Solve for x and y, px + qy = 1 and `qx + py = ((p - q)^(2))/(p^(2) + q^(2))-1`.

Solve for x and y:(q)/(p)x+(p)/(q)y=p^(2)+q^(2);x+y=2pq

Solve for x and y by cross-multiplication : (i)px+qy=p-q,qx-py=p+q

Solve the following pair of linear equations : px + qy= p-q qx- py= p+q

The equations of the tangents drawn from the origin to the circle x^2 + y^2 - 2px - 2qy + q^2 = 0 are perpendicular if (A) p^2 = q^2 (B) p^2 = q^2 =1 (C) p = q/2 (D) q= p/2

The equation x^(2) + px +q =0 has two roots alpha, beta then Choose the correct answer : (1) The equation qx^(2) +(2q -p^(2))x +q has roots (1) alpha /beta , beta/alpha (2) 1/alpha ,1/beta (3) alpha^(2), beta^(2) (4) None of these (2) The equation whose roots are 1/alpha , 1/beta is (1) px^(2) + qx + 1 =0 (2) qx^(2) +px +1 =0 (3) x^(2) + qx + p =0 (4) qx^(2) +x+ p =0 3. the values of p and q when roots are -1,2 (1) p = -1 , q = -2 (2) p =-1 , q =2 (3) p=1 , q = -2 (4) None of these

Find p and q, if the following equation represent a pair of lines perpendicular to each other : (1) px^(2) - 8xy + 3y^(2) + 14x + 2y + q = 5 (2) 12x^(2) + 7xy - py^(2) + 18x + qy + 6 = 0.

{:(2x + 3y = 9),((p + q)x + (2p - q)y = 3(p + q+ 1)):}

Solve px+qy=p-q,qx-py=p+q

If px + qy + r = 0 and qx + py + r = 0 (x != y) , then show that the value of x + y " is " (-r)/(p) or (-r)/(q)

{(p^(2)+3px+3pq+9qx)(p-3q)}-:(p^(2)-9q^(2))