The lines `p(p^(2)+1)x-y+q=0 and (p^(2)+1)^(2)x+(p^(2)+1)y+2q=0` are perpendicular to a common line for :

The lines x+(a-1) y+1=0 and 2 x+a^(2) y-1=0 are perpendicular if

The roots of the equation (q- r) x^(2) + (r - p) x + (p - q)= 0 are

The equation of the line common to the pair of lines (p^(2)-q^(2)) x^(2)+(q^(2)-r^(2)) x y+(r^(2)-p^(2)) y^(2)=0 and (l-m) x^(2)+(m-n) x y+(n-l) y^(2)=0 is

(P+Q)^2 =p^2 +2pq +Q^2=1 represents an equation used in :

The circles : x^2+y^2 +2g_1x-a^2 =0 and x^2+y^2 +2g_2x-a^2=0 cut each other orthogonally. Let p_1 and p_2 be the perpendiculars from (0, a) and (0, - a) on the common tangent of these circles. Then p_1p_2 equals :

Area of the triangle with vertices (a, b ), (x_(1), y_(1)) and (x_(2), y_(2)) , where a, x_(1), x_(2) are in G.P. with common ratio r and b, y_(1), y_(2) are in G.P. with common ratio s is :

If x = acos^(3)theta sin^(2)theta , y = asin^(3)theta cos^(2)theta and (x^(2) + y^(2))^(p)/(xy)^(q)(p,q in N) is independent of theta , then :

Let P(x_(1), y_(1)) and Q(x_(2), y_(2)), y_(1) lt 0, y_(2) lt 0 be the end points of latus rectum of the ellipse x^(2)+4 y^(2)=4 . The equations of parabolas with Iatus rectum P Q are

The equation of the pair of lines through (1,-1) and perpendicular to the pair of lines x^(2)-x y-2 y^(2)=0 is