Limits & Continuityhard
0:00.0

Consider the function f(x)=sin(1x)ln(1+x2)f(x) = \sin(\frac{1}{x})\ln(1+x^2) for x0x \neq 0. If we define f(0)=Lf(0) = L to make f(x)f(x) continuous at x=0x=0, what is the value of LL, and does the limit limx0f(x)\lim_{x \to 0} f'(x) exist?