To solve the inequality \( 4s > 8 \), you can follow these steps:
- Divide both sides of the inequality by 4:
\[ s > \frac{8}{4} \]
- Simplify the right side:
\[ s > 2 \]
So, the solution is:
\[ s > 2 \]
Solve for s.
4s>8
11 answers
Solve for a.
a+3≤7
a+3≤7
To solve the inequality \( a + 3 \leq 7 \), follow these steps:
- Subtract 3 from both sides of the inequality:
\[ a \leq 7 - 3 \]
- Simplify the right side:
\[ a \leq 4 \]
So, the solution is:
\[ a \leq 4 \]
Solve for q.
3q<9
3q<9
To solve the inequality \( 3q < 9 \), follow these steps:
- Divide both sides of the inequality by 3:
\[ q < \frac{9}{3} \]
- Simplify the right side:
\[ q < 3 \]
So, the solution is:
\[ q < 3 \]
Solve for h.
h–2>15
h–2>15
To solve the inequality \( h - 2 > 15 \), follow these steps:
- Add 2 to both sides of the inequality:
\[ h > 15 + 2 \]
- Simplify the right side:
\[ h > 17 \]
So, the solution is:
\[ h > 17 \]
Solve for k.
4k≥12
4k≥12
To solve the inequality \( 4k \geq 12 \), follow these steps:
- Divide both sides of the inequality by 4:
\[ k \geq \frac{12}{4} \]
- Simplify the right side:
\[ k \geq 3 \]
So, the solution is:
\[ k \geq 3 \]
Solve for a.
a/2<–5
a/2<–5
To solve the inequality \( \frac{a}{2} < -5 \), follow these steps:
- Multiply both sides of the inequality by 2 to eliminate the fraction. Remember, since 2 is positive, the direction of the inequality does not change:
\[ a < -5 \times 2 \]
- Simplify the right side:
\[ a < -10 \]
So, the solution is:
\[ a < -10 \]