Determine the Wronskian W(n)W(n)W(n) for the basis sequences 2n2^n2n and (−2)n(-2)^n(−2)n.
W(n)=0W(n) = 0W(n)=0
W(n)=4nW(n) = 4^nW(n)=4n
W(n)=−4⋅(−4)nW(n) = -4 \cdot (-4)^nW(n)=−4⋅(−4)n
W(n)=2nW(n) = 2^nW(n)=2n