Chapter 3: Q. 0 (page 274)

Problem Zero: Read the section and make your own summary of the material.

Short Answer

Expert verified

$1 . F o r m a l l y D e f i n i n g C o n c a v i t y : S u p p o s e f a n d f' a r e b o t h d i f f e r e n t i a b l e o n a n i n t e r v a l I . (a) f i s c o n c a v e u p o n I i f f' i s i n c r e a \sin g o n I . (b) f i s c o n c a v e d o w n o n I i f f' i s d e c r e a \sin g o n I .$

$2 . T h e S e c o n d D e r i v a t i v e D e t e r m i n e s C o n c a v i t y : S u p p o s e b o t h f a n d f' a r e d i f f e r e n t i a b l e o n a n i n t e r v a l I . (a) I f f'' i s p o s i t i v e o n I, t h e n f i s c o n c a v e u p o n I . (b) I f f'' i s n e g a t i v e o n I, t h e n f i s c o n c a v e d o w n o n I .$

$3 . T h e S e c o n d - D e r i v a t i v e T e s t : S u p p o s e x = c i s t h e l o c a t i o n o f a c r i t i c a l p o i n t o f a f u n c t i o n f w i t h f' (c) = 0, a n d s u p p o s e b o t h f a n d f' a r e d i f f e r e n t i a b l e a n d f'' i s c o n t i n u o u s o n a n i n t e r v a l a r o u n d x = c . (a) I f f'' (c) i s p o s i t i v e, t h e n f h a s a l o c a l m i n i m u m a t x = c . (b) I f f'' (c) i s n e g a t i v e, t h e n f h a s a l o c a l m a x i m u m a t x = c . (c) I f f'' (c) = 0, t h e n t h i s t e s t s a y s n o t h i n g a b o u t w h e t h e r o r n o t f h a s a n e x t r e m u m a t x = c .$

Step by step solution

Step 1. Given Information.

Given is the text and next step contains summary of the text.

Step 2. Summary pf the text given.

role="math" localid="1649778521794" $3 . T h e S e c o n d - D e r i v a t i v e T e s t : S u p p o s e x = c i s t h e l o c a t i o n o f a c r i t i c a l p o i n t o f a f u n c t i o n f w i t h f' (c) = 0, a n d s u p p o s e b o t h f a n d f' a r e d i f f e r e n t i a b l e a n d f'' i s c o n t i n u o u s o n a n i n t e r v a l a r o u n d x = c . (a) I f f'' (c) i s p o s i t i v e, t h e n f h a s a l o c a l m i n i m u m a t x = c . (b) I f f'' (c) i s n e g a t i v e, t h e n f h a s a l o c a l m a x i m u m a t x = c . (c) I f f'' (c) = 0, t h e n t h i s t e s t s a y s n o t h i n g a b o u t w h e t h e r o r n o t f h a s a n e x t r e m u m a t x = c .$