If A be the arithmetic mean (A.M.) and p, q be two geometric means (G. M.) between two given numbers then prove that `(p^(2))/(q)+(q^(2))/(p)=2A`.

If one arithmetic mean A and two geometric means p, q be inserted between two given numbers, then prove that, (p^(2))/(q) + (q^(2))/(p) = 2A .

If one geometric mean G and two arithmetic means p, q be inserted between two given numbers, then prove that, G^(2) = (2p - q) (2q - p) .

The arithmetic mean of two numbers is 10 and their geometric mean is 8. find the numbers.

If p and q are two given statements the prove that , ~(p^^q)-=(~p)vv(~q)

If p be the first of n arithmetic means between two numbers and q be the first of n harmonic means between the same two numbers , then prove that the value of q can not lie between p and ((n+1)/(n-1))^2p .

If two positive values of a variable be x_(1) and x_(2) and the arithmetic mean be A, geometric mean be G and the harmonic mean be H, then prove that G^(2)=AH

If p and q are two given statements the prove that , ~(prArrq)-=(p)^^(~q)

If a is the A.M. of b and c and the two geometric mean are G_1 and G_2, then prove that G_1^3+G_2^3=2a b c

If p and q are two given statements the prove that , ~(phArrq)-=(p^^~q)vv(q^^~p)

If G_1 ,G_2 are geometric means , and A is the arithmetic mean between two positive no. then show that G_1^2/G_2+G_2^2/G_1=2A .