If P`(n)` is the statement `"n^2> 100"` , prove that whenever `P(r)` is true, `P(r+1)` is also true.

If P(n) is the statement n^(3)+n is divisible by 3, prove that P(3) is true but P(4) is not true.

If P(n) is the statement 2^(n)>=3n, and if P(r) is true,prove that P(r+1) is true.

Let P (n) be the statement 2^(n) ge n . When P (r) is true, then is it true that P (r + 1) is also true ?

If P(n) is the statement n^(2)+n is even,and if P(r) is true then P(r+1) is true.

If P(n) is the statement n^(2)-n+41 is prime. Prove that P(1),P(2) and P(3) are true. Prove also that P(41) is not true.

If P(n) is the statement n(n+1)(n+2) is divisible is 12 prove that the statements P(3) and P(4) are true,but that P(5) is not true.

Let P(n) be the statement 3^(n)>n. If P(n) is true,P(n+1) is also true.

Let P(n) be the statement : ”n^(2)+n is even" Prove that P(n) is true for all n in N by Mathematical Induction

If P(n) is a statement (n in N) such that if P(k) is true,P(k+1) is true for k in N, then P(k) is true.