Answer:
If 3n^3+13 is odd then n is even for all integers n, using the proof by contradiction.
Step-by-step explanation:
By contradiction method, we need to prove that if [tex]3n^3+13[/tex] is odd then n is even for all integers n.
Proof by contradiction:
Let as assume if [tex]3n^3+13[/tex] is odd then n is odd for all integers n.
[tex]n=2k+1[/tex]
Substitute the value of n in the given expression.
[tex]3(2k+1)^3+13[/tex]
Cube of any odd number is an odd number.
[tex](2k+1)^3=Odd[/tex]
Product of two odd numbers is an odd number.
[tex]3(2k+1)^3=Odd[/tex]
[tex]3(2k+1)^3=Odd[/tex] is an odd number and 13 is an odd number. We know that addition of two odd numbers is an even number.
[tex]3(2k+1)^3+13=Even[/tex]
Which is the contradiction of our assumption.
If 3n^3+13 is odd then n is even for all integers n, using the proof by contradiction.
Hence proved.
