Write and equation in slope intercept form for the line that is perpendicular to the line you graphed using y=-5/2x-3 and passing through points (-5,2)

Question

asked Apr 4, 2023 164k views

1 Answer

Jessie · Answer 1 · 2023-04-08T02:01:50+0000

Answer:

$\sf y =(2)/(5)x+4$

Explanation:

$\sf y = (-5)/(2)x-3\\\\\\m_1=(-5)/(2)$

$\sf \text{Slope of the perpendicular line = $(-1)/(m_1)$}$

$\sf m =(-1)/((-5)/(2))\\\\\\= -1*(-2)/(5)\\\\= (2)/(5)$

$\sf slope = m = (2)/(5)$

Line passes thorugh ( -5 , 2)

Equation of line: y = mx + b

$\sf y = (2)/(5)x + b$

Substitute the point(-5,2) in the above equation and find the value of 'b'.

$\sf 2 =(2)/(5)*(-5)+b\\\\\\ 2 = -2 + b\\$

2+ 2 = b

b = 4

Equation of the line :

$\sf \boxed{y =(2)/(5)x+4}$