[" Prove that the equation of the line passing through "(x_(1),y_(1))" and parallel to "Ax+By],[A(x-x_(1))+B(y-y_(1))]

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

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

Find the equation of the line passing through (1,1) and parallel to the line 2x-3y+5=0.

A : Equation of the line passing through (-2, 3) and parallel to 3x-4y+7=0 is 3x-4y+18=0 . R : Equation of the line passing through (x_(1), y_(1)) and parallel to ax+by+c=0 is a(x-x_(1))+b(y-y_(1))=0

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

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

Prove that the line through the point (x_(1),y_(1)) and parallel to the line Ax+By+C=0 is A(x-x_(1)) +B(y-y_(1))=0 .

A : Equation of the line passing through (3, -4) and perpendicular to 2x+3y+7=0 is 3x-2y-17=0 . R : Equation of the line passing through (x_(1), y_(1)) and perpendicular to ax+by+c=0 is b(x-x_(1))-a(y-y_(1))=0

The equation of the line passing through (a,b) and parallel to the line (x)/(a)+(y)/(b)=1 is