03.06 Evaluating Inequalities

Question 1(Multiple Choice Worth 2 points)
(Evaluating Inequalities LC)

Determine which integer will make the inequality 5x + 12 > 2x + 6 false.

S:{−3}
S:{3}
S:{−1}
S:{1}
Question 2(Multiple Choice Worth 2 points)
(Evaluating Inequalities MC)

Determine which integer(s) from the set S:{−40, 2, 20, 42} will make the inequality three eighths m minus three is less than one fourth m plus 2 false.

S:{42}
S:{−40, 2}
S:{−40, 2, 20}
S:{−40}
Question 3(Multiple Choice Worth 2 points)
(Evaluating Inequalities MC)

Determine which integers in the set S:{−24, −6, 12, 24} will make the inequality one third times the difference of m and three is less than or equal to one sixth times the difference of m and twelve false.

S:{−24, 24}
S:{−24, −6}
S:{−6, 12}
S:{12, 24}
Question 4(Multiple Choice Worth 2 points)
(Evaluating Inequalities MC)

Determine which integer will make the inequality 2(n + 2) < 5(n − 1) true.

S:{10}
S:{3}
S:{2}
S:{0}
Question 5(Multiple Choice Worth 2 points)
(Evaluating Inequalities LC)

Determine which integer will make the inequality x − 4 < 16 true.

S:{16}
S:{20}
S:{21}
S:{32}
Question 6(Multiple Choice Worth 2 points)
(Evaluating Inequalities LC)

Determine which integer will make the inequality 12 > 2x + 4 true.

S:{8}
S:{4}
S:{12}
S:{−2}
Question 7(Multiple Choice Worth 2 points)
(Evaluating Inequalities MC)

Determine which integers in the set S: {−2, −3, −4, −5} will make the inequality 2p − 8 < 5p + 4 true.

S:{−2, −3}
S:{−3, −4}
S:{−4, −5}
S:{−2, −5}