Answer:
The equation of line perpendicular to given line and passes through points ( - 1 , 4 ) is 2y = -3x + 5
Explanation:
Given line equation as :
3 y = 2 x - 1
Or, y =
x -
So , The equation is in the form of y = m x + c
Where m is the slope of the line
∴ satisfying the condition
Slope of given line is m =
Now , ∵ The other line is perpendicular to this line and passes through point ( - 1 , 4 )
Let , Slope of other line = M
∴ for perpendicular line condition , products of the slope = - 1
I.e m × M = - 1
Or , M = -
Or M = -
Or M = -
Thus The equation of line with slope M and passing through points ( - 1 , 4 ) is
or,
/(2)](https://img.qammunity.org/2020/formulas/mathematics/middle-school/tpdmk58p79dwhllzm3kw8rhxif53p15odi.png)
(x + 1)[/tex]
or, 2y - 8 = - 3 (x +1)
Or, 2y - 8 = - 3x - 3
or 2y = - 3x - 3 + 8
∴ 2y = -3x + 5
Hence The equation of line perpendicular to given line and passes through points ( - 1 , 4 ) is 2y = -3x + 5 Answer