Geometry Handbook - tumwater.k12.wa.us



Geometry Handbook 2013-14Name_________________________________________Period______ContentsIntroduction & Welcome……………………………………………………………………….. 1Textbook information……………………………………………………………………………. 1Online resources and Login information….…………………………………………… 1 Required Materials…………………………………………………………………………………… 2Grades ………………….……………………………………………………………………………………2 Graduation Requirements………………………………………………………………………. 3General Classroom Responsibilities……………………………………………………… 3Absences…………………………………………………………………………………………………… 4Homework policies……………………………….………………………………………………… 5Testing …………………………………………………………………………………………………….. 6Extra Help………………………………………………………………………………………………… 77 Habits…………………………………………………………………………………………………8Formulas you will need to memorize.........................................................9Postulates, Properties, and TheoremsChapter 1……………………………………………………………………………………… 10Chapter 2……….……………………………………………………………………………. 11Chapter 3……………………………………………………………………………………… 13Chapter 4……………………..……………………………………………………………… 15Chapter 5……………………………………………………………………………………… 16Right Triangles……………………………………………………………………………… 18Chapter 6……………………………………………………………………………………….. 19Chapter 9……………………………………….……………………………………………. 22Chapter 10…………………………………………………………………………………….. 22EOC Standards Checklist………………………………………………………………………. 23Puzzles..................................................................................................... 26Classroom Procedures & Expectations / CHAMPS………..……… Back coverTeacher ___Mr. PARASCAND_______________ Room number _102___Introduction & Welcome90995541275Welcome to Geometry! I am looking forward working with you and hope that your year is both fun and challenging. This handbook contains almost everything you need to know about this class and my expectations. Please keep it with your math notebook at all times so that you can review classroom information regularly. Geometry is one of the most useful and relevant math courses you will take in high school. We are surrounded by geometric ideas every day. Through the study of lines, polygons, circles, and solids, you will learn to apply geometry to your world. Though you will not be asked to draw on your Algebra skills every day, the ability to solve simple equations is expected regularly. Please ask for help if this is a weakness for you.Textbook information Burger, Edward, et al. Geometry. Holt, Rinehart and Winston, 2007Please have your Geometry text with you every day.Home Book number __________-57150152400Online resources and Login informationHolt online access login: bhhsgeometry1 password: wolves my.Skyward Family Accesslogin:__________________password__________________BHHS web page link Bhhsmathstandards.login: bhhswolfpack password: wolves Teacher webpage (no login necessary)BHHS web page linkOther useful sites for independent study and tutoring (khan academy) (Interactive Math; pick a topic and explore!) (Investigating Geometry) (review of Algebra and Geometry topics)Required Materials423418081280Please have the following materials with you every day. Geometry handbook and Vocabulary bookGeometry textclass notebook and pocket divider either a math binder or a section of a large bindernotebook paper (could be a composition book)graph paper (could be a composition book)writing utensil(s)highlighter pen and pencils (helpful)scientific calculatormust have SIN, COS, and TAN keyscell phone and ipod calculators are not allowed on exams.Students without a calculator will be asked tocheck one out through the library.A calculator is required on the Geometry EOC. Though a graphing calculator is accepted, it is not necessary at this level.All About GradesTSD Grading PoliciesA93% A-90% 413541778105B+87% B83% B-80%C+77%C73%C-70%D+67% D*60%*A D is not sufficient for advancement to Algebra 2Formative Assessment (preparation)10% of the gradewarm upsclass work and homeworkgroup activitiesSummative Assessment (performance)90% of the gradesection quizzesunit testsprojectsfinal examGraduation RequirementsEnd of Course Assessment (EOC)Students are required to pass one state assessment in order to graduate (Algebra EOC, Geometry EOC, or SBAC). If you did not pass the Algebra EOC, then you will be offered intervention this fall and a retest in January. The Geometry EOC will be given in late May or early June. Geometry students who passed the Algebra EOC will not be required to test. A passing score on an EOC will grant course credit, but is not sufficient for advancement to the next level.High School Math CreditBHHS students are required to earn 3 full years of math to graduate. This most likely includes Algebra 1, Geometry, and Algebra 2. Financial Literacy may replace Algebra 2 if taken in the senior year.Four-Year College EntranceFour year colleges and universities in Washington State require completion of Algebra 2 for entrance. Taking 4 full years of math, however, will improve your chances of college acceptance at competitive institutions.General Classroom responsibilitiesBe Here and Be PromptPlease take responsibility and be here, on time, every day. Absences in math class are the number one reason students struggle. Class begins at the bell.Be PreparedHave required materials with you every day. .Be Willing to TryBy completing your assigned practice every day, you will learn Geometry quickly and will minimize the need for extra help. If you get behind, get help immediately.Be HonestYou have a right to get credit for your own work. Please do not share your papers with other students so that they can copy what you spent your valuable time doing. If a friend asks you if he/she can copy your paper, try this: “I can’t let you copy my paper, but I’d be happy to help you with your assignment.” Be HelpfulWe’re in this together. Please be willing to help those around you when necessary and appropriate.Be NeatAccording to school policy, food and drink are not allowed in the classrooms or pods of the B building. In this room, I allow drinks with lids only. PLEASE …. pick up after yourself before leaving class.-109855-126365Be RespectfulCell phones and portable listening devices must be out of sight and sound at all times unless permission is given by the teacher. Please check your texts and other messages during passing time or lunch. If your parents must reach you during class time, please have them call the front office to have a message delivered to you.Repeated cell phone violations will result in an office referral.Be InformedMake it a habit to regularly check your Geometry status using Skyward and let me know if you find any errors. I expect you to take responsibility for and ownership of your progress. Please let me know if you need help with this. Please let me know if you have no internet access and I will print paper progress reports for you.Absences398589525400Whenever possible, please avoid scheduling appointments during math class. In the event of an unavoidable absence, however, please do the following:On the day(s) of the absence:Check the teacher webpage to find out what you missed in class that day. Add the assignment (if any) to your Unit Organizer.Correct your previous homework assignment.If you feel well enough and have the time, try to do the assignment from that day using the Holt online lessons for help. you return to school:Use the notebook in the back of the classroom to correct your assignment that was due on the day of the absence.Have the teacher stamp your assignment and organizer when (s)he checks the others.Turn in your organizer (if you missed a Monday)Make arrangements with the teacher to get extra help on what you missed, if needed.Homework procedures and policies10% of the gradeHow much homework should I expect?You should expect to be assigned Geometry for home practice 4-5 times per week. Homework should take 20-30 minutes.Scoring Rubric Points earned (5 possible)345Incomplete(at least half done)Complete, but lateComplete Core“An error doesn’t become a mistake until you refuse to correct it.” A. Battista-97790-6350Correcting your homeworkAny odd problems from the textbook need to be corrected using the back of your book, prior to coming to class. Even answers will be corrected in class at the beginning or end of class. You are responsible for correcting your own paper and fixing your mistakes. Please work with a neighbor to clean up your errors before we discuss the assignment as a class.Format and HeadingName SCORE Date(target) 3.1---------------------------------------------------------------------------------------------------------------------------Warm-up /Opening Activity :p. 32 #1 - 1999 odds--------------------------------------------------------------------------------------------------------------------------- Original Work Corrections / Reflection1.3.5.Late WorkLate work is due on or before the Monday after the assignment was given. No work is taken late after Monday, except in the case of excused absences.“Success is the sum of small efforts, repeated day in and day out.” Robert Collier ~ Robert CollierIf you have work to turn in late, please correct it, make your corrections, score it, and have me or the TA stamp it at your desk.Testing 90% of the grade-17335552705QuizzesQuizzes will be given about every two lessons. Scores will be recorded in the grade book as part of your summative assessment grade. Quiz retakes are expected when the score is below standard in order to prepare for the unit test. The retest score will replace the first quiz score.Testing A unit test will be given at the end of each chapter or unit of study. This handbook is always allowed on the unit tests. A section score on the unit test may replace a lower quiz grade when initiated by the student using the procedure expected by the teacher. THERE ARE NO RETAKES ON UNIT EXAMS.Active LearningWhile quiz and test scores must be the primary indicators of student learning, remember that how you use your class time and whether or not you engage in the learning will ultimately determine your preparedness for an exam. You will get out of your learning what you put into it. The following behaviors will not be counted in your semester grade but will be reported on Skyward reports.Non-academic behaviors that will be reported on Skyward:RubricAExemplaryBProficientCInconsistentFUnsatisfactoryCooperationConsistently:- Stays focused on the task and what needs to be done- Follows school and classroom rules and encourages others to do so - Self-directed and follows teacher directions - Has a positive attitude.Usually: - Focuses on the task and what needs to be done - Follows school and classroom rules?- Works independently and follows teacher directions.?- Has a positive attitude.Sometimes:- Focuses on the task and what needs to be done - Needs to be reminded of teacher directions to keep on task- Follows school and classroom rules- Has a positive attitude.Rarely:- Focuses on the task and what needs to be done- Performs classroom work without frequent remindersActively disrupts class and/or is noncompliant.Work CompletionConsistently turns in assignments on time or early. Consistently completes and corrects assignment. Consistently turns in assignments on time. Often completes and corrects assignments.Does not consistently turn in assignments complete and correct.Rarely turns in assignments complete and correct.Do you enjoy math and like helping others? Maybe you’d like to volunteer as a tutor! If you are interested in helping out, see Mrs. Mulcahy about working with Algebra and Geometry students after school or during PACK time. Community service hours are available.-56515120015“No one is useless in this world who lightens the burdens of another.” - Charles DickensExtra Help Resources532447513335Your physical and online textbooks have many additional resources available for students. Here are a few of the things that you can use to study or get extra help.In your textbookRead the section and study the plete the assigned homework if you did not do it when plete the corresponding section of the study guide at the end of the chapter.At my.Complete the extra practice handoutPrint and fill out the know-it-notebook sections.Take the interactive practice quiz or unit test.View lesson plete the interactivity, when available.Bhhsmathstandards. Print and complete reading strategies handouts and/or Reteach handouts. See your teacher for answer keys.Math CenterStudent and teacher tutors will be available in the math center on Tuesday and Thursday, 2:15 - 3:15. No appointment is necessary. Come as you are! After-school help with Mr. ParascandSee the schedule on the front board indicating which days each week that Mr. Parascand will be here after school. Let me know you're coming or just drop in!PACK timeUntil further notice, PACK time is reserved for targeted intervention and students will attend by invitation only. Please plan to use your PACK time in your 2nd period class as a study hall.Move over Stephen Covey!7 Habits of Highly Effective Math Students (as penned by Mrs. Mulcahy )4953635583565Throughout the year, you will be given several opportunities to reflect on and assess your progress in class. Though grades will inform you of your learning, you may use the following “habits” to assess your behaviors that contribute to learning.PreparationCome to class on time, with all required plete your assignments on time, ready to be turned in at the beginning of the period on the day they are due.EngagementUse your class time productively. Wasted time is wasted learning.When doing an assignment, do more than write down answers to problems; work to understand the concepts that are being studied.Take careful notes in class.Get actively involved in the lessons, both orally and mentally.PracticeComplete your assignments on time, ready to be turned in at the beginning of the period on the day they are due.Participate in prescribed in-class individual or small-group practice.Follow-throughWhen having trouble with an assignment, seek help from a friend, a teacher, the solution book, or internet resources.FeedbackAlways correct your assignments using the resources municationAsk questions of a neighbor or the teacher when you have a question during the lesson.Have someone that you can work on math with outside of class. PraiseSupport your friends and neighbors.Congratulate others on a job well done. Celebrate your own successes.4696460-5715Formulas & Factsyou will need to MEMORIZE for the EOCDistance formula:Midpoint of a segment:Slope of a line, given 2 points:The Pythagorean Theorem:Equation of a Line:Circumference of a Circle:Area of common 2-dimensional figuresRectangleTriangleParallelogramRhombus / kiteTrapezoidCircleCommon Unit Conversions1 foot = 12 inches1 yard = 3 feet1 miles = 5,280 feet1 meter = 100 centimeters1 inch = 2.54 centimetersChapter 1 Properties, Postulates and TheoremsPoints, Lines, and PlanesName or NumberWhat is SaysPicture1-1-11-1-21-1-31-1-41-1-5Segment AdditionPostulateAngle Addition PostulateChapter 2 Properties, Postulates and TheoremsGeometric ReasoningSimplifying ExpressionsDistributive Propertyab+c)=ab+acCombining Like Terms3x+5x=8xProperties of EqualityAddition Property of EqualityIf , then Subtraction Property of EqualityIf , then Multiplication Property of EqualityIf , then Division Property of EqualityIf and , then Reflexive Property of EqualitySymmetric Property of EqualityIf , then .Transitive Property of EqualityIf and , then Substitution Property of EqualityIf , then can be substituted for in any expression.Properties of CongruenceReflexive Property of Congruence:figure A figure ASymmetric Property of Congruence:If figure A figure B, then figure B figure A.If , then .Transitive Property of CongruenceIf figure A figure B and figure B figure C, then figure A figure C.If and , then .1278890-281940Theorem NameWhat it says…Key WordsPictureLinear Pair Theorem 2-6-1If two angles form a linear pair, then they are supplementary.Two anglesLinear pairSupplementaryCongruent Supplements Theorem 2-6-2If two angles are supplementary to the same angle (or to two congruent angles), then the two angles are congruent.Two anglesSupplementaryCongruentRight Angle Congruence Theorem2-6-3All right angles are congruent.Right angleCongruentCongruent Complements Theorem2-6-4If two angles are complementary to the same angle (or to two congruent angles), then the two angles are congruent.Two anglesComplementaryCongruentCommon Segments Theorem2-7-1ABCDGiven collinear points A, B, C and D arranged as shown, if , then .CollinearCongruentVertical Angles Theorem 2-7-2Vertical angles are congruent.Vertical AnglesCongruent2-7-3If two congruent angles are supplementary, then each angle is a right angle.Congruent anglesSupplementaryRight angleChapter 3 Properties, Postulates and TheoremsParallel and Perpendicular LinesGIVEN lines are parallel…Postulate or Theorem NameWhat it saysKey WordsPictureCorresponding Angles PostulateIF PARALLEL LINES ARE CUT BY A TRANSVERSAL THEN…the corresponding angles are congruent.Parallel linesTransversalCorresponding anglesAlternate Interior Angles TheoremIF PARALLEL LINES ARE CUT BY A TRANSVERSAL THEN …the alternate interior angles are congruent.Parallel linesTransversalAlternate interior anglesAlternate Exterior Angles TheoremIF PARALLEL LINES ARE CUT BY A TRANSVERSAL THEN …the alternate exterior angles are congruent.Parallel linesTransversalAlternate exterior anglesSame-side Interior Angles TheoremIF PARALLEL LINES ARE CUT BY A TRANSVERSAL THEN …the same-side interior angles are supplementary.Parallel linesTransversalSame-side interior anglesSupplementary100965194945Proving lines are parallel…Postulate or Theorem NameWhat it saysKey WordsPictureCorresponding Angles CONVERSEIf 2 coplanar lines are cut by a transversal so that a pair of corresponding angles are congruent, THEN THE LINES ARE PARALLEL.TransversalCorresponding anglesparallelAlternate Interior Angles CONVERSEIf 2 coplanar lines are cut by a transversal so that a pair of alternate interior angles are congruent, THEN THE LINES ARE PARALLEL.TransversalAlternate interior anglesparallelAlternate Exterior Angles CONVERSEIf 2 coplanar lines are cut by a transversal so that a pair of alternate exterior angles are congruent, THEN THE LINES ARE PARALLEL.TransversalAlternate exterior anglesparalleSame-side Interior Angles CONVERSEIf 2 coplanar lines are cut by a transversal so that a pair of same-side interior angles are supplementary, THEN THE LINES ARE PARALLEL.TransversalSame-side interior anglesSupplementaryparallelTheorems about perpendicular lines3-4-1If intersecting lines form a congruent linear pair, then the lines are perpendicular.Linear pairperpendicularPerpendicular Transversal TheoremIn a plane, if a transversal is perpendicular to one of 2 parallel lines, then it is perpendicular to the other.PerpendicularTransversalparallel3-4-3If 2 coplanar lines are perpendicular to the same line, then the 2 lines are parallel to each other.PerpendicularParallelChapter 4 Properties, Postulates and TheoremsCongruent TrianglesPostulate or Theorem NameWhat it saysSketch4-2Triangle Sum Theorem(4-2-1)The sum of the angle measures ofa triangle is 180°. Exterior Angle TheoremThe measure of an exterior angle is equal to the sum of its 2 remote interior angles. Third Angles Theorem(4-2-5)If two angles of one triangle are congruent to two angles of another triangle, then the third pair of angles are congruent.Ways to prove that 2 triangles are congruent4-4Side-Side-Side (SSS) CongruenceIf three sides of one triangle are congruent to three sides of another triangle, THEN THE TRIANGLES ARE CONGRENT.Side-Angle-Side (SAS) CongruenceIf two sides and the included angle of one triangle are congruent to two sides and the included angle of another triangle, THEN THE TRIANGLES ARE CONGRENT.4-5Angle-Side-Angle (ASA) CongruenceIf two angles and the included side of one triangle are congruent to two angles and the included side of another triangle,THEN THE TRIANGLES ARE CONGRENT.Angle-Angle-Side (AAS) CongruenceIf two angles and the NON-included side of one triangle are congruent to two angles and the NON-included side of another triangle, THEN THE TRIANGLES ARE CONGRENT.Hypotenuse-Leg (HL) CongruenceIf the hypotenuse and a leg of a right triangle are congruent to the same parts of another, THEN THE TRIANGLES ARE CONGRENT.4-6CPCTC(or Definition of congruent triangles)The corresponding parts (sides and angles) of congruent triangles are congruent.4-8Isosceles Triangles TheoremIf 2 sides of a triangle are congruent, then the angles opposite them (base angles) are congruent.Isosceles Triangles ConverseIf 2 angles of a triangle are congruent, then the sides opposite them are congruent.319976517145Chapter 5 Properties, Postulates and TheoremsSpecial Segments in TrianglesPostulate or Theorem NameWhat it saysSketch5-1Perpendicular Bisector Theorem(5-1-1)If a point is on the perpendicular bisector of a segment, then it is equidistant from the endpoints of the segments. Converse of the Perpendicular Bisector Theorem (5-1-2)If a point is equidistant from the endpoints of a segment, then it is on the perpendicular bisector of the segment.Angle Bisector Theorem (5-1-3)If a point is on the bisector of an angle, then it is equidistant from the sides of the angle.Converse of the Angle Bisector Theorem (5-1-4)If a point in the interior of an angle is equidistant from the sides of the angle, then it is on the bisector of the angle.Chapter 5 continued….Triangle centers / Points of Concurrency EOC allowed formulasRight Triangles21590254029781505264152964180208280Chapter 6 Properties, Postulates and TheoremsPolygons and QuadrilateralsAngle measures of a convex polygon with n sidesInterior AnglesExterior AnglesSum of all anglesMeasure of one if the polygon is REGULAR!All About a Parallelogram!Characteristics of ...Proving that it is one ...Definition: Both pairs of opposite sides are parallel.6-2-1: Both pairs of opposite sides are congruent.6-2-2: Both pairs of opposite angles are congruent6-2-3: Pairs of same-side interior angles are supplementary.6-2-4: The diagonals bisect each other.Definition: Both pairs of opposite sides are parallel.6-3-1: One pair of opposite sides are parallel and congruent.6-3-2: Both pairs of opposite sides are congruent6-3-3: Both pairs of opposite angles are congruent.6-3-4: One angle is supplementary to both consecutive angles.6-3-5: The diagonals bisect each other.Special ParallelogramsAll About a Rectangle!Characteristics of ...Proving that it is one ...Definition: A quadrilateral with four right angles.6-4-1: All rectangles are parallelograms.6-4-2: Diagonals are congruent.6-5-1: A parallelogram with one right angle6-5-2: A parallelogram with congruent diagonalsAll About a Rhombus!Characteristics of ...Proving that it is one ...Definition: A quadrilateral with four congruent sides.6-4-3: All rhombuses are parallelograms.6-4-4: Its diagonals are perpendicular.6-4-5: Each diagonal bisects a pair of opposite angles.6-5-3: A parallelogram with one pair of consecutive congruent sides6-5-4: A parallelogram with perpendicular diagonals6-5-5: A parallelogram whose diagonal bisects a pair of opposite anglesAll About a Square!Characteristics of ...Proving that it is one ...Definition: A quadrilateral with four right angles and four congruent sides.All squares are parallelograms.All squares are rectangles.All squares are rhombuses.Prove that the quadrilateral is both a rectangle and a rhombus!Other Special QuadrilateralsKiteTrapezoidIsosceles TrapezoidDefinition: A quadrilateral with exactly two pairs of consecutive, congruent sides.6-6-1: Its diagonals are perpendicular.6-6-2: Non-vertex angles are congruentOne diagonal is the perpendicular bisector of the other.One diagonal bisects each vertex angle.Definition: A quadrilateral with exactly one pair of parallel sides.Consecutive angles between the bases are supplementary.The length of the midsegment is the average of the lengths of the two bases.Definition: A trapezoid whose non-parallel sides are congruent.Base angles are congruent.Diagonals are congruent.EOC allowed formulasChapter 10EOC Standards ChecklistThe standards listed below are those that you will see tested on the EOC at the end of the year. These state requirements, however, do not make up your entire Geometry course. Additional topics are necessary as preparation for Algebra 2.Performance ExpectationTested, but doesn’t count for graduationRecord here your performance on each assessment.G.1.A. Distinguish between inductive and deductive reasoning.xG.1.C. Use deductive reasoning to prove that a valid geometric statement is true.G.1.D. Write the converse, inverse, and contrapositive of a valid proposition and determine their validity.G.1.E. Identify errors or gaps in a mathematical argument and develop counterexamples to refute invalid statements about geometric relationships.G.1.F. Distinguish between definitions and undefined geometric terms and explain the role of definitions, undefined terms, postulates (axioms), and theorems.G.2.A. Know, prove, and apply theorems about parallel and perpendicular lines.xG.2.B. Know, prove, and apply theorems about angles, including angles that arise from parallel lines intersected by a transversal.xG.2.C. Explain and perform basic compass and straightedge constructions related to parallel and perpendicular lines.xG.2.D. Describe the intersections of lines in the plane and in space, of lines and planes, and of planes in space.xG.3.A. Know, explain, and apply basic postulates and theorems about triangles and the special lines, line segments, and rays associated with a triangle.G.3.B. Determine and prove triangle congruence, triangle similarity, and other properties of triangles.G.3.C. Use the properties of special right triangles (30°–60°–90° and 45°–45°–90°) to solve problems.G.3.D. Know, prove, and apply the Pythagorean Theorem and its converse.Performance ExpectationTested, but doesn’t count for graduationRecord here your performance on each assessment.G.3.E. Solve problems involving the basic trigonometric ratios of sine, cosine, and tangent.G.3.F. Know, prove, and apply basic theorems about parallelograms.G.3.G. Know, prove, and apply theorems about properties of quadrilaterals and other polygons.G.3.H. Know, prove, and apply basic theorems relating circles to tangents, chords, radii, secants, and inscribed angles.xG.3.I. Explain and perform constructions related to the circle.xG.3.J. Describe prisms, pyramids, parallelepipeds, tetrahedra, and regular polyhedra in terms of their faces, edges, vertices, and properties.xG.3.K. Analyze cross-sections of cubes, prisms, pyramids, and spheres and identify the resulting shapes.xG.4.A. Determine the equation of a line in the coordinate plane that is described geometrically, including a line through two given points, a line through a given point parallel to a given line, and a line through a given point perpendicular to a given line.xG.4.B. Determine the coordinates of a point that is described geometrically.G.4.C. Verify and apply properties of triangles and quadrilaterals in the coordinate plane.G.4.D. Determine the equation of a circle that is described geometrically in the coordinate plane and, given equations for a circle and a line, determine the coordinates of their intersection(s).xG.5.A. Sketch results of transformations and compositions of transformations for a given two-dimensional figure on the coordinate plane, and describe the rule(s) for performing translations or for performing reflections about the coordinate axes or the line y = x.xG.5.B. Determine and apply properties of transformations.xPerformance ExpectationTested, but doesn’t count for graduationRecord here your performance on each assessment.G.5.C. Given two congruent or similar figures in a coordinate plane, describe a composition of translations, reflections, rotations, and dilations that superimposes one figure on the other.xG.5.D. Describe the symmetries of two-dimensional figures and describe transformations, including reflections across a line and rotations about a point.xG.6.A. Derive and apply formulas for arc length and area of a sector of a circle.xG.6.C. Apply formulas for surface area and volume of three-dimensional figures to solve problems.xG.6.D. Predict and verify the effect that changing one, two, or three linear dimensions has on perimeter, area, volume, or surface area of two- and three-dimensional figures.xG.6.E. Use different degrees of precision in measurement, explain the reason for using a certain degree of precision, and apply estimation strategies to obtain reasonable measurements with appropriate precision for a given purpose.G.6.F. Solve problems involving measurement conversions within and between systems, including those involving derived units, and analyze solutions in terms of reasonableness of solutions and appropriate units.G.7.A. Analyze a problem situation and represent it mathematically.G.7.B. Select and apply strategies to solve problems.G.7.C. Evaluate a solution for reasonableness, verify its accuracy, and interpret the solution in the context of the original problem.G.7.E. Read and interpret diagrams, graphs, and text containing the symbols, language, and conventions of mathematics.G.7.G. Synthesize information to draw conclusions and evaluate the arguments and conclusions of others.Diagonal SudokuFrame SudokuUse the digits 1 thru 9 vertically, horizontally,Use the digits 1 thru 9 so that the numbers in diagonally, and in each square.the outside frame equal the sum of the first 3numbers in the corresponding row or column in294513060960the given direction.-33201592430Kakuro (cross sums)KenKenUse the number above, below or next to a rowUse the numbers 1 thru 6 to fill each row and columnor column to create the given sum. No digit mayso that each "cage" equals the target number using be repeated in "the word" and no zeros are used.the given operation.-2260602038353241675203835 Classroom Procedures & Expectations / CHAMPSTransitions (time between activities) are opportunities for wasted time. The less time we waste in class, the more time you will have for practice assignments, student interviews, and other engaging activities. By learning these routines and expectations, we will cut down on lost class time and complete our “jobs” more quickly.-41275-12700Teacher-DirectedInstructionStudent Interview Collaboration TimeWarm-upWorking in PairsWork timeGroup ActivityIndependent AssessmentCNo Conversation unrelated to the lesson.Voice Level – 0, 1Conversation allowedVoice Level – 2 Speaking with partner about activity. No Conversation Voice Level – 0HRaise your hand. Keep it raised until acknowledged. Ask your partner / group.If none of you know the answer, raise your hand. Go on to the next question or step until the teacher can help. Raise your hand. Keep it raised until acknowledged. ATake notes.Work on tasks.Give verbal or written responses to teacher-presented tasks. Read directions on activity and complete each task defined. When finished, wait quietly for the next set of instructions. Work on Assessment. Show all necessary work.MPermission needed to leave your seat. Restroom only if emergency (10/10).Wait to use the pencil sharpener.Please wait to get a drink. Permission needed for the restroom (10/10).Permission needed to go for a drink (10/10).Pencil sharpener – Yes Movement must be assignment related. Permission needed to leave your seat. No Restroom.Pencil sharpener – with permission.Finish assessment before getting a drink. PLooks like …Students are on task.Students give attention to the speaker.Whole-class engagement.Electronic devices are out of sight and sound.Looks like …Pairs or groups are helping each other.100% participation.Electronic devices are out of sight and sound.Looks like …Students are working entirely alone.Eyes are on own papers.Electronic devices are out of sight and sound.S “Success is simple. Do what's right, the right way, at the right time.” Arnold H. Glasow ................
................

In order to avoid copyright disputes, this page is only a partial summary.

Google Online Preview   Download