SOLUTION: find the slope of the line that passes through (-3,1) and (2,-6). find an equation of each line in standard form satisfying the given conditions.

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Question 106865This question is from textbook intermediate algebra
: find the slope of the line that passes through (-3,1) and (2,-6).
find an equation of each line in standard form satisfying the given conditions. This question is from textbook intermediate algebra

Found 2 solutions by jim_thompson5910, MathLover1:
Answer by jim_thompson5910(35256) About Me  (Show Source):
You can put this solution on YOUR website!
Solved by pluggable solver: Finding the Equation of a Line
First lets find the slope through the points (-3,1) and (2,-6)


m=%28y%5B2%5D-y%5B1%5D%29%2F%28x%5B2%5D-x%5B1%5D%29 Start with the slope formula (note: (x%5B1%5D,y%5B1%5D) is the first point (-3,1) and (x%5B2%5D,y%5B2%5D) is the second point (2,-6))


m=%28-6-1%29%2F%282--3%29 Plug in y%5B2%5D=-6,y%5B1%5D=1,x%5B2%5D=2,x%5B1%5D=-3 (these are the coordinates of given points)


m=+-7%2F5 Subtract the terms in the numerator -6-1 to get -7. Subtract the terms in the denominator 2--3 to get 5



So the slope is

m=-7%2F5





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Now let's use the point-slope formula to find the equation of the line:




------Point-Slope Formula------
y-y%5B1%5D=m%28x-x%5B1%5D%29 where m is the slope, and (x%5B1%5D,y%5B1%5D) is one of the given points


So lets use the Point-Slope Formula to find the equation of the line


y-1=%28-7%2F5%29%28x--3%29 Plug in m=-7%2F5, x%5B1%5D=-3, and y%5B1%5D=1 (these values are given)



y-1=%28-7%2F5%29%28x%2B3%29 Rewrite x--3 as x%2B3



y-1=%28-7%2F5%29x%2B%28-7%2F5%29%283%29 Distribute -7%2F5


y-1=%28-7%2F5%29x-21%2F5 Multiply -7%2F5 and 3 to get -21%2F5

y=%28-7%2F5%29x-21%2F5%2B1 Add 1 to both sides to isolate y


y=%28-7%2F5%29x-16%2F5 Combine like terms -21%2F5 and 1 to get -16%2F5 (note: if you need help with combining fractions, check out this solver)



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Answer:



So the equation of the line which goes through the points (-3,1) and (2,-6) is:y=%28-7%2F5%29x-16%2F5


The equation is now in y=mx%2Bb form (which is slope-intercept form) where the slope is m=-7%2F5 and the y-intercept is b=-16%2F5


Notice if we graph the equation y=%28-7%2F5%29x-16%2F5 and plot the points (-3,1) and (2,-6), we get this: (note: if you need help with graphing, check out this solver)


Graph of y=%28-7%2F5%29x-16%2F5 through the points (-3,1) and (2,-6)


Notice how the two points lie on the line. This graphically verifies our answer.





Now let's convert the slope-intercept equation into standard form


Solved by pluggable solver: Converting Linear Equations in Standard form to Slope-Intercept Form (and vice versa)
Convert from slope-intercept form (y = mx+b) to standard form (Ax+By = C)


y+=+%28-7%2F5%29x-16%2F5 Start with the given equation


5%2Ay+=+5%2A%28%28-7%2F5%29x-16%2F5%29 Multiply both sides by the LCD 5


5y+=+-7x-16 Distribute and multiply


5y%2B7x+=+-7x-16%2B7x Add 7x to both sides


7x%2B5y+=+-16 Simplify


The original equation y+=+%28-7%2F5%29x-16%2F5 (slope-intercept form) is equivalent to 7x%2B5y+=+-16 (standard form where A > 0)


The equation 7x%2B5y+=+-16 is in the form Ax%2BBy+=+C where A+=+7, B+=+5 and C+=+-16

Answer by MathLover1(20850) About Me  (Show Source):
You can put this solution on YOUR website!
find the slope of the line that passes through (-3,1) and (2,-6).
slope+=+%28change_in_y%2Fchange_in_x%29
If slope+=+m, change_in_y+=+y%5B2%5D+%96+y%5B1%5D, change_in_x+=+x%5B2%5D+%96+x%5B1%5D, then we have:
m =(y[2] – y[1])/(x[2] – x[1])
Since
x%5B1%5D+=-3
x%5B2%5D+=2
y%5B1%5D+=1
y%5B2%5D+=-6

we will have:
m = (-6– 1)/(2 – (-3))
m+=+-7%2F%282+%2B+3%29

m+=+-%287%2F5%29
We are trying to find equation y+=+ax+%2B+b.
The value of slope a+=+-7%2F5 is already given to us, as a point (-3,1) that lies on the line as well.
we need b which is:
b+=+y%5B1%5D%28ax%5B1%5D%29
b+=+1+-+%28-7%2F5%28-3%29%29
b+=+1+-%2821%2F5%29
b+=+%285-21%29%2F5
b=+-%2816%2F5%29
so,
y+=+ax+%2B+b will be:
y+=+-%287%2F5%29x+-+16%2F5
here is the graph of this function, make sure that both given points (-3,1) and (2,-6)lie on line.

Solved by pluggable solver: Graphing Linear Equations
In order to graph y=-1.4%2Ax-3.2 we only need to plug in two points to draw the line

So lets plug in some points

Plug in x=-8

y=-1.4%2A%28-8%29-3.2

y=11.2-3.2 Multiply

y=8 Add

So here's one point (-8,8)




Now lets find another point

Plug in x=2

y=-1.4%2A%282%29-3.2

y=-2.8-3.2 Multiply

y=-6 Add

So here's another point (2,-6). Add this to our graph





Now draw a line through these points

So this is the graph of y=-1.4%2Ax-3.2 through the points (-8,8) and (2,-6)


So from the graph we can see that the slope is -1.4%2F1 (which tells us that in order to go from point to point we have to start at one point and go down -1.4 units and to the right 1 units to get to the next point), the y-intercept is (0,-3.2)and the x-intercept is (-2.28571428571429,0)


We could graph this equation another way. Since b=-3.2 this tells us that the y-intercept (the point where the graph intersects with the y-axis) is (0,-3.2).


So we have one point (0,-3.2)





Now since the slope is -1.4%2F1, this means that in order to go from point to point we can use the slope to do so. So starting at (0,-3.2), we can go down 1.4 units



and to the right 1 units to get to our next point


Now draw a line through those points to graph y=-1.4%2Ax-3.2


So this is the graph of y=-1.4%2Ax-3.2 through the points (0,-3.2) and (1,-4.6)