To determine: Using "Proof by Contraposition", show that: If n is any odd integer and m is any even integer, then, 3m^{3}+2m^{2} is odd. Using the Mathematical Induction to prove that: 3^{2n}-1 is divisible by 4, whenever n is a positive integer.

FobelloE

FobelloE

Answered question

2021-08-03

To determine:
a) Using "Proof by Contraposition", show that: If n is any odd integer and m is any even integer, then, 3m3+2m2 is odd.
b) Using the Mathematical Induction to prove that: 32n1 is divisible by 4, whenever n is a positive integer.

Answer & Explanation

Sadie Eaton

Sadie Eaton

Skilled2021-08-04Added 104 answers

Step 1
a) Let n be odd integer and m be even integer
Claim: 3m3+2m2 is odd
We will prove this by contradiction.
On contrary, suppose 3m3+2m2 is not odd.
i.e. 3m3+2m2 is even
3m3 is even
m3 is even
m is even
which is contraidiction
oursupposition is wrong
3n3+2m2 is odd.
Step 2
b) Claim: 32n1 is dividible by 4 for nN
We will prove this by induction.
Base step: n=1
321=8, which is divisible by 4
the result is true for n=1
Inductive step: Assume that result is true for n=k
i.e. 432k1-(i)
Now, we prove that: result is true for n=k+1
i.e. 432(k+1)1
Consider 32(k+1)32k9 (mod 4)
19 (mod 4) [from (i)]
32(k+1)1 (mod 4)
432(k+1)1
the result is true for n=k+1
By induction,
32(n+1)1 is divisibly by 4 for nN

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