ࡱ> @ (bjbjFF "*,, 6666666Jn n n n  $J 2 $!RD$ ]6  66 z 555 6 6 5 55S|66 M%n op 0 $L$$JJ6666$6, 5   JJ$ n + JJn Integration by Substitution Overview: In this lesson, students will review the chain rule and use that knowledge to learn the method of substitution for integration. They will begin with very simple examples that can be solved using the guess-and-check method and then slowly move into more complicated examples in order to help them learn how to choose the best substitutions. Grade Level/Subject: This lesson is for 12th graders in AP Calculus. Purpose: This lesson will enable the students to perform more complicated integrations in a much simpler manner than guessing and checking. It will also give students practice in recognizing the common trig integrations and in recognizing derivatives. Prerequisite Knowledge: Students should: Already know and understand derivatives and know the derivatives of all trig functions. Know and be able to use basic integration techniques Objectives: Students will be able to use substitution as a method of solving indefinite and definite integrals. Students will be able to use the substitution technique to help in recognizing a derivative produced by the chain rule. Standards: Connections: Students will draw connections between what they previously learned about derivatives and apply it in order to use the method of substitution. Problem Solving: Students will have to use their problem solving skills in order to choose the best substitution to use in order to solve the integral in the simplest manner. Communication: Students will be asked to communicate their results in a neat and readable form and be able to explain how they arrived at those results in a comprehensible manner. Resources/Materials Needed: Dry-Erase Board/ Dry-Erase markers of varying colors Calculus Book Activities and Procedures: Chain Rule Review: Find the Derivative of the following: sin(x3) e(t^2+1) (x2+1)2 What method did you use to find these derivatives? Using the derivatives that you just found to find the following integrals: +"cos(x3)(3x2)dx +" e(t^2+1)(2t)dt +"4x(x2+1)dx How did you know these? The guess and check method worked for these, but you aren t always going to do more complex integrals this easily. Today we are going to learn Integration by substitution, a method that will help to simplify things as we get into more complex integrals. Substitution involves a change of variable in order to simplify the integral. Typically the variable used is u. We choose u = g(x) du = g1(x)dx Lets look again at the previous examples. +"cos(x3)(3x2)dx Do you see any relationship between the two x-terms in this integral? Using the substitution method, we can set u = x3 du = 3x2 Now, substituting these in we have: +"cos(u)du = sin(u) + C = sin(x3) + C But how do you know wh'} x a l n()-489<= "$(6FHPR :< """"$"&"."0"""""""D#H#`#d#j#l###### hUH*hUheUh}$OJQJ^J h}$H*h}$ h}$5 h}$5>*S| } C x ` a l  mn & F & F & F & F$a$(#+,56>?r "DF^`|I "8^8 & F & F & F">  !!(!""$"""""B#D#^ & F & F`at to set u equal to? There are no concrete rules for this, but there are some general suggestions for choosing substitutions. Good choices for substitutions typically are: g(x) is raised to a power g(x) appears in the denominator g(x) appears as an inside function of a composition Examples: +" e(t^2+1)(2t)dt +"4x(x2+1)dx - explain change of constant in this example. +"(ecosxsinx)dx +"(x/"(2x+3) )dx  explain finding x in terms of u in this example. +"(x/(x+21))dx +"csc3(x)cot(x)dx  explain splitting up csc3(x) into csc2(x)csc(x) EvaluationD#`#b####(;((((gde & F ###$((((( h}$h}$ h}$5Uh}$h}$5h}$he: Read/Take Notes on p. 444-453 and do p. 453 # 1-19 odds. 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