# Explanation: ## Step1: Isolate y in the inequality Start by rearranging to solve for y. $x + 5y < -30$ Subtract $x$ from both sides: $5y < -x - 30$ Divide by 5: $y < -\frac{1}{5}x - 6$ ## Step2: Identify boundary line The boundary is the line $y = -\frac{1}{5}x - 6$. Since the inequality is $<$, use a dashed line. Find intercepts: - x-intercept: Set $y=0$: $0 = -\frac{1}{5}x - 6 \implies x = -30$ (point $(-30, 0)$) - y-intercept: Set $x=0$: $y = -6$ (point $(0, -6)$) ## Step3: Determine shaded region Test a point not on the line, e.g., $(0,0)$: $0 < -\frac{1}{5}(0) - 6 \implies 0 < -6$, which is false. So shade the region **below** the dashed line (opposite of the test point). # Answer: 1. Draw a dashed line through points $(-30, 0)$ and $(0, -6)$ (representing $y = -\frac{1}{5}x - 6$). 2. Shade all area below this dashed line; this shaded region represents the solution set of $x + 5y < -30$.

$x + 5y < -30$ | Sovi AI

QUESTION IMAGE

Question

$x + 5y < -30$

Explanation:

Step1: Isolate y in the inequality

Start by rearranging to solve for y.
$x + 5y < -30$
Subtract $x$ from both sides:
$5y < -x - 30$
Divide by 5:
$y < -\frac{1}{5}x - 6$

Step2: Identify boundary line

The boundary is the line $y = -\frac{1}{5}x - 6$. Since the inequality is $<$, use a dashed line.
Find intercepts:

x-intercept: Set $y=0$:

$0 = -\frac{1}{5}x - 6 \implies x = -30$ (point $(-30, 0)$)

y-intercept: Set $x=0$:

$y = -6$ (point $(0, -6)$)

Step3: Determine shaded region

Test a point not on the line, e.g., $(0,0)$:
$0 < -\frac{1}{5}(0) - 6 \implies 0 < -6$, which is false. So shade the region below the dashed line (opposite of the test point).

Answer:

Draw a dashed line through points $(-30, 0)$ and $(0, -6)$ (representing $y = -\frac{1}{5}x - 6$).
Shade all area below this dashed line; this shaded region represents the solution set of $x + 5y < -30$.