NOTA" stands for none of these answers." Figures are not drawn to scale.
|
|
- Scot Daniel
- 5 years ago
- Views:
Transcription
1 NOTA" stands for none of these answers." Figures are not drawn to scale. 1. If Kyle does not do his homework, then he is lazy. Kyle is lazy. Which of the following must be true? a) Kyle never does his homework b) Kyle always does his homework c) If Kyle does his homework, then he is not lazy d) If Kyle is not lazy, then he does his homework 2. If ΔABC has m A=20 o and m B=40 o, then what is the degree measure of C? a) 30 o b) 40 o c) 60 o d) 120 o 3. What is the perimeter in units of an equilateral triangle with side length 2? a) b) 3 c) 6 d) 8 4. In ΔABC, AC=BC=4 and AB=1. E is a point on segment. If P is the maximum value of BE+AE and Q is the minimum value of BE+AE, then what is P-Q? a) 1 b) 3 c) 5 d) 7 5. Find the perimeter in units of a square inscribed in a triangle with side lengths 5, 5, and 6 if one side of the square lies on the side of the triangle with length 6. a) b) c) d) 6. Find the sum of the coordinates of the centroid of a triangle with vertices at (4, ), (5, ), and (6,1). a) 4 b) 5 c) 6 d) 7 1
2 7. Refer to the diagram below. In equilateral triangle ΔABC with side length 3 inches, points D and E trisect, G is on,, and. Find the perimeter of quadrilateral ADGF in inches. a) 3 b) 4 c) 5 d) 6 8. How many sides does a dodecagon have? a) 10 b) 12 c) 14 d) Rectangle ABCD has side lengths 8 and 15 units. A right triangle with a right angle at point B and its legs extending along and is constructed such that point D bisects its hypotenuse. Find the length, in units, of the right triangle's hypotenuse. a) 32 b) 34 c) 36 d) Consider the following diagram of unit square ABCD. Point E is on, point G is on, and AE=. Point H on is projected onto at point F, and FG=AE. H is also projected onto at point I. Find the value of IH HF. 2
3 a) b) c) d) In ΔABC, AB=1, AC=3, and BC is an integer. The angle bisector through C intersects at point E. CE can be expressed in the simplest radical form for a,b Z +. Find the value of a+b. a) 32 b) 35 c) 37 d) In ΔABC, the angle bisector of A intersects at a right angle. If AC=4 and m B=45 o, then the perimeter of ΔABC can be written in the simplest radical form a+b for a,b,c Z +. Find the value of a + b + c. a) 4 b) 8 c) 14 d) Find the sum of all k such that the line through points (7,k) and (2,0) is parallel to the line through points (k-2,3) and (2k,6). a) -2 b) 2 c) -8 d) Refer to the diagram below. A quadrilateral is formed by intersecting unit square ABCD with unit equilateral triangle EFG. Point B lies on the centroid of ΔEFG and. intersects with at point Y. Find the length of segment. 3
4 a) b) c) d) 15. Which of the following statements is always true regarding parallel lines and a transversal? a) Vertical angles are supplementary. b) Consecutive interior angles are congruent. c) Alternate interior angles are congruent. d) Corresponding angles are complementary. 16. Right triangle ΔABC has a right angle at vertex A and AC>AB. Point D is the foot of the altitude from vertex A. If CD-BD=1, then find the value of AC 2 -AB 2 in terms of BC. a) b) c) BC d) BC 17. Which of the following is a polygon with 10 sides? a) dodecahedron b) decagon c) dodecagon d) decahedron 18. Which of the following methods cannot be directly used to prove two triangles are similar? a) SSS b) AA c) SAS d) SSA 19. How many diagonals are in a convex 60-gon? 4
5 a) 172 b) 1710 c) 1770 d) A convex n-gon is divided into only triangles by segments connecting (not necessarily all) its vertices. Express the fewest number of triangles that can be formed in terms of n. a) n-2 b) n-1 c) n d) n A triangle has side lengths 3x+2, x+1, and 2x+3 for real x. Which of the following is the domain of x? a) all reals b) reals strictly greater than -1 c) reals greater than or equal to -1 d) positive reals 22. In right triangle ΔABC, the altitude dropped from A to hypotenuse intersects at point D. Given that BD=5 and CD=4, what is the length in units of? a) 4.5 b) 10 c) 2 d) A right triangle with hypotenuse 1 has an equilateral triangle constructed outwards from each side. Find the side length in units of the equilateral triangle formed by the centroids of the three constructed equilateral triangles. a) 1 b) c) d) 24. Tianbo is on a hoverpad moving straight ahead towards a skyscraper at 10 meters per second, and his eye level is 10 meters above ground. If he spots the base of a skyscraper at an angle of depression of 45 o, then how long from the time the angle of depression is 45 o will it take for him to reach the skyscraper? a) 1 second b) 10 seconds c) 100 seconds d) 1000 seconds 5
6 25. What is formed when three or more coplanar, nonintersecting line segments of different lengths are connected at their ends to form a closed figure? a) regular polygon b) rhombus c) scalene triangle d) irregular polygon 26. In trapezoid ABCD, m C=m D=60 o. Point E is on segment such that m AEB=30 o. A line through D perpendicular to meets at point G. Given that BG=1 and CD=2, find the length of. a) 3- b) 1+ c) 3+ d) Find the degree measure of one interior angle of a regular convex hexagon. a) 90 o b) 110 o c) 120 o d) 150 o 6
7 28. In ΔABC, AC=6 and BC=5. Let M be the midpoint of. Given that is perpendicular to the angle bisector of BAC, then find the perimeter in units of ΔABC. a) 13 b) 14 c) 15 d) If p q is always true and q r is always true, then which of the following statements must apply? a) p r is always true b) p r is sometimes true c) p r is never true d) r p is always true 30. Find the maximum height (distance between two parallel sides) in units of a rhombus with side length 1. a) b) c) 1 d) 7
Any questions about the material so far? About the exercises?
Any questions about the material so far? About the exercises? Here is a question for you. In the diagram on the board, DE is parallel to AC, DB = 4, AB = 9 and BE = 8. What is the length EC? Polygons Definitions:
More informationGeometry Review for Test 3 January 13, 2016
Homework #7 Due Thursday, 14 January Ch 7 Review, pp. 292 295 #1 53 Test #3 Thurs, 14 Jan Emphasis on Ch 7 except Midsegment Theorem, plus review Betweenness of Rays Theorem Whole is Greater than Part
More informationGeometry Unit 6 Properties of Quadrilaterals Classifying Polygons Review
Geometry Unit 6 Properties of Quadrilaterals Classifying Polygons Review Polygon a closed plane figure with at least 3 sides that are segments -the sides do not intersect except at the vertices N-gon -
More informationPostulates, Theorems, and Corollaries. Chapter 1
Chapter 1 Post. 1-1-1 Through any two points there is exactly one line. Post. 1-1-2 Through any three noncollinear points there is exactly one plane containing them. Post. 1-1-3 If two points lie in a
More informationProving Theorems about Lines and Angles
Proving Theorems about Lines and Angles Angle Vocabulary Complementary- two angles whose sum is 90 degrees. Supplementary- two angles whose sum is 180 degrees. Congruent angles- two or more angles with
More informationGeometry Final Exam - Study Guide
Geometry Final Exam - Study Guide 1. Solve for x. True or False? (questions 2-5) 2. All rectangles are rhombuses. 3. If a quadrilateral is a kite, then it is a parallelogram. 4. If two parallel lines are
More informationGeometry Ch 7 Quadrilaterals January 06, 2016
Theorem 17: Equal corresponding angles mean that lines are parallel. Corollary 1: Equal alternate interior angles mean that lines are parallel. Corollary 2: Supplementary interior angles on the same side
More informationFor all questions, E. NOTA means none of the above answers is correct. Diagrams are NOT drawn to scale.
For all questions, means none of the above answers is correct. Diagrams are NOT drawn to scale.. In the diagram, given m = 57, m = (x+ ), m = (4x 5). Find the degree measure of the smallest angle. 5. The
More informationVideos, Constructions, Definitions, Postulates, Theorems, and Properties
Videos, Constructions, Definitions, Postulates, Theorems, and Properties Videos Proof Overview: http://tinyurl.com/riehlproof Modules 9 and 10: http://tinyurl.com/riehlproof2 Module 9 Review: http://tinyurl.com/module9livelesson-recording
More informationAn Approach to Geometry (stolen in part from Moise and Downs: Geometry)
An Approach to Geometry (stolen in part from Moise and Downs: Geometry) Undefined terms: point, line, plane The rules, axioms, theorems, etc. of elementary algebra are assumed as prior knowledge, and apply
More informationUnit 2: Triangles and Polygons
Unit 2: Triangles and Polygons Background for Standard G.CO.9: Prove theorems about lines and angles. Objective: By the end of class, I should Using the diagram below, answer the following questions. Line
More information3. Given the similarity transformation shown below; identify the composition:
Midterm Multiple Choice Practice 1. Based on the construction below, which statement must be true? 1 1) m ABD m CBD 2 2) m ABD m CBD 3) m ABD m ABC 1 4) m CBD m ABD 2 2. Line segment AB is shown in the
More informationFebruary Regional Geometry Individual Test
Calculators are NOT to be used for this test. For all problems, answer choice E, NOTA, means none of the above answers is correct. Assume all measurements to be in units unless otherwise specified; angle
More information1. AREAS. Geometry 199. A. Rectangle = base altitude = bh. B. Parallelogram = base altitude = bh. C. Rhombus = 1 product of the diagonals = 1 dd
Geometry 199 1. AREAS A. Rectangle = base altitude = bh Area = 40 B. Parallelogram = base altitude = bh Area = 40 Notice that the altitude is different from the side. It is always shorter than the second
More informationGeometry/Trigonometry Unit 5: Polygon Notes Period:
Geometry/Trigonometry Unit 5: Polygon Notes Name: Date: Period: # (1) Page 270 271 #8 14 Even, #15 20, #27-32 (2) Page 276 1 10, #11 25 Odd (3) Page 276 277 #12 30 Even (4) Page 283 #1-14 All (5) Page
More informationName: Extra Midterm Review January 2018
Name: Extra Midterm Review January 2018 1. Which drawing best illustrates the construction of an equilateral triangle? A) B) C) D) 2. Construct an equilateral triangle in which A is one vertex. A 3. Construct
More informationPoints, lines, angles
Points, lines, angles Point Line Line segment Parallel Lines Perpendicular lines Vertex Angle Full Turn An exact location. A point does not have any parts. A straight length that extends infinitely in
More informationQuestion2: Which statement is true about the two triangles in the diagram?
Question1: The diagram shows three aid stations in a national park. Choose the values of x, y, and z that COULD represent the distances between the stations. (a) x = 7 miles, y = 8 miles, z = 18 miles
More informationPolygon. Note: Each segment is called a side. Each endpoint is called a vertex.
Polygons Polygon A closed plane figure formed by 3 or more segments. Each segment intersects exactly 2 other segments at their endpoints. No 2 segments with a common endpoint are collinear. Note: Each
More informationB = the maximum number of unique scalene triangles having all sides of integral lengths and perimeter less than 13
GEOMETRY TEAM #1 A = the m C in parallelogram ABCD with m B= (4x+ 15), m D= (6x+ ) B = the degree measure of the smallest angle in triangle ABC with m A= ( x+ 0), m B= ( x+ 7), m C= (x 15) Find the value
More informationName: Date: Period: Chapter 11: Coordinate Geometry Proofs Review Sheet
Name: Date: Period: Chapter 11: Coordinate Geometry Proofs Review Sheet Complete the entire review sheet (on here, or separate paper as indicated) h in on test day for 5 bonus points! Part 1 The Quadrilateral
More informationSecondary Math II Honors. Unit 4 Notes. Polygons. Name: Per:
Secondary Math II Honors Unit 4 Notes Polygons Name: Per: Day 1: Interior and Exterior Angles of a Polygon Unit 4 Notes / Secondary 2 Honors Vocabulary: Polygon: Regular Polygon: Example(s): Discover the
More informationTeacher: Mr. Samuels. Name: 1. 2
Teacher: Mr. Samuels Name: 1. 2 As shown in the diagram below of ΔABC, a compass is used to find points D and E, equidistant from point A. Next, the compass is used to find point F, equidistant from points
More informationPeriod: Date Lesson 13: Analytic Proofs of Theorems Previously Proved by Synthetic Means
: Analytic Proofs of Theorems Previously Proved by Synthetic Means Learning Targets Using coordinates, I can find the intersection of the medians of a triangle that meet at a point that is two-thirds of
More informationDEFINITIONS. Perpendicular Two lines are called perpendicular if they form a right angle.
DEFINITIONS Degree A degree is the 1 th part of a straight angle. 180 Right Angle A 90 angle is called a right angle. Perpendicular Two lines are called perpendicular if they form a right angle. Congruent
More informationU4 Polygon Notes January 11, 2017 Unit 4: Polygons
Unit 4: Polygons 180 Complimentary Opposite exterior Practice Makes Perfect! Example: Example: Practice Makes Perfect! Def: Midsegment of a triangle - a segment that connects the midpoints of two sides
More informationContents. Lines, angles and polygons: Parallel lines and angles. Triangles. Quadrilaterals. Angles in polygons. Congruence.
Colegio Herma. Maths Bilingual Departament Isabel Martos Martínez. 2015 Contents Lines, angles and polygons: Parallel lines and angles Triangles Quadrilaterals Angles in polygons Congruence Similarity
More informationUnit 6 Polygons and Quadrilaterals
6.1 What is a Polygon? A closed plane figure formed by segments that intersect only at their endpoints Regular Polygon- a polygon that is both equiangular and equilateral Unit 6 Polygons and Quadrilaterals
More informationtheorems & postulates & stuff (mr. ko)
theorems & postulates & stuff (mr. ko) postulates 1 ruler postulate The points on a line can be matched one to one with the real numbers. The real number that corresponds to a point is the coordinate of
More informationGeometry. Geometry is one of the most important topics of Quantitative Aptitude section.
Geometry Geometry is one of the most important topics of Quantitative Aptitude section. Lines and Angles Sum of the angles in a straight line is 180 Vertically opposite angles are always equal. If any
More informationGEOMETRY COORDINATE GEOMETRY Proofs
GEOMETRY COORDINATE GEOMETRY Proofs Name Period 1 Coordinate Proof Help Page Formulas Slope: Distance: To show segments are congruent: Use the distance formula to find the length of the sides and show
More informationUnit 5 Test Date Block
Geometry B Name Unit 5 Test Date Block 60 ANSWERS Directions: This test is written to cover Unit 5. Please answer each question to the best of your ability. If multiple steps are required, it is expected
More informationa) 1/3 area of triangle ABC b) 3.6 c) 3 d) e) Euclid s fifth postulate is equivalent to: Given a line and a point not on that line
1. Given is a right triangle with AD a perpendicular from the right angle to the hypotenuse, find the length of AD given AB = 6, BC = 10 and AC = 8. B D A C a) 7.5 b) 6.5 c) 4.8 d) e) 2. Using the figure
More informationIf two sides and the included angle of one triangle are congruent to two sides and the included angle of 4 Congruence
Postulates Through any two points there is exactly one line. Through any three noncollinear points there is exactly one plane containing them. If two points lie in a plane, then the line containing those
More informationProving Triangles and Quadrilaterals Satisfy Transformational Definitions
Proving Triangles and Quadrilaterals Satisfy Transformational Definitions 1. Definition of Isosceles Triangle: A triangle with one line of symmetry. a. If a triangle has two equal sides, it is isosceles.
More informationUnderstanding Quadrilaterals
Understanding Quadrilaterals Parallelogram: A quadrilateral with each pair of opposite sides parallel. Properties: (1) Opposite sides are equal. (2) Opposite angles are equal. (3) Diagonals bisect one
More informationGeometry Christmas Break
Name: Date: Place all answers for Part. A on a Scantron. 1. In the diagram below, congruent figures 1, 2, and 3 are drawn. 3. Which figure can have the same cross section as a sphere? Which sequence of
More informationA closed plane figure with at least 3 sides The sides intersect only at their endpoints. Polygon ABCDEF
A closed plane figure with at least 3 sides The sides intersect only at their endpoints B C A D F E Polygon ABCDEF The diagonals of a polygon are the segments that connects one vertex of a polygon to another
More informationLesson 9: Coordinate Proof - Quadrilaterals Learning Targets
Lesson 9: Coordinate Proof - Quadrilaterals Learning Targets Using coordinates, I can find the intersection of the medians of a triangle that meet at a point that is two-thirds of the way along each median
More informationGEOMETRY is the study of points in space
CHAPTER 5 Logic and Geometry SECTION 5-1 Elements of Geometry GEOMETRY is the study of points in space POINT indicates a specific location and is represented by a dot and a letter R S T LINE is a set of
More informationadded to equal quantities, their sum is equal. Same holds for congruence.
Mr. Cheung s Geometry Cheat Sheet Theorem List Version 6.0 Updated 3/14/14 (The following is to be used as a guideline. The rest you need to look up on your own, but hopefully this will help. The original
More informationM2 GEOMETRY REVIEW FOR MIDTERM EXAM
M2 GEOMETRY REVIEW FOR MIDTERM EXAM #1-11: True or false? If false, replace the underlined word or phrase to make a true sentence. 1. Two lines are perpendicular if they intersect to form a right angle.
More informationTerm: Definition: Picture:
10R Unit 7 Triangle Relationships CW 7.8 HW: Finish this CW 7.8 Review for Test Answers: See Teacher s Website Theorem/Definition Study Sheet! Term: Definition: Picture: Exterior Angle Theorem: Triangle
More informationLesson 4.3 Ways of Proving that Quadrilaterals are Parallelograms
Lesson 4.3 Ways of Proving that Quadrilaterals are Parallelograms Getting Ready: How will you know whether or not a figure is a parallelogram? By definition, a quadrilateral is a parallelogram if it has
More informationUnit 3: Triangles and Polygons
Unit 3: Triangles and Polygons Background for Standard G.CO.9: Prove theorems about triangles. Objective: By the end of class, I should Example 1: Trapezoid on the coordinate plane below has the following
More informationIndiana State Math Contest Geometry
Indiana State Math Contest 018 Geometry This test was prepared by faculty at Indiana University - Purdue University Columbus Do not open this test booklet until you have been advised to do so by the test
More information2011 James S. Rickards Fall Invitational Geometry Team Round QUESTION 1
QUESTION 1 In the diagram above, 1 and 5 are supplementary and 2 = 6. If 1 = 34 and 2 = 55, find 3 + 4 + 5 + 6. QUESTION 2 A = The sum of the degrees of the interior angles of a regular pentagon B = The
More information3. The sides of a rectangle are in ratio fo 3:5 and the rectangle s area is 135m2. Find the dimensions of the rectangle.
Geometry B Honors Chapter Practice Test 1. Find the area of a square whose diagonal is. 7. Find the area of the triangle. 60 o 12 2. Each rectangle garden below has an area of 0. 8. Find the area of the
More informationTerm Definition Figure
Notes LT 1.1 - Distinguish and apply basic terms of geometry (coplanar, collinear, bisectors, congruency, parallel, perpendicular, etc.) Term Definition Figure collinear on the same line (note: you do
More informationGeometry CST Questions (2008)
1 Which of the following best describes deductive reasoning? A using logic to draw conclusions based on accepted statements B accepting the meaning of a term without definition C defining mathematical
More informationChapter 8. Quadrilaterals
Chapter 8 Quadrilaterals 8.1 Find Angle Measures in Polygons Objective: Find angle measures in polygons. Essential Question: How do you find a missing angle measure in a convex polygon? 1) Any convex polygon.
More informationA. 180 B. 108 C. 360 D. 540
Part I - Multiple Choice - Circle your answer: REVIEW FOR FINAL EXAM - GEOMETRY 2 1. Find the area of the shaded sector. Q O 8 P A. 2 π B. 4 π C. 8 π D. 16 π 2. An octagon has sides. A. five B. six C.
More informationGeometry First Semester Practice Final (cont)
49. Determine the width of the river, AE, if A. 6.6 yards. 10 yards C. 12.8 yards D. 15 yards Geometry First Semester Practice Final (cont) 50. In the similar triangles shown below, what is the value of
More informationSelect the best answer. Bubble the corresponding choice on your scantron. Team 13. Geometry
Team Geometry . What is the sum of the interior angles of an equilateral triangle? a. 60 b. 90 c. 80 d. 60. The sine of angle A is. What is the cosine of angle A? 6 4 6 a. b. c.. A parallelogram has all
More information1) AB CD 2) AB = CD 3) AE = EB 4) CE = DE
1 In trapezoid RSTV with bases RS and VT, diagonals RT and SV intersect at Q. If trapezoid RSTV is not isosceles, which triangle is equal in area to RSV? 1) RQV 2) RST 3) RVT 4) SVT 2 In the diagram below,
More informationName: Period: Date: Geometry Midyear Exam Review. 3. Solve for x. 4. Which of the following represent a line that intersects the line 2y + 3 = 5x?
Name: Period: Date: Geometry Midyear Exam Review 1. Triangle ABC has vertices A(-2, 2), B(0, 6), and C(7, 5). a) If BD is an altitude, find its length. b) XY is the midsegment parallel to AC. Find the
More informationExamples: Identify the following as equilateral, equiangular or regular. Using Variables: S = 180(n 2)
Ch. 6 Notes 6.1: Polygon Angle-Sum Theorems Examples: Identify the following as equilateral, equiangular or regular. 1) 2) 3) S = 180(n 2) Using Variables: and Examples: Find the sum of the interior angles
More informationAnswer Key. 1.1 Basic Geometric Definitions. Chapter 1 Basics of Geometry. CK-12 Geometry Concepts 1
1.1 Basic Geometric Definitions 1. WX, XW, WY, YW, XY, YX and line m. 2. Plane V, Plane RST, Plane RTS, Plane STR, Plane SRT, Plane TSR, and Plane TRS. 3. 4. A Circle 5. PQ intersects RS at point Q 6.
More informationGeometry Third Quarter Study Guide
Geometry Third Quarter Study Guide 1. Write the if-then form, the converse, the inverse and the contrapositive for the given statement: All right angles are congruent. 2. Find the measures of angles A,
More informationCongruent triangles/polygons : All pairs of corresponding parts are congruent; if two figures have the same size and shape.
Jan Lui Adv Geometry Ch 3: Congruent Triangles 3.1 What Are Congruent Figures? Congruent triangles/polygons : All pairs of corresponding parts are congruent; if two figures have the same size and shape.
More informationQ3 Exam Review Date: Per:
Geometry Name: Q3 Exam Review Date: Per: Show all your work. Box or circle your final answer. When appropriate, write your answers in simplest radical form, as a simplified improper fraction, AND as a
More information5.6notes November 13, Based on work from pages , complete In an isosceles triangle, the &
chapter 5 Based on work from pages 178-179, complete In an isosceles triangle, the & & & drawn from the vertex angle of an isosceles triangle are the! 5.1 Indirect proof. G: DB AC F is the midpt. of AC
More informationpd 3notes 5.4 November 09, 2016 Based on work from pages , complete In an isosceles triangle, the &
chapter 5 Based on work from pages 178-179, complete In an isosceles triangle, the & & & drawn from the vertex angle of an isosceles triangle are the! 5.1 Indirect proof. G: DB AC F is the midpt. of AC
More informationParallelograms. MA 341 Topics in Geometry Lecture 05
Parallelograms MA 341 Topics in Geometry Lecture 05 Definitions A quadrilateral is a polygon with 4 distinct sides and four vertices. Is there a more precise definition? P 1 P 2 P 3 09-Sept-2011 MA 341
More informationPROPERTIES OF TRIANGLES AND QUADRILATERALS
Mathematics Revision Guides Properties of Triangles, Quadrilaterals and Polygons Page 1 of 22 M.K. HOME TUITION Mathematics Revision Guides Level: GCSE Higher Tier PROPERTIES OF TRIANGLES AND QUADRILATERALS
More informationLines Plane A flat surface that has no thickness and extends forever.
Lines Plane A flat surface that has no thickness and extends forever. Point an exact location Line a straight path that has no thickness and extends forever in opposite directions Ray Part of a line that
More informationGeometry Period Unit 2 Constructions Review
Name 2-7 Review Geometry Period Unit 2 Constructions Review Date 2-1 Construct an Inscribed Regular Hexagon and Inscribed equilateral triangle. -Measuring radius distance to make arcs. -Properties of equilateral
More informationTENTH YEAR MATHEMATICS
10 The University of the State of New York REGENTS HIGH SCHOOL EXAMINATION TENTH YEAR MATHEMATICS Wednesday, August 16, 1967-8 :30 to 11 :30 a.m., only The last page of the booklet is the answer sheet,
More informationFGCU Invitational Geometry Individual 2014
All numbers are assumed to be real. Diagrams are not drawn to scale. For all questions, NOTA represents none of the above answers is correct. For problems 1 and 2, refer to the figure in which AC BC and
More information0613ge. Geometry Regents Exam 0613
wwwjmaporg 0613ge 1 In trapezoid RSTV with bases and, diagonals and intersect at Q If trapezoid RSTV is not isosceles, which triangle is equal in area to? 2 In the diagram below, 3 In a park, two straight
More informationGeometry Third Quarter Study Guide
Geometry Third Quarter Study Guide 1. Write the if-then form, the converse, the inverse and the contrapositive for the given statement: All right angles are congruent. 2. Find the measures of angles A,
More informationJanuary Regional Geometry Team: Question #1. January Regional Geometry Team: Question #2
January Regional Geometry Team: Question #1 Points P, Q, R, S, and T lie in the plane with S on and R on. If PQ = 5, PS = 3, PR = 5, QS = 3, and RT = 4, what is ST? 3 January Regional Geometry Team: Question
More informationFirst we need a more precise, rigorous definition:
Lesson 21 Lesson 20, page 1 of 8 Glencoe Geometry Chapter 10.1 Polygons & Area We have been working with special types of polygons throughout the year. Rectangles, Squares, Trapezoids, and, yes, Triangles
More informationGeometry Final Assessment
Geometry Final Assessment Identify the choice that best completes the statement or answers the question. 1) Write a conditional statement from the following statement: a) A horse has 4 legs. b) If it has
More informationGeometry Reasons for Proofs Chapter 1
Geometry Reasons for Proofs Chapter 1 Lesson 1.1 Defined Terms: Undefined Terms: Point: Line: Plane: Space: Postulate 1: Postulate : terms that are explained using undefined and/or other defined terms
More informationTheorems, Postulates, and Properties for Use in Proofs
CP1 Math 2 Name Unit 1: Deductive Geometry: Day 21-22 Unit 1 Test Review Students should be able to: Understand and use geometric vocabulary and geometric symbols (,,, etc) Write proofs using accurate
More information6.1: Date: Geometry. Polygon Number of Triangles Sum of Interior Angles
6.1: Date: Geometry Polygon Number of Triangles Sum of Interior Angles Triangle: # of sides: # of triangles: Quadrilateral: # of sides: # of triangles: Pentagon: # of sides: # of triangles: Hexagon: #
More informationGeometry Winter Packet
Geometry Winter Packet Multiple Choice Identify the choice that best completes the statement or answers the question. 1. Which point of concurrency is equidistant from 6. Arrange the letters in order from
More informationGEOMETRY MIDTERM REVIEW
Name: GEOMETRY MIDTERM REVIEW DATE: Thursday, January 25 th, 2018 at 8:00am ROOM: Please bring in the following: Pens, pencils, compass, ruler & graphing calculator with working batteries (Calhoun will
More informationIndex COPYRIGHTED MATERIAL. Symbols & Numerics
Symbols & Numerics. (dot) character, point representation, 37 symbol, perpendicular lines, 54 // (double forward slash) symbol, parallel lines, 54, 60 : (colon) character, ratio of quantity representation
More informationGeometry Quarter 4 Test Study Guide
Geometry Quarter 4 Test Study Guide 1. Write the if-then form, the converse, the inverse and the contrapositive for the given statement: All right angles are congruent. 2. Find the measures of angles A,
More informationChapter 6.1 Medians. Geometry
Chapter 6.1 Medians Identify medians of triangles Find the midpoint of a line using a compass. A median is a segment that joins a vertex of the triangle and the midpoint of the opposite side. Median AD
More informationChapter 4 UNIT - 1 AXIOMS, POSTULATES AND THEOREMS I. Choose the correct answers: 1. In the figure a pair of alternate angles are
STD-VIII ST. CLARET SCHOOL Subject : MATHEMATICS Chapter 4 UNIT - 1 AXIOMS, POSTULATES AND THEOREMS I. Choose the correct answers: 1. In the figure a pair of alternate angles are a) and b) and c) and d)
More informationGeometry (H) Worksheet: 1st Semester Review:True/False, Always/Sometimes/Never
1stSemesterReviewTrueFalse.nb 1 Geometry (H) Worksheet: 1st Semester Review:True/False, Always/Sometimes/Never Classify each statement as TRUE or FALSE. 1. Three given points are always coplanar. 2. A
More informationMoore Catholic High School Math Department
Moore Catholic High School Math Department Geometry Vocabulary The following is a list of terms and properties which are necessary for success in a Geometry class. You will be tested on these terms during
More informationGeometry Period Unit 2 Constructions Review
Name 2-7 Review Geometry Period Unit 2 Constructions Review Date 2-1 Construct an Inscribed Regular Hexagon and Inscribed equilateral triangle. -Measuring radius distance to make arcs. -Properties of equilateral
More informationTransformations and Congruence
Name Date Class UNIT 1 Transformations and Congruence Unit Test: C 1. Draw ST. Construct a segment bisector and label the intersection of segments Y. If SY = a + b, what is ST? Explain your reasoning.
More informationChapter 1-2 Points, Lines, and Planes
Chapter 1-2 Points, Lines, and Planes Undefined Terms: A point has no size but is often represented by a dot and usually named by a capital letter.. A A line extends in two directions without ending. Lines
More informationGeometry SIA #2. Name: Class: Date: Multiple Choice Identify the choice that best completes the statement or answers the question.
Class: Date: Geometry SIA #2 Multiple Choice Identify the choice that best completes the statement or answers the question. 1. Find the value of x. a. 4 b. 8 c. 6.6 d. 6 2. Find the length of the midsegment.
More informationUnit 10 Study Guide: Plane Figures
Unit 10 Study Guide: Plane Figures *Be sure to watch all videos within each lesson* You can find geometric shapes in art. Whether determining the amount of leading or the amount of glass needed for a piece
More informationMAKE GEOMETRIC CONSTRUCTIONS
MAKE GEOMETRIC CONSTRUCTIONS KEY IDEAS 1. To copy a segment, follow the steps given: Given: AB Construct: PQ congruent to AB 1. Use a straightedge to draw a line, l. 2. Choose a point on line l and label
More informationAngles. An angle is: the union of two rays having a common vertex.
Angles An angle is: the union of two rays having a common vertex. Angles can be measured in both degrees and radians. A circle of 360 in radian measure is equal to 2π radians. If you draw a circle with
More informationLesson a: They are congruent by ASA or AAS. b: AC 9.4 units and DF = 20 units
Lesson 7.1.1 7-6. a: They are congruent by ASA or AAS. b: AC 9.4 units and DF = 20 units 7-7. Relationships used will vary, but may include alternate interior angles, Triangle Angle Sum Theorem, etc.;
More informationMgr. ubomíra Tomková GEOMETRY
GEOMETRY NAMING ANGLES: any angle less than 90º is an acute angle any angle equal to 90º is a right angle any angle between 90º and 80º is an obtuse angle any angle between 80º and 60º is a reflex angle
More informationHIGH SCHOOL. Geometry. Soowook Lee
HIGH SCHOOL Geometry Soowook Lee Chapter 4 Quadrilaterals This chapter will cover basic quadrilaterals, including parallelograms, trapezoids, rhombi, rectangles, squares, kites, and cyclic quadrilaterals.
More informationKillingly Public Schools. Grades Draft Sept. 2002
Killingly Public Schools Grades 10-12 Draft Sept. 2002 ESSENTIALS OF GEOMETRY Grades 10-12 Language of Plane Geometry CONTENT STANDARD 10-12 EG 1: The student will use the properties of points, lines,
More informationMoore Catholic High School Math Department
Moore Catholic High School Math Department Geometry Vocabulary The following is a list of terms and properties which are necessary for success in a Geometry class. You will be tested on these terms during
More informationDownloaded from
Lines and Angles 1.If two supplementary angles are in the ratio 2:7, then the angles are (A) 40, 140 (B) 85, 95 (C) 40, 50 (D) 60, 120. 2.Supplementary angle of 103.5 is (A) 70.5 (B) 76.5 (C) 70 (D)
More informationIf B is the If two angles are
If If B is between A and C, then 1 2 If P is in the interior of RST, then If B is the If two angles are midpoint of AC, vertical, then then 3 4 If angles are adjacent, then If angles are a linear pair,
More informationPoint A location in geometry. A point has no dimensions without any length, width, or depth. This is represented by a dot and is usually labelled.
Test Date: November 3, 2016 Format: Scored out of 100 points. 8 Multiple Choice (40) / 8 Short Response (60) Topics: Points, Angles, Linear Objects, and Planes Recognizing the steps and procedures for
More information