Find the integral solution for `n_(1)n_(2)=2n_(1)-n_(2), " where " n_(1),n_(2) in "integer"`.

If n^(2)-11n+24=0 is satisfied by n_(1)&n_(2) where n_(2)>n_(1) then

If 3*n_(1)-n_(2)P_(2)=^(n_(1)+n_(2))P_(2)=90 then the ordered pair (n_(1),n_(2)) is

If n^(2)-11n+24=0 is satisfied by n_(1)&n_(2) where n_(2)gtn_(1) then (A) n_(1)^(2)+n_(2) is prime number (B) n_(1)&n_(2)-n_(1) are co-prime (C) n_(1)&n_(2)-n_(1) are twin primes (D) n_(1)+n_(2)+n_(1)n_(2) has 2 prime divisors

Find the value of (-1)^(n)+(-1)^(2n)+(-1)^(2n_1)+(-1)^(4n+2) , where n is any positive and integer.

If the middle term in the expreansion of (1+x)^(2n) is ([1.3.5….(2n-1)])/(n!) (k) , where n is a positive integer , then k is .

The value of (n!)^(n) if n+(n-1)+(n-2)=n(n-1)(n-2) where n^(3)>9, a positive number is

Find the integral values of n for the equations : (a) (1+i)^(n)=(1-i)^(n) (b) (1-i)^(n)=2^(n)

Find lim_(n rarr oo)(2n-1)(2n)n^(2)(2n+1)^(-2)(2n+2)^(-2)