NCERT solutions for Mathematics [English] Class 12 chapter 2 - Inverse Trigonometric Functions [Latest edition]

Find the principal values of `sin^(-1) (-1/2)`

Find the principal value of  `cos^(-1) (sqrt3/2)`

Find the principal value of cosec⁻¹ (2)

Find the principal value of `tan^(-1) (-sqrt3)`

Find the principal value of  `cos^(-1) (-1/2)`

Find the principal value of tan⁻¹ (−1)

Find the principal value of  `sec^(-1) (2/sqrt(3))`

Find the principal value of `cot^(-1) (sqrt3)`

Find the principal value of  `cos^(-1) (-1/sqrt2)`

Find the principal value of `cosec^(-1)(-sqrt2)`

Find the value of the following:

`tan^(-1)(1) + cos^(-1) (-1/2) + sin^(-1) (-1/2)`

Find the value of the following:

`cos^(-1) (1/2) + 2 sin^(-1)(1/2)`

Find the value of the following:

If sin⁻¹ x = y, then

`tan^(-1) sqrt3 - sec^(-1)(-2)` is equal to ______.

Prove the following:

`3sin^(-1) x = sin^(-1)(3x - 4x^3), x in [-1/2, 1/2]`

Prove the following: 

`3cos^(-1) x = cos^(-1)(4x^3 - 3x), x in [1/2, 1]`

Write the following function in the simplest form:

`tan^(-1)  (sqrt(1+x^2) -1)/x, x != 0`

Write the following function in the simplest form:

`tan^(-1) (sqrt((1-cos x)/(1 + cos x))), x < pi`

Write the following function in the simplest form:

`tan^-1 ((cos x - sin x)/(cos x + sin x)), (-pi)/4 < x < (3 pi)/4`

Write the following function in the simplest form:

`tan^(-1)  x/(sqrt(a^2 - x^2))`, |x| < a

Write the following function in the simplest form:

`tan^(-1) ((3a^2 x - x^3)/(a^3 - 3ax^2)), a > 0; (-a)/sqrt3 <= x a/sqrt3`

Find the value of the following:

`tan^-1 [2 cos (2  sin^-1 1/2)]`

Find the value of following:

`tan  1/2 [sin^(-1)  (2x)/(1+ x^2) + cos^(-1)  (1-y^2)/(1+y^2)], |x| < 1, y> 0  and xy < 1`

Find the value of the given expression.

`sin^(-1) (sin  (2pi)/3)`

Find the value of the given expression.

`tan^(-1) (tan  (3pi)/4)`

Find the value of the given expression.

`tan(sin^(-1)  3/5 + cot^(-1)  3/2)`

`cos^(-1) (cos  (7pi)/6)` is equal to ______.

`sin[pi/3 - sin^(-1) (-1/2)]` is equal to ______.

`"tan" ^-1 sqrt3 - "cot"^-1 (- sqrt3)` is equal to ______.

Find the value of the following:

`cos^(-1) (cos  (13pi)/6)`

Find the value of the following:

`tan^(-1) (tan  (7x)/6)`

Prove that:

`2sin^-1  3/5=tan^-1  24/7`

Prove that:

`sin^(-1)  8/17 + sin^(-1)  3/5 = tan^(-1)  77/36`

Prove that:

`cos^(-1)  4/5 + cos^(-1)  12/13 = cos^(-1)  33/65`

Prove that:

`cos^(-1)  12/13 + sin^(-1)  3/5 = sin^(-1)  56/65`

Prove that:

`tan^(-1)  63/16 = sin^(-1)  5/13 + cos^(-1)  3/5`

Prove that:

`tan^(-1) sqrtx = 1/2 cos^(-1) ((1-x)/(1+x)) , x in [0, 1]`

Prove that:

`cot^(-1)  ((sqrt(1+sin x) + sqrt(1-sinx))/(sqrt(1+sin x) - sqrt(1- sinx))) = x/2`, `x in (0, pi/4)` 

Prove that:

`tan^-1  ((sqrt(1 + x) - sqrt(1 - x))/(sqrt(1 + x) + sqrt(1 - x))) = pi/4 - 1/2 cos^-1 x`, for `- 1/sqrt2 <= x <= 1`

[Hint: put x =  cos 2θ]

Solve the following equation:

`2 tan^(-1) (cos x) =  tan^(-1) (2 cosec x)`

Solve the following equation for x:

tan⁻¹`((1-x)/(1+x))-1/2` tan⁻¹x = 0, where x > 0

sin (tan^–1 x), | x| < 1 is equal to ______.

sin^–1 (1 – x) – 2 sin^–1 x = `pi/2` , then x is equal to ______.