chapter 2 section 4.notebook February 15, 2017
(1, 6) and (4, -1)
chapter 2 section 4.notebook February 15, 2017
chapter 2 section 4.notebook February 15, 2017
chapter 2 section 4.notebook February 15, 2017
chapter 2 section 4.notebook February 15, 2017
chapter 2 section 4.notebook February 15, 2017
chapter 2 section 4.notebook February 15, 2017
Graphically displaying the slope for a tangent line at a point on a curve.
chapter 2 section 4.notebook February 15, 2017
chapter 2 section 4.notebook February 15, 2017
STOPdate ____
Example: Find the slope of the tangent line to the function at x = 1.f(x) = 4 - x2
STOPdate ____
chapter 2 section 4.notebook February 15, 2017
Example: a. Find the slope of the tangent line to the function at x = 2.b. Find the slope of a tangent line at the value x = a.
f(x) = 1x
Example: Find the slope of the tangent line to the function at x = 3.
f(x) = x3 + 1
chapter 2 section 4.notebook February 15, 2017
Find the values of x on the function y = 2x2 - 8x that have horizontal tangents.
When do you think a function would not have a Tangent line at a given point???
2 - 2x - x2 , x < 0f(x) =
2x - 2 , x > 0
at points of discontinuity and at point where there are corners and cusps...ask why!?
{
chapter 2 section 4.notebook February 15, 2017
chapter 2 section 4.notebook February 15, 2017
chapter 2 section 4.notebook February 15, 2017
chapter 2 section 4.notebook February 15, 2017
chapter 2 section 4.notebook February 15, 2017
chapter 2 section 4.notebook February 15, 2017
chapter 2 section 4.notebook February 15, 2017
35. will exist as a perpendicular to the tan line36. no...right and left hand limits not same37. D38. E39. C40. A
chapter 2 section 4.notebook February 15, 2017