f(x)=(sin x)/(e^(x))*[0,pi]

If f(x)=sin x/ e^(x) in [0,pi] then f(x)

Verify Rolles theorem for function f(x)=(sin x)/(e^(x)) on 0<=x<=pi

Verify Rolles Theorem for f(x)=(sin x)/(e^x)\ in\ [0,pi]\ \ \ \ \ \ \ [c=pi/4] f(x)=1-x^(2/3) in [-1,\ 1] (f^(prime)(0)non\ e xi s t e n t)

Verify Rolle.s theorem for f(x) = (sin x)/( e^(x)) on 0 le x le pi .

Find the values of x where function f(X) = (sin x + cosx)(e^(x)) in (0,2pi) has point of inflection

A function f is defined by f(x)=e^(x) sin x in [0,pi] . Which of the following is not correct?

The greatest value of f(x)=sin{x [x]+e^([x])+(pi)/(2)-1} for all x in [0,oo) is

The function f(x)=2sin x-e^(x), AA x in [0, pi] has

The function f(x)=2sin x-e^(x), AA x in [0, pi] has

Verify Rolle's theorem for each of the following functions on indicated intervals; f(x)=sin^(2)x on 0<=x<=pi f(x)=sin x+cos x-1 on [0,(pi)/(2)]f(x)=sin x-sin2x on [0,pi]