1 / 12

MIT OpenCourseWare ocw.mit 18.01 Single Variable Calculus Fall 2006

MIT OpenCourseWare http://ocw.mit.edu 18.01 Single Variable Calculus Fall 2006 For information about citingthese materials or our Terms of Use, visit: http://ocw.mit.edu/terms. Lecture 4 ChainRule , and Higher Derivatives. Chain Rule.

rajah-merrill
Download Presentation

MIT OpenCourseWare ocw.mit 18.01 Single Variable Calculus Fall 2006

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. MIT OpenCourseWare http://ocw.mit.edu 18.01 Single Variable Calculus Fall 2006 For information about citingthese materials or our Terms of Use, visit: http://ocw.mit.edu/terms. Lecture 4 Sept. 14, 2006 18.01 Fall 2006

  2. Lecture 4ChainRule, and Higher Derivatives Lecture 4 Sept. 14, 2006 18.01 Fall 2006

  3. Chain Rule We’ve got general procedures for differentiating expressions with addition, subtraction, and multiplication. What about composition? Example 1. Lecture 4 Sept. 14, 2006 18.01 Fall 2006

  4. Chain Rule So, . To find , write Lecture 4 Sept. 14, 2006 18.01 Fall 2006

  5. Chain Rule As too, because of continuity. So we get: In the example, So, Lecture 4 Sept. 14, 2006 18.01 Fall 2006

  6. Chain Rule Another notation for the chain rule (or ) Example 1. (continued) Composition of functions . Note: Not Commutative! Lecture 4 Sept. 14, 2006 18.01 Fall 2006

  7. Chain Rule Figure 1: Composition of functions:(f ⃘g)(x)=(g(x)) Lecture 4 Sept. 14, 2006 18.01 Fall 2006

  8. Chain Rule Example 2. Let Lecture 4 Sept. 14, 2006 18.01 Fall 2006

  9. Chain Rule Example 3. There are two ways to proceed. Lecture 4 Sept. 14, 2006 18.01 Fall 2006

  10. Higher Derivatives Higher derivatives are derivatives of derivatives. For instance, if , then is the second derivative of f. We write Notations Higher derivatives are pretty straightforward ⇁ just keep taking the derivative! Lecture 4 Sept. 14, 2006 18.01 Fall 2006

  11. Higher Derivatives Example. Start small and look for a pattern. The notation n! is called “n factorial” and defined by Lecture 4 Sept. 14, 2006 18.01 Fall 2006

  12. Higher Derivatives Proof by Induction: We’ve already checked the base case (n = 1). Induction step: Suppose we know Show it holds for the case. Proved! Lecture 4 Sept. 14, 2006 18.01 Fall 2006

More Related