Statement: For all integers n >= 5 we have 2^n >= n^2.

Lucille Douglas

Lucille Douglas

Answered question

2022-09-04

Discrete math induction proof
Statement: For all integers n≥5 we have 2n≥n2.
Proof: Induction over n. Introduce the name A(n) for the statement 2 n n 2 . We shall prove, by mathematical induction that n 5 : A ( n ).
1. A(n) and test with 5 so that A ( 5 ) : 2 5 5 2 32 25 (true)
2. Assume A(p) so that we have A ( p ) : 2 p p 2 and we want to prove A ( p + 1 ) : 2 p + 1 ( p + 1 ) 2 .
2 p + 1 ( p + 1 ) 2 2 2 p p 2 + 2 p + 1, with the assumption 2 p p 2 we get 2 p 2 p 2 + 2 p + 1, it is here where i dont know how to continue to prove the statement.

Answer & Explanation

Nodussimj

Nodussimj

Beginner2022-09-05Added 14 answers

Step 1
Just don't try to do “if and only if”:
2 p + 1 = 2 2 p 2 p 2
because of the induction hypothesis. Now, try proving that, for p 5, 2 p 2 ( p + 1 ) 2
Step 2
Hint: this is equivalent to p 2 2 p 1 0, which is true when p
Gabriela Werner

Gabriela Werner

Beginner2022-09-06Added 11 answers

Step 1
2 p n 2 p 2 = p 2 + p 2
Here p 2 = 2 p + ( p 2 ) p 2 p + 1 for ( p > 4 ) since ( p 2 ) p > 1 for p > 4
Step 2
So 2 p + 1 = 2 2 p > 2 p 2 = p 2 + p 2 p 2 + 2 p + 1 = ( p + 1 ) 2

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