How to Calculate Integrals of Exponential Functions

Instructions:

Choose an answer and hit 'next'. You will receive your score and answers at the end.

question 1 of 3

Evaluate the following integral.

Create Your Account To Take This Quiz

As a member, you'll also get unlimited access to over 79,000 lessons in math, English, science, history, and more. Plus, get practice tests, quizzes, and personalized coaching to help you succeed.

Try it risk-free
Try it risk-free for 30 days. Cancel anytime
Already registered? Log in here for access

1. Evaluate the following integral.

2. Evaluate the following integral.

Create your account to access this entire worksheet
A Premium account gives you access to all lesson, practice exams, quizzes & worksheets
Access to all video lessons
Quizzes, practice exams & worksheets
Certificate of Completion
Access to instructors
Create an account to get started Create Account

About This Quiz & Worksheet

Exponential functions can be integrated, and you can test your ability to do so with this quiz and worksheet combo. You will be presented with multiple practice problems in the quiz which will have you solve integrals of exponential functions.

Quiz & Worksheet Goals

Quiz questions will ask you to evaluate integrals:

  • From 0 to 1
  • Using e^x
  • From 0 to A
  • With multiple terms

Skills Practiced

In these assessments, you can showcase your skills in the following areas:

  • Problem solving - use acquired knowledge to solve for integrals of exponential functions in practice problems
  • Critical thinking - apply relevant concepts to examine information about the integral of e^x in a different light
  • Information recall - access the knowledge you've gained regarding definite integrals and exponential functions

Additional Learning

This accompanying lesson, entitled How to Calculate Integrals of Exponential Functions, will provide an opportunity to continue learning about this calculus topic. Objectives of this lesson include:

  • Recall how to find a definite integral of f(x)
  • Know the integral of e^x dx
  • Explain the unique properties of the derivative of e^x
  • Integrate exponential functions in practice problems given in the lesson
Support