Answer:
[tex](-\frac{2}{7},-\frac{65}{7} )[/tex]
Step-by-step explanation:
By steps in the image:
Step 1:
To eliminate, you need one of the coefficients to be the same in both equations. We will use the term "-6x" found in the first equation.
To get this, multiply the entire second equation by 6 and simplify using the distributive property. The new equation is:
[tex]6x-6y=54[/tex]
Step 2:
Now you need to subtract the first equation and the new version of the second equation. By doing this, the "-6x" in both equations will cancel each other out.
Step 3:
Solve for x in the given equation by:
- Dividing both sides by -14
- Simplify the value of x by dividing top and bottom by 2
Step 4:
Solve for y by:
- Substitute the value of x into the second equation
- Multiply both sides of the equation by 7
- Add 2 to both sides of the equation
- Divide both sides of the equation by -7
Solution:
[tex](-\frac{2}{7},-\frac{65}{7} )[/tex]
:Done
