Calculus I

Team members: Bianca Sosnovski (Queensborough CC), Tao Chen (LaGuardia CC), Ramon Rasaq (BCC) and Giancarlo Paolillo (City College)

If you would like to use our sets please contact: Marianna Bonanome at or Andrew Parker at

Instructions to use our WeBWorK sets:

These sets are still a work in progress and that we are looking for feedback so we can improve them. 

The team’s goal is to provide an ample selection of problems. There are many more problems than anyone necessarily wants to assign and that it is up to the instructor to go through and assign only those problems appropriate to to his/her campus-specific curriculum before opening up the set to the students.

It is ok to just delete and reorder the problems in each set since we have master copies on our development server. 

If you decide to use the course again with your configurations saved, you can archive it at the end of the semester to import to another class of yours.

When leaving your feedback, please be as specific as possible. Include a problem path file if possible so we can identify and rectify issues. General comments on style, language, consistency etc. are also welcome. We appreciate your time and your help!

Please leave feedback on our Calculus I WeBWorK sets here.

Openstax Table of Contents – WeBWorK sets are under development for the following sections:  
Chapter 1 Functions and Graphs
1.1 Review
of Functions
1.2 Basic Classes of
1.3 Trigonometric
1.4 Inverse Functions
1.5 Exponential and
Logarithmic Functions
Chapter 2 Limits
2.1 A
Preview of Calculus
2.2 The
Limit of a Function
2.3 The
Limit Laws
2.4 Continuity
2.5 The Precise Definition
of a Limit
Chapter 3 Derivatives
3.1 Defining
the Derivative
3.2 The
Derivative as a Function
3.3 Differentiation
3.4 Derivatives
as Rates of Change
3.5 Derivatives
of Trigonometric Functions
3.6 The
Chain Rule
3.7 Derivatives
of Inverse Functions
3.8 Implicit
3.9 Derivatives
of Exponential and Logarithmic Functions
Chapter 4 Applications of Derivatives
4.1 Related
4.2 Linear
Approximations and Differentials
4.3 Maxima
and Minima
4.4 The
Mean Value Theorem
4.5 Derivatives
and the Shape of a Graph
4.6 Limits
at Infinity and Asymptotes
4.7 Applied
Optimization Problems
4.8 L’Hôpital’s
4.9 Newton’s Method
4.10 Antiderivatives
Chapter 5 Integration
5.1 Approximating
5.2 The
Definite Integral
5.3 The
Fundamental Theorem of Calculus
5.4 Integration
Formulas and the Net Change Theorem
5.5 Substitution
5.6 Integrals
Involving Exponential and Logarithmic Functions
5.7 Integrals
Resulting in Inverse Trigonometric Functions
Chapter 6 Applications of Integration
6.1 Areas
between Curves