For `x, y, z, t in R, sin^(-1) x + cos^(-1) y + sec^(-1) z ge t^(2) - sqrt(2pi t) + 3pi`
The value of `x + y + z` is equal to

For x, y, z, t in R, sin^(-1) x + cos^(-1) y + sec^(-1) z ge t^(2) - sqrt(2pi t) + 3pi The value of cos^(-1) ("min" {x, y, z}) is

For x, y, z, t in R, sin^(-1) x + cos^(-1) y + sec^(-1) z ge t^(2) - sqrt(2pi t) + 3pi The principal value of cos^(-1) (cos 5t^(2)) is

If sin^-1x + sin^-1 y + sin^-1z = (3pi)/2, then the value of x^9 + y^9 + z^9 - (1)/(x^9y^9z^9) is equal to

If cos^(-1) x + cos^(-1) y + cos^(-1) z = pi , prove that x^(2) + y^(2) + z^(2) + 2xyz = 1

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

If cos^(-1) x + cos^(-1) y + cos^(-1) z = pi , then find sin^(-1) x + sin^(-1) y + sin^(-1) z

Statement I If tan^(-1) x + tan^(-1) y = pi/4 - tan^(-1) z " and " x + y + z = 1 , then arithmetic mean of odd powers of x, y, z is equal to 1/3 . Statement II For any x, y, z we have xyz - xy - yz - zx + x + y + z = 1 + ( x - 1) ( y - 1) ( z - 1)

If x = 2 cos t - cos 2t , y = 2 sin t - sin 2t , then the value of d^2y/dx^2 at t=pi//2 is

If x = a sin 2 t(1+cos 2t) and y = b cos 2t(1-cos 2t), find: the value of dy/dx at t = pi/4 and t = pi/3

If x, y, z are all distinct and |(x,x^(2),1+x^(3)),(y,y^(2),1+y^(3)),(z,z^(2),1+z^(3))|=0 then value of x y z is :