1.Let A1A_1A1 and A2A_2A2 be two arithmetic means and G1,G2G_1, G_2G1,G2 and G3G_3G3 be three geometric means of two distinct positive numbers. Then G13+G12G2+G22G3+G23G_1^3 + G_1^2 G_2 + G_2^2 G_3 + G_2^3G13+G12G2+G22G3+G23 is equal toa.(A1+A2)2 G1G3(A_1 + A_2)^2\,G_1 G_3(A1+A2)2G1G3b.2(A1+A2) G1G32(A_1 + A_2)\,G_1 G_32(A1+A2)G1G3c.(A1+A2) G1G2(A_1 + A_2)\,G_1 G_2(A1+A2)G1G2d.2(A1+A2) G1G222(A_1 + A_2)\,G_1 G_2^22(A1+A2)G1G22Login to continueOnly logged in users canattempt or see the solution.