SOLUTION: Through (-4,1), parallel to x+3y=5

Algebra.Com
Question 770593: Through (-4,1), parallel to x+3y=5
Answer by fcabanski(1391)   (Show Source): You can put this solution on YOUR website!
Parallel lines have the same slope. y=mx+b is the slope-intercept form of a line. m is the slope.


x+3y=5


3y = -x + 5
y = -x/3 + 5/3. The slope is -1/3.


The slope point form of a line equation is y - y(1) = m(x-x(1)) where m is the slope and (x(1),y(1)) is a point on the line. Plug in the info.


y-1 = -1/3(x-(-4)


y-1 = -x/3 -4/3


y = -(1/3)x -1/3

RELATED QUESTIONS

find the equation of the line parallel to x=1 and passing through (-4... (answered by macston)
through (5,-3), parallel to... (answered by Jc0110)
Through :(-4,-4), parallel to... (answered by nerdybill,MathLover1)
1) how do u write an equation in slope-intercept form of the line that passes through (answered by jim_thompson5910,checkley71)
1. through: (5,4), parallel to y=0 2. through:(3,-3), parallel to y=1/4x+5 3.... (answered by josgarithmetic)
Write the equation of the line which passes through (5, –2) and is parallel to x = 4. (1... (answered by John10)
Write the equation of the line which passes through (5, –2) and is parallel to x = 4. (1... (answered by sofiyac)
1.Write the equation of the line which passes through (5, –2) and is parallel to x = 4. (answered by stanbon)
1. through: (5,4), parallel to y=0 2. through:(3,-3), parallel to y=1/4x+5 3.... (answered by josgarithmetic)