Let a,b be positive integers with a<b. Prove that for any natural number n, a^n<b^n. I feel I should start with a base case n=1 which yields true since a is already less than b.

klepkowy7c

klepkowy7c

Answered question

2022-07-18

Discrete Math problem
Let a,b be positive integers with a < b. Prove that for any natural number n, a n < b n .
I feel I should start with a base case n = 1 which yields true since a is already less than b.
Next I would implement the induction hypothesis, but I'm kinda shaky on what that is.
After that I would check the n + 1 case.
Could someone check and verify what I'm doing?

Answer & Explanation

fairymischiefv9

fairymischiefv9

Beginner2022-07-19Added 11 answers

Step 1
For n Z + let P(n) be the statement that a n < b n . You get the induction off the ground by showing that P(1) is true; indeed that’s simply the original hypothesis, that a < b. The induction step is to show that if P(n) is true for some positive integer n, then P ( n + 1 ) is also true. Thus, your induction hypothesis is P(n): a n < b n . From this assumption you want to prove P ( n + 1 ), i.e., that a n + 1 < b n + 1 .
Step 2
You can do this in two steps. First multiply your induction hypothesis by a to conclude that a n + 1 < a b n . Then multiply the inequality a < b by b n , and put the pieces together to get a n + 1 < b n + 1 .

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