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3 min read•june 18, 2024
Congrats congrats! You made it to the last AP Calculus BC topic! In this key topic, you’ll be deriving power series using different techniques you’ve learned throughout this course.
A power series, similar to what you’ve learned about Taylor polynomials, are a representation of a function using an infinite series of polynomials. It is generally expressed by the following below, where n is a non-negative integer, is a sequence of real numbers, and r is a real number.
For the AP Calculus BC exam, memorizing these three frequently appearing power series can be a lifesaver: , , and . In a lot of cases, you will be able to use the original series to find the power series of a transformed version of one of these functions.
Find the power series representation for . Include the first 4 nonzero terms and the general term.
We know that the power series of is . So, since the function is just being multiplied by , we can just multiply the power series of by :
Great job! Lets look at one more example 🤗
If is the power series centered at of , what is ? Include the the first 3 nonzero terms and the general term.
We’re given that To find , simply have to take the derivative of the series:
A cool thing to recognize is that this series is equivalent to the power series of , but negative; this proves that the derivative of is .
The following free-response question (FRQ) is Question 6 from the 2022 AP Calculus BC examination administered by College Board. All credit to College Board.
The function f is defined by the power series for all real numbers x for which the series converges.
c) Write the first four nonzero terms and the general term for an infinite series that represents f′(x).
For this problem, all you have to do is take the derivative, similar to our example 2:
Awesome work! 🎉
Congratulations, you’re done with this unit, and as a result, you’ve also reached the end of AP Calculus BC! Now, you have all the tools you need to ace that AP test this May!
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