If `f:R rarr [(pi)/(3),pi)` defined by `f(x)=cos^(-1)((lambda-x^(2))/(x^(2)+2))` is a surjective function, then the value of `lambda` is equal to

If f:R rarr (0, pi//2], f(x)=sin^(-1)((40)/(x^(2)+x+lambda)) is a surjective function, then the value of lambda is equal to

If the function f:R rarrA defined as f(x)=tan^(-1)((2x^(3))/(1+x^(6))) is a surjective function, then the set A is equal to

If the function f:R rarr A defined as f(x)=sin^(-1)((x)/(1+x^(2))) is a surjective function, then the set A is

If f:R rarr [pi/6,pi/2], f(x)=sin^(-1)((x^(2)-a)/(x^(2)+1)) is an onto function, the set of values a is

Let f : R to [0, pi/2) be defined by f ( x) = tan^(-1) ( 3x^(2) + 6x + a)". If " f(x) is an onto function . then the value of a si

If f:[-pi//2,pi//2] cupR given by f(x)=cosx+sin[(x+1)/(lambda)] is an even function. Then the set of values of lambda(lambda gt0) is Here, [*] denotes the greatest integer function.

Show that f: R->R defined by f(x)=(x-1)(x-2)(x-3) is surjective but not injective.

If f:R rarrA defined as f(x)=tan^(-1)(sqrt(4(x^(2)+x+1))) is surjective, then A is equal to

If the equation sin^(-1)(x^2+x +1)+cos^(-1)(lambda x+1)=pi/2 has exactly two solutions, then the value of lambda is

Let f:R rarr R defined by f(x)=(x^(2))/(1+x^(2)) . Proved that f is neither injective nor surjective.