The geometric mean `G` of two positive numbers is `6`. Their arithmetic mean `A` and harmonic mean `H` satisfy the equation `90A+5H=918`, then `A` may be equal to:

If arithmetic mean of two positive numbers is A, their geometric mean is G and harmonic mean H, then H is equal to

The arithmetic mean of two positive numbers is 6 and their geometric mean G and harmonic mean H satisfy the relation G^(2)+3H=48 . Then the product of the two numbers is

The arithmetic mean of two numbers is 6 and their geometric mean G and harmonic mean H satisfy the relation G^2+3H=48 .Find the two numbers.

The harmonic mean of two numbers is 4. Their arithmetic mean A and the geometric mean G satisfy the relation 2A+G^2=27. Find two numbers.

Find two numbers whose arithmetic mean is 34 and the geometric mean is 16.

Find two numbers whose arithmetic mean is 34 and the geometric mean is 16.

Find two numbers whose arithmetic mean is 34 and the geometric mean is 16.

Find two number whose arithmetic mean is 34 and the geometric mean is 16 .

If the Arithmetic mean and Geometrical mean of three numbers are equal to x, then the each number is equal to

The harmonic mean of two positive numbers a and b is 4, their arithmetic mean is A and the geometric mean is G. If 2A+G^(2)=27, a+b=alpha and |a-b|=beta , then the value of (alpha)/(beta) is equal to