The Harmonic mean of the numbers 2,3,4 is

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.

The harmonic mean of two numbers is -(8)/(5) and their geometric mean is 2 . The quadratic equation whose roots are twice those numbers is

The arthmetic mean of the numbers 1,3,3^(2), … ,3^(n-1), 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 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

The harmonic mean between two numbers is 21/5, their A.M. ' A ' and G.M. ' G ' satisfy the relation 3A+G^2=36. Then find the sum of square of numbers.

The harmonic mean between two numbers is 21/5, their A.M. ' A ' and G.M. ' G ' satisfy the relation 3A+G^2=36. Then find the sum of square of numbers.

The arithmetic mean of two numbers is 18(3)/(4) and the positive square root of their product is 15. The larger of the two numbers is

Statement 1: If the arithmetic mean of two numbers is 5/2 geometric mean of the numbers is 2, then the harmonic mean will be 8/5. Statement 2: For a group of positive numbers (GdotMdot)^2=(AdotMdot)(HdotMdot)dot

The harmonic mean of the segments of a focal chord of the parabola y^(2)=16ax, is