QUESTION IMAGE
Question
directions: solve each of the following inequalities, write the solution set two ways, graph the solution set, and select all of the solutions from the box.
- $-5 > h - 4$
- $-3n \geq 9$
- $15 + x \leq 11$
Problem 1: Solve \(-5 > h - 4\)
Step 1: Add 4 to both sides
To isolate \(h\), we add 4 to both sides of the inequality.
\[
-5 + 4 > h - 4 + 4
\]
Step 2: Simplify both sides
Simplifying the left and right sides gives:
\[
-1 > h
\]
or \(h < -1\)
Now, we select the values from the box that are less than \(-1\). The values are: \(-7\), \(-11\), \(-8\), \(-5\), \(-63\), \(-6\), \(-9\), \(-4\) (wait, \(-4 < -1\), yes), \(-3\) (wait, \(-3 < -1\), yes), \(-2\) (wait, \(-2 < -1\), yes). Wait, let's list all values less than \(-1\):
Looking at the box:
- First row: \(-7\) (yes), \(3\) (no), \(-11\) (yes), \(0\) (no), \(1\) (no), \(20\) (no)
- Second row: \(-4\) (yes), \(2\) (no), \(-8\) (yes), \(17\) (no), \(-1\) (no, since \(h < -1\), not \(\leq\)), \(6\) (no)
- Third row: \(-2\) (yes), \(9\) (no), \(100\) (no), \(-5\) (yes), \(-3\) (yes), \(4\) (no)
- Fourth row: \(5\) (no), \(-63\) (yes), \(-6\) (yes), \(7\) (no), \(15\) (no), \(-9\) (yes)
So the solutions are: \(-7\), \(-11\), \(-4\), \(-8\), \(-2\), \(-5\), \(-3\), \(-63\), \(-6\), \(-9\)
Step 1: Divide both sides by -3 (reverse inequality)
When dividing by a negative number, the inequality sign reverses.
\[
\frac{-3n}{-3} \leq \frac{9}{-3}
\]
Step 2: Simplify both sides
Simplifying gives:
\[
n \leq -3
\]
Now, we select the values from the box that are less than or equal to \(-3\). The values are:
Looking at the box:
- First row: \(-7\) (yes), \(3\) (no), \(-11\) (yes), \(0\) (no), \(1\) (no), \(20\) (no)
- Second row: \(-4\) (yes), \(2\) (no), \(-8\) (yes), \(17\) (no), \(-1\) (no), \(6\) (no)
- Third row: \(-2\) (no, since \(-2 > -3\)), \(9\) (no), \(100\) (no), \(-5\) (yes), \(-3\) (yes), \(4\) (no)
- Fourth row: \(5\) (no), \(-63\) (yes), \(-6\) (yes), \(7\) (no), \(15\) (no), \(-9\) (yes)
So the solutions are: \(-7\), \(-11\), \(-4\), \(-8\), \(-5\), \(-3\), \(-63\), \(-6\), \(-9\)
Step 1: Subtract 15 from both sides
To isolate \(x\), we subtract 15 from both sides.
\[
15 + x - 15 \leq 11 - 15
\]
Step 2: Simplify both sides
Simplifying gives:
\[
x \leq -4
\]
Now, we select the values from the box that are less than or equal to \(-4\). The values are:
Looking at the box:
- First row: \(-7\) (yes), \(3\) (no), \(-11\) (yes), \(0\) (no), \(1\) (no), \(20\) (no)
- Second row: \(-4\) (yes), \(2\) (no), \(-8\) (yes), \(17\) (no), \(-1\) (no), \(6\) (no)
- Third row: \(-2\) (no), \(9\) (no), \(100\) (no), \(-5\) (yes), \(-3\) (no), \(4\) (no)
- Fourth row: \(5\) (no), \(-63\) (yes), \(-6\) (yes), \(7\) (no), \(15\) (no), \(-9\) (yes)
So the solutions are: \(-7\), \(-11\), \(-4\), \(-8\), \(-5\), \(-63\), \(-6\), \(-9\)
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Solution to \(-5 > h - 4\) is \(h < -1\). Solutions from the box: \(-7\), \(-11\), \(-4\), \(-8\), \(-2\), \(-5\), \(-3\), \(-63\), \(-6\), \(-9\)