ICSE Class 9 Trigonometrical Ratios Solution New Pattern By Clarify Knowledge
ICSE Class 9 Trigonometrical Ratios Solution New Pattern 2022
OUR EBOOKS CAN HELP YOU ICSE CLASS 10 BOARD
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ICSE Class 9 Trigonometrical Ratios Solution Table
- ICSE Class 9 Trigonometrical Ratios Solution New Pattern By Clarify Knowledge
- OUR EBOOKS CAN HELP YOU ICSE CLASS 10 BOARD
- CODE IS EASY CAN HELP YOU IN SEMESTER 2
- ICSE Class 9 Trigonometrical Ratios Solution Table
- Chapter 22 - Trigonometrical Ratios [Sine, Consine, Tangent of an Angle and their Reciprocals] Exercise Ex. 22(A)
- Chapter 22 - Trigonometrical Ratios [Sine, Consine, Tangent of an Angle and their Reciprocals] Exercise Ex. 22(B)
Chapter 22 - Trigonometrical Ratios [Sine, Consine, Tangent of an Angle and their Reciprocals] Exercise Ex. 22(A)
Question 1
From the following figure, find the values of :
(i) sin A
(ii) cos A
(iii) cot A
(iv) sec C
(v) cosec C
(vi) tan C.
Solution 1
Given angle 
(i)
(ii)
(iii)
(iv)
(v)
(vi)
Question 2
Form the following figure, find the values of :
(i) cos B
(ii) tan C
(iii) sin2B + cos2B
(iv) sin B. cos C + cos B. sin C
Solution 2
Given angle 
(i)
(ii)
(iii)
(iv)
Question 3
From the following figure, find the values of :
(i) cos A (ii) cosec A
(iii) tan2A - sec2A (iv) sin C
(v) sec C (vi) cot2 C - 
Solution 3
Consider the diagram as
Given angle 
and 
(i)
(ii)
(iii)
(iv)
(v)
(vi)
Question 4
From the following figure, find the values of :
(i) sin B (ii) tan C
(iii) sec2 B - tan2B (iv) sin2C + cos2C
Solution 4
Given angle 
and 
(i)
(ii)
(iii)
(iv)
Question 5
Given: sin A = 
, find :
(i) tan A(ii) cos ASolution 5
Consider the diagram below:
Therefore if length of 
, length of 
Since
Now
(i)
(ii)
Question 6
From the following figure, find the values of :
(i) sin A
(ii) sec A
(iii) cos2 A + sin2A
Solution 6
Given angle 
in the figure
Now
(i)
(ii)
(iii)
Question 7
Given: cos A = 
Evaluate: (i) 
(ii) 
Solution 7
Consider the diagram below:
Therefore if length of 
, length of 
Since
Now
(i)
(ii)
Question 8
Given: sec A = 
, evaluate : sin A - 
Solution 8
Consider the diagram below:
Therefore if length of 
, length of 
Since
Now
Therefore
Question 9
Given: tan A = 
, find : 
Solution 9
Consider the diagram below:
Therefore if length of 
, length of 
Since
Now
Therefore
Question 10
Given: 4 cot A = 3 find;
(i) sin A
(ii) sec A
(iii) cosec2 A - cot2A.Solution 10
Consider the diagram below:
Therefore if length of AB = 3x, length of BC = 4x
Since
(i)
(ii)
(iii)
Question 11
Given: cos A = 0.6; find all other trigonometrical ratios for angle A.Solution 11
Consider the diagram below:
Therefore if length of AB = 3x, length of AC = 5x
Since
Now all other trigonometric ratios are
Question 12
In a right-angled triangle, it is given that A is an acute angle and tan A =
.
find the value of :
(i) cos A(ii) sin A(iii) 
Solution 12
Consider the diagram below:
Therefore if length of AB = 12x, length of BC = 5x
Since
(i)
(ii)
(iii)
Question 13
Given: sin 
Find cos 
+ sin in terms of p and q.Solution 13
Consider the diagram below:
Therefore if length of perpendicular = px, length of hypotenuse = qx
Since
Now
Therefore
Question 14
If cos A = 
and sin B = 
, find the value of : 
.
Are angles A and B from the same triangle? Explain.Solution 14
Consider the diagram below:
Therefore if length of AB = x, length of AC = 2x
Since
Consider the diagram below:
Therefore if length of AC = x, length of 
Since
Now
Therefore
Question 15
If 5 cot 
= 12, find the value of : Cosec + sec Solution 15
Consider the diagram below:
Therefore if length of base = 12x, length of perpendicular = 5x
Since
Now
Therefore
Question 16
If tan x = 
, find the value of : 4 sin2x - 3 cos2x + 2Solution 16
Consider the diagram below:
Therefore if length of base = 3x, length of perpendicular = 4x
Since
Now
Therefore
Question 17
Ifcosec 
= 
, find the value of:
(i) 2 - sin2 - cos2
(ii) 
Solution 17
Consider the diagram below:
Therefore if length of hypotenuse 
, length of perpendicular = x
Since
Now
(i)
(ii)
Question 18
If sec A = 
, find the value of :
Solution 18
Consider the diagram below:
Therefore if length of AB = x, length of 
Since
Now
Therefore
Question 19
If cot 
= 1; find the value of: 5 tan2 + 2 sin2 - 3Solution 19
Consider the diagram below:
Therefore if length of base = x, length of perpendicular = x
Since
Now
Therefore
Question 20
In the following figure:
AD 
BC, AC = 26 CD = 10, BC = 42,
DAC = x and B = y.
Find the value of :
(i) cot x
(ii) 
(iii) 
Solution 20
Given angle 
and 
in the figure
Again
Now
(i)
(ii)
Therefore
(iii)
Therefore
Chapter 22 - Trigonometrical Ratios [Sine, Consine, Tangent of an Angle and their Reciprocals] Exercise Ex. 22(B)
Question 1
From the following figure, find:
(i) y (ii) sin xo
(iii) (sec xo - tan xo) (sec xo + tan xo)
Solution 1
Consider the given figure
(i)
Since the triangle is a right angled triangle, so using Pythagorean Theorem
(ii)
(iii)
Therefore
Question 2
Use the given figure to find:
(i) sin xo (ii) cos yo
(iii) 3 tan xo - 2 sin yo + 4 cos yo.
Solution 2
Consider the given figure
Since the triangle is a right angled triangle, so using Pythagorean Theorem
Also
(i)
(ii)
(iii)
Therefore
Question 3
In the diagram, given below, triangle ABC is right-angled at B and BD is perpendicular to AC. Find:
(i) cos 
DBC (ii) cot DBA
Solution 3
Consider the given figure
Since the triangle is a right angled triangle, so using Pythagorean Theorem
In 
and 
, the 
is common to both the triangles, 
so therefore 
.
Therefore and are similar triangles according to AAA Rule
So
(i)
(ii)
Question 4
In the given figure, triangle ABC is right-angled at B. D is the foot of the perpendicular from B to AC. Given that BC = 3 cm and AB = 4 cm. find:
(i) tan 
DBC
(ii) sin DBA
Solution 4
Consider the given figure
Since the triangle is a right angled triangle, so using Pythagorean Theorem
In 
and 
, the 
is common to both the triangles, 
so therefore
.
Therefore and are similar triangles according to AAA Rule
So
Now using Pythagorean Theorem
Therefore
(i)
(ii)
Question 5
In triangle ABC, AB = AC = 15 cm and BC = 18 cm, find cos 
ABC.Solution 5
Consider the figure below
In the isosceles 
, 
and 
the perpendicular drawn from angle 
to the side 
divides the side into two equal parts 
Question 6
In the figure given below, ABC is an isosceles triangle with BC = 8 cm and AB = AC = 5 cm. Find:
(i) sin B (ii) tan C
(iii) sin2 B + cos2B (iv) tan C - cot B
Solution 6
Consider the figure below
In the isosceles 
, 
and 
the perpendicular drawn from angle 
to the side 
divides the side into two equal parts 
Since 
(i)
(ii)
(iii)
Therefore
(iv)
Therefore
Question 7
In triangle ABC; 
ABC = 90o, CAB = xo, tan xo = 
and BC = 15 cm. Find the measures of AB and AC.Solution 7
Consider the figure
Therefore if length of base = 4x, length of perpendicular = 3x
Since
Now
Therefore
And
Question 8
Using the measurements given in the following figure:
(i) Find the value of sin 
and tan
.
(ii) Write an expression for AD in terms of
Solution 8
Consider the figure
A perpendicular is drawn from D to the side AB at point E which makes BCDE is a rectangle.
Now in right angled triangle BCD using Pythagorean Theorem
Since BCDE is rectangle so ED 12 cm, EB = 5 and AE = 14 - 5 = 9
(i)
(ii)
Or
Question 9
In the given figure;
BC = 15 cm and sin B =
.
(i) Calculate the measure of AB and AC.
(ii) Now, if tan 
ADC = 1; calculate the measures of CD and AD.
Also, show that: tan2B - 
Solution 9
Given
Therefore if length of perpendicular = 4x, length of hypotenuse = 5x
Since
Now
(i)
And
(ii)
Given
Therefore if length of perpendicular = x, length of hypotenuse = x
Since
Now
So
And
Now
So
Question 10
If sin A + cosec A = 2;
Find the value of sin2 A + cosec2 A.Solution 10
Squaring both sides
Question 11
If tan A + cot A = 5;
Find the value of tan2 A + cot2 A.Solution 11
Squaring both sides
Question 12
Given: 4 sin 
= 3 cos ; find the value of:
(i) sin (ii) cos
(iii) cot2 - cosec2.
(iv) 4 cos2- 3 sin2+ 2Solution 12
Consider the diagram below:
Therefore if length of BC = 3x, length of AB = 4x
Since
(i)
(ii)
(iii)
Therefore
(iv)
Question 13
Given : 17 cos 
= 15;
Find the value of: tan + 2 sec.Solution 13
Consider the diagram below:
Therefore if length of AB = 15x, length of AC = 17x
Since
Now
Therefore
Question 14
Given : 5 cos A - 12 sin A = 0; evaluate :
.Solution 14
Now
Question 15
In the given figure; 
C = 90o and D is mid-point of AC. Find
(i) 
(ii) 
Solution 15
Since 
is mid-point of 
so 
(i)
(ii)
Question 16
If 3 cos A = 4 sin A, find the value of :
(i) cos A(ii) 3 - cot2 A + cosec2A.Solution 16
Consider the diagram below:
Therefore if length of AB = 4x, length of BC = 3x
Since
(i)
(ii)
Therefore
Question 17
In triangle ABC, 
B = 90o and tan A = 0.75. If AC = 30 cm, find the lengths of AB and BC.Solution 17
Consider the figure
Therefore if length of base = 4x, length of perpendicular = 3x
Since
Now
Therefore
And
Question 18
In rhombus ABCD, diagonals AC and BD intersect each other at point O.
If cosine of angle CAB is 0.6 and OB = 8 cm, find the lengths of the the side and the diagonals of the rhombus.Solution 18
Consider the figure
The diagonals of a rhombus bisects each other perpendicularly
Therefore if length of base = 3x, length of hypotenuse = 5x
Since
Now
Therefore
And
Since the sides of a rhombus are equal so the length of the side of the rhombus 
The diagonals are
Question 19
In triangle ABC, AB = AC = 15 cm and BC = 18 cm. Find:
(i) cos B (ii) sin C
(iii) tan2 B - sec2 B + 2Solution 19
Consider the figure below
In the isosceles 
, the perpendicular drawn from angle 
to the side 
divides the side into two equal parts 
Since 
(i)
(ii)
(iii)
Therefore
Question 20
In triangle ABC, AD is perpendicular to BC. sin B = 0.8, BD = 9 cm and tan C = 1. Find the length of AB, AD, AC and DC.Solution 20
Consider the figure below
Therefore if length of perpendicular = 4x, length of hypotenuse = 5x
Since
Now
Therefore
And
Again
Therefore if length of perpendicular = x, length of base = x
Since
Now
Therefore
And
Question 21
Given q tan A = p, find the value of :
.Solution 21
Now
Question 22
If sin A = cos A, find the value of 2 tan2A - 2 sec2 A + 5.Solution 22
Consider the figure
Therefore if length of perpendicular = x, length of base = x
Since
Now
Therefore
Question 23
In rectangle ABCD, diagonal BD = 26 cm and cotangent of angle ABD = 1.5. Find the area and the perimeter of the rectangle ABCD.Solution 23
Consider the diagram
Therefore if length of base = 3x, length of perpendicular = 2x
Since
Now
Therefore
Now
Question 24
If 2 sin x = 
, evaluate.
(i) 4 sin3 x - 3 sin x.
(ii) 3 cos x - 4 cos3 x.Solution 24
Consider the figure
Therefore if length of 
, length of 
Since
Now
(i)
(ii)
Question 25
If sin A = 
and cos B = , find the value of : 
.Solution 25
Consider the diagram below:
Therefore if length of 
, length of 
Since
Consider the diagram below:
Therefore if length of 
, length of 
Since
Now
Therefore
Question 26
Use the informations given in the following figure to evaluate: 
Solution 26
Consider the given diagram as
Using Pythagorean Theorem
Now
Again using Pythagorean Theorem
Now
Therefore
Question 27
If sec A = 
, find: 
.Solution 27
Consider the figure
Therefore if length of 
, length of 
Since
Now
Therefore
Question 28
If 5 cos 
= 3, evaluate : 
.Solution 28
Now
Question 29
If cosec A + sin A = 5
, find the value of cosec2A + sin2A.Solution 29
Squaring both sides
Question 30
If 5 cos 
= 6 sin ; evaluate:
(i) tan (ii) 
Solution 30
Now
(i)
(ii)
