If G be the geometric mean of x and y , then `1/(G^2-x^2)+1/(G^2-y^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 a be one A.M and G_(1) and G_(2) be then geometric means between b and c then G_(1)^(3)+G_(2)^(3)=

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

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 be the GM between x and y, then the value of (1)/(G^(2) - x^(2)) + (1)/(G^(2) - y^(2)) is equal to

The geometric mean of (x _(1) , x _(2), x _(3), ... X _(n)) is X and the geometric mean of (y _(1), y _(2), y _(3),... Y _(n)) is Y. Which of the following is/are correct ? 1. The geometric mean of (x _(1) y _(1), x _(2) y _(2) . x _(3) y _(3), ... x _(n) y _(n)) is XY. 2. The geometric mean of ((x _(1))/( y _(1)) , ( x _(2))/( y _(2)), (x _(3))/( y _(3)) , ... (x _(n))/( y _(n))) is (X)/(Y). Select the correct answer using the code given below:

Let G_(1),G_(2) be the geometric means of two series x_(1),x_(2),...,x_(n);y_(1),y_(2),...,y_(n). If G is the geometric mean of (x_(i))/(y_(i)),i=1,2,...n, then G is equal to

The geometric mean of the observation x_(1),x_(2),x_(3),……..,_(n) is G_(1) , The geometric mean of the observation y_(1),y_(2),y_(3),…..y_(n) is G_(2) . The geometric mean of observations (x_(1))/(y_(1)),(x_(2))/(y_(2)),(x_(3))/(y_(3)),……(x_(n))/(y_(n)) us