Let f(x)=sin x
`bb"Statement I"` f is not a polynominal function.
`bb"Statement II"` nth derivative of f(x), w.r.t. x, is not a zero function for any positive integer n.

Find the derivatives of f(x) w.r.t. x in the following : f(x)=root(3)(ax+b)

If f(x) =tan ^(-1)x,then derivative of f(tan x) w.r.t. f(cot x) is

Statement 1: Let f:R rarr R be a real-valued function AA x,y in R such that |f(x)-f(y)|<=|x-y|^(3) .Then f(x) is a constant function.Statement 2: If the derivative of the function w.r.t.x is zero,then function is constant.

The derivative of function f(x) = log_e(2x) w.r.t. t is

bb"Statement I" The function f(x) =xsinx and f'(x)=xcosx+sinx are both non-periodic. bb"Statement II" The derivative of differentiable functions (non-periodic) is non-periodic funciton.

Statement 1: If f(x) is an odd function,then f'(x) is an even function.Statement 2: If f'(x) is an even function,then f(x) is an odd function.

If f(x) is a polynomial of nth degree then int e^(x)f(x)dx= Where f^(n)(x) denotes nth order derivative of f(x)w.r.t.x

bb"Statement I" The equation f(x)=4x^(5)+20x-9=0 has only one real root. bb"Statement II" f'(x)=20x^(4)+20=0 has no real root.

If the derivative of f(x)w.r.t.x is ((1)/(2)-sin^(2)x)/(f(x)) then f(x) is a periodic function with fundamental period

Statement I If f(x) is a continuous function defined from R to Q and f(5)=3 , then differential coefficient of f(x) w.r.t.x will be 0 Statement II Differentation of constant functions is always zero.