which situation could be represented by the following equation 600-30w=250
A danny has 250 in his checking account if he deposits 30 a week and receives a bonus check of 600 how many weks will is take to have 600
B alex has a credit of 600 at the gym the weekly cost of the gym is 30 how many weeks will it take to have 250
C a tank contains 250 gallons of water thw water is being drained at a rate of 30 gallons per hour how many days will it take for the tank to reach a level of 600 gallons
D sam wants to have 600 in his savinga account at the end of the semester he begins with 250 in his account if he withdraws 30 weekly how many weeks can sam withdraw and still meet his bubget
D sam wants to have 600 in his savings account at the end of the semester he begins with 250 in his account if he withdraws 30 weekly how many weeks can sam withdraw and still meet his budget.
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Sure, what is the question?
The situation that could be represented by the equation 600 - 30w = 250 is option D: Sam wants to have 600 in his savings account at the end of the semester. He begins with 250 in his account and withdraws 30 weekly. We need to determine how many weeks Sam can withdraw and still meet his budget.
To solve the equation, follow these steps:
Step 1: Start with the equation 600 - 30w = 250.
Step 2: Subtract 250 from both sides of the equation:
600 - 30w - 250 = 250 - 250
350 - 30w = 0
Step 3: Rewrite the equation in a more simplified form:
-30w + 350 = 0
Step 4: Move the constant term to the other side of the equation by subtracting 350 from both sides:
-30w = -350
Step 5: Divide both sides by -30 to isolate the variable w:
w = -350 / -30
Step 6: Simplify the expression:
w = 350 / 30
Step 7: Divide 350 by 30:
w ≈ 11.67
Therefore, Sam can withdraw for approximately 11.67 weeks and still meet his budget.