Jack has a number of 4 foot poles and a number of 6 foot poles

Slides:

Advertisements

Similar presentations

Area & Perimeter Word Problems

Advertisements

Formulas LinesApplicationPrismsMixed Bag Team 1Team.

Who Wants To Be A Mathionaire? Question 1 I have 4 sides, they are all the same length, I am a 2D shape can you guess my name? A circle B triangle C.

Problem of the Week! Max was in charge of getting the equipment for the 14 people on his baseball team. He made sure he had 8 bats and 38 baseballs. He.

Ashley Holien.  Standard  Use time and money in real-world and mathematical situations.  Objectives  Students will be shown the basic concept of how.

Time 1 day = 24 hours 1 hour = 60 minutes 1 minute = 60 seconds 1 year

Units 13 and 14 Review Measurement and Time Which word belongs in the blank? Write longer or shorter. The length of a pencil is _______ than a foot.

4.2 Using Similar Shapes How can you use similar shapes to find unknown measures?

Length Measurement of distance between two endpoints. Chapter 8.

inches = 1 foot 3 feet = 1 yard 36 inches = 1 yard 5280 feet = 1 mile 1760 yards = 1 mile.

FRONT- I50 sq. ft. BACK-150 sq. ft. SIDE-80 sq. ft. + SIDE-80 sq. ft. 460 sq. ft. 460 sq. ft. 460 ÷ 10 =46 gallons , x x 46.

Lesson 4 (Writing Equations from Word Problems)  How do you write equations from word problems?  First, highlight or underline all important information.

Presentation Timer Select a time to count down from the clock above 60 min 45 min 30 min 20 min 15 min 10 min 5 min or less.

Presentation Timer Select a time to count down from the clock above 60 min 45 min 30 min 20 min 15 min 10 min 5 min or less.

Perimeter Is the sum of the lengths of the sides. When solving a perimeter problem, it is helpful to draw and label a figure to model the region.

International system of unit. International system of units.

Optimum Area and Perimeter Second Attempt at Lesson.

Geometry Word Problems.

Find Perimeter, Circumference, & Area

Think Math Leveled Problem Solving Grade 4 Chapters 4-7.

Money and "Real-Life" Problems.

Maths that’s mental!. 12 passengers are on a bus. 5 more get on. How many are there now? How many are there if 8 get off? How many if 5 get on at the.

Saturday, 16 September 2006 ©RSH Number Ratio. Saturday, 16 September 2006 ©RSH Ratio The word ratio is used to describe a fraction. If the ratio of Sara’s.

QUADRATIC MODELS: BUILDING QUADRATIC FUNCTIONS

Example: Working with Fractions. PROBLEM Adam wants to fence a triangular shaped yard. He wants to determine how many feet of fencing he will need. The.

© Mark E. Damon - All Rights Reserved Another Presentation © All rights Reserved

Measurement & Data Vocabulary a.m. – the half of the day that is from midnight to the middle of the day; morning analog clock - a clock that shows the.

Briana had $30 to spend on herself. She spent 1/5 of the money on candy, 1/6 for a sandwich, and 1/2 of it on a book. How much money does Briana have left.

Chapter 11 Geometry and Measurement

$100 $200 $300 $400 $500 $100 $200 $300 $400 $500 $100 $200 $300 $400 $500 $100 $200 $300 $400 $500 $100 $200 $300 $400 $500 $100 $200 $300.

Simplifying Fractions Parts of a Fraction 3 4 = the number of parts = the total number of parts that equal a whole.

Optimization. Objective  To solve applications of optimization problems  TS: Making decisions after reflection and review.

How much money 1.2 quarters + 3 dimes + 4 pennies 2.4 quarters 3.7 quarters 4.

GET READY Questions will run automatically. Set 2 Question 1 Which number is 20 MORE than 990?

This is the story of Simon Shape Hello!. On Monday Simon Shape woke up feeling very hungry so he ate and ate and ate…

Warm Up 1)Simplify 7 – (5 – 3x) + 10x )Would the side lengths 60, 11 & 61 create a right triangle? 3)Find the length of a segment with endpoints.

Basic Measurement.

Math Olympiad 79.

HAWKES LEARNING SYSTEMS Students Matter. Success Counts. Copyright © 2013 by Hawkes Learning Systems/Quant Systems, Inc. All rights reserved. Section 5.2.

3.5 Linear Equations and Problem Solving. Consecutive Integers 1) Find three consecutive integers whose sum is 162.

AFind the perimeter of a polygon. bSolve applied problems involving perimeter. Perimeter of a Polygon A polygon is a closed geometric figure with three.

Time pm10 pm9 pm8 pm7 pm6 pm5 pm4 pm3 pm2 pm1 pmmidday

Swun Math Trimester 3. Fractions Foundations for Multiplication Measurement Data and Graphing.

A Breakthrough… Time Machine Evidence. Overview… VISIT TODAYVISIT TODAYVISIT.

Year 2 Problem Solving. Addition Problem solving zTroy has a toy car which is 15cm long. Peter has a toy truck which is 12cm longer. What is the length.

Telling the Time.

Math Review What is the name of the unit that measures the distance around a figure? What is the name of the unit that measures the distance.

Bell Work: Write the fraction as a decimal number. 1/30.

JE’PARDY! Math. Addition facts Subtraction facts ShapesMoney $100$300$500 $300$100 $300$500 $300$100 ?

1 A gardener wants to use 62 ft. of fencing bought at a garage sale to enclose a rectangular garden. Find the dimensions of the gardens if its length is.

Created by Hester Sutton March 2011 The Brandywine School District presents The Singapore Math Series Session III Multiplication and Division.

Parts of the Clock Click on the minute hand. Click on the clock’s face.

Day 1 5-Minutes. (Driscoll, 1999) Maria has a red candle and a green candle. Each candle is 18 centimeters long. Maria lights each candle at the same.

PERIMETER OF IRREGULAR FIGURES 2/26/16. WARM-UP FIND THE PERIMETER OF THE SQUARE 1 ¼ inches 1 ¼ + 1 ¼ + 1 ¼ + 1 ¼ = 5 inches or 4(1 ¼ ) = 5.

1.2 Measurement of Segments and Angles. * There are many ways to find the measure of the angle formed by the hands of an analog clock. * You may use one.

Section 10.3 Polygons and Perimeter Math in Our World.

My Plan to Go to Around the world By: Benedict/5C.

9.2 Perimeter and Area of Triangles and Trapezoids Objective: Students find the perimeter and area of triangles and trapezoids.

Preview Warm Up California Standards Lesson Presentation.

Shapes Time Equations Place Value $10 $20 $30 $40 COMMON CORE.

Length Word Problems.

Polynomial Functions.

Polygons 1st year TG.

Footloose Dots Game Perimeter and Area.

Length in the Customary System.

Ratio and Proportion.

CHAPTER 10 Geometry.

Dimensional Analysis and Scientific Notation

Pole Position Student Points Time

Presentation transcript:

Jack has a number of 4 foot poles and a number of 6 foot poles Jack has a number of 4 foot poles and a number of 6 foot poles. If he lays all the 4ft. Poles in a line, they have the same total length as laying all the 6ft. poles in a line. Altogether he has 20 poles. How many 6 ft. poles does he have?

Two clocks are set at 6 A.M. One clock gains 30 seconds every hour and the second clock loses 1 minute every hour. At what time will the faster clock be 30 minutes ahead of the second clock?

In a foreign country coins are called parns, arns, and darns In a foreign country coins are called parns, arns, and darns. Four parns and 1 arn equal 1 darn. Two arns and 1 darn equal 10 parns. How many parns would equal 1 darn?

Rob cleans yards on Saturdays Rob cleans yards on Saturdays. One Saturday morning he started out with $5 in his pocket. He cleans three yards charging the same for each. He ended up with $23 in his pocket. How much money did Rob have in his pocket after he cleaned the first yard?

A farmer builds a fence for his chickens in the shape of a pentagon, as shown. Each of the 5 sides has equal length, but the fence along the highway costs twice as much as any one of the other 4 sides. If the total cost of fencing was $1800, how much did the highway fence cost?