" Show that "(a-b)^(2),(a^(2)+b^(2))" and "(a+b)^(2)" are in AP."

Show that (a-b)^(2),(a^(2)+b^(2)) and (a+b)^(2) are in A.P.

Show that (a-b)^(2),(a^(2)+b^(2)) and (a+b)^(2) are in A.P.

Show that (a-b)^2,\ (a^2+b^2) and (a+b)^2 are in A.P.

Show that (a^(2) +ab+b^(2)) ,(c^(2) +ac +a^(2)) and ( b^(2) +bc+ c^(2)) are in AP, if a,b,c are in AP.

If a b,c are in A.P.then show that (i) a^(2)(b+c),b^(2)(c+a),c^(2)(a+b) are also in A.P.

Show that the sequence (a+b)^(2)(a^(2)+b^(2)),(a-b)^(2),... is an A.P.

If a, b, c are In A.P., then show that, a^(2)(b+c), b^(2)(c+a), c^(2)(a+b) are in A.P. (ab+bc+ca != 0)

If (b^(2) + c^(2) - a^(2))/(2bc), (c^(2) + a^(2) - b^(2))/(2ca), (a^(2) + b^(2) - c^(2))/(2ab) are in A.P. and a+b+c = 0 then prove that a(b+c-a), b(c+a-b), c(a+b-c) are in A.P.

If a, b, c are in A.P., prove that a^(2)(b+c),b^(2)(c+a),c^(2)(a+b)" are also in A.P."

If a, b, c are in A.P., prove that a^(2)(b+c),b^(2)(c+a),c^(2)(a+b)" are also in A.P."