Flashback 10-5-12 The 2 diagrams below show a circle of radius 1 inch with shaded sectors of angle x°, for 2 different values of x. One of the following.

Slides:

Advertisements

Similar presentations

4. The derivative of f is x2(x - 2)(x + 3) . At how many points will

Advertisements

Concavity & the second derivative test (3.4) December 4th, 2012.

Maximum and Minimum Values

Economics 214 Lecture 7 Introduction to Functions Cont.

THE ABSOLUTE VALUE FUNCTION. Properties of The Absolute Value Function Vertex (2, 0) f (x)=|x -2| +0 vertex (x,y) = (-(-2), 0) Maximum or Minimum? a =

Increasing and Decreasing Functions and the First Derivative Test.

Applications of Extrema Lesson 6.2. A Rancher Problem You have 500 feet of fencing for a corral What is the best configuration (dimensions) for a rectangular.

Graphing Inequalities of Two Variables Recall… Solving inequalities of 1 variable: x + 4 ≥ 6 x ≥ 2 [all points greater than or equal to 2] Different from.

Copyright © 2011 Pearson, Inc. 1.2 Functions and Their Properties.

P.O.D. Using your calculator find the domain and range of: a) b) c)

Domain & Range Domain (D): is all the x values Range (R): is all the y values Must write D and R in interval notation To find domain algebraically set.

Do Now!!! Find the values of x that satisfy and explain how you found your solution. Solution: First, you must factor the numerator and denominator if.

Today in Pre-Calculus Go over homework Notes: Finding Extrema –You’ll need a graphing calculator (id’s please) Homework.

Functions. Quick Review What you’ll learn about Numeric Models Algebraic Models Graphic Models The Zero Factor Property Problem Solving Grapher.

11.6 Arc Lengths and Areas of Sectors

Fri 10/2 Lesson 2 – 8 Learning Objective: To graph two variable inequalities Hw: Pg. 118 #8 – 17, 39 – 41, *46.

Sullivan Algebra and Trigonometry: Section 2.4 Circles Objectives Write the Standard Form of the Equation of a Circle Graph a Circle Find the Center and.

Increasing/ Decreasing

Flashback In the figure below,

Flashback The 2 diagrams below show a circle of radius 1 inch with shaded sectors of angle x°, for 2 different values of x. One of the following.

2.8B Graphing Absolute Value Inequalities in the Coordinate Plane 1. Find location of the absolute value “V”  a I x – h I + k 2. Determine if graph is.

4.2 Critical Points Fri Dec 11 Do Now Find the derivative of each 1) 2)

Intro to Functions Mr. Gonzalez Algebra 2. Linear Function (Odd) Domain (- ,  ) Range (- ,  ) Increasing (- ,  ) Decreasing Never End Behavior As.

Class Opener: Solve each equation for Y: 1.3x + y = y = 2x 3.x + 2y = 5 4. x – y = x + 3y = x – 5y = -3.

Warm Up. EQUATION OF A CIRCLE Geometry How can we make a circle? What are the most important aspects when drawing a circle?

9.6 Circles in the Coordinate Plane Date: ____________.

MTH 251 – Differential Calculus Chapter 4 – Applications of Derivatives Section 4.1 Extreme Values of Functions Copyright © 2010 by Ron Wallace, all rights.

Equations of Circles. You can write an equation of a circle in a coordinate plane, if you know: Its radius The coordinates of its center.

Determine where a function is increasing or decreasing When determining if a graph is increasing or decreasing we always start from left and use only the.

4.2 Critical Points Mon Oct 19 Do Now Find the derivative of each 1) 2)

Section 4.2: Maximum and Minimum Values Practice HW from Stewart Textbook (not to hand in) p. 276 # 1-5 odd, odd, 35, 37, 39, 43.

2.5 Quadratic Functions Maxima and Minima.

Do Now from 1.2a Find the domain of the function algebraically and support your answer graphically. Find the range of the function.

MTH1170 Function Extrema.

Graph Inequalities On Coordinate Plane

Inequality Set Notation

Warm-up (10 min.) I. Factor the following expressions completely over the real numbers. 3x3 – 15x2 + 18x x4 + x2 – 20 II. Solve algebraically and graphically.

Algebra II Elements 5.8: Analyze Graphs of Polynomial Functions

EXTREMA and average rates of change

Today in Pre-Calculus Go over homework Need a calculator

2.7 Absolute Value Functions

The mileage of a certain car can be approximated by:

Objectives for Section 12.5 Absolute Maxima and Minima

Do your homework meticulously!!!

Absolute or Global Maximum Absolute or Global Minimum

3.1 Extreme Values Absolute or Global Maximum

5.4 - Analyzing Graphs of Polynomial Functions

Extreme Value Theorem Implicit Differentiation

3.2: Extrema and the First Derivative Test

Section 4.3 Optimization.

A function f is increasing on an open interval I if, for any choice of x1 and x2 in I, with x1 < x2, we have f(x1) < f(x2). A function f is decreasing.

Second Derivative Test

Warm-up (10 min.) I. Factor the following expressions completely over the real numbers. 3x3 – 15x2 + 18x x4 + x2 – 20 II. Solve algebraically and graphically.

-20 is an absolute minimum 6 is an absolute minimum

1.2 Functions and Their Properties

Sept 1st midpoint.

Self Assessment 1. Find the absolute extrema of the function

Warm-up: Determine whether the graph of y is a function of x:

What does Linear Mean? Linear or Not? How do I know?

More Properties of Functions

Functions and Their Properties II

Every number has its place!

Ex1 Which mapping represents a function? Explain

Flashback Calculate the solutions without a calculator.

Welcome: The graph of f(x) = |x – 3| – 6 is given below

Chapter 12 Graphing and Optimization

f(x) g(x) x x (-8,5) (8,4) (8,3) (3,0) (-4,-1) (-7,-1) (3,-2) (0,-3)

Unit 4: Applications of Derivatives

Chapter 4 Graphing and Optimization

Presentation transcript:

Flashback The 2 diagrams below show a circle of radius 1 inch with shaded sectors of angle x°, for 2 different values of x. One of the following is the graph in the standard (x,y) coordinate plane of the area, y, of a shaded sector with angle x°, for all values of x between 0 and 360. Which is that graph? A. B. C. D. E. A.B.C.D.E.

Joke of the day What do you call a crushed angle?

A Rectangle

Bounded functions Function is bounded above if there is some number that is greater than or equal to every number in the range of the function. Function is bounded below if there is some number that is less than or equal to every number in the range of the function. Function is bounded if the function is bounded above and bounded below.

How do we know? Check graph i.e. w(x) = 3X 2 – 4 Confirm algebraically:

Local and absolute extrema Local maximum: f(c) is the largest range value over an open interval that contains c. Local minimum: f(c) is the smallest range value over an open interval that contains c. Absolute Maximum: f(c) is the largest range value over the entire range of the function. Absolute minimum: f(c) is the smallest range value over the entire range of the function.

Try one F(x) = X 4 – 7x 2 + 6x Enter into calculator.

HW: p. 102 Ex , 30,32, 36,38,42,44

Exit Slip p. 104 #84