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Determine the equation of the line that passes through the point (1/9,−3) and is parallel to the line −8y+4x=4.

User Eugen Govorun
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1 Answer

21 votes
21 votes

Given:

The point lies on the line is (1/9, -3).

The parallel line is -8y+4x=4.

Required:

We need to find the equation of the line.

Step-by-step explanation:

Consider the parallel line.


-8y+4x=4

Subtract 4x from both sides.


-8y+4x-4x=4-4x
-8y=4-4x

Divide both sides by (-8).


-(8y)/(-8)=(4)/(-8)-(4x)/(-8)
y=-(1)/(2)+(1)/(2)x
y=(1)/(2)x-(1)/(2)

Which is of the form


y=mx+b

where slope,m=1/2.

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

The slope of the required line is m =1/2.

Consider the line equation.


y=mx+b

Substitute x =1/9, y=-3, and m=1/2 in the equation to find the value of b.


-3=(1)/(9)((1)/(2))+b
-3=(1)/(18)+b

Subtract 1/18 from both sides.


-3-(1)/(18)=(1)/(18)+b-(1)/(18)
-3*(18)/(18)-(1)/(18)=b
(-54-1)/(18)=b
b=-(55)/(18)

Substitute m=1/2 and b =-55/18 in the line equation.


y=(1)/(2)x-(55)/(18)

Multiply both sides by 18.


18y=18*(1)/(2)x-18*(55)/(18)
18y=19x-55

Final answer:


18y=19x-55

User Necrolis
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