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contact
information:
prof: r. ghrist
office: 329 altgeld; 148 csl
email: ghrist@math.uiuc.edu
(do not send email to ghrist@uiuc.edu!)
lecture notes: two formats available:
.mht requires Explorer
.pdf requires Acrobat
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topic
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notes
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1: intro
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2: special
functions
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3: taylor series
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4: epsilons
& deltas
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5: continuity
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6: limits
and series
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7:
differentiation
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8:
interpretation of derivatives
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9: the chain rule
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10: implicit differentiation
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11: differentials & approximation
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12: the
mean value theorem
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13: optimization
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14: more optimization
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15: graphing functions
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16:
iterative methods
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17: antiderivatives
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18: the riemann integral
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19: the ftic; substitution
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20: integration techniques
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21: areas
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22: volumes
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23: hypervolumes
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24: length and surface area
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25: force, pressure, work
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26: mass, averagets, centroids
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27: probability, monte carlo
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28: polar coordinates
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29: parameterized curves
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30:
differential equations
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31: population dynamics
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32: vibrations
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33: sequences
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34: series
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35: convergence tests
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36: power & taylor series
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37: remainders and error
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38: series solutions to ode's
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