` (N^(P-1)-1)` is a multiple of p, if N is prime to p and p is a

Let P (n) be the statement." 2^(3n-1) is integral multiple of 7". Then, P (1), P (2) and P (3) are true ?

If p is a prime number,then LCM of p and (p+1) is

If P(n) is the statement 2^(3n)-1. Is an integral multiple 7', and if P(r) is true, prove that P(r+1) is true.

Let P (n) be the statement 2^(3n) - 1 is integral multiple of 7. Then P (3) is true.

If n lt p lt 2n and p is prime and N=.^(2n)C_(n) , then

The value of sum_(n=1)^(oo)(1)/((3n-2)(3n+1)) is equal to (p)/(q), where p and q are relatively prime natural numbers.Then the value of (p^(2)+q^(2)) is equal to

Consider the following statements: 1. If p > 2 is a prime, then it can be written as 4n + 1 of 4n + 3 for suitable natural number n. 2. If p > 2 is a prime, then (p -1)(p +1) is always divisible by 4. Of these statements: