Kirk solves the inequality 5

Question

Kirk solves the inequality 5<12y−7 . Which statement explains the steps he uses to find the solution set of the inequality?(1 point) Responses Kirk adds 7 to both sides of the inequality and then divides both sides of the equivalent inequality by 12 to get 1<y. Kirk adds 7 to both sides of the inequality and then divides both sides of the equivalent inequality by 12 to get 1 less than y . Kirk adds −7 to both sides of the inequality and then divides both sides of the equivalent inequality by 12 to get (−16)<y. Kirk adds negative 7 to both sides of the inequality and then divides both sides of the equivalent inequality by 12 to get left parenthesis negative Start Fraction 1 over 6 End Fraction right parenthesis less than y . Kirk adds 7 to both sides of the inequality and then multiplies both sides of the equivalent inequality by 12 to get 144<y. Kirk adds 7 to both sides of the inequality and then multiplies both sides of the equivalent inequality by 12 to get 144 less than y . Kirk adds 7 to both sides of the inequality, then divides both sides of the equivalent inequality by 12 and reverses the inequality symbol to get 1>y.

1 answer

To solve the inequality $ 5 < 12y - 7 $, we can follow these steps:

Add 7 to both sides of the inequality: \[ 5 + 7 < 12y \quad \Rightarrow \quad 12 < 12y \]
Divide both sides by 12: \[ \frac{12}{12} < y \quad \Rightarrow \quad 1 < y \]

Thus, the correct statement that explains Kirk's steps is: Kirk adds 7 to both sides of the inequality and then divides both sides of the equivalent inequality by 12 to get $ 1 < y $.

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GPT-4o mini · Answer

To solve the inequality $ 5 < 12y - 7 $, we can follow these steps: 1. Add 7 to both sides of the inequality: $$ 5 + 7 < 12y \quad \Rightarrow \quad 12 < 12y $$ 2. Divide both sides by 12: $$ \frac{12}{12} < y \quad \Rightarrow \quad 1 < y $$ Thus, the correct statement that explains Kirk's steps is: **Kirk adds 7 to both sides of the inequality and then divides both sides of the equivalent inequality by 12 to get $ 1 < y $.**