1 Answer

Prasanna Kumar J · Answer 1 · 2023-04-11T01:40:54+0000

Given the inequalities:

$\begin{gathered} (x)/(4)\ge-1\rightarrow(1) \\ -4x-4\le-3\rightarrow(2) \end{gathered}$

The solution to the first inequality:

$\begin{gathered} (x)/(4)\ge-1\rightarrow*4 \\ x\ge-4 \\ x\in\lbrack-4,\infty) \end{gathered}$

The solution to the second inequality:

$\begin{gathered} -4x-4\le-3 \\ -4x\le-3+4 \\ -4x\le1\rightarrow/(-4) \\ x\ge-(1)/(4) \\ x\in\lbrack-(1)/(4),\infty) \end{gathered}$

We will find the intersection between the intervals

So, the answer will be:

$\lbrack-(1)/(4),\infty)$

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