The fourth power of the common difference of an arithmetic progression with integer entries is added to the product of any four consecutive of it. Prove that the resulting sum is the squares of an integer.

Find two consecutive positive odd integers, sum of whose squares is 290.

Find two consecutive positive integers, sum of whose squares is 613.

Let M be a 2xx2 symmetric matrix with integer entries. Then M is invertible if The first column of M is the transpose of the second row of M The second row of M is the transpose of the first column of M M is a diagonal matrix with non-zero entries in the main diagonal The product of entries in the main diagonal of M is not the square of an integer

If the arithmetic progression whose common difference is nonzero the sum of first 3n terms is equal to the sum of next n terms. Then, find the ratio of the sum of the 2n terms to the sum of next 2n terms.

Prove that when 1 is added to the sum of n terms of the series {8+16+24+…}, the result will be perfect square.

The sum of four integers in A.P. is 20 and the sum of their squares is 120 , find them.

Suppose that all the terms of an arithmetic progression (A.P.) are natural numbers. If the ratio of the sum of the first seven terms to the sum of the first eleven terms is 6: 11 and the seventh term lies in between 130 and 140, then the common difference of this A.P. is

Suppose that all the terms of an arithmetic progression (A.P) are natural numbers. If the ratio of the sum of the first seven terms to the sum of the first eleven terms is 6 : 11 and the seventh terms lies in between 130 and 140, then the common difference of this A.P, is

Four different integers form an increasing A.P. One of these numbers is equal to the sum of the squares of the other three numbers. Then The sum of all the four numbers is -

Find two negative integers whose difference is 3 and sum of their squares is 89.