[" (i) "[" (i) "a^(-1)(1+c),b^(-1)(c),a)...

[" (i) "[" (i) "a^(-1)(1+c),b^(-1)(c),a),(a),a+b-c" are in AP."],[" (i) "b+c-a,c+a-b,a+b-c" are in arogression with integer entries is added to "],[" A-s.a The fourth power of the common difference of an arithmetic resulting sum is the square of an integer."],[" A."8.8" the product of any four consecutive terms of it.Prove that the resulting sum is the square of an integer."],[" Section (B) : Geometric Progression "]]

Similar Questions

Explore conceptually related problems

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

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

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.

If the fourth Power of the common difference of an A.P. with integer entries is added to the product of any four consecutive terms of it, prove that the resulting Sum is the square of an integer.

If the fourth power of the common difference of an A.P with integer entries is added to the product of any four consecutive of it, then the resulting sum is

If a(1/b + 1/c), b(1/c + 1/a), c(1/a + 1/b) are in A.P., prove that a, b, c, are in A.P.

If a (1/b+1/c), b(1/c+1/a), c(1/a+1/b) are in A.P. Prove that a, b, c are in A.P.

Similar Questions

Recommended Questions