If x and y are unequal real positive numbers , does the relation `sec theta=(2xy)/(x^2+y^2)` hold ? Give your argument .

Write 'true' or 'false' : sec theta=(2xy)/(x^(2)+y^(2))

Show that the relation sec^2 theta = (4xy)/(x+y)^2 is possible, only when x=y.

sec^2theta=4xy/(x+y)^2 is true if and only if

The equation sin^2theta=(x^2+y^2)/(2x y),x , y!=0 is possible if

If sec theta = (2xy)/(x^2+y^2) possible? When x and y are positive real numbers.

"sec"^(2) theta = (4xy)/((x + y)^(2)) is true if and only if-

If x and y are positive real numbers and m, n are any positive integers, then prove that (x^n y^m)/((1+x^(2n))(1+y^(2m))) lt 1/4

State with reason whether the statements given below is negation of each other : (i) The relation xy=yx is true for every real number x and y . (ii) There exists real numbers x and y for which the relation xy = y x is not true .

Let 'a' and 'b' be non-zero real numbers. Then, the equation (ax^2+ by^2+c) (x^2-5xy+6y^2) represents :