If f:R→Rf:\mathbb{R}\to\mathbb{R}f:R→R is a differentiable function at a∈Ra\in\mathbb{R}a∈R such that f′(a)=af(a)f'(a)=af(a)f′(a)=af(a), then what is limx→axf(a)−af(x)x−a ?\lim_{x\to a}\frac{xf(a)-af(x)}{x-a}\, ?limx→ax−axf(a)−af(x)?
af(a)af(a)af(a)
f(a)f(a)f(a)
(1−a2)f(a)(1-a^2)f(a)(1−a2)f(a)
None of the previous options
