2 Answers

Samir Bhatt · Answer 1 · 2019-09-03T23:32:55+0000

Answer:

$(-\infty,-2] \cup [\displaystyle(-4)/(3),-\infty)$

Explanation:

We are given the following information in the question:

We have to solve the given inequalities for x:

Inequality 1

$-9x+5 \leq 17\\-9x \leq 17-5\\-9x \leq 12\\\\x \leq \displaystyle(12)/(-9)\\\\x \geq (-4)/(3)\\\\x \in [(-4)/(3),-\infty)$

Inequality 2

$13x + 25 \leq -1\\13x \leq -1-25\\13x \leq -26\\\\x \leq \displaystyle(-26)/(13)\\\\x \leq -2\\x \in (-\infty,-2]$

The combined solution for both the inequalities is given by:

$(-\infty,-2] \cup [\displaystyle(-4)/(3),-\infty)$

Tastybytes · Answer 2 · 2019-09-06T05:14:00+0000

Answer:

(-∞ 2] ∪ [-4/3 ∞ )

Explanation:

Given compound inequality,

$-9x+5\leq 17\text{ or }13x+25\leq -1$

$-9x\leq 12\text{ or }13x\leq -26$ ( Subtraction property of inequality )

$-x\leq (12)/(9)\text{ or }x\leq -(26)/(13)$ ( Division property of inequality )

$-x\leq (4)/(3)\text{ or }x\leq -2$

$x\geq -(4)/(3)\text{ or }x\leq -2$ ( a < b ⇒ - a > - b )

Hence, the solution of the given inequality is,

(-∞ -2] ∪ [-4/3 ∞ )

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