we have
[tex]3x+1 > 7[/tex]-------> inequality A
[tex]4x\leq 24[/tex] -------> inequality B
Step 1
Solve inequality A
[tex]3x+1 > 7\\ \\3x > 7-1 \\ \\x> 2[/tex]
the solution is the interval------> (2,∞)
Step 2
Solve inequality B
[tex]4x\leq 24\\ \\x\leq 6[/tex]
the solution is the interval------> (-∞,6]
Step 3
Find the solution of the compound inequality
Solution A ∩ Solution B
(2,∞) ∩ (-∞,6]=(2,6]
therefore
the answer is the option A
a number line with an open circle on 2, a closed circle on 6, and shading in between
Answer:
Option: A is the correct answer.
A. a number line with an open circle on 2, a closed circle on 6, and shading in between.
Step-by-step explanation:
We are given a system of inequalities as:
3x + 1 > 7 and 4x less than or equal to 24
i.e. it could also be written as:
[tex]3x+1>7\\\\3x>7-1\\\\3x>6\\\\x>2[/tex]
And the second inequality is:
[tex]4x\leq 24\\\\x\leq 6[/tex]
Hence, the compound inequality could be represented as:
x>2 i.e. (2,∞)
and x≤6 i.e. (-∞,6]
Hence, the feasible region or the region that is common to both the inequalities is:
(2,6]
Hence, there will be a number line with open circle at 2 since 2 is not included in the domain and a closed circle at 6 and shading in between
