Answer:
Solution for given inequality:
[tex]x \in \bigg(-\infty, \displaystyle\frac{-40}{6}\bigg)[/tex]
Step-by-step explanation:
We are given the following information in the question:
We have to solve an inequality:
[tex]-2(x+3)-4 > 4x+30[/tex]
The steps can be explained as:
1. First multiplying all the terms and solving the bracket.
[tex]-2(x+3)-4 > 4x+30\\-2x -6-4>4x+30[/tex]
2. Taking all the like terms on one side of equation.
[tex]-2x -6-4>4x+30\\-10 -30 > 4x + 2x[/tex]
3. Adding and subtracting the like term.
[tex]-10 -30 > 4x + 2x\\6x < -40[/tex]
4. Solving for x
[tex]x < \displaystyle\frac{-40}{6}\\\\x < \frac{-40}{6}\\x \in \bigg(-\infty, \frac{-40}{6}\bigg)[/tex]
