The Power of Connected Streets

Slides:

Advertisements

Similar presentations

Routing Routing in an internetwork is the process of directing the transmission of data across two connected networks. Bridges seem to do this function.

Advertisements

Case Study By: The South Group

QUADTRATIC RELATIONS Standard Form.

1 Minimal Spanning Tree This is a technique used when we need to connect many places to a system(network).

Chapter 7 Network Flow Models.

Chapter 11 Network Models. What You Need to Know For each of the three models: –What is the model? (what are given and what is to calculate) –What is.

Graphing Linear Equations. Identifying a Linear Equation A linear equation is any equation that can be put in the form... Ax + By = C... where A, B, and.

Table of Contents Recall that to solve the linear system of equations in two variables... we needed to find the values of x and y that satisfied both equations.

OSPF To route, a router needs to do the following: Know the destination address Identify the sources it can learn from Discover possible.

Quadratic Expressions and Equations Expanding quadratic expressions using the grid method (C)

Instructions for lesson delivery This is part 2 for the lessons on linear equations Print out the last page for each students so they can place them in.

Solving Linear Systems using Linear Combinations (Addition Method) Goal: To solve a system of linear equations using linear combinations.

Instructions for Lesson Delivery 1.This is lesson 1 of 2 for Linear equations. 2.Print the last page for all students so they can place them in their whiteboards.

Bean Investigation Presentation By:Serhiy Smirnov Period:1.

Exponential Equations and Expressions – Day 2

Grade 6 Module 1 Lesson 14. Exercise 1 Create a table to show the time it will take Kelli and her team to travel from Yonkers to each town listed in the.

3.1 Symmetry; Graphing Key Equations. Symmetry A graph is said to be symmetric with respect to the x-axis if for every point (x,y) on the graph, the point.

Linear Equations in Two Variables A Linear Equation in Two Variables is any equation that can be written in the form where A and B are not both zero.

Reflections. Reflect the shape across the x axis Graph the following coordinates, then connect the dots (2,3) (2,5) (5,5) (5,6) (7,4) (5,2)(5,3) What.

Florida’s First Eco-Sustainable City. 80,000+ Residential Units 10 million s.f. Non-Residential 20 Schools International Clean Technology Center Multi-Modal.

Simultaneous Equations 8 January, 2016 What are simultaneou s equations Let me explain. If you have an equation like: x + y = 5, there are lots of answers.

Double click here to add event title Double click here to add event date Double click here to add event time Double click here to add event location.

Warm Up Solve each equation for y. 1.x = -4y 2.x = 2y x = (y + 3)/3 4.x = -1/3 (y + 1)

Objective: to identify and graph linear equations. Chapter 7-3 Standards AF 3.3 & AF 1.1.

TARGET HEART RATE CALCUATION SPACE WITH EQUATION Show your work here -First take 220 and subtract your age -Next take this number and subtract your resting.

Mathsercise-C Graphs 1 Ready? Here we go!. Graphs 1 Complete this grid for the function y = 3x x y Answer Question 2 Substitute each.

Solving Systems of Equation Using Elimination. Another method for solving systems of equations Eliminate one of the variables by adding the two equations.

Elimination Method - Systems. Elimination Method  With the elimination method, you create like terms that add to zero.

Elimination Week 17 blog post. Add or subtract In elimination, we have to add or subtract two linear equations to isolate one of the variables. So, the.

5x(x 2 – 4) (y 2 + 4)(y 2 – 4) (9 + d 2 )(9 – d 2 )

Rewrite a linear equation

Elimination Method Day 1

Type Topic in here! Created by Educational Technology Network

3.2 Solve Linear Systems Algebraically

2012 סיכום מפגש 2 שלב המשכי תהליך חזוני-אסטרטגי של המועצה העליונה של הפיזיותרפיה בישראל.

Unit 7: Systems of Equations

2.1 Graphs of equations.

Equation Review Given in class 10/4/13.

TE2: Combining Like Terms

7.2 Solving Systems of Equations Algebraically

X and Y Intercepts.

Solving One and Two Step Equations

Y The graph of a rule connecting x and y is shown. From the graph, when x is -1, what is y? Give me a value of x that makes y positive, negative, equal.

Add and subtract Rationals with Unlike denominators

4.3 Graphing Equations of Lines From Intercepts

Objective - To graph ordered pairs.

5.1 Solving Systems of Equations by Graphing

Use power series to solve the differential equation. y ' = 7xy

Final Review Jeopardy Chapter Chapter Chapter 3 100

form the ordered pair solution

Warm Up 12/3/2018 Solve by substitution.

YOUR text YOUR text YOUR text YOUR text

POD #30 1/31/19 Write the rule for the following tables:

Equation Review.

Today we will Graph Linear Equations

Solutions of Linear Functions

Final Review Double Jeopardy

Jeopardy y = mx + b 100 Equation 100 Slope 100 Point-Slope 100 Review

Example 2B: Solving Linear Systems by Elimination

Simultaneous Equations

Graphing Quadratic Equations

Add Main Topic Here Created by Educational Technology Network

Ch. 6 Vocabulary 7.) Substitution method (6-2) 8.) Elimination method (6-3)

Solving Systems by ELIMINATION

TransCAD User’s Guide 2019/8/19.

X ⦁ X = 64 ±8 ±14 X ⦁ X ⦁ X =

Unit 7: Systems of Equations

Solving Linear Systems by Graphing

Presentation transcript:

The Power of Connected Streets Destination Origin How do we get from here to there?

The Power of Connected Streets Destination Origin How do we get from here to there?

The Power of Connected Streets Destination Origin How do we get from here to there?

The Power of Connected Streets Destination Origin 1 Possible Route

The Power of Connected Streets Destination Origin Add a second pair of streets to the network, and…

The Power of Connected Streets Destination Origin 2 Possible Routes

The Power of Connected Streets x= 2 Destination y= 2 Origin Add another street in each direction…

The Power of Connected Streets x= 2 Destination y= 2 Origin More Possible Routes

The Power of Connected Streets x= 2 Destination y= 2 Origin More Possible Routes

The Power of Connected Streets x= 2 Destination y= 2 Origin More Possible Routes

The Power of Connected Streets x= 2 Destination y= 2 Origin More Possible Routes: 6 in all, without doubling back

(x+y)! = # of possible routes (x!)(y!) The Power of Connected Streets The Casey Hawthorne Traffic Routes Equation (only accounts for one direction)

The Power of Connected Streets x= 3 Destination y= 4 Origin Continue enhancing the network: 4 x 3 grid yields 35 routes

The Power of Connected Streets x= 5 Destination y= 4 Origin Continue enhancing the network: 5 x 4 grid yields 126 routes

The Power of Connected Streets Make a town, not “pods.” 8 x 8 grid yields 12,870 routes

The Power of Connected Streets Beaufort, SC