If G be the GM between` x and y`, then the value of `1/(G^2-x^2)+1/(G^2-y^2)` is equal to (A) `G^2` (B) `2/G^2`(C)`1/G^2`(D) `3G^2 `

If G is the geometric mean of xa n dy then prove that 1/(G^2-x^2)+1/(G^2-y^2)=1/(G^2)

If G is the geometric mean of xa n dy then prove that 1/(G^2-x^2)+1/(G^2-y^2)=1/(G^2)

If G is the geometric mean of xa n dy then prove that 1/(G^2-x^2)+1/(G^2-y^2)=1/(G^2)

If G is the geometric mean of xa n dy then prove that 1/(G^2-x^2)+1/(G^2-y^2)=1/(G^2)

If G is the geometric mean of x and y then prove that (1)/(G^(2)-x^(2))+(1)/(G^(2)-y^(2))=(1)/(G^(2))

If G is the G.M between two positive numbers a and b.show that 1/(G^2-a^2)+1/(G^2-b^2)=1/G^2

If G is the G.M. between two positive numbers a and b, show that (1)/(G^(2) - a^(2)) + (1)/(G^(2) - b^(2)) = (1)/(G^(2)) .

If G_1 and G_2 are two geometric means and A the asrithmetic mean inserted between two numbers, then the value of G_1^2/G_2+G_2^2/G_1 is (A) A/2 (B) A (C) 2A (D) none of these

If g_1 , g_2 are two G.M's between two numbers a and b, then (g_1^2)/(g_2)+(g_2^2)/(g_1) is equal to:

Let a function f be even and integrable everywhere and periodic with period 2. Let g(x)=int_0^x f(t) dt and g(t)=k The value of g(x+2)-g(x) is equal to (A) g(1) (B) 0 (C) g(2) (D) g(3)