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

Prove that : sin^-1 x + sin^-1 2x = pi/3

If sin^(-1) x + sin^(-1) y = (2pi)/3", then " cos^(-1) x + cos^(-1) y

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

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

Find x if sin^-1 (6x) + sin^-1 (6sqrt3x) = - pi/2

Solve the equation sin^(-1)6 x+sin^(-1)6sqrt(3)x=(-pi)/2dot

Statement I If f (x) = int_(0)^(1) (xf(t)+1) dt, then int_(0)^(3) f (x) dx =12 Statement II f(x)=3x+1

Statement I The number of solution of the equation |sin x|=|x| is only one. Statement II |sin x| ge 0 AA x in R .

Consider f(x) = {{:(2 sin (a cos^(-1) x)",","if",x in (0, 1)),(sqrt(3)",","if",x = 0),(ax + b",","if",x lt 0):} Statement I If b = sqrt(3) and a = (2)/(3) , then f(x) is continuous in (-oo, 1) . Statement II If a function is defined on an interval I and limit exists at every point of interval I, then function is continuous in I.