Table of Contents
Chapter 5 Trigonometric Ratios Exercise Ex. 5.1
Question 1 (i)
Solution 1 (i)
Question 1 (ii)
Solution 1 (ii)
Question 1 (iii)
Solution 1 (iii)
Question 1 (iv)
Solution 1 (iv)
Question 1 (v)
Solution 1 (v)
Question 1 (vi)
Solution 1 (vi)
Question 1 (vii)
Solution 1 (vii)
Question 1 (viii)
Solution 1 (viii)
Question 1 (ix)
Solution 1 (ix)
Question 1 (x)
Solution 1 (x)
Question 1 (xi)
Solution 1 (xi)
Question 1 (xii)
Solution 1 (xii)
Question 2
In ABC right angled at B, AB = 24 cm, BC = 7 cm. Determine
(i) sin A, cos A
(ii) sin C, cos C
Solution 2
In ABC by applying Pythagoras theorem
AC2 = AB2 + BC2
= (24)2 + (7)2
= 576 + 49
= 625
AC = = 25 cm
Question 3
Solution 3
Question 4
Solution 4
Question 5
Given 15 cot A = 8. Find sin A and sec ASolution 5
Question 6
Solution 6
Question 7
Solution 7
Question 8
Solution 8
Question 9
Solution 9
Question 10
Solution 10
Question 11
Solution 11
Question 12
Solution 12
Question 13
Solution 13
Question 14
Solution 14
Question 15
Solution 15
Question 16
Solution 16
Question 17
Solution 17
Question 18
Solution 18
Question 19
Solution 19
Question 20
Solution 20
Question 21
Solution 21
Question 22
Solution 22
Question 23
Solution 23
Question 24
Solution 24
Question 26
Solution 26
Question 27
Solution 27
Question 28
Solution 28
Question 29
Solution 29
Question 30
Solution 30
Question 31
Solution 31
Question 32
Solution 32
Question 33
Solution 33
Question 34
Solution 34
Question 35
Solution 35
Question 36
Solution 36
Question 25
If find the value of Solution 25
Given:
Chapter 5 Trigonometric Ratios Exercise Ex. 5.2
Question 1
Solution 1
Question 2
Solution 2
Question 3
Solution 3
Question 4
Solution 4
Question 5
Solution 5
Question 6
Solution 6
Question 7
Solution 7
Question 8
Solution 8
Question 9
Solution 9
Question 10
Solution 10
Question 11
Solution 11
Question 12
Solution 12
Question 13
Solution 13
Question 14
Solution 14
Question 15
Solution 15
Question 16
Solution 16
Question 17
Solution 17
Question 18
Solution 18
Question 19
Solution 19
Question 20
Solution 20
Question 21
Solution 21
Question 22
Solution 22
Question 23
Solution 23
Question 24
Solution 24
Question 25
Solution 25
Question 26 (i)
Solution 26 (i)
Question 26 (ii)
Solution 26 (ii)
Question 26 (iii)
Solution 26 (iii)
Question 26 (iv)
Solution 26 (iv)
Question 27 (i)
If A = B = 60o, verify that cos (A – B) = cos A cos B + sin A sin BSolution 27 (i)
Question 27 (ii)
Solution 27 (ii)
Question 27 (iii)
Solution 27 (iii)
Question 28 (i)
Solution 28 (i)
Question 28 (ii)
Solution 28 (ii)
Question 29
Solution 29
Question 30 (i)
Solution 30 (i)
Question 31
Solution 31
Question 32
Solution 32
Question 33
Solution 33
Question 34
Solution 34
Question 35
If sin (A – B) = sin A cos B – cos A sin B and cos(A – B) = cos A cos B + sin A sin B, find the values of sin 15o and cos 15o.Solution 35
Question 36
Solution 36
Question 37
Solution 37
Question 38
Solution 38
Question 39
Solution 39
Question 40
Prove that
Solution 40
Question 30 (ii)
If tan(A + B) = 1 and 0o < A + B < 90o, A > B, then find the values of A and B. Solution 30 (ii)
Given: tan(A + B) = 1 and
Therefore,
A + B = 45o … (i)
A – B = 30o … (ii)
Adding the two equations, we get
Chapter 5 Trigonometric Ratios Exercise Ex. 5.3
Question 1
Solution 1
Question 2 (i)
Solution 2 (i)
Question 2 (ii)
Solution 2 (ii)
Question 2 (iii)
Solution 2 (iii)
Question 2 (iv)
Solution 2 (iv)
Question 2 (v)
Solution 2 (v)
Question 2 (vi)
Solution 2 (vi)
Question 2 (vii)
Solution 2 (vii)
Question 2 (viii)
Solution 2 (viii)
Question 2 (ix)
Solution 2 (ix)
Question 2 (x)
Solution 2 (x)
Question 2 (xi)
Solution 2 (xi)
Question 3
Express each one of the following in terms of trigonometric ratios of angles lying between 0o and 45o
(i) sin 59o + cos 56o
(ii) tan 65o + cot 49o
(iii) sec 76o + cosec 52o
(iv) cos 78o + sec 78o
(v) cosec 54o + sin 72o
(vi) cot 85o + cos 75o
(vii) sin 67o + cos 75oSolution 3
Question 4
Solution 4
Question 5
If sin 3A = cos (A – 26o), where 3A is an acute angle, find the value of A.Solution 5
Question 6(i)
Solution 6(i)
Question 6(ii)
Solution 6(ii)
Question 7 (i)
Solution 7 (i)
Question 7 (ii)
Solution 7 (ii)
Question 7 (iii)
Solution 7 (iii)
Question 7 (iv)
Solution 7 (iv)
Question 8 (i)
Solution 8 (i)
Question 8 (ii)
Solution 8 (ii)
Question 8 (iii)
Solution 8 (iii)
Question 8 (iv)
Solution 8 (iv)
Question 8 (v)
Solution 8 (v)
Question 9 (i)
Solution 9 (i)
Question 9 (ii)
Solution 9 (ii)
Question 9 (iii)
Solution 9 (iii)
Question 9 (iv)
Solution 9 (iv)
Question 9 (v)
Solution 9 (v)
Question 9 (vi)
Solution 9 (vi)
Question 9 (vii)
Solution 9 (vii)
Question 9 (viii)
Solution 9 (viii)
Question 9 (ix)
Solution 9 (ix)
Question 9 (x)
Solution 9 (x)
Question 10
Solution 10
Question 11 (ii)
If A, B,C are the interior angles of a ΔABC,show that
Solution 11 (ii)
Question 12
Solution 12
Question 13
Solution 13
Question 14
Solution 14
Question 15
Solution 15
Question 16
Solution 16
Question 17
Solution 17
Question 6 (iii)
If A, B, C, are the interior angles of a triangle ABC, ∠A = 90o, then find the value of Solution 6 (iii)
Given: ∠A = 90o
For a triangle ABC, ∠A + ∠B + ∠C = 90o
Question 9 (xi)
Evaluate: Solution 9 (xi)
Using the identities
Question 11 (i)
If A, B, C are the interior angles of a ∆ABC, show that: Solution 11 (i)
For a triangle ABC, ∠A + ∠B + ∠C = 90o
Question 18
If tan 2A = cot(A – 18o), where 2A is an acute angle, find the value of A.Solution 18
Given: tan 2A = cot(A – 18o)
As tan x = cot(90o – x), we have
cot(90o – 2A) = cot(A – 18o)
90o – 2A = A – 18o
3A = 108o
Therefore, A = 36o.
Chapter 5 Trigonometric Ratios Exercise 5.56
Question 1
Solution 1
Question 2
Solution 2
Question 3
Solution 3
Question 4
Solution 4
So, the correct option is (a).Question 5
Solution 5
Question 6
Solution 6
Chapter 5 Trigonometric Ratios Exercise 5.57
Question 7
Solution 7
Question 8
Solution 8
Question 9
Solution 9
Question 10
Solution 10
So, the correct option is (d).Question 11
Solution 11
So, the correct option is (c).Question 12
Solution 12
Question 13
Solution 13
Question 14
If A and B are complementary angles, then
(a) sin A = sin B
(b) cos A and cos B
(c) tan A = tan B
(d) sec A = cosec BSolution 14
Question 15
Solution 15
So, the correct option is (b).Question 16
Solution 16
So, the correct option is (a).Question 17
Solution 17
So, the correct option is (b).Question 18
Solution 18
So, the correct option is (d).
Chapter 5 Trigonometric Ratios Exercise 5.58
Question 19
Solution 19
Question 20
Solution 20
So, the correct option is (b).Question 21
Solution 21
Question 22
Solution 22
Question 23
Solution 23
Question 24
Solution 24
Question 25
Solution 25
Question 26
Solution 26
Question 27
Solution 27
So, the correct option is (d).Question 28
Sin 2A = 2 sin A is true when A =
(a) 0o
(b) 30o
(c) 45o
(d) 60oSolution 28
So, the correct option is (a).Question 29
Solution 29
Question 30
Solution 30
Question 31
Solution 31
Question 32
Solution 32
Chapter 5 Trigonometric Ratios Exercise 5.59
Question 33
Solution 33
So, the correct option is (c).Question 34
Solution 34
Question 35
Solution 35