If V be the vector spacce of all functions from R to R and W-{f:2f(3)=f(1)}`

Let R be the set of all real numbers and let f be a function from R to R such that f(X)+(X+1/2)f(l-X)=1, for all xinR." Then " 2f(0)+3f(1) is equal to-

The sum of all the local minimum values of the twice differentiable function f : R to R defined by f (x) = x ^(3) - 3x ^(2) - ( 3f " (2))/(2) x + f " (1) is :

Let f be a differentiable function from R to R such that |f(x) - f(y) | le 2|x-y|^(3/2)," for all " x, y in R. "If " f (0) = 1, " then" _(0)^(1) int f^(2) (x) dx is equal to

Suppose f_(1) and f_(2) are non=zero one-one functions from R to R .is (f_(1))/(f_(2)) necessarily one- one? Justify your answer.Here,(f_(1))/(f_(2)):R rarr R is given by ((f_(1))/(f_(2)))(x)=(f_(1)(x))/(f_(2)(x)) for all x in R.

Suppose f_(1) and f_(2) are non-zero one-one functions from R to R. Is (f_(1))/(f_(2)) necessarily one- one? Justify your answer.Here,(f_(1))/(f_(2)):R rarr R is given by ((f_(1))/(f_(2)))(x)=(f_(1)(x))/(f_(2)(x)) for all x in R .

For all twice differentiable functions f : R to R , with f(0) = f(1) = f'(0) = 0

Discuss the surjectivity of the following functions: f:R rarr given by f(x)=x^(3)+2 for all x in R