1 Answer

Templatetypedef · Answer 1 · 2023-09-11T13:30:42+0000

Equation of line p:

${\sf{2x - 3y = 4}}$

${\sf{y = (2x)/(3) - (4)/(3)}}$

Slope of line p (m):

${\sf{(2)/(3)}}$

Since, l is perpendicular to line p, the product of slopes of line l & p should be -1. We assume slope of line l be m2

Hence,

${\sf{m * m2 = - 1}}$

${\sf{ (2)/(3) * m2 = - 1}}$

${\sf{m2 = ( - 3)/(2)}}$

Since, line l passes through points (6, 0).

We apply,

${\sf{(y - y1) = m2(x - x1)}}$

${\sf{y - 0 = ( - 3)/(2)(x - 6)}}$

${\sf{2y - 0 = - 3x + 18}}$

${\sf{3x + 2y - 18 = 0}}$

The equation of line l:

${\sf{\red{\boxed{\sf{3x+2y-18=0}}}}}$

Please log in or register to add a comment.