Integer just greater tehn (sqrt(3)+1)^(2...

Integer just greater tehn `(sqrt(3)+1)^(2n)` is necessarily divisible by (A) `n+2` (B) `2^(n+3)` (C) `2^n` (D) `2^(n+1)`

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

The integer just above (sqrt(3)+1)^(2n) is,for all n in N.

(3^(3n)-26n-1), is divisible by (26),n<=2

For all n inN,3*5^(2n+1)+2^(3n+1) is divisible by (A) 19 (B) 17 (C) 23 (D) 25

2^(2n)+1 where n is odd integer is divisible by

If n is a whole number greater than 1, then n^(2)(n^(2)-1) is always divisible by 8 (b) 10 (c) 12 (d) 16

For each n in N, 3.(5^(2n+1))+2^(3n+1) is divisible by

Prove by induction that the integer next greater than (3+sqrt(5))^n is divisible by 2^n for all n in N .

Recommended Questions

Integer just greater tehn (sqrt(3)+1)^(2n) is necessarily divisible by...
Text Solution
|
Use a combinatorial argument to prove that (C(n,1))^(2)+2(C(n,2))^(2)+...
Text Solution
|
If n is a positive integer, prove that 1-2n+(2n(2n-1))/(2!)-(2n(2n-1)(...
Text Solution
|
The integer just above (sqrt(3)+1)^(2n) is,for all n in N.
Text Solution
|
lim(n rarr oo)(sqrt(n+1)+sqrt(n+2)+.........+sqrt(2n-1))/(n^((3)/(2) )...
Text Solution
|
The sum of the series 1^2+3^2+5^2+.......\ n terms is a.(n(n+1)(2n+1))...
Text Solution
|
If 2^(2n-1)=1/(8^(n-3)), then the value of n is a. -2 b. 2 c. 0 d. 3
Text Solution
|
Integer just greater tehn (sqrt(3)+1)^(2n) is necessarily divisible by...
Text Solution
|
If (1-x+x^(2n))^n=a0+a1x+a2^2+.+a(2n)x^(2n) then a0+a2+a4+…..+a(2n) eq...
Text Solution
|