If a,b,c are in A.P. then `a^(3) +c^(3) - 8b^(3)` is equal to

Suppose a ,b ,c are in A.P and a^(2) , b^(2) , c^(2) are in G.P. If a lt b lt c and a+b+c = (3)/(2) then the value of a is

If alpha and beta are the roots of the equation ax^(2)+bx+c=0, alphabeta=3 and a,b,c are in AP, then alpha+beta is equal to a)-4 b)1 c)4 d)-2

Consider the quadratic equation (b-c)x^2+(c-a)x+(a-b)=0 If a,b,c are in A.P. prove that the given quadratic equation has equal roots.

Suppose that a, b, c are in A.P. Prove that a^2(b+c),b^2(c+a),c^2(a+b) are in A.P.

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

If abc = p and A = [(a,b,c),(c,a,b),(b,c,a)] , prove that A is orthogonal if and only if a,b,c are the roots of the equation x^(3) pm x^(2) - p = 0 .