Course Hive
Search

Welcome

Sign in or create your account

Continue with Google
or
Algebra 96 - Exponential Functions and Compound Interest
Play lesson

Algebra - Algebra 96 - Exponential Functions and Compound Interest

5.0 (0)
15 learners

What you'll learn

This course includes

  • 19.3 hours of video
  • Certificate of completion
  • Access on mobile and TV

Summary

Keywords

Full Transcript

Exponential functions were first explored by the Swiss mathematician Jacob Bernoulli in sixteen-eighty-three, as a way of computing "continuous compound interest". When computing accruing interest and principal with continuous compounding, the compounding periods can be thought of as being infinitely short, with the increase in principal approaching the theoretical upper limit. In Bernoulli's quest to determine this upper limit, his research led to the development of the exponential function whose base is the constant "e", also known as "Euler's number". In this lecture, we use algebra to calculate compound interest with increasing shorter compounding periods, and show how this upper limit is approached.

Course Hive

Continue this lesson in the app

Install CourseHive on Android or iOS to keep learning while you move.

Related Courses

FAQs

Course Hive
Download CourseHive
Keep learning anywhere