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Mou · Answer 1 · 2023-12-02T15:29:40+0000

The expressions we have are:

$\begin{gathered} 4x-7>5 \\ or \\ 5x+4\leq-6 \end{gathered}$

We need to solve each of these expressions, and since it is a compound inequality, the solution will be the solution of the first inequality OR the solution of the second inequality.

We start by solving:

The first step is to add 7 to both sides:

$\begin{gathered} 4x-7+7>5+7 \\ 4x>12 \end{gathered}$

The next step is to divide both sides by 4:

$\begin{gathered} (4x)/(4)>(12)/(4) \\ x>3 \end{gathered}$

We have the first part of the solution: x>3

Now we need to solve the second inequality:

$5x+4\leq-6$

The first step is to subtract 4 to both sides:

$\begin{gathered} 5x+4-4\leq-6-4 \\ 5x\leq-10 \end{gathered}$

And the second step is to divide both sides by 5:

$\begin{gathered} (5x)/(5)\leq-(10)/(5) \\ x\leq-2 \end{gathered}$

We have the second part of the solution. And since the initial conditions are one inequality OR the other, the same goes to express the solution:

$x\leq-2\text{ or x>}3$

ANSWER: OPTION D

$x\leq-2\text{ or x>}3$

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