Let P(n) be the statement: 2^n >= 3n. I...

Let `P(n)` be the statement: `2^n >= 3n`. If `P(r)` is true, show that `P (r + 1)` is true. Do you conclude that `P(n)` is true for all `n in N`

Similar Questions

Explore conceptually related problems

Let P(n) be the statement : 2^(n)gt3n . IF P(m) is true, show that, P(m+1) is true. Do you conclude that, P(n) is true for all ninNN ?

Let P(n) be the statement ‘‘4^n > n’’ . If P(r) is true, prove that P(r +1) is also true.

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

Let P(n) be the statement ''(3)^(n)gt n'' . If P(n) is true , prove that P(n + 1) is true.

Let P(n) denotes the statement 2^n gt n and if P(n) is true, show that P(n+1) is also true

Let P(n) be the statement ''2^n > 1’’ . Is P(1) true ?

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

If P(n) be the statement 2^ngtn^n and if P(m) is true, show tht P(m+1) is also 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 "3^n > n" . If P(n) is true, P(n+1) is also true.