The solution for x of the equation : `int_(sqrt2)^(x) (dt)/(tsqrt(t^2 - 1)) = pi/2` is :

Equation of the tangent to y= int_(x^(2))^(x^(3)) (dt)/(sqrt(1+t^(2))) at x=1 is

The number of real solutions of the equation tan^(-1) sqrt( x ( x + 1)) + sin^(-1) sqrt(x^(2) + x + 1) = (pi)/(2) is

int_(1/2)^(1/sqrt2) (dx)/(x^(2)sqrt(1-x^(2))) =

The number of real solution of the equation sqrt(1 + cos 2x) = sqrt2 sin^(-1) (sin x), -pi le x le pi , is

The number of solutions of the equation sqrt(x^(2))-sqrt((x-1)^(2))+sqrt((x-2)^(2))=sqrt(5) is

int_(-1)^(1) log (x+sqrt(x^(2)+1))dx =

The number of real solutions of : tan^(-1) sqrt(x(x+1))+sin^(-1) sqrt(x^2+x+1)=pi/2 is :

Find the number of solution(s) of the equation cos (pi sqrt(x)) cos (pi sqrt(x-4))=1 .