Determine the Wronskian W(n)W(n)W(n) for the solutions xn=2nx_n = 2^nxn=2n and yn=3ny_n = 3^nyn=3n.
W(n)=6nW(n) = 6^nW(n)=6n
W(n)=−6nW(n) = -6^nW(n)=−6n
W(n)=2nW(n) = 2^nW(n)=2n
W(n)=0W(n) = 0W(n)=0