If `P(n)=2+4+6+....+2n, n in N`. Then `P(k) =k(k+1)` `rArr P(k+1)=(k+1)(k+2),forall k in N` , So , we can conclude that `P(n)=n(n+1)` for

If P(n) : 2n lt n! , n in N , then P(n) is true for all n gt= ………….. .

P(n) : n (n+1) is even number then P(3) = .........

Let P(n) be statement and let P(k) rArr P(k+1) ,for some natural number k, then P(n) is true for all n in N

If…..is true and P(k) is true rArr P(k+1) is true, k gt= - 1 , then for all n in N cup {0,-1},P(n) is true.

Use the principle of mathematical induction : A sequence a_1, a_2, a_3,…… is defined by letting a_1 = 3 and a_k = 7a_(k-1) , for all natural numbers k > 2 . Show that a_n = 3.7^(n-1) , for all natural numbers .

Use the principle of mathematical induction : A sequence d_1,d_2,d_3,……… is defined by letting d_1= 2 and d_k = (d_k - 1)/(k) , for all natural numbers, k gt= 2 . Show that d_n = (2)/(n!) , for all n in N

P(n) : 2n + 1 , for n = …………it is not a prime number.

P(n) : 4n + 1 , for n = ………….it is not a prime number

A = {3k| k in N} B = {3k -1|k in N} and C = {3k-2| k in N}. Then A , B and C are disjoint sets .