If n is a positive integer, show that
`( P + iQ)^(1//n) + ( P - iQ)^(1//n) = 2 ( P^(2) + Q^(2))^(1//2n) cos (1/n , tan . Q/P)`.

(p+iq)^((1)/(n))n+(p-iq)^((1)/(n))=2(p^(2)+q^(2))(1)/(2n)cos((1)/(n)(arctan q)/(p))

If p is a fixed positive integer, prove by induction that p^(n +1) + (p + 1)^(2n - 1) is divisible by P^2+ p +1 for all n in N .

If p is a fixed positive integer, prove by induction that p^(n +1) + (p + 1)^(2n - 1) is divisible by P^2+ p +1 for all n in N .

If p is a fixed positive integer, prove by induction that p^(n +1) + (p + 1)^(2n - 1) is divisible by P^2+ p +1 for all n in N .

If p is a fixed positive integer,prove by induction that p^(n+1)+(p+1)^(2n-1) is divisible by P^(2)+p+1 for all n in N

Let n be a positive integer with f(n)=1!+2!+3!+….+n! and P(x) and Q(x) be polynomials in x such that f(n+2) = Q(n)f(n) + P(n)f(n+1) . Find P(2).

If p is a natural number, then prove that p^(n+1) + (p+1)^(2n-1) is divisible by p^(2) + p +1 for every positive integer n.

If p is a natural number, then prove that p^(n+1) + (p+1)^(2n-1) is divisible by p^(2) + p +1 for every positive integer n.

P(n):11^(n+2)+1^(2n+1) where n is a positive integer p(n) is divisible by -