The minimum value of p for which the lines `3x-4y=2, 3x-4y=12, 12x+5y=7` and `12x+5y=p` constitute the sides of a rhombus is

Add 4x y ,\ 12 x y and 3x y .

Equation of line mid-parallel to the lines 3x+4y=12 and 3x+4y=2 is

Given the four lines with the equations x+2y-3=0 , 3x+4y-7=0 , 2x+3y-4=0 , 4x+5y-6=0 , then

Find the bisector of the acute angle between the lines : 3x+4y=11 and 12x-5y=2

The three lines 4x - 7y + 10 , x + y = 5 and 7x+ 4y = 15 form the sides of a triangle Then the point (1,2) is its

If 3x+2y=12 and x y=6 , find the value of 9x^2+4y^2

Given that x:y= 2:7, find 3x + 4y: 2x + 5y.

If 3x+2y=12 and x y=6, find the value of 9x^2+4y^2

The equation of a line which is parallel to the line common to the pair of lines given by 6x^2-x y-12 y^2=0 and 15 x^2+14 x y-8y^2=0 and at a distance of 7 units from it is 3x-4y=-35 5x-2y=7 3x+4y=35 2x-3y=7