Part A:
Input: The initial amount of water in the fish tank (10,450 ml), and the rate of water leakage (270 ml per minute)
Output: The amount of water left in the tank after a certain period of time
Part B:
Let's define a function to model this situation. Let "t" represent the time in minutes. The function can be defined as:
f(t) = 10,450 - 270t
Part C:
To find the amount of water left in the tank after 10 minutes, we substitute t = 10 into the function:
f(10) = 10,450 - 270(10)
= 10,450 - 2700
= 7750 ml
Converting ml to liters:
7750 ml = 7.75 liters
So, there will be 7.75 liters of water left in the tank after 10 minutes.
The Charleston family has a fish tank holding 10,450 ml of water. The water is leaking at a rate of 270 ml per minute.
Part A: Define the input and output in the given scenario.
Part B: Write a function to model this situation.
Part C: How many liters of water will be left in the tank after 10 minutes.
1 answer