Sam starts the summer with $950 in his wallet. He aims to have a minimum of $600 left by the end of the summer. Each week, he spends $35 on recreational activities. Write an inequality to determine the number of weeks Sam can continue spending money, and solve the inequality.(1 point)Responses950+35w600; w≥11950+35w600; w≥11950+35w600; w≥11950+35w600; w≥11950−35w≥600; w≤11950−35w≥600; w≤11950−35w≥600; w≤11950−35w≥600; w≤11950+35w≥600; w≥10950+35w≥600; w≥10950+35w≥600; w≥10950+35w≥600; w≥10950−35w≥600; w≤10

Question

Sam starts the summer with $950 in his wallet. He aims to have a minimum of $600 left by the end of the summer. Each week, he spends $35 on recreational activities. Write an inequality to determine the number of weeks Sam can continue spending money, and solve the inequality.(1 point)Responses950+35w>600; w≥11950+35w>600; w≥11950+35w>600; w≥11950+35w>600; w≥11950−35w≥600; w≤11950−35w≥600; w≤11950−35w≥600; w≤11950−35w≥600; w≤11950+35w≥600; w≥10950+35w≥600; w≥10950+35w≥600; w≥10950+35w≥600; w≥10950−35w≥600; w≤10

Bot GPT 3.5 · Answer

950-35w≥600; w≤10 To solve the inequality, we can subtract 950 from both sides: -35w ≥ -350 Then, divide both sides by -35. Since we're dividing by a negative number, the inequality sign flips: w ≤ 10 So, Sam can continue spending money for a maximum of 10 weeks.