kmcquighan
These are tools that I developed while teaching university level math courses to help explain abstract mathematical concepts. Please use and share them.
Pinned Repositories
Calc-II-Alternating-Series
Calc-II-Comparison-Tests
Calc-II-Growth-Rates
A Jupyter notebook that explains what is meant by the relative "growth rate" of sequences.
Calc-II-Improper-Integrals
A Jupyter Notebook that explains improper integrals: what they are and how to compute them.
Calc-II-Numerical-Methods
A Jupyter notebook that explains the order of a numerical method.
Calc-II-Sequences-and-Series
A Jupyter notebook that explains the difference between convergence of an infinite sequence and convergence of an infinite series.
Calc-II-Taylor-Series
A Jupyter notebook that explains the pointwise convergence of a Taylor series.
HPC-Laplace-Equation
This provides sample code for how to use to ScaLaPACK high performance linear algebra libraries.
kmcquighan's Repositories
kmcquighan/Calc-II-Improper-Integrals
A Jupyter Notebook that explains improper integrals: what they are and how to compute them.
kmcquighan/Calc-II-Sequences-and-Series
A Jupyter notebook that explains the difference between convergence of an infinite sequence and convergence of an infinite series.
kmcquighan/HPC-Laplace-Equation
This provides sample code for how to use to ScaLaPACK high performance linear algebra libraries.
kmcquighan/Calc-II-Alternating-Series
kmcquighan/Calc-II-Comparison-Tests
kmcquighan/Calc-II-Growth-Rates
A Jupyter notebook that explains what is meant by the relative "growth rate" of sequences.
kmcquighan/Calc-II-Numerical-Methods
A Jupyter notebook that explains the order of a numerical method.
kmcquighan/Calc-II-Taylor-Series
A Jupyter notebook that explains the pointwise convergence of a Taylor series.