G is the geometric mean and p and q are two arithmetic means between two numbers a and b, prove that :
`G^(2)=(2p-q)(2q-p)`

If A is the arithmetic mean and p and q be two geometric means between two numbers a and b, then prove that : p^(3)+q^(3)=2pq " A"

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)

If one geometric mean G and two arithmetic means A_(1) and A_(2) be inserted between two given quantities,prove that G^(2)=(2A_(1)-A_(2))(2A_(2)-A_(1))

If G_(1) and G_(2) are two geometric means and A is the arithmetic mean inserted two numbers,G_(1)^(2) then the value of (G_(1)^(2))/(G_(2))+(G_(2)^(2))/(G_(1)) is:

If one G.M., G and two A.M.\'s p and q be inserted between two given quantities, show that G^2=(2p-q)(2q-p) .

The point P(a, b) is such that b-25a=4 and the arithmetic mean of a and b is 28. Q(x, y) is the point such that x and y are two geometric means between a and b, if O is the origin then (OP)^(2)+(OQ)^(2) is equal to

If p is the first of the n arithmetic means between two numbers and q be the first on n harmonic means between the same numbers. Then,show that q does not lie between p and ((n+1)/(n-1))^(2)p