If `n^2-11n+24=0` is satisfied by `n_1 & n_2` where `n_2 > n_1` then

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

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

For positive integer n_1,n_2 the value of the expression (1+i)^(n1) +(1+i^3)^(n1) (1+i^5)^(n2) (1+i^7)^(n_20), where i=sqrt-1, is a real number if and only if (a) n_1=n_2+1 (b) n_1=n_2-1 (c) n_1=n_2 (d) n_1 > 0, n_2 > 0

For positive integer n_1,n_2 the value of the expression (1+i)^(n1) +(1+i^3)^(n1) (1+i^5)^(n2) (1+i^7)^(n_20), where i=sqrt-1, is a real number if and only if (a) n_1=n_2+1 (b) n_1=n_2-1 (c) n_1=n_2 (d) n_1 > 0, n_2 > 0

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

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

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

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