Answer:
Credit: Luqman Khan
Step-by-step explanation:
n(n+1)
n^2+n
check first case n=1
1+1=2 2(1)
it works for first case
assume true for n=k
k^2+k=2A
check n=k+1
(k+1)^2+(k+1)
k^2+2k+1+k+1
k^2+3k+2
k^2+k+2k+2
2A+2k+2
2(A+K+2)
It works for first case. If it works for n=k, then it also works for n=k+1
Then it is true for all 2 consecutive numbers, by mathematical induction