building a survival shelter a project based learning unit for 8 th grade mathematics june, 2011
TRANSCRIPT
REI is offering a Wilderness Survival class and wants to provide instruction in building a survival shelter that is elevated but is built without access to measurement tools such as protractors and rulers. Students will create a Guide for Building a Survival Shelter that is based on Pythagorean Theorem. Optionally, the shelter construction will be validated with a three-dimensional scale model.
Guiding Questions
• What led to the development of Pythagorean Theorem and how can it be used to solve real-world problems today?
• How can the Pythagorean Theorem be represented through models and pictures?
Standards-Based Project 8.7 Geometry and spatial reasoning. The student uses geometry to model and describe the physical world. The student is expected to:
8.7B use geometric concepts and properties to solve problems in fields such as art and architecture.
8.7C use pictures and models to demonstrate the Pythagorean Theorem. 8.9 Measurement. The student uses indirect measurement to solve problems. The student is expected to:
8.9A use the Pythagorean Theorem to solve real-life problems
Survival Simulation Game
• A ball of steel wool• A small ax• A loaded .45 caliber pistol• Newspapers• Cigarette lighter (without fluid)• Extra shirt & pants for each
survivor
You and your companions have just survived a small plane crash . . . Your group of survivors managed to salvage the following twelve items. List in order of importance for your survival.
• 20 x 20 ft piece of canvas• A small ax• An air map made of plastic• 1 quart 100-proof whiskey • A compass• Chocolate bar for each
survivor
Request for Submissions
Guide for Building a Survival Shelter
Today, REI wants to add a Wilderness Survival class to its Outdoor School offerings. As part of that class, they want to provide instruction for building an elevated survival shelter that is built without access to measurement tools. You will create a Guide for Building a Survival Shelter that is based on the Pythagorean Theorem.
What do you know?What do you need to know?
• Why and what is REI requesting?
• What mathematical concepts are required in building the structure?
• Why might this be a challenging task?
• What are some of the requirements of the survival guide?
What is your idea for a Survival Shelter?
Using chart paper, each group will sketch their idea for a survival shelter.
This will be the starting point for your project and will be refined over the next two weeks as you gain more information.
What is the Pythagorean Theorem?
The Pythagorean Theorem is a relationship among the lengths of the sides of a right triangle.
b
ac
Leg
Longest side of the triangle
Across from the right angle
hypotenuse
Leg
The legs form the right angle
What do you notice about the hypotenuse and the legs of a right triangle?
What is the Pythagorean Theorem?
b
ac
Leg hypotenuse
Leg
In any right triangle with legs a and b and hypotenuse c,
In any right triangle with legs a and b and hypotenuse c,
Think-Pair-Share about each of the representations of Pythagorean Theorem
below!
b
acLeg hypotenuse
Leg
Quinton cut two pieces of wood, one 5 feet long, and the other 12 feet long. If the third piece he cuts is 13 feet long, could the three pieces form a right triangle?
3 sides: 5 feet, 12 feet, 13 feet
Longest side
13 feet5 feet
12 feet
Making It Right Group Activity
• Using the sticks provided, form as many triangles as you can.
• Measure the length of the sides of the triangle and fill in the table. Remember, “c” must always be the longest side.
• Using your protractor determine if the triangle is a right triangle.
• Complete the table with the triangles you formed.
A spider is crawling on a 18” x 18” square window. The path of the spider is shown below. Calculate the distance traveled by the spider.
Creepy CrawliesWarm-up
A spider is crawling on a 18” x 18” square window. The path of the spider is shown below. Calculate the distance traveled by the spider.
18
18
We know that each leg is 18” and we are looking for the length of the diagonal or the hypotenuse.
c
Do The Right ThingTelevision sizes are described by the diagonal measurement across the screen. The rectangular screen of John’s television set measures 12 inches by 16 inches. What is the size of his television to the nearest inch?
John has a 20-inch set.
To solve for c, do the opposite of
squaring a number which is to find the
square root.
Do The Right ThingA 10-foot long piece of lumber is leaning against a wall. The bottom of the piece of lumber is 8 feet from the base of a wall. How high up the wall does the piece of lumber reach?
Form a ZERO PAIR to get b2 by itself!
To solve for b, do the opposite of squaring a number which is to
find the square root.
The piece of lumber reaches 6 feet up the wall.
Finding Pythagorus
Identify a Rectangular Shapes in the Room.
Practice finding missing measurements using Pythagorean Theorem.
Finding PythagorusDirections
• Part One – Calculate the hypotenuse– Find a rectangle in the
room– Measure the length and
width (a and b) in inches– Draw a sketch– Calculate the diagonal ( c )
and show work– Check your answer by
measuring the diagonal
• Part Two – Calculate the side– Find another rectangle in the
room– Measure the width and the
diagonal ( a and c)– Draw a sketch– Calculate the length of
rectangle (b) and show work
– Check you answer by measuring the length of the
rectangle.
Work in Pairs. Materials: tape measure or meter stick, calculator.
Pythagorean Theorem PosterIndividual Project
• Model Geometric Proof• Examples of Solving
Real-World Problems with Pythagorean Theorem
• Pythagorean Spiral
Pythagorean Theorem Triples
Identify Pythagorean Theorem Triples.
Find missing measurements using triples
Pythagorean Triples
When the three side lengths of a right triangle are all whole numbers, such as 3, 4, 5 or 5, 12, 13, the set of three side lengths is known as Pythagorean Triples.
Pythagorean Triples
What do you notice that’s similar between these sets of triples?
3 4 5
9 12 15
If you If you multiply multiply 33, , 44, and , and 5 5 by by 33, you will , you will get 9, 12, get 9, 12, and 15.and 15.
If you If you multiply multiply 55, , 1212, and , and 13 13 by by 22, you , you will get 10, will get 10, 24, and 24, and 26.26.
Any Multiple of A Pythagorean Triple is also a Pythagorean Triple!
Generating Pythagorean TriplesThere are an infinite number of Pythagorean Triples. Greek philosopher Plato discovered a way to generate some of them.
For any number, n, the legs of a right triangle are 2n and n2 - 1 and the hypotenuse is n2 + 1.
For example, for n = 5, the Pythagorean Triple is 10 or 2 x 5, 24 or 52-1 and 26 or 52+1. So the Pythagorean triple is 10, 24, 26.
Proof:
102 + 242 = 262
100 + 576 = 676
In ancient Egypt there were men called “rope-stretchers.” They discovered that if a rope was tied in a circle with 12 evenly spaced knots that it could be used to form a right triangle. This technique enabled them to ensure that the foundations of their buildings were square (90 degree angles at each corner).
Work with your team to come up with an explanation of their method.
Rope-Stretchers(Monday)