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Browse the full collection of course materials, past exams, study guides and class notes for MATH 1132Q - Calculus II at University of Connecticut verified by our community.
PROFESSORS
All Professors
All semesters
Voula Collins
spring
4D. McArdle
spring
23Shaun Keane
spring
1M. Minn-Thu-Aye
spring
22McArdle, David
fall
15Verified Documents for D. McArdle
Study Guides
Concise chapter summaries created by our note takers.
MATH 1132Q
Study Guide
MATH 1132Q Study Guide - Final Guide: Cartesian Coordinate System, Polar Coordinate System
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Class Notes
Taken by our most diligent verified note takers in class covering the entire semester.
MATH 1132Q Lecture 1: MATH 1132Q , Lecture 1 , Intro / 7.2
Sin^2x = ( 1 - cos(2x) ) / 2. Cos^2x = ( 1 + cos(2x) ) /2. Sin 2x = 2 sin x cos x. Cos 2x = cos^2 x - sin^2 x = 2 cos^2 x - 1 = 1 - 2 sin^2 x. Tan 2x =
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MATH 1132Q Lecture Notes - Lecture 2: Antiderivative
Math 1132q , lecture 2 , section 7. 3. Identity x = a sin , - /2 < < /2. A^2 + x^2 x = a tan , - /2 < < /2. X^2 - a^2 x = a sec , 0 < &l
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MATH 1132Q Lecture 3: MATH 1132Q , Lecture 3 , 7.1
Objective : find an antiderivative by using integration by parts. Example : find the derivative of f(x) = -x cos(x) + sinx + c f"(x) = (-x)(-sinx) + (-
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MATH 1132Q Lecture Notes - Lecture 4: Antiderivative
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MATH 1132Q Lecture 5: MATH 1132Q , Lecture 5 , Section 7.7
Math 1132q , lecture 5 , section 7. 7. T n = x / 2 [ f(x 0 ) + 2f(x 1 ) + 2f(x 2 ) + + 2f(x n - 1) + f(x n ) ] M n = x [ f(x 1 ) + f(x 2 ) + f(x 3 )+
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MATH 1132Q Lecture 6: MATH 1132Q , Lecture 6 , Section 7.8 - Improper Integrals
Math 1132q , lecture 6 , section 7. 8 - improper integrals. Improper integral - an integral that has an infinite bound, or an integral whose integrand
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MATH 1132Q Lecture Notes - Lecture 8: Monotonic Function
Math 1132q , lecture 8 , section 11. 1 : sequences and series. An important question we want to answer is whether we can find a good polynomial approxi
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MATH 1132Q Lecture 9: MATH 1132Q , Lecture 9 , Section 11.2 - Series
Math 1132q , lecture 9 , section 11. 2: series. Series: the sum of the terms in a sequence. Example -- for {a n } n=1 to , the corresponding series is
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MATH 1132Q Lecture 10: MATH 1132Q , Lecture 10 , Section 11.3 - The Integral Test and Estimates of Sums
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MATH 1132Q Lecture Notes - Lecture 11: Nostril, Ibm System P, Points Of The Compass
Math 1132q , lecture 11 , 11. 4 -- the comparison test. Basic comparison test: let a n and b n be series such that a n and b n are eventually both posi
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MATH 1132Q Lecture Notes - Lecture 12: Alternating Series, Ibm System P, Conditional Convergence
Math 1132q , lecture 12 , section 11. 5 -- alternating series. A series is alternating if it has the form: (-1)^n b n =b 1 + b 2 - b 3 + b 4 - . I 2 i
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MATH 1132Q Lecture Notes - Lecture 13: Alternating Series Test, Absolute Convergence, Ratio Test
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MATH 1132Q Lecture Notes - Lecture 14: Ratio Test, Bmw 1 Series
Math 1132q , lecture 14 , section 11. 8 -- power series. The number a is the center of the series. Interval of convergence: the interval of x-values wh
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MATH 1132Q Lecture 16: MATH 1132Q , Lecture 16 , Section 11.9- Representations of Functions as Power Series
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MATH 1132Q Lecture 19: MATH 1132Q , Lecture 19 , 11.10 -- Taylor and Maclaurin Series
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MATH 1132Q Lecture 20: MATH 1132Q Lecture : MATH 1132Q , Lecture 20 , Section 11.11 -- Applications of Taylor Polynomials
Math 1132q , lecture 20 , section 11. 11 -- applications of taylor polynomials. The degree n taylor polynomial approximation to f(x) at x = a is: + x^5
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MATH 1132Q Lecture Notes - Lecture 21: Constant Function
Math 1132q , lecture 21 , section 9. 1 -- modeling with differential equations. Let y = f(x) be a function that models the population of egrets on an i
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MATH 1132Q Lecture 22: MATH 1132Q , Lecture 22 , Section 9.3 -- Seperable Equations
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MATH 1132Q Lecture 23: MATH 1132Q , Lecture 23 , Section 6.4 -- Work
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MATH 1132Q Lecture Notes - Lecture 24: Pythagorean Theorem
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MATH 1132Q Lecture 26: MATH 1132Q , Lecture 26 , Section 10.1/10.2: Parametric Equations and Curves
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MATH 1132Q Lecture Notes - Lecture 29: Polar Coordinate System
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