GEOMETRY http://www.mathsisfun.com/geometry/index.html Geometry is all about shapes and their properties.

Slides:

Advertisements

Similar presentations

C=π d C=2πr r=½d d=rx2 A=πr² The diameter is the longest chord. The ratio of the circumference is always …. π is a Greek letter. π can also.

Advertisements

Line A straight path that goes on forever in both directions; it is named by any two points on the line. Z Y ZY or YZ.

Points, Lines, and Shapes!

Geometry Point Line Line segment Ray Plane Parallel lines

Pleased to Meet You Five people meet in a room. Each one shakes hands with the other four. How many handshakes are there? (Hint: Draw a picture)

Students' Heights 3 feet 11 inches 46 inches

Area and Circumference of Circles. 1. Radius- any line segment that connects the center to a point on the circle VOCABULARY Radius.

Chapter 5: Plane Geometry

What Am I? Vocabulary Review Geometry. 1. I AM EXPRESSED IN SQUARE UNITS. A.VOLUME B.CIRCUMFERENCE C.AREA D.PERIMETER I KNOW THIS!

The Circle Introduction to circles Let’s investigate… Circumference

CIRCUMFERENCE AND CIRCLE

V. Martinez. We can give points names. Here there are many points.  A point is an exact location in space.

Circles. A circle is a shape with all points the same distance from its center. The distance around a circle is called its circumference. The distance.

Definition: A circle is the set of all points on a plane that is a fixed distance from the center.

Perimeter Rectangles, Squares, and Triangles Perimeter Measures the distance around the edge of any flat object. To find the perimeter of any figure,

Radius, Diameter, and Circumference of a Circle Lesson 7 (3 rd 6 Weeks) TEKS 6.6C.

1.You will explain the definition of a circle, radius, chord, diameter, circumference and arc. 2.You will name and label the terms of a circle. 3.You will.

Circumference of a Circle Parts of a circle Calculate d from r Calculate r from d Introducing pi Using C =π d C from d …. 5 circles C given radius 5 questions.

Geometry: Angle Measures. Do Now: What is the distance between R and Q? What is the distance between S and R?

Circles: Area and Circumference. Definitions Circumference: Distance around the outside of a circle Area: How many squares it takes to cover a circle.

GEOMETRYGEOMETRY Circle Terminology. Student Expectation 6 th Grade: 6.3.6C Describe the relationship between radius, diameter, and circumference of a.

  investigate the relationship between the diameter and circumference of a circle.

Tools of Geometry Chapter 1 Vocabulary Mrs. Robinson.

Area (geometry) the amount of space within a closed shape; the number of square units needed to cover a figure.

Introduction Geometric figures can be graphed in the coordinate plane, as well as manipulated. However, before sliding and reflecting figures, the definitions.

Jeopardy Geometry Circles 1 Triangles 2 Polygons 3 Formulas 4 Angles 5 Pot Luck

Circumference and Area: Circles

Geometry in Robotics Robotics 8.

Jeopardy VocabularyAnglesFind XCircleTTriangle Q $100 Q $200 Q $300 Q $400 Q $500 Q $100 Q $200 Q $300 Q $400 Q $500 Final Jeopardy.

Objective Apply formulas for perimeter, area, and circumference.

Circumference and Diameter 1/31/2006. Circumference A circle is a shape with all points the same distance from the center. It is named by the center.

CRCT Domain Review Geometry. Key Vocabulary  Radius  The distance from the center to the edge of a circle  Half of the circle’s diameter  Diameter.

Jeopardy Terminology Geometry This PowerPoint was revised from the original version from; geometry.ppt.

Transparency 1 Click the mouse button or press the Space Bar to display the answers.

Triangles & Congruency

Circumference Review. Review What is the relationship between a radius and a diameter? What does a circumference measure? What formulas do we use to calculate.

Warm Up Evaluate. Round to the nearest hundredth

Area and Perimeter.

Basic Geometric Elements Point Line Line segment Ray Parallel lines Intersecting lines Perpendicular Angles Vertex Sides.

Using a Protractor Geometry Lesson. 3 A 180 o Protractor Outside scale from 0 o to 180 o going in a clockwise direction. Inside scale from 0 o to 180.

Circles Review Grade 5 SOL 5.9 Mrs. Evan, ITRT.

Introduction & Installation. Circles A circle is a shape with all points the same distance from the center. A circle is named by the center. The circle.

Using a Protractor Geometry Lesson. 3 A 180 o Protractor Outside scale from 0 o to 180 o going in a clockwise direction. Inside scale from 0 o to 180.

Circles Review 3 rd Grade Geometry. What is the diameter of a circle?

Geometry Notes. The Language of Geometry Point: A point is a specific location in space but the point has no size or shape Line: a collection of points.

Circles Circumference and Area 6 th Grade Math LaVergne Middle School.

Angles and Shapes By: Parker and Matthew. 3 types of angles Acute angle- An angle that measures less than 90 degrees. Obtuse angle- An angle that measures.

Objective: Solve equations using area circumference, diameter, and radius.

GEOMETRY!!!. Points  A point is an end of a line segment.  It is an exact location in space.   It is represented by a small dot. Point A A.

Lesson 8.2: Naming & Measuring Angles Standard: MG 3.1, MG 3.4 Objective: Name angles. Measure angles. Find the complement and supplement.

Introduction & Installation. Circles A circle is a shape with all points the same distance from the center. A circle is named by the center. The circle.

Lesson 8.7 Concept: How to find the circumference of a circle. Guidelines: *The diameter of a circle extends from one side of the circle to the other.

Geometry Level 1. Angle names Acute angle Web animation An acute angle is between 0 and 90 degrees *Task: Draw an example of an acute angle and label.

PERIMETER AND AREA PRESENTATION 4 - circles and π UNIT 4 MATHS.

Circles Objective: SWBAT define a circle and name its parts.

Geometry Point Line Line segment Ray Plane Parallel lines

Geometry Point Line Line segment Ray Plane Parallel lines

Geometry Point Line Line segment Ray Plane Parallel lines

Using a Protractor Geometry Lesson.

Spiral TAKS Review #2 6 MINUTES.

Geometry Point Line Line segment Ray Plane Parallel lines

Types of Angles Wednesday, 10 April 2019.

Geometry Point Line Line segment Ray Plane Parallel lines

Geometry Point Line Line segment Ray Plane Parallel lines

Types of Angles Sunday, 21 July 2019.

Geometry: Circles and Circumference

Geometry Point Line Line segment Ray Plane Parallel lines

Presentation transcript:

GEOMETRY http://www.mathsisfun.com/geometry/index.html Geometry is all about shapes and their properties.

GEOMETRY

•How do you find the degree of an angle? You use a protractor! It’s a small, semi-circular tool that contains markings from 0 to 180 degrees. The way you use it is to line up one of the angle’s rays on the 0 degree line along the flat, bottom part of the protractor.

•How do you find the degree of an angle? Then you look where the other ray hits the markings. Sometimes you have to extend the line so it’s long enough to reach the markings. You can do that using the straight edge of the protractor; just line it up and make the line long enough so it reaches the markings!

How do you find the degree of an angle?

How do you find the degree of an angle?

•What are acute, obtuse, and right angles? An angle is a measure of how much space there is between two lines, measured in degrees or radians. A right angle measures exactly 90 degrees, and makes an L shape. Any angle that measures more than 90 degrees is called an obtuse angle.

•What are acute, obtuse, and right angles? An angle that is less than 90 degrees is called an acute angle. For example, when it is exactly three o’clock, the hour and minute hands make a right angle. When it is 3:10, the hands make an acute angle. When it is four o’clock, the hands make an obtuse angle.

•What are acute, obtuse, and right angles?

•What are acute, obtuse, and right angles?

•What is a ray? In geometry, lines go on forever. A ray is like a line that only goes on forever in one direction. We draw it as a line segment with an arrow on the end. An angle is made up of two rays.

•What is a ray?

Area of a Circle http://www. mathgoodies

Area of a Circle

Area of a Circle Pi = 3.14

Radius The distance around a circle is called its circumference. The distance across a circle through its center is called its diameter. We use the Greek letter (pronounced Pi) to represent the ratio of the circumference of a circle to the diameter.

Radius In the last lesson, we learned that the formula for circumference of a circle is: . For simplicity, we use = 3.14. We know from the last lesson that the diameter of a circle is twice as long as the radius. This relationship is expressed in the following formula: .

Radius The area of a circle is the number of square units inside that circle. If each square in the circle to the left has an area of 1 cm2, you could count the total number of squares to get the area of this circle. Thus, if there were a total of 28.26 squares, the area of this circle would be 28.26 cm2

Radius However, it is easier to use one of the following formulas: or where is the area, and is the radius. Let's look at some examples involving the area of a circle. In each of the three examples below, we will use = 3.14 in our calculations.