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Find the solution of the system of equations. 4x - y = 11 2.r – 4y = –26

Find the solution of the system of equations. 4x - y = 11 2.r – 4y = –26-example-1
User Marcel Batista
by
3.0k points

1 Answer

10 votes
10 votes

Step-by-step explanation:

We can use the substitution method to solve this system.

First we clear y from the first equation:


\begin{gathered} 4x-y=11 \\ 4x-11=y \\ y=4x-11 \end{gathered}

Then we replace this expression into the second equation:


\begin{gathered} 2x-4y=-26 \\ 2x-4(4x-11)=-26 \end{gathered}

Solve for x:


\begin{gathered} 2x-16x+44=-26 \\ -14x=-26-44 \\ x=(-26-44)/(-14)=(-70)/(-14)=5 \end{gathered}

And with x = 5 we replace it into the first equation and solve for y:


y=4x-11=4\cdot5-11=20-11=9

Answer:

The solution is (5, 9)

User Jaynetics
by
3.0k points
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