Answer:
The solution to the compound inequality is given by:
[tex]1\leq x<6[/tex]
Step-by-step explanation:
The compound inequality is given by:
[tex]3x-8\geq -5[/tex] and
[tex]2x-7<5[/tex]
- On solving the first inequality i.e.
[tex]3x-8\geq -5[/tex]
on adding both side of the inequality by 8 we get:
[tex]3x\geq -5+8\\\\i.e.\\\\3x\geq 3[/tex]
Now on dividing both side of the inequality by 3 we get:
[tex]x\geq 1[/tex]
- The second inequality is given by:
[tex]2x-7<5[/tex]
On adding both side of the inequality by 7 we get:
[tex]2x<5+7\\\\i.e.\\\\2x<12[/tex]
on dividing both side of the inequality by 2 we get:
[tex]x<6[/tex]
Hence, the solution of the compound inequality is:
[tex]1\leq x<6[/tex]
