SOLUTION: How to prove that all integers n, if n^3+5 is odd then n is even?
Algebra
->
Matrices-and-determiminant
-> SOLUTION: How to prove that all integers n, if n^3+5 is odd then n is even?
Log On
Algebra: Matrices, determinant, Cramer rule
Section
Solvers
Solvers
Lessons
Lessons
Answers archive
Answers
Click here to see ALL problems on Matrices-and-determiminant
Question 1143943
:
How to prove that all integers n, if n^3+5 is odd then n is even?
Answer by
greenestamps(13203)
(
Show Source
):
You can
put this solution on YOUR website!
If n^3+5 is odd, then n^3 is even, because 5 is odd.
If n^3 is even, then n is even.
