The solution for x of the equation
`overset(x)underset(sqrt(2))int(1)/(tsqrt(t^(2)-1))dt=(pi)/(2)`, is

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

The solution for x of the equation int_(sqrt(2))^(x)(dt)/(t sqrt(t^(2)-1))=(pi)/(2) is: (A) 2(B)pi(C)(sqrt(3))/(2) (D) 2sqrt(2)

(1)/(2)int(dt)/(t sqrt(t-1))

The solution for x of the equation int_(sqrt(2))^(x)(dt)/(sqrt(t^(2)-1))=(pi)/(2) is pi(b)(sqrt(3))/(2) (c) 2sqrt(2) (d) none of these

The solution for x of the equation int _(sqrt2) ^(x) (dt)/( tsqrt(t ^(2) -1))= (pi)/(12) is

" (a) "int(dt)/(sqrt(1-t^(2)))

The number of solutions for the equation 2 sin^(-1)(sqrt(x^(2) - x + 1)) + cos^(-1)(sqrt(x^(2) - x) )= (3pi)/(2) is

Evaluate int(t^(2))/(sqrt(1-t^(2)))dt

The sum of solutions of the equation 2 sin^(-1) sqrt(x^(2)+x+1)+cos^(-1) sqrt(x^(2)+x)=(3pi)/(2) is :

The number of the solutions of the equation 2 sin^(-1) sqrt(x^(2) + x + 1) + cos^(-1) sqrt(x^(2) + x) = (3pi)/(2) is