Integration Applications l Area Between Curves 6 1
Integration Applications l Area Between Curves (6. 1) l Average Value of a Function (6. 5) l Volumes of Solids (6. 2, 6. 3) l Created by Rotations l Created using Cross Sections l Arc Length of a Curve (8. 1) l Probability (8. 5) Methods of Integration l U-substitution (5. 5) l Integration by Parts (7. 1) l Trig Integrals (7. 2) l Trig Substitution (7. 3) l Partial-Fraction Decomposition (7. 4) l Putting it All Together: Strategies! (7. 5) l Improper Integrals (7. 8) Wednesday, April 18, 2018 Differential Equations l What is a differential equation? (9. 1) l Solving Differential Equations l Visual: Slope Fields (9. 2) l Numerical: Euler’s Method (9. 2) l Analytical: Separation of Variables (9. 3) l Applications of Differential Equations Infinite Sequences & Series (Ch 11) l What is a sequence? A series? (11. 1, 11. 2) l Determining Series Convergence l l Divergence Test (11. 2) Integral Test (11. 3) Comparison Tests (11. 4) Alternating Series Test (11. 5) Ratio Test (11. 6) Nth-Root Test (11. 6) l Power Series l Interval & Radius of Convergence l l New Functions from Old Taylor Series and Maclaurin Series
Wednesday, April 18, 2018
Wednesday, April 18, 2018
Wednesday, April 18, 2018
The sum of the series is a function with domain the set of all x values for which the series converges. l The function seems to be a polynomial, except it has an infinite number of terms. l Wednesday, April 18, 2018
l If we let cn = 1 for all n, we get a familiar series: l This geometric series has common ratio x and we know the series converges for |x| < 1. l We also know the sum of this series: Wednesday, April 18, 2018
l This is called: l a power series in (x – a), or a power series centered at a, or l a power series about a. l Wednesday, April 18, 2018
For what values of x does each series converge? l Determine the Radius of Convergence and the. Interval of Convergence for each power series. l Wednesday, April 18, 2018
l For what values of x does this series converge? l Determine its Radius of Convergence and its Interval of Convergence. Wednesday, April 18, 2018
l For what values of x does this series converge? l Determine its Radius of Convergence and its Interval of Convergence. Wednesday, April 18, 2018
l For what values of x does this series converge? l Use the Ratio Test to determine values of x that result in a convergent series. Wednesday, April 18, 2018
l For what values of x does this series converge? l Use the Ratio Test to determine values of x that result in a convergent series. Wednesday, April 18, 2018
l For what values of x does this series converge? l Determine its Radius of Convergence and its Interval of Convergence. Wednesday, April 18, 2018
l For what values of x does this series converge? l Determine its Radius of Convergence and its Interval of Convergence. Wednesday, April 18, 2018
l If we let cn = 1 for all n, we get a familiar series: l This geometric series has common ratio x and we know the series converges for |x| < 1. l We also know the sum of this series: Wednesday, April 18, 2018
Wednesday, April 18, 2018
Wednesday, April 18, 2018
Wednesday, April 18, 2018
Taylor Polynomials applet Wednesday, April 18, 2018
Our goal is to generate polynomial functions that can be used to approximate other functions near particular values of x. The polynomial we seek is of the following form: Wednesday, April 18, 2018
Wednesday, April 18, 2018
Wednesday, April 18, 2018
Wednesday, April 18, 2018
Goal: Generate polynomial functions to approximate other functions near particular values of x. Create a third-degree polynomial approximator for Wednesday, April 18, 2018
Create a 3 rd-degree polynomial approximator for Wednesday, April 18, 2018
How can we describe the cn so a power series can represent OTHER functions? ANY functions? Now we go way back to the ideas that motivated this chapter’s investigations and connections: Polynomial Approximators! Wednesday, April 18, 2018
Taylor Series Demo #1 Taylor Series Demo #2 Taylor Series Demo #3 Taylor Series Demo #4 Wednesday, April 18, 2018
Look at characteristics of the function in question and connect those to the cn. Example: f(x) = ex, centered around a = 0. Wednesday, April 18, 2018
Example: f(x) = ex, centered around a = 0. And…how far from a = 0 can we stray and still find this re-expression useful? Wednesday, April 18, 2018
General Form: Coefficients cn Wednesday, April 18, 2018
Examples: Determining the cn f(x) = cos(x), centered around a = 0. Wednesday, April 18, 2018
Examples: Determining the cn f(x) = sin(x), centered around a = 0. Wednesday, April 18, 2018
Examples: Determining the cn f(x) = ln(1 -x), centered around a = 0. Wednesday, April 18, 2018
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