Perpendiculars from the point `P(4,4)` to the straight lines `3x+4y+5=0` and `y=mx+7` meet at Q and R, respectively. If the area of triangle PQR is maximum, then the value of is

lf from point P(4,4) perpendiculars to the straight lines 3x+4y+5=0 and y=mx+7 meet at Q and R area of triangle PQR is maximum, then m is equal to

Find the distance of the point (4,5) from the straight line 3x-5y+7=0

The tangent drawn to the hyperbola (x^(2))/(16)-(y^(2))/(9)=1 , at point P in the first quadrant whose abscissa is 5, meets the lines 3x-4y=0 and 3x+4y=0 at Q and R respectively. If O is the origin, then the area of triangle OQR is (in square units)

The triangle formed by the straight lines x=y , x+y=4 and x+3y=4 is :

From a point P=(3, 4) perpendiculars PQ and PR are drawn to line 3x +4y -7=0 and a variable line y -1= m (x-7) respectively then maximum area of triangle PQR is :

If the straight lines 3x-5y=7and4x+ay+9=0 are perpendicular to one another, find the value of a.

Let P, Q, R, S be the feet of the perpendiculars drawn from a point (1, 1) upon the lines x+4y=12, x-4y+4=0 and their angle bisectors respectively, then equation of the circle which passes through Q, R, S is :

A line intersects the straight lines 5x-y-4=0 and 3x-4y-4=0 at A and B , respectively. If a point P(1,5) on the line A B is such that A P: P B=2:1 (internally), find point Adot

The straight lines 3x+y-4=0,x+3y-4=0 and x+y=0 form a triangle which is :

Find the length of the perpendicular draw from the point (4,7) upon the straight line passing through the origin and the point of intersection of the lines 2x – 3y+ 14 = 0 and 5x + 4y = 7