1
Question
Solve the given inequality for real x: 3(2 – x) ≥ 2(1 – x)
Solve the given inequality for real x: 3(2 – x) ≥ 2(1 – x)
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Solution
3(2
– x)
≥
2(1 – x)
⇒ 6
– 3x
≥
2 – 2x
⇒ 6
– 3x
+ 2x
≥
2 – 2x
+
2x
⇒ 6
– x
≥
2
⇒ 6
– x
– 6 ≥
2 – 6
⇒ –x
≥
–4
⇒ x
≤
4
Thus,
all real numbers x,which
are less than or equal to 4, are the solutions of the given
inequality.
Hence,
the solution set of the given inequality is (–∞,
4].
3(2 – x) ≥ 2(1 – x)
⇒ 6 – 3x ≥ 2 – 2x
⇒ 6 – 3x + 2x ≥ 2 – 2x + 2x
⇒ 6 – x ≥ 2
⇒ 6 – x – 6 ≥ 2 – 6
⇒ –x ≥ –4
⇒ x ≤ 4
Thus, all real numbers x,which are less than or equal to 4, are the solutions of the given inequality.
Hence, the solution set of the given inequality is (–∞, 4].
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