Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions

Students get through Maths 1A Important Questions Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions which are most likely to be asked in the exam.

Intermediate 1st Year Maths 1A Inverse Trigonometric Functions Important Questions

Question 1.
Find the values of the following.
i) sin-1(-\(\frac{1}{2}\))
Solution:
sin-1(-\(\frac{1}{2}\)) = -sin-1(\(\frac{1}{2}\)) = –\(\frac{\pi}{6}\)

ii) cos-1(-\(\frac{\sqrt{3}}{2}\))
Solution:
cos-1(-\(\frac{\sqrt{3}}{2}\)) = π – cos-1(\(\frac{\sqrt{3}}{2}\))
= π – \(\frac{\pi}{6}\) = \(\frac{5\pi}{6}\)

Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions

iii) tan-1(\(\frac{1}{\sqrt{3}}\))
Solution:
tan-1(\(\frac{1}{\sqrt{3}}\)) = \(\frac{\pi}{6}\)

iv) cot-1(-1)
Solution:
cot-1(-1) = π – cot-1 (1) = π – \(\frac{\pi}{4}\)
= \(\frac{3\pi}{4}\)

v) sec-1(-\(\sqrt{2}\))
Solution:
sec-1(-\(\sqrt{2}\)) = π – sec-1(\(\sqrt{2}\))
= π – \(\frac{\pi}{4}\) = \(\frac{3\pi}{4}\)

vi) cosec-1(\(\frac{2}{\sqrt{3}}\))
Solution:
cosec-1(\(\frac{2}{\sqrt{3}}\)) = sin-1(\(\frac{\sqrt{3}}{2}\)) = \(\frac{\pi}{3}\)

Question 2.
Find the values of the following.
i) sin-1(sin \(\frac{4\pi}{3}\))
Solution:
Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions 1

ii) cos-1(cos \(\frac{4\pi}{3}\))
Solution:
cos-1(cos \(\frac{4\pi}{3}\))
= cos-1 (cos (π + \(\frac{\pi}{3}\)))
= cos-1 (-cos \(\frac{\pi}{3}\))
= π – cos-1 (cos \(\frac{\pi}{3}\)) = π – \(\frac{\pi}{3}\) = \(\frac{2\pi}{3}\);
∵ \(\frac{2\pi}{3}\) ∈ (0, π)

Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions

iii) tan-1(tan \(\frac{4\pi}{3}\))
Solution:
tan-1(tan \(\frac{4\pi}{3}\)) = tan-1(tan(π + \(\frac{\pi}{3}\)))
= tan-1(tan \(\frac{\pi}{3}\)) = \(\frac{\pi}{3}\);
∵ \(\frac{\pi}{3}\) ∈ (-\(\frac{\pi}{2}\), \(\frac{\pi}{2}\))

Question 3.
Find the values of the following
i) sin(cos-1 \(\frac{5}{13}\))
Solution:
sin(cos-1 \(\frac{5}{13}\)) = sin (sin-1 \(\frac{12}{13}\)) = \(\frac{12}{13}\)

ii) tan (sec-1 \(\frac{25}{7}\))
Solution:
tan (sec-1 \(\frac{25}{7}\)) = tan (tan-1 \(\frac{24}{7}\)) = \(\frac{24}{7}\)

iii) cos (tan-1 \(\frac{24}{7}\))
Solution:
cos (tan-1 \(\frac{24}{7}\)) = cos (cos-1 \(\frac{7}{25}\)) = \(\frac{7}{25}\)

Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions

Question 4.
Find the values of the following
i) sin2 (tan-1 \(\frac{3}{4}\))
Solution:
sin (tan-1 \(\frac{3}{4}\)) = sin (sin-1 \(\frac{3}{5}\)) = \(\frac{3}{5}\)
∴ sin2 (tan-1 \(\frac{3}{4}\)) = (\(\frac{3}{5}\))2 = \(\frac{9}{25}\)

ii) sin (\(\frac{\pi}{2}\) – sin-1(-\(\frac{4}{5}\)))
Solution:
sin (\(\frac{\pi}{2}\) – sin-1(-\(\frac{4}{5}\))
= sin (\(\frac{\pi}{2}\) – sin-1(\(\frac{4}{5}\))
= cos (sin-1 \(\frac{4}{5}\))
= cos (cos-1 \(\frac{3}{5}\)) = \(\frac{3}{5}\)

iii) cos (cos-1(-\(\frac{2}{3}\)) – sin-1(\(\frac{2}{3}\)))
Solution:
cos (cos-1(-\(\frac{2}{3}\)) – sin-1(\(\frac{2}{3}\)))
= cos (π – cos-1\(\frac{2}{3}\) – sin-1(\(\frac{2}{3}\)))
= cos (π – (cos-1\(\frac{2}{3}\) + sin-1\(\frac{2}{3}\)))
= cos (π – \(\frac{\pi}{2}\)) = cos (\(\frac{\pi}{2}\)) = 0

Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions

iv) sec2(cot-1 3) + cosec2 (tan-1 2)
Solution:
Let cot-1 (3) = α and tan-1 (2) = β
Then cot α = 3 and tan β = 2
⇒ tan α = \(\frac{1}{3}\) and cot β = \(\frac{1}{2}\)
Now sec2(cot-1 3) + cosec2 (tan-1 2)
= sec2 α + cosec2 β
= (1 + tan2α) + (1 + cot2 β)
= 1 + (\(\frac{1}{3}\))2 + 1 + (\(\frac{1}{2}\))2
= 2 + \(\frac{1}{9}\) + \(\frac{1}{4}\)
= \(\frac{72+4+9}{36}\) = \(\frac{85}{36}\)

Question 5.
Find the value of cot-1 \(\frac{1}{2}\) + cot-1 \(\frac{1}{3}\)
Solution:
cot-1 \(\frac{1}{2}\) + cot-1 \(\frac{1}{3}\)
= tan-1 (2) + tan-1 (3)
∵ x = 3, y = 2, xy > 1
= π + tan-1 (\(\frac{2+3}{1-(2)(3)}\))
= π + tan-1 (\(\frac{5}{-5}\))
= π + tan-1 (-1)
= π – \(\frac{\pi}{4}\) = \(\frac{3\pi}{4}\)

Question 6.
Prove that sin-1 \(\frac{4}{5}\) + sin-1 \(\frac{7}{25}\) = sin-1 \(\frac{117}{125}\) [Mar 16]
Solution:
Method (i):
Let sin-1(\(\frac{4}{5}\)) = α and sin-1 \(\frac{7}{25}\) = β
Then sin α = \(\frac{4}{5}\) and sin β = \(\frac{7}{25}\) and α, β ∈ (0, \(\frac{\pi}{2}\))
So that cos α = \(\frac{3}{5}\) and cos β = \(\frac{24}{25}\) and α + β ∈ (0, π)
Now
cos(α + β) = cos α cos β – sin α sin β
= \(\frac{3}{5}\) . \(\frac{24}{25}\) – \(\frac{4}{5}\) . \(\frac{7}{25}\)
= \(\frac{72-28}{125}\) = \(\frac{44}{125}\) > 0
⇒ (α + β) ∈ (0, \(\frac{\pi}{2}\))
Now sin(α + β) = sin α cos β – cos α sin β
= \(\frac{4}{5}\) . \(\frac{24}{25}\) – \(\frac{3}{5}\) . \(\frac{7}{25}\)
= \(\frac{96+21}{125}\) = \(\frac{117}{125}\)
⇒ (α + β) = sin (\(\frac{117}{125}\))
∴ sin-1 (\(\frac{4}{5}\)) + sin-1 (\(\frac{7}{25}\)) = sin-1 (\(\frac{117}{125}\)

Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions

Method (ii) :
We know that
Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions 2

Question 7.
If x ∈ (-1, 1), prove that 2 tan-1x = tan-1(\(\frac{2 x}{1-x^{2}}\))
Solution:
∵ x ∈ (-1, 1) and let tan-1 x = α
Then tan α = x and \(\frac{-\pi}{4}\) < \(\frac{\pi}{4}\)
Now tan-1 (\(\frac{2 x}{1-x^{2}}\)) = tan-1 (\(\frac{2 \tan \alpha}{1-\tan ^{2} \alpha}\))
= tan-1 (tan 2α)
= 2α,
since 2α ∈ (-\(\frac{-\pi}{2}\), \(\frac{-\pi}{2}\))
∴ tan-1(\(\frac{2 x}{1-x^{2}}\)) = 2 tan-1 (x)

Question 8.
Prove that sin-1 \(\frac{4}{5}\) + sin-1 \(\frac{5}{13}\) + sin-1 \(\frac{16}{25}\) = \(\frac{\pi}{2}\)
Solution:
Let sin-1 \(\frac{4}{5}\) = α and sin-1 \(\frac{5}{13}\) = β
Then α, β are acute angles and sin α = \(\frac{4}{5}\), sin β = \(\frac{5}{13}\)
So that cos α = \(\frac{3}{5}\) and cos β = \(\frac{12}{13}\)
Now
cos (α + β) = cos α cos β – sin α sin β
= \(\frac{3}{5}\) . \(\frac{12}{13}\) – \(\frac{4}{5}\) . \(\frac{5}{13}\)
= \(\frac{16}{65}\)
∴ α + β = cos-1 (\(\frac{16}{65}\))
⇒ sin-1 \(\frac{4}{5}\) + sin-1 \(\frac{5}{13}\) = cos-1(\(\frac{16}{65}\)) __________ (1)
LHS
= (sin-1\(\frac{4}{5}\) + sin-1 \(\frac{5}{13}\)) + sin-1(\(\frac{16}{65}\))
= cos-1 \(\frac{16}{65}\) + sin-1 \(\frac{16}{65}\) = \(\frac{\pi}{2}\) [By (1)]
LHS = RHS

Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions

Question 9.
Prove that cot-1 9 + cosec-1 \(\frac{\sqrt{41}}{4}\) = \(\frac{\pi}{4}\)
Solution:
Let cot-1 (9) = α and cosec-1 \(\frac{\sqrt{41}}{4}\) = β
⇒ cot α = 9 and cosec β = \(\frac{\sqrt{41}}{4}\)
⇒ tan α = \(\frac{1}{9}\) and cot β = Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions 11
= \(\sqrt{\frac{41}{16}-1}\) = \(\sqrt{\frac{25}{16}}\) = \(\frac{5}{4}\)
∴tan α = \(\frac{1}{9}\) and tan β = \(\frac{4}{5}\)
Now tan(α + β) = \(\frac{\tan \alpha+\tan \beta}{1-\tan \alpha \tan \beta}\)
= \(\frac{\frac{1}{9}+\frac{4}{5}}{1-\left(\frac{1}{9}\right)\left(\frac{4}{5}\right)}\)
= \(\left(\frac{5+36}{45-4}\right)\) = 1
⇒ tan (α + β) = tan \(\frac{\pi}{4}\)
⇒ α + β = \(\frac{\pi}{4}\)
⇒ cot-1 (9) + cosec-1 (\(\frac{\sqrt{41}}{4}\)) = \(\frac{\pi}{4}\)

Question 10.
Show that cot (sin-1 \(\sqrt{\frac{13}{17}}\)) = sin (tan-1 \(\frac{2}{3}\))
Solution:
Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions 3
Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions 4

Question 11.
Find the value of tan (2 tan-1(\(\frac{1}{5}\)) – \(\frac{\pi}{4}\))
Solution:
Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions 5

Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions

Question 12.
Prove that sin-1 \(\frac{4}{5}\) + 2 tan-1 \(\frac{1}{3}\) = \(\frac{\pi}{2}\)
Solution:
Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions 6

Question 13.
Prove that cos (2 tan-1 \(\frac{1}{7}\)) = sin (4 tan-1 \(\frac{1}{3}\))
Solution:
Let tan-1 \(\frac{1}{7}\)) = α and tan-1 \(\frac{1}{3}\) = β
Then tan α = \(\frac{1}{7}\) and tan β = \(\frac{1}{3}\)
Now
Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions 7
Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions 8

Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions

Question 14.
If sin-1 x + sin-1y + sin-1z = π, then prove that x4 + y4 + z4 + 4x2y2z2 = 2 (x2y2 + y2z2 + z2x2)
Solution:
Let sin-1x = A, sin-1 y = B and sin-1(z) = c
then A + B + C = π ________(1) and
sin A = x, sin B = y and sin C = z
Now A + B = π – C’
= cos (A + B) = cos( π – C’)
= cos A cos B – sin A sin B = -cos C
⇒ \(\sqrt{1-x^{2}} \sqrt{1-y^{2}}\) – xy = – \(\sqrt{1-z^{2}}\)
⇒ \(\sqrt{1-x^{2}} \sqrt{1-y^{2}}\) = xy – \(\sqrt{1-z^{2}}\)
On squaring both sides we get
(1 – x2)(1 – y2) = x2y2 + (1 – z2) – 2xy \(\sqrt{1-z^{2}}\)
⇒ 2xy\(\sqrt{1-z^{2}}\) = x2 + y2 – z2
Again on squaring both sides, we get
(2xy \(\sqrt{1-z^{2}}\))2 (x2 + y2 – z2)2
⇒ 4x2y2(1 – z2) = x4 + y4 + z4 + 2x2y2 – 2y2z2 – 2z2x2
⇒ 4x2y2 – 4x2y2z2 = x4 + y4 + z4 + 2x2y2 – 2y2z2 — 2z2x2
⇒ x4 + y4 + z4 + 4x2y2z2 = 2x2y2 + 2y2z2 + 2z2x2

Question 15.
If cos-1\(\frac{p}{a}\) + cos-1\(\frac{q}{b}\) = α, then prove that \(\frac{p^{2}}{a^{2}}\) – \(\frac{2 p q}{a b}\) cos α + \(\frac{q^{2}}{b^{2}}\) = sin2 α
Solution:
Let cos-1\(\frac{p}{a}\) = α and cos-1\(\frac{q}{b}\) = β
then cosα = \(\frac{p}{a}\) and cos β = \(\frac{q}{b}\) and
A + B = α (given)
Now
cos α = cos(A + B)
= cosA cosB – sinA sinB
Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions 9

Question 16.
Solve are sin(\(\frac{5}{x}\)) + arc sin \(\frac{12}{x}\) = \(\frac{\pi}{2}\); (x > 0)
Solution:
Given that
sin-1 (\(\frac{5}{x}\)) + sin-1 \(\frac{12}{x}\) = \(\frac{\pi}{2}\); x > 0
Let sin-1 \(\frac{5}{x}\) = α and sin-1 \(\frac{12}{x}\) = β
then sin α = \(\frac{5}{x}\) and sin β = \(\frac{12}{x}\), x > 0
Now α + β = \(\frac{\pi}{2}\)
⇒ α = \(\frac{\pi}{2}\) – β
sin α = sin(\(\frac{\pi}{2}\) – β) ⇒ sin α = cos β
= \(\frac{5}{x}\) = \(\sqrt{1-\left(\frac{12}{x}\right)^{2}}\)
⇒ \(\frac{25}{x^{2}}\) = 1 – \(\frac{144}{x^{2}}\)
⇒ \(\frac{169}{x^{2}}\) = 1 ⇒ x2 = 169 ⇒ x = ± 13
⇒ x = 13 (∵ x > 0)

Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions

Question 17.
Solve sin-1 (\(\frac{3x}{5}\)) + sin-1 (\(\frac{4x}{5}\)) = sin-1(x)
Solution:
Let sin-1 (\(\frac{3x}{5}\)) = α, sin-1 (\(\frac{4x}{5}\)) = β and sin-1(x) = γ
Then sin α = \(\frac{3x}{5}\), sin β = \(\frac{3x}{5}\) and sin γ = x
⇒ cos α = \(\sqrt{1-\frac{9 x^{2}}{25}}\), cos β = \(\sqrt{1-\frac{16 x^{2}}{25}}\) and cos γ = \(\sqrt{1-x^{2}}\)
Now α + β = γ
⇒ sin (α + β) = sin γ
⇒ sinα cos β + cos α sin β = sin γ
Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions 10
Squaring on both sides
16(25 – 9x2) = 625 – 150\(\sqrt{25-16 x^{2}}\) + 9(25 – 16x2)
⇒ 400 – 144x2 = 625 – 150\(\sqrt{25-16 x^{2}}\) + 225 – 144x2
⇒ 150\(\sqrt{25-16 x^{2}}\) = 225 + 225
⇒ \(\sqrt{25-16 x^{2}}\) = 3
⇒ 25 – 16x2 = 9
⇒ 16x2 = 16 ⇒ x = ± 1
∴ x = 0, + 1, – 1.
All these values of x satisfy the given equation.

Question 18.
Solve sin<sup>-1</sup> x + sin<sup>-1</sup> 2x = \(\frac{\pi}{3}\)
Solution:
Given that sin<sup>-1</sup> x + sin<sup>-1</sup> 2x = \(\frac{\pi}{3}\)
⇒ cos (sin<sup>-1</sup>x + sin<sup>-1</sup> 2x) = cos(\(\frac{\pi}{3}\))
Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions 12
But when x = –\(\frac{\sqrt{3}}{2 \sqrt{7}}\),. both sin<sup>-1</sup>x and sin<sup>-1</sup>(2x) are negative. The given equation does not satisfy.
Hence x = \(\frac{\sqrt{3}}{2 \sqrt{7}}\) is the only solution.

Question 19.
If sin [2 cos-1 {cot (2 tan-1 x)}] = 0, find x
Solution:
sin [2cos-1 {cot (2 tan-1 x)}] = 0
⇔ 2 cos-1 [cot (2tan-1 x)] = 0 or π or 2π
(since the range of cos-1 is (0, π)
⇔ cos-1 [cot (2 tan-1 x)] = 0 or \(\frac{\pi}{2}\) or π
⇒ cot (2 tan-1 x) = 1 or 0 or -1
⇒ 2 tan-1 x = ±\(\frac{\pi}{4}\) or ±\(\frac{\pi}{2}\) (or) ±\(\frac{3\pi}{4}\)
∴ tan-1 (x) = ±\(\frac{\pi}{8}\) (or) ±\(\frac{\pi}{4}\) (or) ± \(\frac{3\pi}{8}\)
x = ± (\(\sqrt{2}\) – 1) (or) ±1 (or) ± (\(\sqrt{2}\) + 1)

Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions

Question 20.
Prove that cos-1 [tan-1 (sin (cot-1x)}] = \(\sqrt{\frac{x^{2}+1}{x^{2}+2}}\)
Solution:
Let cot-1 (x) = θ,
then cot θ = x and 0 < x < π
Inter 1st Year Maths 1A Inverse Trigonometric Functions Important Questions 13

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