A pair of mutually perpendicular lines is drawn through the origin forming an isosceles triangle with the line 2x+3y=6 then area of triangle is

Find the equation of lines passing through the origin and making 45^(@) with the line 3x-y+5=0 .

State the number of lines of symmetry for the following figures: An isosceles triangle

Equation of the line perpendicular to y=x and passing through (3,2) is

A line is drawn through the point (1, 2) to meet the co-ordinate axes at P and Q such that it forms a triangle OPQ, where O is the origin. If the area of the triangle OPQ is least, then the slope of the line PQ is :

If alpha beta gt 0, ab gt 0 and the variable line (x)/(a), (y)/(b)=1 is drawn through the given point P(alpha, beta) , then the least area of the triangle formed by this line and the co-ordinate axes is :

The equation of the line perpendicular to 5 x-2 y=7 and passing through the point of intersection of the lines 2 x+3 y=1 and 3 x+4 y=6 is

Equation of line passing through the point (1, 2) and perpendicular to the line y=3x-1 is

The equation of the line passing through the point (3,2) and perpendicular to the line y=x is

Find the centroid of the triangle formed by the line 2x + 3y - 6 = 0, with the coordinate axes.

The equation of the pair of lines passing through the origin and perpendicular to the pair 10 x^(2)+4 x y-2 y^(2)=0 is