If you are citizen of an European Union member nation, you may not use this service unless you are at least 16 years old.
You already know Dokkio is an AI-powered assistant to organize & manage your digital files & messages. Very soon, Dokkio will support Outlook as well as One Drive. Check it out today!
Great paper: "Asking good questions in the mathematics classroom (Plenarytalkpaper.pdf)" by Maria Terrell, Cornell University ".
Cornell University Mathematics Department's GoodQuestions Project: http://www.math.cornell.edu/~GoodQuestions/. "The Cornell University Mathematics Department's GoodQuestions Project has developed and made available a set of multiple-choice GoodQuestions, checks of student understanding for use with a CRS during introductory calculus classes." (Description taken from Vanderbilt's Center for Teaching - See reference).
Tim Fahlberg's math professor sister, Dr. Linda Fahlberg-Stojanovska, and many of her students recently converted Dr. Maria Terrell's "Good Questions for Calculus" into ExamView format. By converting these questions to ExamView we hope that more educators will use these questions to improve student learning in calculus
a) by using them during class to stimulate discussion (their original purpose),
b) by using them as the basis of Whiteboard Movies (aka mathcasts) created by students, and
c) by using them in new & creative ways!
Topic
ExamView Question -Types
True/False
Bimodal -
Multiple Choice or Short Answer
2.1 The tangent and velocity problems and precalculus
1
3
2.2 The limit of a function
3
2
2.3 Calculating limits using the limit laws
0
6
2.4 Continuity
7
4
2.5 Limits involving infinity
3
2
2.6 Tangents, velocities, and other rates of change
0
5
2.7 Derivatives
5
1
2.8 The derivative as a function
0
4
2.9 & 3.8 Linear approximations and Differentials
0
10
3.1 Derivatives of polynomials and exponential functions
1
5
3.2 The product and quotient rules
1
3
3.4 Derivatives of trigonometric functions
0
5
3.5 The Chain Rule
0
4
3.6 Implicit Differentiation
0
3
3.7 Derivatives of logarithmic functions
2
1
2.9 & 3.8 Linear approximations and Differentials
0
10
4.1 Related Rates
1
4
4.2 Maximum and Minimum Values
1
6
4.3 Mean Value Theorem and shapes of curves
2
7
4.5 L'Hospital's Rule
0
3
4.6 Optimization
1
3
4.8 Newton's Method
0
3
4.9 Antiderivatives
4
1
5.1 Areas and Distances
1
2
5.2 The Definite Integral
2
5
5.3 Evaluating Definite Integrals
2
3
5.4 The Fundamental Theorem of Calculus
2
4
5.5 The Substitution Rule
0
4
Important note: Please let us know if you find any errors in these questions by emailing Tim Fahlberg. Thanks!
Comments (0)
You don't have permission to comment on this page.