Garfield’s Proof of the Garfield’s Proof Pie- thagorean Theorem Garfield’s Proof of the.

Slides:

Advertisements

Similar presentations

Taking Action Themes: Explore, Engage, Connect & Lead (Be positive & together we will transform education!) Here are the 4 questions that I'd love for.

Advertisements

Slope of a Line Slope basically describes the steepness of a line Free powerpoints at

Lesson Objectives By the end of this lesson you should be able to:

Get. through back much go good new write out.

# 16 Dilation benchmark M. A. 7. 8

MODULE II VOCABULARY PART I. MODULE II The name of this module is “Reasoning and Proof”. In this module, we will begin a deeper understanding of proofs.

P u t y o u r h e a d o n m y s h o u l d e r.

Using Area Formulas You can use the postulates below to prove several theorems. AREA POSTULATES Postulate 22 Area of a Square Postulate Postulate 23 Area.

Chapter 10 Measurement Section 10.4 The Pythagorean Theorem.

Areas of Quadrilaterals, Triangles and Circles

Formulas… They help us find the area. They did not fall out of the sky! In Exploration 10.7, you will develop the formulas for the area of a triangle,

8.6:Perimeters and Areas of Similar Figures

Powerpoint hosted on Please visit for 100’s more free powerpoints.

Slide The Pythagorean Theorem and the Distance Formula  Special Right Triangles  Converse of the Pythagorean Theorem  The Distance Formula: An.

Geometry Section 9.4 Special Right Triangle Formulas

Presented By: Alexander Sarkissian. Pythagoras’s Theorem  First we will start with the common right triangle.  Side a= Adjacent side  Side b= Opposite.

Section 7.2 – The Quadratic Formula. The solutions to are The Quadratic Formula

Reflections 30 Reflect across y=x (x,y)  (y,x) Reflect across x-axis (x,y)  (x,-y) Reflect across y-axis (x,y)  (-x,y) Reflect across y=x Reflect across.

6.7 Area of Triangles and Quadrilaterals

Geometry 9.2 The Pythagorean Theorem October 10, 2015Geometry 9.2 The Pythagorean Theorem2 Goals Prove the Pythagorean Theorem. Solve triangles using.

DALTON DICKSON MRS. BISHOP 5 TH PERIOD How to Use Pythagorean Theorem.

ANNOTATING TEXT IN ELEMENTARY SCHOOL Anna Boyes Summer Institute 2014.

6/4/ : Analyzing Polygons 3.8: Analyzing Polygons with Coordinates G1.1.5: Given a line segment in terms of its endpoints in the coordinate plane,

Proof Quiz Review 13 Questions…Pay Attention. A postulate is this.

Pythagorean Theorem Proof Unit 4 Project Grace Olson.

Pythagorean Theorem The best known mathematical proof is named for Pythagoras.

Who am I? 3/4  I am older than dirt….and lived around 570 BCE  I was a philosopher that influenced Plato  If I could of gotten , I would of found.

[1.1] Line Symmetry. Use two pattern blocks to make:  Triangle  Rectangle  Square  Parallelogram  Rhombus  Trapezoid  Hexagon  Can you find more.

Painless Properties Justify Me Theorem Schmeorem Just.

Finding the distance between two points. (-4,4) (4,-6)

Honors Geometry Section 5.5 Special Right Triangle Formulas.

Dashing Through the Formulas Created by S.Falwell 2012 permission granted for teachers to use with link to comelearnmore.com.

The Pythagorean Theorem The Ladder Problem. Right Triangles Longest side is the hypotenuse, side c (opposite the 90 o angle) The other two sides are the.

Oak-Land Junior High Geometry Presented by: Mrs. Haugan Math.

WHO WAS HE?? Pythagoras was a mathematician who lived in around 500BC. Pythagoras was in a group of people who lived in a certain way to be very pure.

By: Alex Melnick and Brian Yoon. 3.5 – Triangle Sum Theorem The Parallel Postulate – Given a line and a point not on the line, there is one and.

Pythagoras Theorem Proof of the Pythagorean Theorem using Algebra.

Perimeter & Surface Area Today’s lesson will cover…  finding perimeter and surface area of polygons  using formulas to solve problems involving surface.

Algebra 1 Predicting Patterns & Examining Experiments Unit 5: Changing on a Plane Section 2: Get to the Point.

Bisectors in Triangles Concurrency of Perpendicular Bisector Theorem If the perpendicular bisectors PX, PY and PZ are concurrent at P, then PA = PC = PB.

Geometry 9.2 The Pythagorean Theorem June 11, 2016Geometry 9.2 The Pythagorean Theorem2 Goals I can prove the Pythagorean Theorem. I can solve triangles.

Area Chapter 10. O In your own words, write a definition for area. O Create a list of the area formulas that you know. O Rectangle O Triangle O Parallelogram.

Lesson 8-2 The Pythagorean Theorem (page 290)

Lesson 8-2 The Pythagorean Theorem (page 290) Essential Question How do you use the Pythagorean Theorem?

EXAMPLE FORMULA DEFINITION 1.

Objective: To find areas of regular polygons

6.7 Areas of Triangles and Quadrilaterals

Side Ratio Perimeter Ratio Area Ratio 1:5 1:5 1:25 4:3 4:3 16:9 3:1

Theorem The area A of a triangle is

Use algebra to write two-column proofs.

Math Humor Q: What keeps a square from moving?.

Proof No. 2 Andrew Jones Taken from

Your name and your teacher’s name

Check Homework, WS 1-6, Problems 7-25, odds:

The Benefits of Saving Money.

Unit 5: Geometric and Algebraic Connections

Basic Proof of the Pythagorean Theorem:

Ways to prove Pythagoras theorem

Area of Composite Figures

÷ 5 = 29 How many 5s are there in 1? Great!

÷ 2 = 24 How many 2s are there in 4?

If a triangle is a RIGHT TRIANGLE, then a2 + b2 = c2.

7-2 Two Proof Oriented Triangle Theorems

laboutiquedelpowerpoint.

Presentation transcript:

Garfield’s Proof

of the Garfield’s Proof

Pie- thagorean Theorem Garfield’s Proof of the

Garfield’s Proof of the Pie- thagorean Theorem

Pie-

Py

Garfield’s Proof of the Py thagorean Theorem (President)

Garfield’s Proof of the Py thagorean Theorem (President)

See Garfield eat Pie A Garfield The Cat’s Proof

President Garfield’s Proof: Examine these three triangles. a b a b c c c c Their area is

See Garfield eat Pie A See Garfield eat Pie B

ab a b c c The President’s great idea was to construct a trapezoid using these three triangles. The area formula for a trapezoid is: In this case, we get:

See me squared! This is Dr. Mena’s class, so we’ve got One Dead Cat xx

Then President Garfield noticed something astonishing!!

Thanks to Jim Davis for creating the incredibly humorous cat Video Clips/Sounds stolen liberally from And for those of you who thought I left someone important out … Thanks to Mrs. Garfield for creating the not-so-humorous but definitely smart president Production by Dead Cat Studios In conjunction with Too Much Time, Uninc.