Chapter 5.4, Problem 5E

To determine

To calculate:

Match the system of the linear equations using given graphs.

Answer to Problem 5E

Given system has no solution and inconsistent,Graph (D)matches the solution.

Explanation of Solution

Given information:

  $\begin{array}{l}2x+y=4\\ -4x-2y=-8\end{array}$

Calculation:

Given equations are,

  $\begin{array}{l}2x+y=\mathrm{4...}\left(i\right)\\ -4x-2y=-\mathrm{8...}\left(ii\right)\end{array}$

For match theis system with graphand describe whether tehsystem is consistent or inconsistent.

Lets, find first solution:

First multiply equation $\left(i\right)$ by $2$ ,

  $4x+2y=8$

It is observed that the coefficient of variable on left hand side of the equations $\left(i\right)$ and Eq. $\left(ii\right)$ are similar.

  $\begin{array}{l}4x+2y=8\\ -4x-2y=-8\end{array}$

Sloe of both equations is same.

Both equations represents the parallel lines.

Above system represented by graph (D).

  

Aslines are parallel the graph of the lines never intersect each other.

System has no solution and it inconsistent.