CIRCLES DEFINITIONS TRIANGLES ANGLES SEGMENTS & LINES 1pt 1 pt 1 pt 1pt 1 pt 2 pt 2 pt 2pt 2pt 2 pt 3 pt 3 pt 3 pt 3 pt 3 pt 4 pt 4 pt 4pt 4 pt 4pt 5pt 5 pt 5 pt 5 pt 5 pt IT IS A CHORD THAT PASSES THROUGH THE CENTER OF THE CIRCLE WHAT IS A DIAMETER?

ByMathemania. Chapter 6 and 7. Review for Test 2. Review for Test 2. Triangles II. Angles. Graphs. Triangles I. Misc. 5. 5. 5. 5. 5. 10. 10. 10. 10. 10. 25. 25. 25. 25. 25. 50. 50. 50. 50. 50. 100. 100. 100. 100. 100. Final Round. Triangle I. 4. x. 3.

ByThe Pythagorean Theorem. Presented by: Tanya Van Dam Kalles Junior High Algebra 2 Spring 2000. Pythagoras. Lived in southern Italy during the sixth century B.C. Considered the first true mathematician Used mathematics as a means to understand the natural world

ByAngles. Look around the room. Have you ever noticed all of the angles. The angles of corners, objects on your desk. Even the angle your elbow makes when you lean on the desk. Types of Angles. Right Angle. Acute Angle. Obtuse Angle. Right Angles.

ByCiphering Practice. August 20, 2007. If , what are the values of k , such that ?. If you ask Batman’s nemesis, Catwoman, how many cats she has, she answers with a riddle: “Five-sixths of my cats plus seven.” How many cats does Catwoman have?.

ByIDENTIFYING TRIANGLES. They are everywhere . IDENTIFY TRIANGLES. By sides By angles. Isosceles Triangle. At least two sides are congruent. Equilateral Triangle. All sides are congruent. Scalene Triangle. No sides are congruent. Equiangular Triangle. All angles are congruent.

By4.6 Congruence in Right Triangles. Chapter 4 Congruent Triangles. 4.6 Congruence in Right Triangles. Right Triangle. Hypotenuse. Leg. Leg. *The Hypotenuse is the longest side and is always across from the right angle*. Pythagorean Theorem. a 2 + b 2 = c 2. c.

ByTHEOREM OF PYHTAGORAS AND GSP FOR GOLDEN RECTANGLE, REGULAR PENTAGON AND QUADRATURE. Paul Sexton Buena Park High School psexton@fjuhsd.k12.ca.us. Armando M. Martinez-Cruz CSU Fullerton Amartinez-cruz@fullerton.edu. Presented at CMC-Palm Springs Nov. 4, 2006. Outline of Presentation.

ByPythagorean Theorem. various visualizations. Pythagorean Theorem. If this was part of a face-to-face lesson, I would cut out four right triangles for each pair of participants and ask you to discover these visualizations of why the Pythagorean Theorem is true.

By4.1 Triangles and Angles. Classifying Triangles. Triangle Classification by Sides. Equilateral 3 congruent sides. Isosceles At least 2 congruent sides. Scalene No congruent sides. Triangle Classification by Angles. Equilangular 3 congruent angles. Acute 3 acute angles. Obtuse

ByFuzzy Relations and Functions. By P. D. Olivier, Ph.D., P.E. From Driankov, Hellendoorn, Reinfrank. Classical to Fuzzy Relations. A classical relation is a set of tuples Binary relation (x,y) Ternary relation (x,y,z) N-ary relation (x 1 ,…x n ) Connection with Cross product

ByThe New. Math Family Feud. Game 1. A triangle has a base of length 13 and the other two sides are equal in length. If the lengths of the sides of the triangle are integers, what is the shortest possible length of a side?.

ByGeometry. By: Maurice Partner Teacher: Mrs. Minchew. Lines. A line is a collection of points along a straight path that goes on and on in opposite directions. A line has no endpoints. Angles.

ByProving Triangles Congruent. Lesson 4-4. (AAS, HL). A. D. D. A. B. C. F. E. B. C. F. E. Postulates. If two angles and a non included side of one triangle are congruent to the corresponding two angles and side of a second triangle, then the two triangles are congruent. AAS.

ByThe Pythagorean Theorem. From The Simpson’s Homer copies the Scarecrow on The Wizard of Oz . The Pythagorean Theorem. The sum of the square of the two sides of a right triangle is equal to the square of the hypotenuse.

By10.5 Tangents & Secants. Objectives. Use properties of tangents Solve problems using circumscribed polygons. k. j. Tangents and Secants. A tangent is a line in the plane of a circle that intersects the circle in exactly one point. Line j is a tangent.

ByProving Pythagoras. By Marshall Knauf Bhaskara’s Second Proof of the Pythagorean Theorem. Step One. Start with a right triangle Legs= a, b Hypotenuse= c. c. a. b. Step Two. A. We label the triangle with lines a, b, and c Points A, B, and C Lines x, y Altitude h. a. b. h. B. x.

By9.3 The Converse of the Pythagorean Theorem. Geometry Mrs. Spitz Spring 2005. Objectives/Assignment. Use the Converse of the Pythagorean Theorem to solve problems. Use side lengths to classify triangles by their angle measures. Assignment: pp. 545-547 #1-35 Assignment due today: 9.2

By5.1 Special Right Triangles. *You will be able to find the lengths of sides of special right triangles. 45-45-90 And 30-60-90. Special Right Triangles. Leg:Leg:Hypotenuse. Short Leg:Long Leg:Hypotenuse. We will use a reference triangle to set up a proportion then solve. .

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