Graph the system below and write its solution. $$ \left\{\begin{array}{c}6 x-2 y=-4 \ y=3 x+2\end{array} ight. $$

Question

Graph the system below and write its solution. $$ \left\{\begin{array}{c}6 x-2 y=-4 \ y=3 x+2\end{array}ight. $$

UpStudy AI · Accepted Answer

The system is given by

$$
\begin{cases}
6x - 2y = -4 \
y = 3x + 2
\end{cases}
$$

**Step 1. Substitute the second equation into the first equation.**

Replace $$ y $$ in the first equation with $$ 3x+2 $$:

$$
6x - 2(3x + 2) = -4.
$$

**Step 2. Simplify the equation.**

Expand and simplify:

$$
6x - 6x - 4 = -4 \
-4 = -4.
$$

This is always true, which means the equation holds for all $$ x $$.

**Step 3. Interpret the result.**

The identity $$-4=-4$$ indicates that the two equations are equivalent. In other words, the line

$$
y = 3x + 2
$$

is the same as the one represented by $$ 6x-2y=-4 $$. Therefore, the system has infinitely many solutions: every point on the line $$ y=3x+2 $$ is a solution.

**Step 4. Graph the system.**

To graph the line $$ y=3x+2 $$, determine a couple of points:

- When $$ x=0 $$, $$ y = 3(0) + 2 = 2 $$. The point is $$ (0,2) $$.
- When $$ x=1 $$, $$ y = 3(1) + 2 = 5 $$. The point is $$ (1,5) $$.
- When $$ x=-1 $$, $$ y = 3(-1) + 2 = -1 $$. The point is $$ (-1,-1) $$.

Plot these points and draw the line through them.

**Solution:**

The solution to the system is all points on the line

$$
y = 3x + 2.
$$

Thus, the system has infinitely many solutions.
The system has infinitely many solutions, all points on the line $$ y = 3x + 2 $$.

Graph the system below and write its solution. \( \left\{\begin{array}{c}6 x-2 y=-4 \\ y=3 x+2\end{array}\right. \)

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