX : XB = 2 : 1 then ∆ AXY : ∆ABC = ………………
A) 9 : 4
B) 4 : 9
C) 1 : 9
D) 2 : 3
Answer:
B) 4 : 9

Question 50.
In a square, the diagonal is ………………. times of its side.
A) \(\sqrt{7}\)
B) \(\sqrt{3}\)
C) \(\sqrt{2}\)
D) 2
Answer:
C) \(\sqrt{2}\)

Question 51.
The side of an equilateral triangle is ‘a’ units. Its height is …………….. units.
A) \(\frac{\sqrt{3 a}}{2}\)
B) \(\frac{\sqrt{3}}{4}\)a
C) \(\frac{3}{a}\)
D) \(\frac{3}{2}\)
Answer:
A) \(\frac{\sqrt{3 a}}{2}\)

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 52.
The ratio of the areas of two similar triangles is 1 : 4 then the ratio of their corresponding sides …………….
A) 9 : 1
B) 1 : 1
C) 2 : 1
D) 1 : 2
Answer:
D) 1 : 2

Question 53.
∆ABC ~ ∆PQR then AB : PQ = ……………….
A) AC : PR
B) AC : PQ
C) AB : PR
D) none
Answer:
A) AC : PR

Question 54.
∆ABC is an isosceles right triangle ∠C = 90° then AB2 = ……………….
A) AB2 + BC2
B) AC2 + BC2
C) AC2 + 2
D) none
Answer:
B) AC2 + BC2

Question 55.
Each angle in an equilateral triangle is ……………….
A) 60°
B) 80°
C) 100°
D) 70°
Answer:
A) 60°

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 56.
Each exterior angle of an equilateral triangle is …………….
A) 180°
B) 130°
C) 110°
D) 120°
Answer:
D) 120°

Question 57.
The longest side in a right triangle is ……………..
A) smaller
B) hypotenuse
C) adjacent
D) none
Answer:
B) hypotenuse

Question 58.
In the figure, ∆ABC, DE // BC and \(\frac{A D}{D B}\) = \(\frac{3}{5}\), AC = 5.6 then AE = …………….. cm.
TS 10th Class Maths Bits Chapter 8 Similar Triangles 16
A) 1.8
B) 3.5
C) 1.2
D) 2.1
Answer:
D) 2.1

Question 59.
From the figure, AD = ……………. cm.
TS 10th Class Maths Bits Chapter 8 Similar Triangles 17
A) 2.4
B) 4.2
C) 8.2
D) 9.2
Answer:
A) 2.4

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 60.
In the figure, LM // CB and LN // CD then \(\frac{A M}{A B}\) = ……………….
TS 10th Class Maths Bits Chapter 8 Similar Triangles 18
Answer:
(A)

Question 61.
In a trapezium, diagonals divide each other ………………
A) proportionally
B) not proportional
C) congruent
D) none
Answer:
A) proportionally

Question 62.
In ∆ABC, AB = BC = AC then ∠A = ∠B = ∠C = …………..
A) 70°
B) 60°
C) 80°
D) 90°
Answer:
B) 60°

Question 63.
In the figure, two triangles are similar then x = ……………… cm.
TS 10th Class Maths Bits Chapter 8 Similar Triangles 19
A) 9.3
B) 1.5
C) 7.5
D) 8.5
Answer:
C) 7.5

Question 64.
In the figure, x = …………… cm
TS 10th Class Maths Bits Chapter 8 Similar Triangles 20
A) 10
B) 12
C) 9
D) 8
Answer:
D) 8

Question 65.
In the figure, x = ……………. cm.
TS 10th Class Maths Bits Chapter 8 Similar Triangles 21
A) 12 cm
B) 8 cm
C) 3 cm
D) data is not sufficient
Answer:
D) data is not sufficient

Question 66.
∆ABC ~ ∆PQR, ∠A + ∠B = 100°, ∠R = ……………
A) 60°
B) 80°
C) 90°
D) 100°
Answer:
B) 80°

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 67.
∆ABC ~ ∆DEF and their areas are respectively 64 cm2 and 121 cm2 if EF = 15.4 cm then BC = …………….. cm.
A) 10.2
B) 8.7
C) 11.2
D) 10.3
Answer:
C) 11.2

Question 68.
Which of the following are the sides of a right triangle ?
A) 10 cm, 8 cm, 6 cm
B) 12 cm, 1 cm, 9 cm
C) 3 cm, 5 cm, 12 cm
D) all
Answer:
A) 10 cm, 8 cm, 6 cm

Question 69.
From the figure y = …………….. cm.
TS 10th Class Maths Bits Chapter 8 Similar Triangles 22
A) 9
B) 10
C) 12
D) 15
Answer:
D) 15

Question 70.
The diagonal of a trapezium ABCD in which AB // CD intersect at ‘O’. If AB = 2CD then the ratio of areas of triangles AOB and COD is …………….
A) 14 : 1
B) 1 : 2
C) 1 : 9
D) none
Answer:
D) none

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 71.
∆ABC ~ ∆DEF and 2AB = DE and BC = 8 cm then EF = ………………. cm.
A) 16
B) 19
C) 12
D) none
Answer:
A) 16

Question 72.
∆ABC ~ ∆DEF, BC = 4 cm, EF = 5 cm and area of ∆ABC = 80 cm2 then area of ∆DEF = …………… cm2.
A) 105
B) 165
C) 125
D) none
Answer:
C) 125

Question 73.
In the figure PQR, ∠QPR = 90°, PQ = 24 cm and QR = 26 cm and in ∆PKR, ∠PKR = 90° and KR = 8 cm then PK = ……………… cm.
TS 10th Class Maths Bits Chapter 8 Similar Triangles 23
A) 10
B) 6
C) 19
D) 8
Answer:
B) 6

Question 74.
In the figure, QA ⊥ AB and PB ⊥ AB if AO = 20 cm, BO = 12 cm, PB = 18 cm then AQ = ……………. cm.
TS 10th Class Maths Bits Chapter 8 Similar Triangles 24
A) 70
B) 60
C) 40
D) 30
Answer:
D) 30

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 75.
In the figure, ∠A = ∠B and AD = BE then …………
TS 10th Class Maths Bits Chapter 8 Similar Triangles 25
A) DE // AB
B) DE = AB
C) CD = EB
D) none
Answer:
A) DE // AB

Question 76.
In the figure, in ∆PQR, QR // ST, \(\frac{\mathrm{PS}}{\mathrm{SQ}}\) = \(\frac{3}{5}\) and PR = 28 cm then PT = ……………. cm.
TS 10th Class Maths Bits Chapter 8 Similar Triangles 26
A) 6.5
B) 10.5
C) 8.1
D) 3.3
Answer:
B) 10.5

Question 77.
In an equilateral triangle ABC, AD ⊥ BC meeting BC in D then AD2 = …………….
A) 3 BD2
B) BD2
C) AB2
D) none
Answer:
A) 3 BD2

Question 78.
In the figure, if AB // CD then x = …………….. cm.
TS 10th Class Maths Bits Chapter 8 Similar Triangles 27
A) 10
B) 12
C) 7
D) 9
Answer:
C) 7

Question 79.
If the diagonals in a quadrilateral divide each other proportionally then it is ………….
A) square
B) trapezium
C) triangle
D) none
Answer:
B) trapezium

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 80.
In the figure, DE // AB and FE // DB then DC2 …………….
TS 10th Class Maths Bits Chapter 8 Similar Triangles 28
A) CF × AC
B) FE × AB
C) CF × FD
D) none
Answer:
A) CF × AC

Question 81.
D, E and F are the mid points of the sides BC, CA and AB respectively of ∆ABC then the ratio of the areas of ∆DEF and ABC = …………..
A) 1 : 9
B) 2 : 1
C) 1 : 2
D) 1 : 4
Answer:
D) 1 : 4

Question 82.
In the figure \(\frac{\mathrm{PS}}{\mathrm{SQ}}\) = \(\frac{\mathrm{PT}}{\mathrm{TR}}\) and ∠PST = ∠PRQ then ∆PQR is ………………. triangle.
A) isosceles
B) equilateral
C) scalene
D) none
Answer:
A) isosceles

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 83.
Side of a rhombus is 4 cm then its perimeter is ……………. cm
A) 22
B) 21
C) 16
D) 20
Answer:
C) 16

Question 84.
In the figure, x = ………………
TS 10th Class Maths Bits Chapter 8 Similar Triangles 29
A) 130°
B) 135°
C) 45°
D) 15°
Answer:
B) 135°

Question 85.
Two sides of a right triangle are 3 cm and 4 cm then the third side is …………… cm.
A) 9
B) 6
C) 6.1
D) 5
Answer:
D) 5

Question 86.
∆ABC ~ ∆PQR, AB : PQ = 3 : 4 then ar ∆ ABC : ar ∆ PQR = ……………
A) 9 : 16
B) 9 : 1
C) 16 : 9
D) none
Answer:
A) 9 : 16

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 87.
If 82 + 152 = k2 then k = ………………
A) 16
B) 17
C) 19
D) 20
Answer:
B) 17

Question 88.
The angles of a triangle arc in the ratio 1 : 2 : 3 then the largest angle is ………………
A) 70°
B) 60°
C) 90°
D) 20°
Answer:
C) 90°

Question 89.
Straight angle means ………………..
A) 180°
B) 190°
C) 200°
D) 100°
Answer:
A) 180°

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 90.
In the figure, PQ // MN, \(\frac{\mathrm{K P}}{\mathrm{P M}}\) = \(\frac{4}{13}\) and KN = 20.4 cm then KQ ……………… = cm.
TS 10th Class Maths Bits Chapter 8 Similar Triangles 30
A) 6.3
B) 4.8
C) 1.8
D) 2.8
Answer:
B) 4.8

Question 91.
In the figure DE // BC if AD = x, AE = x + 2, DB = x – 2 and CE = x – 1 then x = ………………
TS 10th Class Maths Bits Chapter 8 Similar Triangles 31
A) 4
B) 5
C) 6
D) 7
Answer:
A) 4

TS 10th Class Maths Bits Chapter 8 Similar Triangles

Question 92.
∆ABC ~ ∆DEF if DE : AB = 2 : 3 and ar ∆DEF = 44 sq. units then ar ∆ABC = ……………. sq.units.
A) 90
B) 101
C) 99
D) 110
Answer:
C) 99

TS 10th Class Maths Notes Chapter 8 Similar Triangles

We are offering TS 10th Class Maths Notes Chapter 8 Similar Triangles to learn maths more effectively.

TS 10th Class Maths Notes Chapter 8 Similar Triangles

→ The geometrical figures which have the same shape but are not necessarily of the same size are called similar figures.

→ The heights and distances of distant objects can be found using the principles of similar figures.

→ Two polygons with same number of sides are said to be similar if their corresponding angles are equal and their corresponding sides are in proportion.

→ A polygon in which all sides and all its angles are equal is called a regular polygon.
TS 10th Class Maths Notes Chapter 8 Similar Triangles 1

→ The ratio of the corresponding sides is referred to as scale factor or representative factor.

→ All squares are similar.

→ All circles are similar.

→ All equilateral triangles are similar.

TS 10th Class Maths Notes Chapter 8 Similar Triangles

→ Two congruent figures are similar but two similar figures need not be congruent.
TS 10th Class Maths Notes Chapter 8 Similar Triangles 2

→ A square ABCD and a rectangle PQRS are of equal corresponding angles, but their corresponding sides are in proportion.
∴ The square ABCD and the rectangle PQRS are not similar.

→ The corresponding sides of a square ABCD and a rhombus PQRS are equal but their corresponding angles are not equal. So they are not similar.
TS 10th Class Maths Notes Chapter 8 Similar Triangles 3

→ If a line is draw parallel to one side of a triangle inter-secting the other two sides at two distinct points then the other two sides are divided in the same ratio.
TS 10th Class Maths Notes Chapter 8 Similar Triangles 4
In ΔABC; DE ∥ BC then \(\frac{\mathrm{AD}}{\mathrm{DB}}=\frac{\mathrm{AE}}{\mathrm{EC}}\)
This is called Basic Proportionality theorem (or) Thale’s theorem.

→ If a line divides any two sides of a triangle in the same ratio, then the line must be parallel to the third side.
In ΔABC, a line intersecting AB in D and AC in E such that \(\frac{\mathrm{AD}}{\mathrm{DB}}=\frac{\mathrm{AE}}{\mathrm{EC}}\)
Then l ∥ BC.
This is converse of Thale’s theorem.

→ Two triangles are similar, if
i) their corresponding angles are equal.
ii) their corresponding sides are in the same ratio.
If in two triangles, corresponding angles are equal, then their corresponding sides are in the same ratio or proportional and hence the two triangles are similar.
TS 10th Class Maths Notes Chapter 8 Similar Triangles 5
In ΔABC, ΔDEF
∠A = ∠D
∠B = ∠E
∠C = ∠F ⇒ \(\frac{\mathrm{AB}}{\mathrm{DE}}=\frac{\mathrm{BC}}{\mathrm{EF}}=\frac{\mathrm{AC}}{\mathrm{DF}}\)
∴ ΔABC ~ ΔDEF (A . A. A)

→ If in two triangles, sides of one triangle are proportional to the sides of other triangle, then their corre-sponding angles are equal and hence the two triangles are similar.
TS 10th Class Maths Notes Chapter 8 Similar Triangles 6
In ΔABC, ΔDEF
\(\frac{\mathrm{AB}}{\mathrm{DE}}=\frac{\mathrm{BC}}{\mathrm{EF}}=\frac{\mathrm{AC}}{\mathrm{DF}}\) ⇒ ∠A = ∠D
∠B = ∠E
∠C = ∠F
Hence, ΔABC ~ ΔDEF (S.S.S)

→ If two angles of a triangle are equal to two corresponding angles of another triangle then the two triangles are similar.
TS 10th Class Maths Notes Chapter 8 Similar Triangles 7
In ΔABC, ΔDEF
∠A = ∠D
∠B = ∠E
⇒ ∠C = ∠F (By Angle sum property)
∴ ΔABC ~ ΔDEF (A.A)

→ If one angle of a triangle is equal to one angle of other triangle and the sides including these angles are proportional, then the two triangles are similar.
TS 10th Class Maths Notes Chapter 8 Similar Triangles 8
In ΔABC, ΔDEF
∠A = ∠D
\(\frac{\mathrm{AB}}{\mathrm{DE}}=\frac{\mathrm{AC}}{\mathrm{DF}}\)
∴ ΔABC ~ ΔDEF (S.A.S)
The ratio of areas of two similar triangles is equal to the ratio of the squares of their corresponding sides.
\(\frac{\Delta \mathrm{ABC}}{\Delta \mathrm{DEF}}=\frac{\mathrm{AB}^2}{\mathrm{DE}^2}=\frac{\mathrm{BC}^2}{\mathrm{EF}^2}=\frac{\mathrm{AC}^2}{\mathrm{DF}^2}\)

TS 10th Class Maths Notes Chapter 8 Similar Triangles

→ If a perpendicular is drawn from the vertex, containing the right angle of a right triangle to the hypotenuse, then the triangles on each side of perpendicular are similar to one another and to the original triangle. Also the square of the perpendicular is equal to the product of the lengths of the two parts of the hypotenuse.
TS 10th Class Maths Notes Chapter 8 Similar Triangles 9
In ΔABC, ∠B = 90°
BD ⊥ AC
Then ΔADB – ΔBDC ~ ΔABC
and BD2 = AD. DC

→ Pythagoras theorem: In a right angled triangle the square of hypotenuse is equal to the sum of the squares of other two sides.
TS 10th Class Maths Notes Chapter 8 Similar Triangles 10
In ΔABC; ∠A = 90°; AB2 + AC2 = BC2

→ In a triangle, if square of one side is equal to sum of squares of the other two sides, then the angle opposite to the first side is right angle.
TS 10th Class Maths Notes Chapter 8 Similar Triangles 11
In ΔABC, AC2 = AB2 + BC2 then ∠B = 90°
This is converse of Pythagoras theorem.

→ Baudhayan Theorem (about 800 BC) : The diagonal of a rect¬angle produces itself the same area as produced by its both sides.
(i.e., length and breadth)
TS 10th Class Maths Notes Chapter 8 Similar Triangles 12
In rectangle ABCD, area produced by the diagonal AC = AC . AC = AC2, area produced by the length = AB . BA = AB2, area produced by the breadth = BC. CB = BC2
Hence, AC2 = AB2 + BC2

→ A sentence which is either true or false but not both is called a simple statement.

→ A statement formed by combining two or more simple statements is called a compound statement.

→ A compound statement of the form “If… then…” is called a Conditional or Implication.

→ A statement obtained by modifying the given statement by ‘NOT’ is called its negation.

Important Formulas:

  • Pythagoras Theorem AC2 = AB2 + BC2
  • If ΔABC ~ ΔPQR then \(\frac{\operatorname{ar}(\mathrm{ABC})}{\operatorname{ar}(\mathrm{PQR})}=\left(\frac{\mathrm{AB}}{\mathrm{PQ}}\right)^2=\left(\frac{\mathrm{BC}}{\mathrm{QR}}\right)^2=\left(\frac{\mathrm{CA}}{\mathrm{RP}}\right)^2\)

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TS 10th Class Maths Notes Chapter 8 Similar Triangles 13

TS 10th Class Maths Notes Chapter 8 Similar Triangles

Pythagoras (570 – 495 B.C):

  • Pythagoras was an Ionian Greek philosopher, mathematician and founder of the religious movement called Pythagoreanism.
  • Pythagoras made influential contributions to philosophy and religious teaching in the late 6th century BC.
  • He is often revered as a great mathematician, mystic and scientist, but he is best) known for the Pythagorean theorem which bears his name.

TS 10th Class Maths Notes Chapter 7 Coordinate Geometry

We are offering TS 10th Class Maths Notes Chapter 7 Coordinate Geometry to learn maths more effectively.

TS 10th Class Maths Notes Chapter 7 Coordinate Geometry

→ A French mathematician Rene Descartes (1596 – 1650) has developed the study of Co-ordinate Geometry.

→ The cartesian plane is also called co-ordinate plane or xy plane.

→ The X-co-ordinate is called the Abscissa and the y-co-ordinate is called the ordinate.

→ The intersection of x-axis and y-axis is called the origin. The co-ordinates of origin = 0 (0, 0).

→ Area of Rhombus = \(\frac{1}{2}\) × product of its diagonals.

→ Area of a triangle = \(\frac{1}{2}\) × base × height.

→ The distance between two points P(x1, y1) and Q(x2, y2) is \(\sqrt{\left(x_2-x_1\right)^2+\left(y_2-y_1\right)^2}\)

→ The distance of a point (x, y) from the origin is \(\)

→ The distance between two points (x1, y1) and (x2, y2) on a line parallel to Y – axis is |y2 – y1|.

→ The distance between two points (x1, y1) and (x2, y2) on a line parallel to X-axis is |x2 – x1|.

→ The co-ordinates of the point P(x, y) which divides the line segment joining the points A(x1, y1) and B(x2, y2) internally in the ratio m1 : m2 are
\(\left[\frac{m_1 x_2+m_2 x_1}{m_1+m_2}, \frac{m_1 y_2+m_2 y_1}{m_1+m_2}\right]\)

TS 10th Class Maths Notes Chapter 7 Coordinate Geometry

→ The midpoint of the line segment joining the points P(x1, y1) and Q(x2, y2) is
\(\left(\frac{x_1+x_2}{2}, \frac{y_1+y_2}{2}\right)\)

→ The point of intersection of the medians of a triangle is called the centroid. It is usually denoted by G. it divides each median in the ratio 2 :1.

→ The vertices of ΔABC are A(x1, y1), B(x2, y2) and C(x3, y3), then the co-ordinates of the centroid of the ΔABC is \(\left[\frac{x_1+x_2+x_3}{3}, \frac{y_1+y_2+y_3}{3}\right]\)

→ The area of the triangle formed by the points (x1, y1) (x2, y2) and (x3, y3) is the numerical value of the expression
\(\frac{1}{2}\)|x1(y2 – y3) + x2(y3 – y1) + x3(y1 – y2)|.

→ Area of a triangle formula or Heron’s Formula A = \(\sqrt{s(s-a)(s-b)(s-c)}\)
S = \(\frac{a+b+c}{2}\)

→ Slope of the line (m) = \(\frac{y_2-y_1}{x_2-x_1}\)

Important Formula:

  • AB = \(\sqrt{\left(x_2-x_1\right)^2+\left(y_2-y_1\right)^2}\)
  • Point (x, y) form the origin is \(\sqrt{x^2+y^2}\)
  • Mid Point = \(\left[\frac{x_1+x_2}{2}, \frac{y_1+y_2}{2}\right]\)
  • Centroid = \(\left[\frac{x_1+x_2+x_3}{3}, \frac{y_1+y_2+y_3}{3}\right]\)
  • Area = \(\frac{1}{2}\)|x1(y2 – y3) + x2(y3 – y1) + x3(y1 – y2)|.
  • Heron’s Formula A = \(\sqrt{S(S-a)(S-b)(S-c)}\)
  • S = \(\frac{a+b+c}{2}\)
  • Slope m = \(\frac{y_2-y_1}{x_2-x_1}\)

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TS 10th Class Maths Notes Chapter 7 Coordinate Geometry 1

TS 10th Class Maths Notes Chapter 7 Coordinate Geometry

Rene Descartes (1596 – 1650):

  • Rene Descartes was a French Mathematician.
  • Rene Descartes is a Father of Modern Mathematics.
  • The Cartesian co-ordinate system – allowing reference to a point in space as a set of numbers, and allowing algebraic equations to be expressed as geometric shapes in a two – dimensional co-ordinate system was named after him.
  • Descartes theory provided the basis for the calculus of Newton and Leibnitz.

TS 10th Class Maths Notes Chapter 6 Progressions

We are offering TS 10th Class Maths Notes Chapter 6 Progressions to learn maths more effectively.

TS 10th Class Maths Notes Chapter 6 Progressions

→ The array of numbers following some rule is called a number pattern.
E.g.: 4, 6, 4, 6, 4, 6,…

→ There is a relationship between the numbers of a pattern.

→ Each number in a pattern is called a term.

→ The series or list of numbers formed by adding or subtracting a fixed number to / from the preceding terms is called an Arithmetic Progression, simply A.P.
E.g.: 3, 5, 7, 9, 11,

→ In the above list, each term is obtained by adding ‘2’ to the preceding term except the first term.

→ Also, we find that the difference between any two successive terms is the same throughout the series. This is called “common difference”.

→ The general form of an A.P. is a – the first term; d – the common difference.
a, a + d, a + 2d, a + 3d,…. a + (n – l)d. Here d = a2 – a1 = a3 – a2 = a4 – a3 = ………………… = an – an-1.

→ If the number of terms of an A.P. is finite, then it is a finite A.P.
E.g.: 10, 8, 6, 4, 2.

→ If the number of terms of an A.P. is infinite, then it is an infinite A.P.
E.g.: 4, 8,12,16, …

→ If d > 0, then an > an-1 and if d < 0, then an < an-1

→ The general term or nth term of an A.P. is an = a + (n – 1)d.
E.g.: The 10th term of 10, 6, 2, – 2, is Here a = 10; d = a2 – a1 = 6 -10 = – 4
∴ a10 = a + (n – 1)d = 10 + (10 – 1) × – 4 = 10 – 40 + 4 = – 26.

TS 10th Class Maths Notes Chapter 6 Progressions

→ Sum of first n – terms of an A.P. is Sn = \(\frac{n}{2}\)(a + l), where a is the first term and l is the last term.
E.g : 1 + 2 + 3 + ………… + 80 = \(\frac{80}{2}\)(1 + 80) = 40 × 81 = 3240

→ Sum of the first n – terms of an A.P. is given by,
Sn = \(\frac{n}{2}\)[2a + (n – 1)d]. Also, an = Sn – Sn-1

→ In a series of numbers, if every number is obtained by multiplying the preceding number by a fixed number except for the first term, such arrangement is called geometric progression or G.P.
E.g.: 4, 8, 16, 32, 64,…
Here, starting from the second term, each term is obtained by multiplying the preceding term by 2. The first term may be denoted by ‘a’, then we also see that
\(\frac{a_2}{a_1}=\frac{a_3}{a_2}=\frac{a_4}{a_3}=\ldots=\frac{a_n}{a_{n-1}}\) = r
We call it “common ratio”, denoted by ‘r’.

→ The general form of a G.P. is a, ar, ar2, ar3,…., arn-1
i.e a1 = a, a2 = ar, a3 = ar2, ……… an = arn-1

Important Formula:

  • a = First term
  • d = Tn – Tn-1
  • Tn = a + (n – 1)d
  • Sn = \(\frac{n}{2}\)[2a + (n – 1)d]
  • Sn = \(\frac{n}{2}\)[a + l]
  • r = \(\frac{T_n}{T_{n-1}}\)
  • Tn = arn-1
  • Sn = \(\frac{a\left(r^n-1\right)}{r-1}\); r ≥ 1
  • Sn = \(\frac{a\left(1-r^n\right)}{1-r}\); r ≤ 1
  • S = \(\frac{a}{1-r}\); |r| < 1

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TS 10th Class Maths Notes Chapter 6 Progressions 1

TS 10th Class Maths Notes Chapter 6 Progressions

Carl Fredrich Gauss(1777 – 1855):

  • Carl Fredrich Gauss was a German mathematician and physical scientist who contributed significantly to many fields of mathematics.
  • Gauss was asked to find the sum of the positive integers from 1 to 100. He immediately replied that the sum is 5050.
  • Gauss had a remarkable influence in many fields of mathematics and science and is ranked as one of history’s most influential mathematicians.

TS 10th Class Maths Notes Chapter 5 Quadratic Equations

We are offering TS 10th Class Maths Notes Chapter 5 Quadratic Equations to learn maths more effectively.

TS 10th Class Maths Notes Chapter 5 Quadratic Equations

→ The general form of a linear equation in one variable is ax + b = c.

→ Any equation of the form p(x) = 0 where p(x) is a polynomial of degree 2, is a quadratic equation.

→ If p(x) = 0 whose degree is 2 is written in descending order of their degrees, then we say that the quadratic equation is written in the standard form.

→ The standard form of a quadratic equation is ax2 + bx + c = 0 where a ≠ 0. We can write it as y = ax2 + bx + c.

→ There are various occasions in which we make use of Q.E. in our day-to-day life.
Eg : The height of a rocket is defined by a Q.E.

→ Let ax2 + bx + c = be a quadratic equation. A real number a is called a root of the Q.E. if aα2 + bα + c = 0. And x = a is called a solution of the Q.E. (i.e.) the real value of x for which the Q.E ax2 + bx + c = 0 is satisfied is called its solution.

→ Zeroes of the Q.E. ax2 + bx + c = 0 and the roots of the Q.E. ax2 + bx + c = 0 are the same.

TS 10th Class Maths Notes Chapter 5 Quadratic Equations

→ To factorise a Q.E. ax2 + bx + c = 0, we find p, q ∈ R such that p + q = b and pq = ac.
This process is called Factorising a Q.E. by splitting its middle term.
Eg : 12x2 + 13x + 3 = 0
here a = 12; b = 13; c = 3
a.c = 12 × 3 = 36
b = 4 + 9 where 4 × 9 = 36
Now 12x2 + 9x + 4x +3 = 0
⇒ 12x2 + 9x + 4x + 3 = 0
⇒ 3x(4x + 3) + 1 (4x + 3) = 0
⇒ (4x + 3) (3x + 1) = 0
Here 4x + 3 = 0 or 3x + 1 = 0
⇒ 4x = -3 or 3x = -1
⇒ x = \(\frac{-3}{4}\) or x = \(\frac{-1}{3}\)

\(\frac{-3}{4}\) and \(\frac{-1}{3}\) are called the roots of the Q.E. 12x2 + 13x + 3 = 0 and x = \(\frac{-3}{4}\) or \(\frac{-1}{3}\) is the solution of the Q.E 12x2 + 13x + 3 = 0.

→ In the above example, (4x + 3) and (3x + 1) are called the linear factors of the Q.E. 12x2 + 13x + 3 = 0

→ We can factorise a Q.E. by adjusting its left side so that it becomes a perfect square.
Eg : x2 + 6x + 8 = 0 ⇒ x2 + 2. x. 3 + 8 = 0 ⇒ x2 + 2.x.3 = -8
The L.H.S. is of the form a2 + 2ab
∴ By adding b2 it becomes a perfect square
∴ x2 + 2.x.3 + 32 = -8 + 32
⇒ (x + 3)2 = -8 + 9
⇒ (x + 3)2 = 1
⇒ x + 3 = ±1
Now we take x + 3 = 1 or x + 3=-1
⇒ x = -2 or x = -4

→ Adjusting a Q.E. of the form ax2 + bx + c = 0 so that it becomes a perfect square.
Step -1: ax2 + bx + c = 0 ⇒ ax2 + bx = -c
⇒ x2 + \(\frac{b}{a}\)x = \(\frac{-c}{a}\)

Step – 2: x2 + \(\frac{\mathrm{bx}}{\mathrm{a}}+\left[\frac{1}{2}\left(\frac{\mathrm{b}}{\mathrm{a}}\right)\right]^2=\frac{-\mathrm{c}}{\mathrm{a}}+\left[\frac{1}{2}\left(\frac{\mathrm{b}}{\mathrm{a}}\right)\right]^2\)

Step – 3: \(\left(x+\frac{b}{2 a}\right)^2=\frac{b^2-4 a c}{4 a^2}\)

Step – 4: Solve the above
Eg: 5x2 – 6x + 2 = 0 ⇒ x2 – \(\frac{6 x}{5}=\frac{-2}{5}\)
TS 10th Class Maths Notes Chapter 5 Quadratic Equations 1

→ Let ax2 + bx + c = 0 (a ≠ 0) be a Q.E., then b2 – 4ac is called the Discriminant of the Q.E.

→ If b2 – 4ac > 0, then the roots of the Q.E. ax2 + bx + c = 0 are given by
x = \(\frac{-b \pm \sqrt{b^2-4 a c}}{2 a}\). This is called quadratic formula to find the roots

→ The nature of the roots of a Q.E. can be determined either by its discriminant or its graph.
Q.E.: y = ax2 + bx + c.
TS 10th Class Maths Notes Chapter 5 Quadratic Equations 2

TS 10th Class Maths Notes Chapter 5 Quadratic Equations

Important Formulas:

  • Quadratic Formula for find the roots x = \(\frac{-b – \sqrt{b^2-4 a c}}{2 a}\)
  • Sum of the roots α + β = \(\frac{-b}{a}\)
  • Product of the roots αβ = \(\frac{c}{a}\)
  • Discriminant = b2 – 4ac
  • If b2 – 4ac > 0 then the roots are real and distinct.
  • If b2 – 4ac = 0 the roots are real and equal.
  • If b2 – 4ac < 0 then the roots are not real.

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TS 10th Class Maths Notes Chapter 5 Quadratic Equations 3

Al – Khwarizmi (780 – 850):

  • Muhammad ibn Musa al-Khwarizmi was a Persian mathematician, astronomer, astrologer and geographer, it He was born around 780 A.D. in Khwarizmi (now Khiva, Uzbekishtan) and died around 850.
  • He worked most of his life as a scholar in the House of Wisdom in Baghdad, it His ‘Algebra’ was the first book on the systematic solutions of linear and quadratic equations.

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Solving these TS 10th Class Maths Bits with Answers Chapter 9 Tangents and Secants to a Circle Bits for 10th Class will help students to build their problem-solving skills.

Tangents and Secants to a Circle Bits for 10th Class

Question 1.
The angle between the tangent to a circle and the radius drawn through the point of contact is
A) 90°
B) 60°
C) 45°
D) 30°
Answer:
A) 90°

Question 2.
From a point P, length of the tangent to a circle is 12 cm and the distance of P from the centre is 13 cm. then the radius of circle is
A) 7 cm
B) 6 cm
C) 5 cm
D) 12.5 cm
Answer:
C) 5 cm

Question 3.
If the tangents PA and PB from a point P to a circle with centre ‘O’ are inclined to each other at an angle of 80° then ∠POA = …………..
A) 50°
B) 60°
C) 70°
D) 80°
Answer:
A) 50°

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 4.
If TP and TQ are two tangents to a circle with centre ‘O’ so that ∠POQ = 110°, then ∠PTQ =
A) 60°
B) 70°
C) 80°
D) 90°
Answer:
B) 70°

Question 5.
In the adjacent figure, if quadrilateral PQRS circumscribes a circle then PB + SD = ………………
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 1
A) SR
B) PR
C) QS
D) PS
Answer:
D) PS

Question 6.
In the adjacent figure, APB is a tangent to the circle with centre ‘O’ at a point P. If ∠QPB = 50° then the measure of ∠POQ =
A) 25°
B) 75°
C) 100°
D) 120°
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 2
C) 100°

Question 7.
In the adjacent figure AB, BC and AC of a triangle ABC, touch a circle at P, Q and R respectively. If PA = 4 cm, BP = 6 cm and AC = 11cm then length of BC =
A) 15 cm
B) 14 cm
C) 7 cm
D) 10 cm
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 3
Answer:
D) 10 cm

Question 8.
In the adjacent figure, if BP = 5 cm, QC = 7 cm and AR = 6 cm then AB + BC + AC =
A) 18 cm
B) 36 cm
C) 25 cm
D) 30 cm
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 4
Answer:
B) 36 cm

Question 9.
The length of the tangent drawn from a point 17 cm away from the centre of a circle of radius 8 cm is
A) 25 cm
B) 9 cm
C) 15 cm
D) 8.5 cm
Answer:
C) 15 cm

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 10.
In the adjacent figure, the length of the chord AB if PA = 6 cm and ∠PAB = 60° is
A) 5 cm
B) 6 cm
C) 7 cm
D) 4 cm
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 5
Answer:
B) 6 cm

Question 11.
A line which intersects a circle in two points is called
A) a secant
B) a tangent
C) a chord
D) an arc
Answer:
A) a secant

Question 12.
The number of tangents that can be drawn to a circle at any point on it is
A) 2
B) 1
C) 3
D) infinetly many
Answer:
B) 1

Question 13.
The number of parallel tangents that can be drawn to a circle can have at the most is
A) 1
B) 2
C) 3
D) 4
Answer:
B) 2

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 14.
The number of tangents that can be drawn to a circle from outside the circles is
A) 2
B) 1
C) infinetly many
D) 4
Answer:
A) 2

Question 15.
Two concentric circles of radii 5 cm and 3 cm. Find the length of the chord of the larger circle which touches the smaller circle
A) 10 cm
B) 6 cm
C) 8 cm
D) 2 cm
Answer:
C) 8 cm

Question 16.
Length of the arc of a quadrant of a circle of radius ‘r’ is
A) πr
B) 3πr
C) \(\frac{\pi \mathrm{r}}{2}\) + 2r
D) \(\frac{\pi \mathrm{r}}{2}\)
Answer:
D) \(\frac{\pi \mathrm{r}}{2}\)

Question 17.
The length of the arc A × B in the adjacent figure is
A) 11 cm
B) 22 cm
C) 33 cm
D) 44 cm
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 6
Answer:
B) 22 cm

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 18.
The area of a sector of a circle of radius 7 cm and central angle 45° is
A) 5.5 cm2
B) 19.25 cm2
C) 154 cm2
D) 77 cm2
Answer:
B) 19.25 cm2

Question 19.
The measure of central angle of a circle
A) 90°
B) 180°
C) 170°
D) 360°
Answer:
D) 360°

Question 20.
In the adjacent figure, ‘O’ is the centre of the circle. The area of the sector OAPB is \(\frac{5}{18}\) part of the area of the circle. Then the value
A) 30°
B) 60°
C) 45°
D) 100°
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 7
Answer:
D) 100°

Question 21.
A tangent PQ at a point P of a circle of radius 5 cm meets a line through the centre O at a point Q so that OQ = 12 cm, then PQ =
A) \(\sqrt{79}\)
B) \(\sqrt{119}\)
C) 119
D) 169
Answer:
B) \(\sqrt{119}\)

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 22.
The number of parallel tangents of a circle with a given tangent is
A) 1
B) 2
C) 3
D) 4
Answer:
A) 1

Question 23.
The length of the tangent drawn from an exterior point is 8 cm away from the centre of a circle of radius 6 cm is
A) 8 cm
B) 10 cm
C) 6 cm
D) 12 cm
Answer:
B) 10 cm

Question 24.
In the figure x = ………………
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 8
A) 60°
B) 100°
C) 110°
D) 120°
Answer:
D) 120°

Question 25.
The semi perimeter of ∆ABC = 28 cm then AF + BD + EC is …………………..
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 9
A) 23 cm
B) 28 cm
C) 56 cm
D) 14 cm
Answer:
B) 28 cm

Question 26.
The length of the drawn from a point 8 cm away from the centre of circle with radius 6 cm is
A) 2\(\sqrt{7}\) cm
B) 3\(\sqrt{7}\) cm
C) \(\sqrt{7}\) cm
D) 10 cm
Answer:
A) 2\(\sqrt{7}\) cm

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 27.
In the figure ‘O’ is the centre of the circle and PA, PB are tangents, then their lengths are,
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 10
A) 5 cm, 13 cm
B) 13 cm, 13 cm
C) 13 cm, 12 cm
D) 12 cm, 12 cm
Answer:
D) 12 cm, 12 cm

Question 28.
Angle in a major segment is
A) an obtuse angle
B) an acute angle
C) right angle
D) none
Answer:
B) an acute angle

Question 29.
The length of the tangent drawn to a circle with radius ‘r’ from a point P which is ‘d’ units from the centre is
A) \(\sqrt{d^2-r^2}\)
B) \(\sqrt{r^2+d^2}\)
C) \(\sqrt{d r}\)
D) \(\sqrt{d + r}\)
Answer:
A) \(\sqrt{d^2-r^2}\)

Question 30.
If the arc is a minor arc then the segment is a …………………. segment
A) Minor
B) Major
C) Semi-circle
D) None
Answer:
A) Minor

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 31.
The radius of a circle is equal to the sum of the circumferences of two circles of diameters 36 cm and 20 cm is ……………
A) 16 cm
B) 28 cm
C) 42 cm
D) 56 cm
Answer:
B) 28 cm

Question 32.
If tangents PA and PB from a point P to a circle with centre ‘O’ are inclined to each other at an angle of 110° then ∠PAO =
A) 45°
B) 50°
C) 70°
D) 35°
Answer:
D) 35°

Question 33.
How many tangent lines can be drawn to a circle from a point outside the circle ?
A) 1
B) 4
C) 2
D) none
Answer:
B) 4

Question 34.
In the given figure ∠APB = 60° and OP = 10 cm. then PA = …………….. cm. (A.P. Mar. ’16, ’15)
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 11
A) 5
B) 5\(\sqrt{2}\)
C) 5\(\sqrt{3}\)
D) 20
Answer:
C) 5\(\sqrt{3}\)

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 35.
The maximum number of possible tangents that can be drawn to a circle is ……………. (A.P. Mar. ’15)
A) infinity
B) 2
C) 4
D) 1
Answer:
A) infinity

Question 36.
The angle between the tangent and the radius drawn at the point of contact is ………………. (A.P. June ’15)
A) 60°
B) 30°
C) 45°
D) 90°
Answer:
D) 90°

Question 37.
If a circle is inscribed in a Quadrilateral then AB + CD = …………….. (A.P. June ’15)
A) BC + DA
B) AC + BD
C) 2AC + 2BD
D) 2BC + 2DA
Answer:
A) BC + DA

Question 38.
In the adjoint figure AC = 5, So BC = ………………… cm. (A.P. June ’15)
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 12
A) 5 cm
B) 7.5 cm
C) 2.5 cm
D) 10 cm
Answer:
C) 2.5 cm

Question 39.
The angle made at the centre of a circle is ………………. (A.P. Mar. ’16)
A) 360°
B) 90°
C) 280°
D) 60°
Answer:
A) 360°

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 40.
The number of secants that can be drawn to a circle is ………………… (T.S. Mar. ’16)
A) 2
B) 1
C) infinity
D) 0
Answer:
C) infinity

Question 41.
The diameter of a circle is 10.2 cm then its radius is ……………… cm. (A.P. Mar. ’16)
A) 5.1 cm
B) 20.4
C) 10.5
D) 15.3
Answer:
A) 5.1 cm

Question 42.
If ‘r’ is the radius of a semi-circle then its perimeter is ………………….
A) πr + 2r (or) r[π + 2] (or) \(\frac{36}{7}\) r
B) πr + r
C) πr + 3r
D) πr
Answer:
A) πr + 2r (or) r[π + 2] (or) \(\frac{36}{7}\) r

Question 43.
Which of the following is not correct? (A.P. Mar. ’16 )
i) Maximum possible tangents that can be drawn to a circle from a point ‘p’ is 2.
ii) The number of secants drawn to a circle from a point at exterior is 2.

A) i only
B) ii only
C) i and ii
D) neither (i) nor (ii)
Answer:
A) i only

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 44.
In the figure PT is a tangent to the circle with centre O’ then x = ………………….
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 13
A) 148°
B) 58°
C) 52°
D) 42°
Answer:
D) 42°

Question 45.
Angle in a major segment is …………………
A) an obtuse angle
B) an acute angle
C) right angle
D) none
Answer:
B) an acute angle

Question 46.
In the figure PT is a tangent drawn from P. If the radius is 7 cm and OP is 25 cm, then the length of the tangent is ………………. cm.
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 14
A) 18
B) 20
C) 24
D) 26
Answer:
C) 24

Question 47.
PQ is the chord of a circle. The tangent XR drawn at X meets PQ at R when produced. If XR = 12 cm, PQ = x cm, QR = (x – 2) cm. then x = ………………..
A) 6 cm
B) 7 cm
C) 14 cm
D) 10 cm
Answer:
D) 10 cm

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 48.
The angle between the tangent to a circle and the radius drawn through the point of contact is ………………
A) 90°
B) 60°
C) 45°
D) 30°
Answer:
A) 90°

Question 49.
Two circles intersect at A, B, PS, PT are two tangents drawn from P which lies on AB to the two circles, then ……………..
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 15
A) PS = 2PT
B) PT = 2PS
C) PS = PT
D) PS ≠ PT
Answer:
C) PS = PT

Question 50.
In the figure AB is a diameter and AC is chord of the circle such that ∠BAC = 30°. If DC is a tangent, then ABCD is ……………..
A) isosceles
B) equilateral
C) right angled
D) acute angled
Answer:
A) isosceles

Question 51.
To draw a pair of tangents to a circle which are inclined to each other at an angle of 60° it is required to draw the tangents at the end points of two radii inclined at an angle of ……………….
A) 30°
B) 60°
C) 90°
D) 120°
Answer:
D) 120°

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 52.
If the radii of two concentric circles are 5 cm and 13 cm then the length of the chord of one circle which is tangent to the other circle is ……………
A) 24 cm
B) 18 cm
C) 12 cm
D) 6 cm
Answer:
A) 24 cm

Question 53.
If tangents PA and PB from a point P to a circle with centre O are inclined to each other at an angle of 110° then ∠PAO = …………….
A) 45°
B) 50°
C) 70°
D) 35°
Answer:
D) 35°

Question 54.
In a right triangle ABC, right angled at B, BC = 15 cm and AB = 8 cm. A circle is inscribed in the triangle ABC. The radius of the circle is ……………..
A) 1cm
B) 3 cm
C) 5 cm
D) 2 cm
Answer:
B) 3 cm

Question 55.
Three circles are drawn with the vertices of a triangle as centres such that each circle touches the other two. If the sides of the triangle are 2 cm, 3 cm, 4 cm find the diameter of the smallest circle.
A) 4 cm
B) 2 cm
C) 1 cm
D) 5 cm
Answer:
C) 1 cm

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 56.
A circle may have ……………… parallel tangents atmost.
A) 10
B) 12
C) 9
D) 2
Answer:
D) 2

Question 57.
A tangent to a circle intersects it in ………………. point(s).
A) 1
B) 2
C) 3
D) 4
Answer:
A) 1

Question 58.
A line segment joining any point on a circle is called its ………………..
A) diameter
B) tangent
C) chord
D) none
Answer:
C) chord

Question 59.
A line which intersects the given circle at two distinct points is called a ……………….
A) tangent
B) secant
C) circle
D) centre
Answer:
B) secant

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 60.
The common point to a tangent and a circle is called …………………
A) point of contact
B) circle
C) tangent
D) none
Answer:
A) point of contact

Question 61.
Angle between the tangent and radius drawn through the point of contact is ……………..
A) 100°
B) 70°
C) 80°
D) 90°
Answer:
D) 90°

Question 62.
The circumference of a circle is 100 cm. The side of a square inscribed in the circle is ……………… cm.
A) \(\frac{1}{\pi}\)
B) \(\frac{5 \sqrt{2}}{\pi}\)
C) \(\frac{50 \sqrt{2}}{\pi}\)
D) 50\(\sqrt{2}\)
Answer:
C) \(\frac{50 \sqrt{2}}{\pi}\)

Question 63.
The area of a square inscribed in a circle of radius 8 cm is …………………… cm2.
A) 118
B) 129
C) 160
D) 128
Answer:
D) 128

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 64.
The area of a circle that can be inscribed in a square of side 6 cm is …………………… cm2.
A) 9π
B) 12π
C) 120π
D) none
Answer:
A) 9π

Question 65.
The perimeter of a quadrant of a circle of radius \(\frac{7}{2}\) cm is …………………. cm.
A) 9.5
B) 12.5
C) 10.5
D) 2
Answer:
B) 12.5

Question 66.
The number of tangents at one point of a circle is ………………..
A) 1
B) 2
C) 3
D) 10
Answer:
A) 1

Question 67.
Number of tangents to a circle which are parallel to a secant are …………………
A) 1
B) 10
C) 9
D) 2
Answer:
D) 2

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 68.
………………. tangent can be drawn from a point inside a circle.
A) No
B) 1
C) 4
D) None
Answer:
A) No

Question 69.
A line which is perpendicular to the radius of the circle through the point of contact is called a …………………..
A) secant
B) tangent
C) chord
D) none
Answer:
B) tangent

Question 70.
The tangents drawn at the ends of a diameter are ………………
A) parallel
B) 0
C) perpendicular
D) none
Answer:
B) 0

Question 71.
The tangent drawn at the end point of radius is ………………….
A) 0
B) parallel
C) perpendicular
D) none
Answer:
C) perpendicular

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 72.
Tangents drawn from an exterior point are ……………..
A) not equal
B) parallel
C) equal
D) none
Answer:
C) equal

Question 73.
A secant meets a circle in ……………… points.
A) 2
B) 4
C) 3
D) 1
Answer:
A) 2

Question 74.
A tangent meets a circle in ……………… points.
A) 10
B) 9
C) 7
D) 1
Answer:
D) 1

Question 75.
Sum of the central angles in a circle is ………………..
A) 360°
B) 300°
C) 180°
D) 110°
Answer:
A) 360°

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 76.
Angle is a semi-circle at the centre is …………………….
A) 100°
B) 180°
C) 200°
D) 80°
Answer:
B) 180°

Question 77.
From the figure, x = ……………… cm.
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 16
A) 8.4
B) 8.8
C) 4.8
D) 4
Answer:
C) 4.8

Question 78.
Angle in a semi-circle is ……………..
A) 80°
B) 90°
C) 100°
D) 110°
Answer:
B) 90°

Question 79.
Number of tangents drawn to a circle is ……………….
A) 1
B) 4
C) 3
D) infinite
Answer:
D) infinite

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 80.
In the figure, x = ……………….. cm.
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 17
A) 5
B) 6
C) 8.2
D) 10
Answer:
A) 5

Question 81.
Angle in a minor segment is ………………
A) acute
B) 60°
C) obtuse
D) none
Answer:
C) obtuse

Question 82.
In a circle d = 10.2 cm then r = …………… cm.
A) 4.1
B) 5.1
C) 4.6
D) 5.6
Answer:
B) 5.1

Question 83.
The longest chord in a circle is ……………..
A) diameter
B) radius
C) chords
D) none
Answer:
A) diameter

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 84.
Circles having same centre are called ……………. circles.
A) triangle
B) concentric
C) trapezium
D) none
Answer:
B) concentric

Question 85.
Circles having same radii are ………………
A) congruent
B) not congruent
C) only similar
D) none
Answer:
A) congruent

Question 86.
Area of circle is ………….. sq. units.
A) \(\frac{\pi}{\mathrm{r}^2}\)
B) πr3
C) πr2
D) π2r2
Answer:
C) πr2

Question 87.
The shaded portion represents ……………….
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 18
A) minor segment
B) major segment
C) chord
D) none
Answer:
A) minor segment

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 88.
Area of semi-circle is ……………….
A) πr2
B) π2 r
C) \(\frac{\pi \mathrm{r}^2}{2}\)
D) πr
Answer:
C) \(\frac{\pi \mathrm{r}^2}{2}\)

Question 89.
Number of circle passing through 3 collinear points in a plane is ……………….
A) 1
B) 0
C) 9
D) 12
Answer:
B) 0

Question 90.
Sum of opposite angles in a cyclic quadrilateral is …………….
A) 100°
B) 180°
C) 190°
D) 200°
Answer:
B) 180°

Question 91.
Cyclic rhombus is a ………………
A) rhombus
B) parallelogram
C) triangle
D) none
Answer:
A) rhombus

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 92.
In the figure, ∠BAC = ………………
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 19
A) 90°
B) 70°
C) 30°
D) none
Answer:
C) 30°

Question 93.
Area of sector = ……………….
A) \(\frac{x^{\circ}}{360}\) × πr2
B) \(\frac{x^{\circ}}{360}\) × 2πr
C) lb
D) none
Answer:
A) \(\frac{x^{\circ}}{360}\) × πr2

Question 94.
Area of ring = ……………….
A) π(R2 – r2)
B) π(R – r)
C) R2 – r2
D) π(R2 – r2 + 2r)
Answer:
A) π(R2 – r2)

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 95.
Side of a square is 4 cm then A = ……………….. cm2.
A) 64
B) 12
C) 16
D) 20
Answer:
C) 16

Question 96.
Diameter of a circle passes through ……………
A) equal
B) point
C) centre
D) none
Answer:
C) centre

Question 97.
The shaded portion represents …………… segment.
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 20
A) major
B) minor
C) acute
D) none
Answer:
A) major

Question 98.
Which of the following is a semicircle ?
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 21
Answer:
(A)

Question 99.
Angles in the same segment of the circle ………………
A) 30°
B) equal
C) not equal
D) none
Answer:
B) equal

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 100.
In the figure, x° = …………
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 22
A) 30°
B) 110°
C) 60°
D) none
Answer:
D) none

Question 101.
In the figure, x = …………………
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 23
A) 20°
B) 90°
C) 60°
D) 80°
Answer:
C) 60°

Question 102.
Area of triangle = ………………. sq.units.
A) bh
B) \(\frac{1}{2}\)bh
C) \(\frac{\mathrm{b}+\mathrm{h}}{2}\)
D) none
Answer:
B) \(\frac{1}{2}\)bh

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 103.
Area of square whose is 3 cm in …………………… cm2.
A) 6
B) 12
C) 10
D) 9
Answer:
D) 9

Question 104.
Area of circle with radius r = …………………
A) πr4
B) πr
C) πr2
D) \(\frac{\pi}{2}\)
Answer:
C) πr2

Question 105.
The area of square is 49 cm2 then side is …………….. cm.
A) 12
B) 6
C) 8
D) 7
Answer:
D) 7

Question 106.
In the above problem perimeter = ……………. cm.
A) 19
B) 16
C) 28
D) none
Answer:
C) 28

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 107.
Angle made by minute hand in 1 m = ………………..
A) 6°
B) 12°
C) 10°
D) none
Answer:
A) 6°

Question 108.
x° = 60°, r = 14 cm then area of sector = ………………. cm2.
A) 100.6
B) 102.66
C) 811.6
D) none
Answer:
B) 102.66

Question 109.
Area of regular hexagon of side ‘a’ units is ……………… sq. units.
A) \(\frac{6 \sqrt{3}}{4}\)a2
B) \(\frac{6 \sqrt{3}}{7}\)a2
C) \(\frac{6}{7} \sqrt{3}\)a2
D) none
Answer:
A) \(\frac{6 \sqrt{3}}{4}\)a2

Question 110.
Parallelogram circumscribing a circle is a ……………
A) parallelogram
B) rhombus
C) circle
D) none
Answer:
B) rhombus

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 111.
In the figure, XY and X1Y1 are two parallel tangents to a circle with centre ‘O’ and another tangent AB with point of contact C intersecting XY at A and X1Y1 at B then ∠AOB = ………………..
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 24
A) 75°
B) 95°
C) 70°
D) 90°
Answer:
D) 90°

Question 112.
The angle between a tangent to a circle and the radius drawn at the point of contact is ……………….
A) 60°
B) 70°
C) 90°
D) 20°
Answer:
C) 90°

Question 113.
If AP and AQ are the two tangents to a circle with centre ‘O’. So that POQ = 110° then ∠PAQ = ……………..
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 25
A) 70°
B) 60°
C) 65°
D) 75°
Answer:
A) 70°

Question 114.
Area of circle interms of diameter is ……………..
A) \(\frac{\pi \mathrm{d}^2}{4}\)
B) πr2
C) \(\frac{\pi \mathrm{d}^2}{14}\)
D) all
Answer:
A) \(\frac{\pi \mathrm{d}^2}{4}\)

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 115.
In the figure, AP = 12 cm, PB = 16 cm and π = 3.14 then perimeter of shaded region is …………………… cm.
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 26
A) 51
B) 70
C) 58
D) 68
Answer:
C) 58

Question 116.
A bicycle wheel makes 75 revolutions per minute to maintain a speed of 8.91 km per hour then diameter of the wheel is ………………. m.
A) 6.3
B) 0.63
C) 8.1
D) none
Answer:
B) 0.63

Question 117.
Angle described by hour hand in 12 hours is ………………….
A) 90°
B) 200°
C) 360°
D) 180°
Answer:
C) 360°

Question 118.
Each angle in a square is …………….
A) 85°
B) right angle
C) 60°
D) 70°
Answer:
B) right angle

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 119.
In the figure, the area of shaded region is ……………… cm2.
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 27
A) 74
B) 60
C) 82
D) 42
Answer:
D) 42

Question 120.
Perimeter of semicircle is ………… units.
A) \(\frac{36 \mathrm{r}}{7}\)
B) \(\frac{18}{7}\)r
C) \(\frac{9}{17}\)r
D) none
Answer:
A) \(\frac{36 \mathrm{r}}{7}\)

Question 121.
In the figure the relation among a, b and c is ………………
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 28
A) c2 = a2 + b2
B) c2 – a2 = 2b2
C) c2 + b2 = a2
D) all
Answer:
A) c2 = a2 + b2

Question 122.
In the figure, a = ……………….
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 29
A) 100°
B) 170°
C) 80°
D) 90°
Answer:
C) 80°

Question 123.
Perimeter of sectors = …………….
A) l + 2r
B) l – r
C) l – 2r
D) none
Answer:
A) l + 2r

Question 124.
What do you observe from the below
TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle 30
A) PA < PB B) PA > PB
C) PA = PB
D) none
Answer:
C) PA = PB

TS 10th Class Maths Bits Chapter 9 Tangents and Secants to a Circle

Question 125.
The radius of a circle is doubled then its area becomes ……………… times.
A) 5
B) 4
C) 9
D) none
Answer:
B) 4