Prove that for every positive integer n,...

Prove that for every positive integer `n, 1^(n) + 8^(n) - 3^(n) - 6^(n)`is divisible by 10.

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

For every positive integer n, prove that 7^(n) – 3^(n) is divisible by 4.

For every positive integer n, prove that 7^(n) – 3^(n) is divisible by 4.

For every positive integer n, prove that 7^(n) – 3^(n) is divisible by 4.

For every positive integer n,prove that 7^(n)-3^(n) is divisible by 4.

For any positive integer n, prove that (n^(3) - n) is divisible by 6.

For every positive integer n, prove that 7^n - 3^n is divisible by 4.

For any positive integer n, prove that n^(3) - n is divisible by 6.

Prove by mathematical induction that for any positive integer n , 3^(2n)-1 is always divisible by 8 .

For all positive integers {x(x^(n-1)-n*a^(n-1)+a^(n)(n-1)} is divisible by

For every positive integer n, prove that 7^n-3^n is divisible by 4.

Recommended Questions

Prove that for every positive integer n, 1^(n) + 8^(n) - 3^(n) - 6^(n)...
Text Solution
|
For every positive integer n, prove that 7^n-3^nis divisible by 4.
Text Solution
|
Prove that n^2-n divisible by 2 for every positive integer n.
Text Solution
|
For any positive integer n,prove that n^(3)-n is divisible by 6
Text Solution
|
For any positive integer n , prove that n^3-n divisible by 6.
Text Solution
|
Prove that n^(2)-n divisible by 2 for every positive integer n.
Text Solution
|
Prove that for every positive integer n, 1^(n) + 8^(n) - 3^(n) - 6^(n)...
Text Solution
|
For any positive integer n prove that n^(3)-n is divisible by 6
Text Solution
|
Prove that n^(2)-n is divisible by 2 for every positive integer n.
Text Solution
|