If the ratio of A.M. and G.M. of two positive numbers a and b is m : n, then prove that :
`a:b=(m+sqrt(m^(2)-n^(2))):(m-sqrt(m^(2)-n^(2)))`

The ratio of the A.M.and G.M.of two positive numbers a and b,is : n .Show that a :b=(m+sqrt(m^(2)-n^(2))):(m-sqrt(m^(2)-n^(2)))

If A.M.and G.M.between two numbers is in the ratio m:n then prove that the numbers are in the ratio (m+sqrt(m^(2)-n^(2))):(m-sqrt(m^(2)-n^(2)))

If the ratio of A.M.between two positive real numbers a and b to their H.M.is m:n then a:b is equal to

If the A.M.of two positive numbers a and b(a>b) is twice their geometric mean.Prove that : a:b=(2+sqrt(3)):(2-sqrt(3))

If sum of two numbers a&b is n xx their G.M then show that (a)/(b)=(n+sqrt(n^(2)-4))/(n-sqrt(n^(2)-4))

The A.M and G.M of two numbers a and b are 18 and 6 respectively then H.M of a and b is