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4.1 Interpreting the Meaning of the Derivative in Context

1 min readjune 18, 2024

4.1 Interpreting the Meaning of the Derivative in Context

Congratulations! Over the past two units, you have become a master at calculating derivatives! But, now what? In Unit 4, we will delve into how derivatives apply to real-world contexts.


🌍 Derivatives in Real-World Contexts

To understand how to interpret the meaning of derivatives in context, we must think back to the definition of a derivative—the derivative of a function measures the instantaneous rate of change, or rate of change at a specific point, with respect to its independent variable.

So, if we understand the context of the given function, then we can easily determine the meaning of the function’s derivative in context as well.

Let’s walk through an example together.

✏️ Derivatives in Context Walkthrough

Let f(x)f(x) give the volume, in liters, of water in a tank tt minutes after it starts being filled. What does f(10)f'(10) mean?

The function f(x)f(x) models volume in liters with respect to time in minutes. This means that, for example, f(10)f(10) models the volume of water in the tank 1010 minutes after beginning to fill it.

Now, after understanding what the function itself models, we can interpret what its derivative models.

Since the derivative is the instantaneous rate of change, the derivative of f(x)f(x) or f(x)f'(x) is, therefore, the volume of water, in liters, filling into the tank per minute at a specific point in time. f(10)f'(10) can thus be interpreted as “The amount of water filling into the tank per minute after 1010 minutes.”


📝 Interpreting Derivatives: Practice Problems

Give a couple of questions a try yourself!

❓Interpreting Derivatives: Questions

Interpreting Derivatives: Question 1

Michael has an ant farm. The function A(t)A(t) gives the amount of ants on the farm after tt days. What is the best interpretation A(5)=12A'(5)=12?

A) After 55 hours, Michael’s ant farm is increasing by 1212 ants per hour.

B) After 1212 days, Michael’s ant farm is increasing by 55 ants per day.

C) After 55 days, Michael’s ant farm is increasing by 1212 ants per day.

D) After 55 days, Michaels’ ant farm is decreasing by 1212 ants per day.

Interpreting Derivatives: Question 2

Anna has an Instagram account. The function F(t)F(t) gives the amount of followers she has after tt months. What is the best interpretation F(2)=300F'(2)=-300?

A) After 22 months, Anna’s account is losing 300300 followers per month.

B) After 22 months, Anna’s account is gaining 300300 followers per month.

C) After 22 weeks, Anna’s account is losing 300300 followers per week.

D) After 22 weeks, Anna’s account is gaining 300300 followers per week.

Interpreting Derivatives: Question 3

Daniel owns a business. The function P(t)P(t) gives the amount of money in dollars his business has made after tt days. What is the best interpretation P(3)=200P'(3)=200?

A) After 33 months, Daniel’s business is losing 200200 dollars per month.

B) After 33 days, Daniel’s business is earning 200200 dollars per day.

C) After 33 days, Daniel’s business has made 200200 dollars.

D) After 33 days, Daniel’s business has lost 200200 dollars.

✅ Interpreting Derivatives: Answers and Solutions

Interpreting Derivatives: Question 1

A(t)A(t) gives the number of ants in Michael’s ant farm after a given time in days, so A(t)A'(t) gives the instantaneous rate of change of A(t)A(t) in ants per day. Specifically, A(5)A'(5) is the rate at which the amount of ants changes at t=5t=5 days.

Therefore, the is the best interpretation of A(5)=12A'(5)=12 is C) “After 55 days, Michael’s ant farm is increasing by 1212 ants per day.”

Interpreting Derivatives: Question 2

F(t)F(t) gives the number of followers Anna has after tt months, so F(t)F'(t) gives the instantaneous rate of change of F(t)F(t) in followers per month. Specifically, F(2)F'(2) is the rate at which the number of followers changes at t=2t=2 months. A negative value means that the number of followers is decreasing or the account is losing followers.

Therefore, the is the best interpretation of F(2)=300F'(2)=-300 is A) “After 22 months, Anna’s account is losing 300300 followers per month.”

Interpreting Derivatives: Question 3

P(t)P(t) gives the amount of money in dollars Daniel’s business makes after tt days, so P(t)P'(t) gives the instantaneous rate of change of P(t)P(t) in dollars per day. Specifically, P(3)P'(3) is the rate at which the amount of money the business has changes at t=3t=3 days.

Therefore, the is the best interpretation of P(3)=200P'(3)=200 is B) “After 33 days, Daniel’s business is earning 200200 dollars per day.”


⭐ Closing

Great work! You now have a better idea of how to interpret the meaning of a derivative in the context of a given problem. You got this!

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