Answer:
D. [tex]1000 - 100w \geq 500; w \leq 5[/tex]
Step-by-step explanation:
Given:
Initial amount in the bank = $1000
Money withdrawn each week = $100
Final amount should be at least $500.
Now, let the number of weeks the money is withdrawn be 'w'.
Therefore,
Money withdrawn in 'w' weeks = [tex]\textrm{Money withdrawn each week}\times w[/tex]
Total Money withdrawn in 'w' weeks = [tex]100w[/tex]
Now, final amount after 'w' weeks is equal to the difference between initial amount and total withdrawal amount. Therefore,
Final amount = Initial amount - Total withdrawal amount
Final amount = [tex]1000 - 100w[/tex]
Now, final amount must be greater than or equal to $500. So,
[tex]\textrm{Final amount}\geq500\\\\1000-100w\geq500[/tex]
Therefore, the inequality that represents the inequality for the number of weeks Amy can withdraw money is:
[tex]1000-100w\geq500[/tex]
Now, let us solve for 'w'.
Adding -500 and 100w both sides, we get:
[tex]1000-500-100w+100w\geq500-500+100w\\\\500\geq100w\\\\\textrm{The above inequality is reversed when taking 100w on the left side}\\\\100w\leq500\\\\w\leq\frac{500}{100}\\\\\therefore w\leq5[/tex]
Therefore, the correct option is (D).
