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Find the equation of a line parallel to the given point. Write the equation in slope-intercept form Line y= -3x+ 6, point(1,-5)

User Ian Mc
by
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1 Answer

19 votes
19 votes

Given:


\text{ line }y=-3x+6\text{ and point (1,-5).}

Aim:

We need to find the line which is parallel to y=-3x+6.

Step-by-step explanation:

We know that the slope of the parallel lines is equal.

The given line is of the form


y=mx+b_1
\text{where }m=-3\text{ and }b_1=6.

The slope of the required line is -3.

The slope-intercept form of the line equation for the required line is


y=mx+b

substitute m=-3, x=1, and y=-5 in the equation to find the value of b.


-5=-3(1)+b


-5+3=b
b=-2

Substitute m=-3 and b= -2 in the slope intercept line equation.


y=(-3)x+(-2)


y=-3x-2

Final answer:

Teh slope-intercept equation is


y=-3x-2

User Amit Pandya
by
3.0k points