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)

Let x be the number of weeks Sam can continue spending money.
He spends 35x dollars.
He starts with 950 - 35x dollars.
Since he aims to have a minimum of 600 dollars left, 950 - 35x >= 600.
Solving the inequality, 35x <= 950 - 600, 35x <= 350, x <= 10.
Sam can continue spending money for a maximum of 10 weeks. Answer: \boxed{10}.

950+35w>600; w≥11 950+35w>600; w≥11 950−35w≥600; w≤11 950−35w≥600; w≤11 950+35w≥600; w≥10 950+35w≥600; w≥10 950−35w≥600; w≤10

The correct inequality is 950 - 35w ≥ 600; w ≤ 10.