Extreme Values of Functions. Example: The mileage of a certain car can be approximated by: At what speed should you drive the car to obtain the best gas.
Maximum & Minimum Problems Lagrange
4.1 Extreme Values of Functions Greg Kelly, Hanford High School, Richland, Washington Borax Mine, Boron, CA Photo by Vickie Kelly, 2004.
Maths In Focus Extension 1 HSC Chapter 2
The mileage of a certain car can be approximated by: At what speed should you drive the car to obtain the best gas mileage? Of course, this problem isn’t.
The mileage of a certain car can be approximated by:
Extreme Values. NotationSet NotationPicture (a,b) [a,b] [a,b) (a,b] (a,∞) [a, ∞) a < x < b x > a Intervals Inequalities 1.If a < b then a + c < b + c.
4.1 Extreme Values of Functions Greg Kelly, Hanford High School Richland, Washington.
The textbook gives the following example at the start of chapter 4: The mileage of a certain car can be approximated by: At what speed should you drive.
4.1 Extreme Values of Functions
DO NOW PLEASE 1.Put your TEST CORRECTIONS next to you on your table. I’ll collect it. 2.Solve: If f(2) = 20, and f’(2)= 0.6 what is the approximate value.