Use mathematical induction to prove the following.1 ? 3 + 2 ? 4 + 3 ? 5 + . . . + n(n + 2) =

What will be an ideal response?

Answers may vary. One possibility:
S_n: 1 ? 3 + 2 ? 4 + 3 ? 5 + . . . + n(n + 2) =
S₁: 1 ? 3 =
S_k: 1 ? 3 + 2 ? 4 + 3 ? 5 + . . . + k(k + 2) =
S_k+1: 1 ? 3 + 2 ? 4 + 3 ? 5 + . . . + k(k + 2) + (k + 1)(k + 3) =
Step 1: Since  =  = 1 ? 3, S₁ is true.
Step 2: Let k be any natural number. Assume S_k. Deduce S_k+1.
1 ? 3 + 2 ? 4 + 3 ? 5 + . . . + k(k + 2) =
1 ? 3 + 2 ? 4 + 3 ? 5 + . . . + k(k + 2) + (k + 1)(k + 3) =  + (k + 1)(k + 3)
=  +
=  +
=
=
=
=
= .

Mathematics

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