[" The AM between two positive numbers "a" and "b(a>b)" is twice their GU "],[" prove that "a:b=(2+sqrt(3)):(2-sqrt(3))]

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

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

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

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

If the A.M between two positive numbers a and b is twice theirr G.M., then A : B =

The A.M. of two positive numbers a and b is twice their G.M. Prove that - a:b=2+sqrt3:2-sqrt3 .

If the AM of two positive numbers a and b (agtb) is twice of their GM, then a:b is

The A.M of two position number 'x' and y (x > y) is twice their G.M. Prove that x : y = (2+sqrt 3) : (2-sqrt3)