1. Review of Chapter 4

2.  To approximate the change in a function f
 For a small value of delta x
 The exact value of the change in f

3.  To approximate f (x) at x = c (x is close to c )

4.  Find the linearization for the function
f(t) = 32t – 4t2, a = 2. Use this to
approximate f(2.1).
 L(t) approximates f(2.1) as 49.6. Actual value
is 49.56

5. Local Extrema a function f (x) has a:
 Local Minimum at x = c if f (c) is the
minimum value of f on some open interval (in
the domain of f containing c.
 Local Maximum at x = c if f (c) is the
maximum value of f on some open interval
containing c.

6. Local Max
Local Min
Local Min

7. Definition of Critical Points
 A number c in the domain of f is called a
critical point if either f’ (c) = 0 or f’ (c) is
undefined.

8.  Find the extreme values of g(x) = sin x cos x
on [0, π]

9.  Critical points: g’(x) = cos 2 x – sin 2 x
 g’(x) = 0, x = π/4, 3π/4
 g(π/4) = ½ , max
 g(3π/4) = -1/2 , min
 Endpoints (0, 0), (π, 0)

10.  Assume f (x) is continuous on [a, b] and
differentiable on (a, b). If f (a) = f (b) then
there exists a number c between a and b such
that f’(c) = 0
f(c)
f(a) f(b)
a c b

11.  Assume that f is continuous on [a, b] and
differentiable on (a, b). Then there exists at
least one value c in (a, b) such that

12.  If f’(x) > 0, for x in (a, b) then f is increasing
on (a, b).
 If f’(x) < 0 for x in (a, b), then f is decreasing
on (a, b)
 If f’(x) changes from + to – at x = c, f(c) is
local maximum
 If f’(x) changes from – to + at x = c, f(c) is a
local minimum

13.  Concavity
 f is concave up if f’(x) is increasing on (a, b)
 f is concave down if f’(x) is decreasing on
(a, b)

14.  If f’’(x) > 0 for x in (a, b), the f is concave up
on (a, b).
 If f’’(x) < 0 for x in (a, b), the f is concave
down on (a, b).
 Inflection Points – If f’’(c) = 0 and f’’(x)
changes sign at x = c then f(x) has a point of
inflection at x = c.

15.  F’’(c) > 0, then f (c) is a local minimum
 F’’(c) < 0, f (c) is a local maximum
 F’’(c) = 0, inconclusive…may be local
max, min or neither

16.  For a Function f (x):
 Domain/Range of the Function
 Intercepts (x and y)
 Horizontal/Vertical Asymptotes

 End Behavior (Polynomials)
 Period, frequency, amplitude, shifts
(Trigonometric)

17.  For the Derivative f’ (x):
 Critical points
 Increasing/Decreasing Intervals
 Extrema

18.  For the Second Derivative f’’ (x):
 Points of Inflection
 Concavity

19.  Application of the Derivative involving finding
a maximum or minimum.
 Example problems on page 227 (#41) and
page 228 (#43)

20.  Method for finding approximations for zeros
of a function.
 Uses a number of iterations to locate the
zero.