SOLUTION: find a common solution for each system of equations: y=3x+5 y=-5x-3

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Question 132186This question is from textbook Algebra
: find a common solution for each system of equations:
y=3x+5
y=-5x-3 This question is from textbook Algebra

Found 2 solutions by nycsharkman, jim_thompson5910:
Answer by nycsharkman(136) About Me  (Show Source):
You can put this solution on YOUR website!
The best way to find a solution in this example is to graph both linear equations on the SAME coordinate system (graph paper). The solution for this system will be the point where the two graphs meet.
I assume you know how to graph linear equations, right?

Answer by jim_thompson5910(35256) About Me  (Show Source):
You can put this solution on YOUR website!
First let's graph y=3x%2B5



Looking at y=3x%2B5 we can see that the equation is in slope-intercept form y=mx%2Bb where the slope is m=3 and the y-intercept is b=5


Since b=5 this tells us that the y-intercept is .Remember the y-intercept is the point where the graph intersects with the y-axis

So we have one point




Now since the slope is comprised of the "rise" over the "run" this means
slope=rise%2Frun

Also, because the slope is 3, this means:

rise%2Frun=3%2F1


which shows us that the rise is 3 and the run is 1. This means that to go from point to point, we can go up 3 and over 1



So starting at , go up 3 units


and to the right 1 unit to get to the next point



Now draw a line through these points to graph y=3x%2B5

So this is the graph of y=3x%2B5 through the points and





Now let's graph y=-5x-3




Looking at y=-5x-3 we can see that the equation is in slope-intercept form y=mx%2Bb where the slope is m=-5 and the y-intercept is b=-3


Since b=-3 this tells us that the y-intercept is .Remember the y-intercept is the point where the graph intersects with the y-axis

So we have one point




Now since the slope is comprised of the "rise" over the "run" this means
slope=rise%2Frun

Also, because the slope is -5, this means:

rise%2Frun=-5%2F1


which shows us that the rise is -5 and the run is 1. This means that to go from point to point, we can go down 5 and over 1



So starting at , go down 5 units


and to the right 1 unit to get to the next point



Now draw a line through these points to graph y=-5x-3

So this is the graph of y=-5x-3 through the points and





If we graph the two equations on the same coordinate system, we can see that the two lines intersect at the point (-1,2)


Graph of y=3x%2B5 (red) and y=-5x-3(green) which intersect at the point (-1,2)


So the common solution is

x=-1 and y=2