Let x be the arithmetic mean y,z be the two geometric means between any two positive numbers. Then value of `(y^(3) + z^(3))/(xyz)` is

Let x be the arithmetic mean and y,z be the two geometric means between any two positive numbers. Then, value of (y^3+z^3)/xyz ​=?

Let x be the arithmetic mean and y, z be two geometric means between any two positive numbers. Then, prove that (y^(3) + z^(3))/(xyz) = 2 .

Let x be the arithmetic mean and y,z be tow geometric means between any two positive numbers.Then,prove that (y^(3)+z^(3))/(xyz)=2

Let x be the arithmetic mean and y, z be two geometric means between any two positive numbers. Then, prove that (y^3+z^3)/(xyz)=2 .

Let x be the arithmetic mean and y,z be the two geometric means between any two positive numbers,then (y^(3)+z^(3))/(xyz)=... (1997C 2M )

Let x be the arithmetic mean and y ,z be tow geometric means between any two positive numbers. Then, prove that (y^3+z^3)/(x y z)=2.

Let x be the arithmetic mean and y ,z be the two geometric means between any two positive numbers, then (y^3+z^3)/(x y z)=dot (1997C, 2M)

If a be the arithmetic mean and b, c be the two geometric means between any two positive numbers, then (b^3 + c^3) / abc equals

In a Delta ABC, If a is the arithmetic mean and b,c(b!=c) are the geometric means between any two positive real number then (sin^(3)B+sin^(3)C)/(sin A sin B sin C)=

If x,y,z are the three geometric means between 6,54, then z =