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Solve each system of equations by GRAPHING. Clearly identify your solution.(5x + 2y = 4 (3x + 6y = -12)

User Rami Alshareef
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You have the following system of equations:

5x + 2y = 4

3x + 6y = -12

In order to solve the previous equation by graphing, first, solve each equation for y, just as follow:

5x + 2y = 4

2y = -5x + 4

y = -5/2 x + 2

3x + 6y = -12

6y = -3x - 12

y = -1/2 x - 2

To graph each equation calculate both x and y intercepts. TO calculate x intercepts, equal y = 0 and solve for x:

0 = -5/2 x + 2

-2 = -5/2x

-4 = -5x

4/5 = x

0 = -1/2 x - 2

1/2x = -2

x = -4

For the y-intercept, only evaluate each equation for x=0:

y = -5/2 (0) + 2

y = 2

y = -1/2 (0) - 2

y = - 2

Hence, the x and y intercepts are:

(4/5 , 0) and (0 , 2) for the first equation of the system

(-4 , 0) and (0 , -2) for the second equation of the system

Then, the graphs of the equations are:

In the previous graph you can notice the x and y intercepts of each line, also you can notice that the lines intercept each other on th point (2,-3).

Hence, the solution to the given system of equations is:

x = 2

y = -3

Solve each system of equations by GRAPHING. Clearly identify your solution.(5x + 2y-example-1
User Madpop
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