Is it true that `x=e^(logx)` for all real x?

if f (x) = x^3 , show that f''(x) exist for all real values of x and find it.

Show that f(x)=e^(1//x) is a strictly decreasing function for all x in R .

Evaluate int e^(x) cos x dx

Prove that (log_ab x)/(log_a x)=1+log_x b

Differentiate sin(logx) with respect to x.

Find the derivate of y = x^3(logx)^2 .

If a , b , c , are real, then prove that roots of the equation 1/(x-a) + 1/(x-b) + 1/(x-c) = 0 are real.

if f(xy) = f(x) f(y) for all x and y and if f(x) is continuous at x = 1, then show that it is continuous for all x except 0

Prove that x+1/x=sintheta is not possible for all x in R

Prove that log_x frac(9)(14)+log_x frac(35)(24)-log_x frac(15)(48)=log_x 3