MPM 2D Make Up July 2012.  The admission fee at a small fair is $1.50 for children and $4.00 for adults. On a certain day, 2200 people enter the fair.

Slides:

Advertisements

Similar presentations

Velocity-time graph’s

Advertisements

Notes: 11.2 Speed & Velocity.

Acceleration Review.

Confidential1 Hello, Laura. This is Mrs. Bisanz. I will be your teacher today! OUR LESSON: Review of Integers.

Name:__________ warm-up 6-4 Use elimination to solve the system of equations. 5x + y = 9 3x – y = 7 Use elimination to solve the system of equations. 2x.

Warm-Up 5 minutes Beth and Chris drove a total of 233 miles in 5.6 hours. Beth drove the first part of the trip and averaged 45 miles per hour. Chris drove.

Real World Problems MA.912.A.5.7 Solve real-world problems involving rational equations (mixture, distance, work, interest, and ratio).

Wind and Current Word Problems

4.3 Application problems dealing with systems of linear equations.

Chapter 5: Systems of Linear Equations Section 5.1: Solving Systems of Linear Equations by Graphing.

Tuesday, 2/9/10 SWBAT… solve systems of equations using the graphing method Agenda 1. WU (5 min) 2. Activity – Systems of equations: graphing method (20.

MPM 2D. (DO NOT SOLVE) Use “let” statements! 1. The sum of two numbers is 72. Their difference is 48.

Applications for Systems of Equations Algebra I. Example #1  Flying to Ankara with a tailwind a plane averaged 368 mph. On the return trip the plane.

Section Uniform Motion Problems. Planes An airplane took off from Birmingham to Los Angeles, traveling at an average of 600 miles per hour. One.

Lesson 7-4 Elimination Using Multiplication. Use elimination to solve each system of equations. Ex. 1 3x + 4y = 6 5x + 2y = -4 Multiply one equation to.

Using Linear Systems to Solve Application Problems:  1. Define the variables. There will be two unknown values that you are trying to find. Give each.

Copyright © Ed2Net Learning, Inc.1 Integers Grade 6.

Objective: Solving systems of equations using elimination method. Warm up 1. The admission fee at a small fair is $1.50 for children and $4.00 for adults.

MATH ACTIVITY PREPARED BY: KRISTINE MAE GUERRA MARX LENNIN CABALTICAN.

Addition or Subtraction Multiplication or Division.

GET READY Questions will run automatically. Set 2 Question  0.35.

Ms. Azim’s Review Extravaganza Theory Substitution Elimination DVT Percent/ Mixture Geometry/ Money Q $100 Q $200 Q $300 Q $400 Q $500 Q $100 Q $200 Q.

Writing Systems of Equations. The admission fee at a small fair is $1.50 for children and $4.00 for adults. On a certain day, 2200 people enter the fair.

KAYAKING EXAMPLE 4 Write and solve a linear system During a kayaking trip, a kayaker travels 12 miles upstream (against the current) and 12 miles downstream.

Example 1 A train leaves Slaton traveling east at 80 kilometers per hour. An hour later, another train leaves Slaton on a parallel track at 120 km/hr.

9.1 and 9.2 word problems. Solving these word problems… Set up a system of equations Set up a system of equations Solve the system using elimination or.

BINGO Algebra 1 Chapter 8. #1 Determine whether the given pair is a solution of the system. (6, -1); x-y=3 2x+5y=6.

8-5 Vectors Part 2: Adding and Applications. Resultants Vectors can also be named with a single lowercase letter, such as u. The map shows vectors representing.

Motion Problems(wind/water) Review Homework 191 # # # 46.

Section 4.1 Speed & Velocity b What is motion? A change in the position of an object relative to another object (a reference point), which is assumed to.

A BOAT TRAVELS 180 MILES IN 4.2 HOURS (WITH A CONSTANT SPEED). HOW FAR CAN IT TRAVEL IN 2.3 HOURS (WITH THE SAME SPEED)? 2KG.

Motion and Force 8SCIENCE.

Systems of Linear Equations Real-World Problems Block 45.

Solving Systems of Equations Review. Systems of Equations Applications.

5.4 Elimination Using Multiplication Algebra 1 Objective: Each student will understand if addition and subtraction does not eliminate a variable – how.

6.5: Applying Systems of Equations Algebra 1: November 11, 2014.

7.2 – SOLVING LINEAR SYSTEMS GRAPHICALLY SYSTEMS OF LINEAR EQUATIONS.

1. Three times a number increased by 5 results in A number plus twice a number is The sum of three consecutive integers is Twice.

Math 20-1 Chapter 6 Rational Expressions and Equations Solve Rational Equations Teacher Notes.

Motion Problems 2 A man bikes from A to B at 20 km/h. He returns by car at 60 km/h. The bike trip is 2 hours longer than the car trip. How far is it.

Unit I Review Lessons 4 to 8. Complete the table and write a system of equations A sailboat travels 24 mi. downstream in 3 h. The return trip upstream.

Velocity: Speed in a given direction Ex. 250 km/h North Speed = 250km/h Direction = North.

Application Problems- Day 2 Digit and Coin Problems Goal: To use a system of equations to solve coin and digit problems.

Grade 10 Academic (MPM2D) Unit 1: Linear System Creating a System of Equations Mr. Choi © 2017 E. Choi – MPM2D - All Rights Reserved.

Chapter 11 Motion.

1. If you travel at 10mph for 1 hour, how far do you travel?

Systems Applications.

1.3 Applications.

Systems of Linear Equations in Two Variables

11.3 Solving Linear Systems by Adding or Subtracting

Speed, Distance, Time Calculations

Rational Functions: Applications

Solve ANSWER x = 9 ANSWER t =

1.3 Solving with Variables on Both Sides

Rational Equations and Problem Solving

Elimination Using Multiplication

Solve Linear Systems by Adding or Subtracting

5-A9 Wind and Current Word Problems

Speed, Distance, Time Calculations

kahoot WARM-uP Lesson 55 Exit card

Speed, Distance, Time Calculations

Speed, Distance, Time Calculations

Speed, Distance, Time Calculations

Applications Involving Quadratic Equations

Speed, Distance, Time Calculations

Speed, Distance, Time Calculations Final Review

Speed, Distance, Time Calculations

Unit 1 – Section 9 “Applications of Systems of Equations”

Speed, Distance, Time Calculations

Presentation transcript:

MPM 2D Make Up July 2012

 The admission fee at a small fair is $1.50 for children and $4.00 for adults. On a certain day, 2200 people enter the fair and $5050 is collected. How many children and how many adults attended?

 A riverboat took 2h to travel 24km down a river with the current and 3h to make the return trip against the current. Find the speed of the boat in still water and the speed of the current.

 Nikolas drove 500 km from Windsor to Peterborough in 5 ½ hours. He drove part of the way at 100km/h and the rest of the way at 80km/h. How far did he drive at each speed?

 The sum of two numbers is 255. When the smaller is subtracted from the larger, the result is 39. Find the numbers.

 When three numbers are added in pairs, the sums of the pairs are 22, 39, and 45. What are the three numbers?