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Higher Derivatives Concavity 2nd Derivative Test

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Presentation on theme: "Higher Derivatives Concavity 2nd Derivative Test"— Presentation transcript:

1 Higher Derivatives Concavity 2nd Derivative Test
Lesson 5.3

2 Think About It Just because the price of a stock is increasing … does that make it a good buy? When might it be a good buy? When might it be a bad buy? What might that have to do with derivatives?

3 Think About It It is important to know the rate of the rate of increase! The faster the rate of increase, the better. Suppose a stock price is modeled by What is the rate of increase for several months in the future?

4 Think About It Plot the derivative for 36 months
The stock is increasing at a decreasing rate Is that a good deal? What happens really long term? Consider the derivative of this function … it can tell us things about the original function

5 Higher Derivatives The derivative of the first derivative is called the second derivative Other notations Third derivative f '''(x), etc. Fourth derivative f (4)(x), etc.

6 Find Some Derivatives Find the second and third derivatives of the following functions

7 Velocity and Acceleration
Consider a function which gives a car's distance from a starting point as a function of time The first derivative is the velocity function The rate of change of distance The second derivative is the acceleration The rate of change of velocity

8 Concavity of a Graph Concave down Concave up Opens down Opens up
Point of Inflection where function changes from concave down to concave up

9 Concavity of a Graph Concave down Concave up Decreasing slope
Second derivative is negative Concave up Increasing slope Second derivative is positive

10 Test for Concavity Let f be function with derivatives f ' and f ''
Derivatives exist for all points in (a, b) If f ''(x) > 0 for all x in (a, b) Then f(x) concave up If f ''(x) < 0 for all x in (a, b) Then f(x) concave down

11 Test for Concavity Strategy Find c where f ''(c) = 0
This is the test point Check left and right of test point, c Where f ''(x) < 0, f(x) concave down Where f ''(x) > 0, f(x) concave up Try it

12 Determining Max or Min Use second derivative test at critical points
When f '(c) = 0 … If f ''(c) > 0 This is a minimum If f ''(c) < 0 This is a maximum If f ''(c) = 0 You cannot tell one way or the other!

13 Assignment Lesson 5.3 Page 345 Exercises 1 – 85 EOO

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