The easiest way to solve this question is to use substitution. Since you can replace y for 7x-2 in the other equation.

You should have

.

Distribute the 2 to the parentheses.

Add 4 to both sides of the equation.

Subtract 6x from both sides.

Divide by 8 to get x.

Put 1 back in to either equation for x to solve for y.

First task is to solve at least one of the equations for y.

Move -3x to the other side by adding 3x to both sides.

Divide by 2 to all the terms in the equation.

Plug this value for y into the other equation.

Distribute the 2.

Add 3x to both sides.

Subtract 19 from both sides of the equation.

Divide by 6.

Plug this back in for x in either equation.

To solve this system of equations, you are given the value of .

The second equation is 

So you put the value of  into the second equation.

Combine like terms.

Add  to both sides of the equation.

Divide both sides by .

Substitute the value of x in one of the equations to get the value of y.

 is the correct answer.

To cancel out the  terms, multiply  by 

Then add:

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Plug the value of  which is  into one of the equations to get the value of .

 is the correct answer.

Using the substitution method, set the two systems of equations equal to each other.

Isolate the variable by subtracting  from both sides of the equation.

To get the value of , substitute the value of  in one of the equations.

 is the correct answer.

Using the substitution method, set both systems of equations equal to each other.

Isolate the variable by adding  to both sides of the equation.

Add  to both sides.

Divide both sides by 3.

To get the value of y, substitute the value of x in one of the equations.

 is the correct answer.

In order to eliminate the  terms, first multiply the first equation by 

Then multiply the second equation by 

This will now eliminate the  terms when added together.

+ 

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Divide both sides by 

Now substitute the value of  which is  to get the value of  in one of the the two original equations.

Add  to both sides of the equation.

Divide both sides by 

 is the correct answer.

Set both equations equal to each other and solve.

Add  to both sides of the equation.

Add  to both sides of the equation.

Divide both sides by 8.

Plug the value of the  variable into one of the equations to get the value of 

 is the correct answer for this system of equations.

To solve this system of equations, multiply the first equation by .

Now add the two equations together to remove the  terms.

+   

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Divide both sides by .

Plug the value of the  variable, which is  into one of the equations.

Subtract  from both sides of the equation.

Divide both sides by 

 is the correct answer for this system of equations.

To solve this system of equations:

Multiply the first equation by  and the second equation by .

Add these two equations; this will remove the  terms.

+

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To get the value of , plug the value of , which is  into one of the equations.

Divide both sides by 

 is the correct answer for this system of equations.