5-1 POW! extreme values

1. 5-1 POW! extreme values Extreme Values of functions Today’s Date: 10/14/16 Test Date: Fri 11/4

2. Def: (Absolute) Extreme Value If f is a function with Domain D, f (c) is a) the absolute maximum value on D ifff (x)  f (c) b) the absolute minimum value on D ifff (x)  f (c) Note: if the domain changes, so can the abs. max & min Thm: Extreme Value Theorem If f is continuous on a closed interval [a, b], then f has both a max value & a min value on the interval. Note: could be @ an endpoint or inside the interval

3. Def: Local / Relative Extreme Values abs max local max local min local min abs min If c is an interior point in the domain of f , then f (c) is: a) a local max value ifff (x)  f (c) in an open interval b) a local min value ifff (x)  f (c) in an open interval Note: the list of local extrema will automatically include the absolute extrema

4. Thm: Local Extreme Values A function has a local max or local min where f'(x) = 0 OR f'(x) DNE What do I check? f'(x) = 0 (2) f'(x) DNE (3) endpoints (if it’s closed) Def: Critical Point a point in the interior of a domain where f'(x) = 0 or f'(x) DNE Def: Stationary Point a point in the interior of a domain where f'(x) = 0 Note: Critical & stationary points do not have to be the same

5. Ex 3) Find the absolute maximum and minimum values of on the interval [–2, 3]. • 0 • DNE @ x = 0 Critical value @ x = 0  f (0) = 0 Endpoints: @ x = –2  f (–2) = @ x = 3  f (3) = abs min @ (0, 0) abs max @

6. happens @ Extreme Value Critical Point or Endpoint Critical Point or Endpoint Extreme Value does not have to be Ex 5) Find the extreme values of –4x = 0  x = 0 deriv DNE @ x = 1 no endpoints local max local min Critical values: @ x = 0  f (0) = 5 @ x = 1  f (1) = 3 Reminder: Solve analytically first THEN confirm w/ calculator

7. homework Pg. 198 #3–8, 11, 14, 15, 19, 23, 29, 35, 38, 41