Determine the value of nnn such that f(x)=xnf(x) = x^nf(x)=xn satisfies x2f′′(x)−6f(x)=0x^2 f''(x) - 6f(x) = 0x2f′′(x)−6f(x)=0.
n=3n = 3n=3
n=2n = 2n=2
n=−2n = -2n=−2
n=0n = 0n=0