Is the equation `sec^(2)theta=(4xy)/((x+y)^(2))` possible for real values of x and y ?

If x and y be real, show that the equation sec ^(2) theta=(4 xy)/((x+y)^(2)) is possible only when x=y

Find the values of theta and p, if the equation x cos theta + y sin theta = p is the normal form of sqrt 3 x + y + 2 = 0

If xy = A sin x + B cos x is the solution of the differential equation x (d^2 y)/( dx^2) - 5a (dy)/( dx) + xy = 0 , then the value of a is

solve the differential equation (x^2+x y) d y=(x^2+y^2) d x

If c lt 1 and the system of equations x + y - 1 = 0, 2x - y - c = 0 and -bx + 3by - c = 0 is consistent, then the possible real values of b are a) b in (-3,(3)/(4)) b) b in (-(3)/(2),4) c) b in (-(3)/(4),3) d)None of these

If p and q are respectively the perpendiculars from the origin upon the straight lines, whose equations are x sec theta + y cosec theta = a and x cos theta - y sin theta =a cos 2 theta, then 4p ^(2) + q ^(2) is equal to a) 5a^(2) b) 4a ^(2) c) 3a ^(2) d) 2a ^(2)

If (x,y,z) is the solution of the equations 4x + y = 7 3y + 4z = 5 5x + 3z = 2 Then the value of x + y + z equals