The arithmetic mean of two numbers x and y is 3 and geometric mean is 1. Then `x^(2) + y^(2)` is equal to

Let x,y,z be different integers less than or equal to 14. The arithmetic mean of x and y is 10 and the geometric mean of x and z is 2 sqrt(21) then harmonic mean of y and z is equal to

If the arithmetic mean of two positive number a and b (a gtb ) is twice their geometric mean then a : b is

Two numbers x and y have arithmetic mean 9 and geometric mean 4. Then, x and y are the roots of

The quadratic equation in x such that the arithmetic mean of its roots is 5 and geometric mean of the roots is 4, is given by :

Let a be a positive number such that the arithmetic mean of a and 2 exceeds their geometric mean by 1. Then, the value of a is

Calculate the arithmetic mean of even numbers' and odd numbers from 1 to 100 ?

Three numbers x,y and z in arithmetic progression if x+y+z=-3 and xyz =8 then x^(2)+y^(2)+z^(2) is equal to

If a is positive and if A and G are the arithmetic mean and the geometric mean of the roots of x^(2)-2ax+a^(2)=0 respectively , then a) A=G b) A=2G c) 2A=G d) A^(2)=G

If y = 2 ^(x) . 3 ^(2x-1) , then (d ^(2) y )/( dx ^(2)) is equal to :