Answer:
[tex]x\leq 3[/tex] or [tex]x\geq -1[/tex]
Step-by-step explanation:
Verify the solution of each case
case 1) we have
[tex]-4\leq x\leq 4[/tex]
Divide the compound inequality into two inequalities
[tex]x\leq 4[/tex] ---> solution is the interval (-∞,4]
[tex]-4\leq x[/tex] ---> solution is the interval [-4,∞)
The solution of the compound inequality is
[-4,∞) ∩ (-∞,4] ----> [-4,4]
case 2) we have
[tex]-2\leq x\leq -1[/tex]
Divide the compound inequality into two inequalities
[tex]x\leq -1[/tex] ---> solution is the interval (-∞,-1]
[tex]-2\leq x[/tex] ---> solution is the interval [-2,∞)
The solution of the compound inequality is
[-2,∞) ∩ (-∞,-1] ----> [-2,-1]
case 3) we have
[tex]x\leq -1[/tex] ---> solution is the interval (-∞,-1]
or
[tex]x\geq 0[/tex] ---> solution is the interval [0,∞)
The solution of the compound inequality is ----> (-∞,-1] ∪ [0,∞)
case 4) we have
[tex]x\leq 3[/tex] ---> solution is the interval (-∞,3]
or
[tex]x\geq -1[/tex] ---> solution is the interval [-1,∞)
The solution of the compound inequality is
(-∞,3] ∪ [-1,∞) ---->(-∞,∞)
