Tic – Tac – Toe ! Choose a square by clicking on “box #”

Slides:

Advertisements

Similar presentations

Mathematics. Session Applications of Derivatives - 2.

Advertisements

Your Title Finish Start Category 3 Category Category 6 Category 2 4

{ Ch. 5 Review: Integrals AP Calculus. 5.2: The Differential dy 5.2: Linear Approximation 5.3: Indefinite Integrals 5.4: Riemann Sums (Definite Integrals)

Tic Tac Toe Prototype Following is a prototype of a Tic Tac Toe program. The main goal of the program is to provide quick and simple entertainment. It.

Write your words 3 times each. Write your words in color sorts, using a different color for each pattern or group. Write your words in pyramid form. c.

PLANNING THE TIC TAC TOE GAME BY NEEL DAVE. TIC TAC TOE INSTRUCTIONS Tic Tac Toe Instructions The basic concept of Tic Tac Toe 1.This is a game for two.

Tic Tac Toe Architecture CSE 5290 – Artificial Intelligence 06/13/2011 Christopher Hepler.

Integer Tic Tac Toe Let’s Begin Rules: 1.Erase all x’s and o’s from the previous game before you begin. 2.Decide which player will be x’s and which will.

Welcome to Jeff’s baseball game! Here is how to play. You are asked a math question and you have to get it right or you will repeat the question until.

TIC TAC KNOW Elapsed Time Grade 3 Welcome to TicTac Town.

4.1 Maximum and Minimum Values. Maximum Values Local Maximum Absolute Maximum |c2|c2 |c1|c1 I.

AP CALCULUS AB Chapter 4: Applications of Derivatives Section 4.1:

Intermediate Value Theorem 2.4 cont.. Examples If between 7am and 2pm the temperature went from 55 to 70.  At some time it reached 62.  Time is continuous.

Minimum and Maximum Values Section 4.1 Definition of Extrema – Let be defined on a interval containing : i. is the minimum of on if ii. is the maximum.

Review Limits When you see the words… This is what you think of doing…  f is continuous at x = a  Test each of the following 1.

Section 3.1 Maximum and Minimum Values Math 1231: Single-Variable Calculus.

Solving Inequalities. C + 3 < 12 Guess a reasonable solution and write your guess.

Ex: 3x 4 – 16x x 2 for -1 < x < – Maximums and Minimums Global vs. Local Global = highest / lowest point in the domain or interval… Local =

Adding Game Click here You must look at the bottom to move on….. Click here.

Math Bridging Course Tutorial 3 Chris TC Wong 30/8/2012 1/9/2012.

Section 3.2 Mean Value Theorem Math 1231: Single-Variable Calculus.

Theorems Lisa Brady Mrs. Pellissier Calculus AP 28 November 2008.

If f(x) is a continuous function on a closed interval x ∈ [a,b], then f(x) will have both an Absolute Maximum value and an Absolute Minimum value in the.

Tic – Tac – Toe ! Choose a square by clicking on “box #” Choose a square by clicking on “box #” If the person choosing the square gets the problem correct,

Crash Courtesy of Maymi Heaser a kindergarten teacher from MCCS #201 Can be used for any subject and grades K-8 MATERIALS NEEDED TO MAKE THE PROJECT: A.

MAT 3749 Introduction to Analysis

4.2 The Mean Value Theorem State Standard

Great Theoretical Ideas in Computer Science

Tic-Tac-Throw! How to Play: X or O

O X X O O X X O X O X O O X O X O X Tic Tac Toe Graphical

Super Connect 4 Rules: Each team takes turn choosing a square

Tic Tac Toe X O X O X O X O O X O

Tic Tac Toe O O X X ? X O X O © Math by Morrison 2011.

3.1 Extrema on an Interval Define extrema of a function on an interval. Define relative extrema of a function on an open interval. Find extrema on a closed.

Tic – Tac – Toe ! Choose a square by clicking on “box #”

Super Connect 4 Rules: Each team takes turn choosing a square

Tangent Lines and Theorems Notes

4.1. EXTREMA OF functions Rita Korsunsky.

DIVIDING FRACTIONS TIC-TAC-TOE

Proving Lines Parallel

Tic – Tac – Toe ! Choose a square by clicking on “box #”

Election Tic-Tac-Toe Scavenger Hunt

Important Values for Continuous functions

Metric to English Conversions

Tic – Tac – Toe ! Choose a square by clicking on “box #”

Memory The game consists of 15 slides. There are 7 equations, 7 solutions, and one bonus space!! Begin by clicking once on any box. If you have an equation,

Tic – Tac – Toe ! Choose a square by clicking on “box #”

ROLLES THEOREM AND THE EXTREME VALUE THEOREM

Packet #17 Absolute Extrema and the Extreme Value Theorem

Open Box Problem Problem: What is the maximum volume of an open box that can be created by cutting out the corners of a 20 cm x 20 cm piece of cardboard?

Tic – Tac – Toe ! Choose a square by clicking on “box #”

Solve the equation: 6 x - 2 = 7 x + 7 Select the correct answer.

4.1 – Graphs of the Sine and Cosine Functions

ROLLES THEOREM AND THE EXTREME VALUE THEOREM

Today in Calculus Go over homework Trig Review Mean Value Theorem

Once you have filled a square with your colour, you get another turn.

Transition Maths Try these maths problem solving tasks and see how good your maths skills are.

Writing Inequalities Continued

Tic – Tac – Toe ! Choose a square by clicking on “box #”

Once you have filled a square with your colour, you get another turn.

Tic – Tac – Toe ! Choose a square by clicking on “box #”

Tic – Tac – Toe ! Choose a square by clicking on “box #”

Tic – Tac – Toe ! Choose a square by clicking on “box #”

SHUT THE BOX! RULES INSTRUCTIONS PLAY.

EXTREMELY important for the AP Exam

SHUT THE BOX! RULES INSTRUCTIONS PLAY.

2019 SAIMC Puzzle Challenge General Regulations

First consider a geometric illustration of completing the square for

Presentation transcript:

Tic – Tac – Toe ! Choose a square by clicking on “box #” If the person choosing the square gets the problem correct, he/she gets the square (click on “O” or “X”), otherwise his/her opponent gets the square. Take turns choosing squares until there is a winner (don’t forget to learn math) When finished click on each square for practice

O X X O O X X O X O X O O X O X O X Ch. 3 Tic-Tac-Toe Review Round 6 – IVT, MVT, EVT O X X O O X Box 1 Box 2 Box 3 Box 4 Box 5 Box 6 Box 7 Box 8 Box 9 X O X O X O X O X O X O X O X O X O O X O X O X X O X O X O

Back to game Box 1

Back to game Box 2

Back to game Box 3

Back to game Box 4

Back to game Box 5

Back to game Box 6

Back to game Box 7

Back to game Box 8

The extreme value theorem states that if a real-valued function f is continuous in the closed and bounded interval [a,b], then f must attain a maximum and a minimum, each at least once. Back to game Box 9