Classify the absolute value inequality as
· Having a single interval containing its solutions, but not the entire set of real numbers
· Having the union of two disjoint intervals containing its solutions
· Being a contradiction with no solution
· Being an identity with the set of all real numbers as its solution set
-$|6 x+7|-2-13$
A) union of two intervals
B) contradiction
C) identity
D) single interval

Question

Classify the absolute value inequality as
· Having a single interval containing its solutions, but not the entire set of real numbers
· Having the union of two disjoint intervals containing its solutions
· Being a contradiction with no solution
· Being an identity with the set of all real numbers as its solution set
-$|6 x+7|-2>-13$
A) union of two intervals
B) contradiction
C) identity
D) single interval

Quizplus · Accepted Answer

The Answer of Classify the absolute value inequality as
· Having a single interval containing its solutions, but not the entire set of real numbers
· Having the union of two disjoint intervals containing its solutions
· Being a contradiction with no solution
· Being an identity with the set of all real numbers as its solution set
-$|6 x+7|-2>-13$
A) union of two intervals
B) contradiction
C) identity
D) single interval

Classify the Absolute Value Inequality as · Having a Single ∣6x+7∣−2>−13|6 x+7|-2>-13∣6x+7∣−2>−13

Classify the Absolute Value Inequality as
· Having a Single $|6 x+7|-2>-13$