Sam starts the summer with $950 in his wallet. He aims to have ¿ 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)
0 950 + 35w > 600; w > 11
• 950 - 35w > 600; w < 11
O 950 + 35w ≥ 600; w ≥ 10
O 950 - 35w ≥ 600; w ≤ 10
950 - 35w ≥ 600; w ≤ 10
To solve the inequality, we can isolate the variable w by subtracting 950 from both sides:
950 - 950 - 35w ≥ 600 - 950
-35w ≥ -350
Next, divide both sides by -35, remembering to reverse the inequality symbol since we are dividing by a negative number:
-35w / -35 ≤ -350 / -35
w ≤ 10
Therefore, Sam can continue spending money for a maximum of 10 weeks.