Infinite Limits: Sequences and Series
http://www.maa.org/taxonomy/term/40468/0
enGeometric Series
http://www.maa.org/programs/faculty-and-departments/course-communities/geometric-series
Applets and Activities for Real Analysis: Sequence Convergence
http://www.maa.org/programs/faculty-and-departments/course-communities/applets-and-activities-for-real-analysis-sequence-convergence
Sequences and Series of Constants Plotter
http://www.maa.org/programs/faculty-and-departments/course-communities/sequences-and-series-of-constants-plotter
The Limit of a Sequence
http://www.maa.org/programs/faculty-and-departments/course-communities/the-limit-of-a-sequence
Taylor Polynomials - Exponential Functions
http://www.maa.org/programs/faculty-and-departments/course-communities/taylor-polynomials-exponential-functions
Infinite Limits: Sequences and Series (Classroom Capsules and Notes)
http://www.maa.org/programs/faculty-and-departments/course-communities/infinite-limits-sequences-and-series-classroom-capsules-and-notes
The Existence of Multiplicative Inverse
http://www.maa.org/programs/faculty-and-departments/classroom-capsules-and-notes/the-existence-of-multiplicative-inverse
<div class="field field-name-body field-type-text-with-summary field-label-hidden"><div class="field-items"><div class="field-item even"><p><em>This capsule discusses a way to show each non-zero element of certain rings have a multiplicative inverse. The approach is to set up a system of linear equations and the solution is the multiplicative inverse. Therefore the non-zero determinant guarantees the existence of the multiplicative inverse.</em></p>
</div></div></div>Another Look at Some p-series
http://www.maa.org/programs/faculty-and-departments/classroom-capsules-and-notes/another-look-at-some-p-series
<div class="field field-name-body field-type-text-with-summary field-label-hidden"><div class="field-items"><div class="field-item even"><p><em>Certain p-series are the focus of this capsule. This project comes with scenarios to help students "visualize" the convergence or divergence of the p-series.</em></p>
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