Solving the inequality given algebraically, the solution of the inequality for the value of m is:
m < -4 OR m > 3
Given the following inequality,
[tex]\frac{m - 2}{3} < -2 \\[/tex]
or
4m + 3 > 15
Let's solve algebraically for the value of m in both inequality statements given.
[tex]\frac{m - 2}{3} < -2 \\[/tex]
[tex]\frac{m - 2}{3} \times 3 < -2 \times 3\\\\m - 2 < -6[/tex]
[tex]m - 2 + 2 < -6 + 2\\\\m < -4[/tex]
Or
4m + 3 > 15
- Subtract 3 from each side
4m + 3 - 3 > 15 - 3
4m > 12
[tex]\frac{4m}{4} > \frac{12}{4} \\\\[/tex]
m > 3
Therefore, solving the inequality given algebraically, the solution of the inequality for the value of m is:
m < -4 OR m > 3
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