Determine the AP whose `3^(rd)` term is 5 and the `7^(th)` term is 9.

Determine the AP whose third term is 16 and the 7^(th) term exceeds the 5^(th) term by 12.

Find the 31^(th) term of an A.P. whose 11^(th) term is 38 and the 16^(th) term is 73.

Find the sum to 'n' terms of an A.P. whose 7^(th) term is 30 and 13^(th) term is 54.

Find the sum of 32 terms of an A.P. whose third term is 1 and 6^(th) term is -11.

If the sum of the first n terms of an A.P. is 3n+n^2 , what is the first term? What is the 2^(nd) term, 3^(rd) term, 10^(th) term and the n^(th) terms.

Determine the 18^(th) term of a G.P. whose 5^(th) term is 1 and common ratio is 2/3

In an A.P the 3^(rd) term = 5 and 7^(th) term = 9 then the common difference=….

If the sum of the first n terms of an AP is 4n-n^(2) , what is the first term (remember the first term is S_(1) )? What is the sum of first two terms? What is the second term? Similarly, find the 3^(rd) , the 10^(th) and the n^(th) terms.

In a GP the 3^(rd) term is 24 and 6^(th) term is 192. find the 10^(th) term.

The 8^(th) term of an A.P. is 17 and the 19^(th) term is 39. Find the 25^(th) term.