Statement I `sin^(-1) 2x + sin^(-1) 3x = pi/3 `
`rArr x = sqrt(3/76)` only.
and
Statement II Sum of twp negative angles cannot be positive.

Solve: sin^(-1)x + sin^(-1)2x = pi/3 .

Solve sin^(-1)x + sin^(-1) 2x = (pi)/(3)

Solve sin^(-1)x+sin^(-1)2x=(pi)/(3)

sin ^ (- 1) x + sin ^ (- 1) 2x = (2 pi) / (3)

solve: sin ^ (- 1) x + sin ^ (- 1) 2x = (pi) / (3)

Statement 1. cos^-1 x-sin^-1 (x/2+sqrt((3-3x^2)/2))=- pi/3, where 1/2 lexle1 , Statement 2. 2sin^-1 x=sin^-1 2x sqrt(1-x^2), where - 1/sqrt(2)lexle1/sqrt(2). (A) Both Statement 1 and Statement 2 are true and Statement 2 is the correct explanation of Statement 1 (B) Both Statement 1 and Statement 2 are true and Statement 2 is not the correct explanatioin of Statement 1 (C) Statement 1 is true but Statement 2 is false. (D) Statement 1 is false but Statement 2 is true

Statement-1: sin^(-1)tan((tan^(-1))x+tan^(-1)(1-x))] =(pi)/(2) has no non zero integral solution Statement-2: The greatest and least values of (sin^(-1)x)^(3)+(cos^(-1)x)^(3) are (7pi)^(3)/(8) and (pi)^(3)/(32) respectively

Statement I : If -1 le x lt 0 , then cos (sin^(-1)x) = -sqrt(1-x^(2)) Statement II : If -1 le x lt 0 , then sin (cos^(-1)x) = sqrt(1 - x^(2)) Which one of the following is correct is respect of the above statements ?

Let F(x) be an indefinite integral of sin2x . Statement- 1: The function F(x) satisfies F(x+pi)=F(x) for all real x . Statement- 2: sin2(x+pi)=sin2x for all real x . (A) Statement I is true, Statement II is also true, Statement II is the correct explanation of Statement I. (B)Statement I is true, Statement II is also true, Statement II is not the correct explanation of Statement I. (C) Statement I is true, Statement II is false. (D) Statement I is false, Statement II is ture.