Let P(n) be a statement and let P(n) `Rightarrow` P(n+1) for all natural number n, then P(n) is true.

Let P(n) be a statement such that P(n) Rightarrow P(n+1) for all n in NN . Also P(k) is true, k in NN . Then we can conclude that:

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

Let P(n): n^(2)+n is odd. Then P(n) Rightarrow P(n+1) for all n in NN and P(1) is not true. From here, we can conclude that:

A student was asked to prove a statement P(n) by using the principle of mathematical induction. He proved that P(n) Rightarrow P(n+1) for all n in N and also that P(4) is true: On the basis of the above he can conclude that P(n) is true.

Let P(n) be the statement "7 divides 2^(3n)-1 ." What is P(n+1) ?

Consider the statement P(n): n^(2) ge 100 . Here, P(n) Rightarrow P(n+1) for all n . We can conclude that:

Let P(n) be the statement 7 divides (2^(3n)-1)dot What is P(n+1)?

If P(n) be the statement 2^ngtn^n and if P(m) is true, show tht P(m+1) is also true

Let P(n) denote the statement that n^2+n is odd . It is seen that P(n)rArr P(n+1),P(n) is true for all