MAT136H1 Lecture 1: 5.1&5.2 Left/Right Hand Sums & Definite Intergrals

MAT136H1 Lecture 2: 5.3 The Fundamental Therom+Interpretations

MAT136H1 Lecture 3: 6.1& 6.2 Antiderivatives Graphically & Numerically& Constructing Antiderivatives Analytically

MAT136H1 Lecture 4: Differential Equation and Motions and Differentrial Equations

MAT136H1 Lecture 5: 6.4 Fundamental Theorem of Calculus & 7.1 Ingtegration by Substitution

MAT136H1 Lecture 6: 7.2 Integration by Parts

MAT136H1 Lecture 7: 7.4&7.5 algebraic identities and trigonometric substitutions & numerical methods for definite integral

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MAT136H1 Lecture 8: 7.6 improper integral

MAT136H1 Lecture 9: 7.7 Comparing Improper Integrals

77comparingimproperintldf. in ding an exact value of an improper integral is often hard so we can often apure it with aknownintegral tosay ifgiven inte

MAT136H1 Lecture 10: Review For the Midterm

MAT136H1 Lecture Notes - Lecture 11: Encyclopedia Of Indo-European Culture

1 y 1 theslope i y canbeany number y dy dx y . 2xy gcxj. tt g fix g 9 f x zx. fi i. 2x ig f g that contradicts our assumptions that g x fix are differe

MAT136H1 Lecture 12: 11.4 separable equations

MAT136H1 Lecture Notes - Lecture 15: Thx

Jim are having a cupofcoffee j cools hiscoffeewith 3 tsb of cream theyboth wait tominutes m thencools her otkewith 3 tbsptcreamp. inno drinks the. Is m

MAT136H1 Lecture 16: 11.7 Logistic Modelling

Ph birthrate gu deathrate b f k constant. Logistic model population growing butalternating a limit p ipo negatiegnwthnh_e f. cn logistic model k l nega

MAT136H1 Lecture 17: 9.1 Sequence and Series 9.2 Geometric Series

MAT136H1 Lecture 18: 9.3 Comparing Series Via Integrals

MAT136H1 Lecture 19: 9.9 Test for convergence and divergence 9.5 Power Series differential Intervel of convergence

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MAT136H1 Lecture 20: 10.1 Taylor Polynomials

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MAT136H1 Lecture 21: 10.2 Taylor Series 10.3 Finding and Using Taylor Polynomials

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MAT136H1 Lecture 22: Review lecture

MAT136H1 Lecture 23: 8.1 Areas and Volumes & 8.2 Applications to Geometry

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MAT136H1 Lecture 24: 8.4 Variable Density

MAT136H1 Lecture Notes - Lecture 25: Fax

MAT136H1 Lecture 26: Final Review

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Definite Integrals, Fundamental theorem of Calculus, Areas, Averages, Volumes. Techniques: Substitutions, integration by parts, partial fractions, improper integrals. Differential Equations: Solutions and applications. Sequences, Series, Taylor Series. Examples from life science and physical science applications.

Calculus 1(B)

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