Find the 5th and 10th terms of the sequence `[u_(n)]` defined by, `u_(n) = {(2n+7 "when n is odd"),(n^(2) + 1 "when n is even"):}`

Find the 25th and 50th terms of the sequence whose nth terms is given by u_(n) = {((n)/(n+1) "when n is odd"),((n+1)/(n+2) "when n is even"):}

Find the sequence of the numbers defined by a_n={1/n , when n is odd -1/n , when n is even

What is the 20^("th") term of the sequence defined by a_n=(n-1) (2-n) (3+n) ?

A function f from the set of natural numbers N to the set of integers Z is defined by f(n)={((n-1)/(2),"when n is odd"),(-(n)/(2),"when n is even"):} Then f(n) is -

Find the first five terms of the sequence whose n th terms (u_(n)) is given by u_(n) = 3n^(2) -2

Determine the first five terms of the sequence defined by, u_(1) = -2, u_(2) = 2 and u_(n) = (n)/(n-2)u_(n-1), n gt 2 .

Find the first five terms of the sequence whose n th terms (u_(n)) is given by u_(n) = nth prime number.

Write the first five terms of the sequence defined by u_(n) = 2n^(2) - 3n Also find the corresponding series in each case.

Find the sum to n terms of the series in whose n^(th) terms is given by (2n-1)^2

Find the sum to n terms of the series in whose n^(th) terms is given by n^2+2^n