Calculus I: From Functions to Differential Equations

Refresh and review your bachelor-level calculus. This course covers all the various differentiation and integration techniques and guides you through several important methods for solving differential equations.

A strong foundation in mathematics is critical for success in all science and engineering disciplines. Whether you want to make a strong start to a master’s degree, prepare for more advanced courses, solidify your knowledge in a professional context or simply brush up on fundamentals, this course will get you up to speed.

This course allows you to get a solid basis by refreshing and reviewing your bachelor-level calculus. 
 
The course focuses on functions of one variable. In the first 5 weeks you will learn all the basic integration, differentiation and approximation techniques required in a first calculus course of an engineering bachelor education. In the final week these topics will all come together as you solve and analyze several ordinary differential equations. 

We use examples that are based on real-life applications so you can practice your mathematical skills in an engineering context. Our courses in calculus offer enough depth to cover what you need to succeed in your engineering master’s or profession in areas such as modeling, physics, fluid dynamics, dynamical systems and more.

This is a review course
This self-contained course is modular, so you do not need to follow the entire course if you wish to focus on a particular aspect. As a review course you are expected to have previously studied or be familiar with most of the material. Hence the pace will be higher than in an introductory course. 

This format is ideal for refreshing your bachelor level mathematics and letting you practice as much as you want. Through the Grasple platform, you will have access to plenty of exercises and receive intelligent, personal and immediate feedback.

What You'll Learn:

  • Apply differentiation techniques such as the chain rule and implicit differentiation.
  • Apply integration techniques such as integration-by-parts and substitution.
  • Solve ordinary differential equations that are important in engineering like a damped, forced harmonic oscillator. 
  • Compute horizontal asymptotes to find equilibria and growth rates.
  • Analyze challenging engineering problems using these techniques

Course Syllabus

Week 1: 

  • functions 
  • graphs
  • inverse functions 
  • inverse trigonometric functions 
  • compositions of functions 

Week 2: 

  • differentiation 
  • tangent lines 
  • implicit differentiation 
  • differentiation of inverses 

Week 3: 

  • approximation errors 
  • linear approximation 
  • differentials 
  • Taylor polynomials 
  • Taylor’s inequality

Week 4: 

  • horizontal asymptotes 
  • growth rates 
  • computing horizontal asymptotes 

Week 5:

  • integration 
  • integration by parts 
  • substitution method 
  • integration by Taylor polynomial 
  • integrals over unbounded domains 

Week 6: 

  • differential equations 
  • direction fields 
  • first order separable and linear equations 
  • forced and damped harmonics oscillators
  • approximating solutions to differential equations using Taylor polynomials