SOLUTION: Find a counterexample for statement. 2^n+3^n is divisible by 4 the key n = 3
Algebra
->
Logarithm Solvers, Trainers and Word Problems
-> SOLUTION: Find a counterexample for statement. 2^n+3^n is divisible by 4 the key n = 3
Log On
Algebra: Logarithm
Section
Solvers
Solvers
Lessons
Lessons
Answers archive
Answers
Click here to see ALL problems on logarithm
Question 475704
:
Find a counterexample for statement.
2^n+3^n is divisible by 4
the key n = 3
Answer by
Alan3354(69443)
(
Show Source
):
You can
put this solution on YOUR website!
Find a counterexample for statement.
2^n+3^n is divisible by 4
------
n = 0 --> 1 + 1 = 2 not divisible
