`underset(xrarr0^-)lim[x]`=

Let f(x) be a polynomial of degree four having extreme values at x =1 and x=2. If underset(xrarr0)lim[1+(f(x))/x^2] =3, then f(2) is equal to

underset(xrarr0)lim (sinx)/x is equal to:

Evaluate underset(xrarr0)lim (2^(x+3)-8)/(x) .

Evaluate underset(xrarr0)lim (e^x-sinx-1)/x

underset(xrarr0)lim (e^x -1)/(x) is equal to

Prove that underset(xrarr0)lim (a^x-1)/x= log a .

underset(xrarr0)lim (sin4x)/(sin2x) is:

underset(xrarr0)lim (sin2x)/x is equal to:

Evaluate underset(xrarr0)lim (e^(2x)-1)/(sinx) .

Find underset(xrarr0)lim f(x) , where f(x)={(|x|/x, xne0),(0, x=0):}