Chapter 3.2, Problem 3LC

Solution

To solve the system of equations $\left\{\begin{array}{c}2x+3y=7\\ -2x+5y=1\end{array}\right.$ by the method of elimination.

The solution of the system of equations $\left\{\begin{array}{c}2x+3y=7\\ -2x+5y=1\end{array}\right.$ is found to be $x=2$ and $y=1$ .

Given the system of equations:

  $\left\{\begin{array}{c}2x+3y=7\\ -2x+5y=1\end{array}\right.$

Concept Used:

Method of elimination in the case of linear equations in two variables:

Given a system of linear equations in two variables.

The method of elimination employs the elimination of one variable from the system of equations. Thus, the first step is to determine the variable that is to be eliminated. Then, the equations are multiplied with different non-zero constants and added together in a way so that the targeted variable is eliminated. In some cases, a simple addition would eliminate the variable. But, in general scalar multiplication is needed as said earlier.

Calculation:

Observe that the first equation has $2x$ and the other one has $-2x$ .

Then, adding the equations will eliminate the variable $x$ from the system.

Perform the addition:

  $\frac{\begin{array}{ccccc}2x& +& 3y& =& 7\\ -2x& +& 5y& =& 1\end{array}}{\begin{array}{ccccc}0x& +& 8y& =& 8\end{array}}\begin{array}{c}+\\ \\ \\ \end{array}$ .

Thus, it is found that:

  $0x+8y=8$ .

Find the value of $y$ from $0x+8y=8$ :

  $\begin{array}{c}0x+8y=8\\ 0+8y=8\\ 8y=8\\ y=\frac{8}{8}\\ y=1\end{array}$ .

Thus, it is found that:

  $y=1$ .

Substitute $y=1$ in the first equation and solve it for $x$ :

  $\begin{array}{c}2x+3y=7\\ 2x+3\left(1\right)=7\\ 2x+3=7\\ 2x=7-3\\ 2x=4\\ x=\frac{4}{2}\\ x=2\end{array}$ .

Thus, it is found that:

  $x=2$ .

Thus, the solution of the system of equations $\left\{\begin{array}{c}2x+3y=7\\ -2x+5y=1\end{array}\right.$ is found to be $x=2$ and $y=1$ .

Conclusion:

The solution of the system of equations $\left\{\begin{array}{c}2x+3y=7\\ -2x+5y=1\end{array}\right.$ is found to be $x=2$ and $y=1$ .