Unit 1 Review Bingo!
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DO NOW REVIEW Alternate Exterior REVIEW UNIT 1 REVIEW BINGO! HOW TO PLAY! 1. Write each answer from the powerpoint into a random space on your BINGO card IN PEN 2. Mr. Easter will put a problem on the board. You will have 1-4 minutes to work the problem. 3. Work the problems on scratch paper IN PENCIL 4. When you get the answer, mark it off on your BINGO card. 5. If you get an answer that is not on your BINGO card, then the answer is wrong. Try the problem again and/or raise your hand for help. 6. After the game, we will review the problems that people had trouble with. HOW TO WIN! Any full row in any direction! WRITE THE ANSWERS ON YOUR BINGO CARD IN A RANDOM ORDER 45 122 125 7 58 62 (7,-17) 140 180 162 Combining Like Terms 35 82 Same Side Interior Angles 117 Substitution Property 102 Corresponding Angles 18 Subtraction Property of Equality (1,9) Division Property of Equality 4.47 29 PROBLEM 1 FOUR MINUTES Find the measurement of each angle in the picture below. Each angle measurement is one answer. 5π₯ + 8 1 4 3 2 11π₯ − 4 PROBLEM 2 FOUR MINUTES If B is on π΄πΆ and AB is ππ₯ + π, BC is 5π₯ − π, and AC is 6π + ππ then a. What is AB? b. What is BC? c. What is AC? PROBLEM 3 1 MINUTE What property is used below? 6x+12-2x=180 4x+12=180 PROBLEM 4 3 MINUTES ο1 and ο2 are supplementary angles. mο1 is 10y - 8 and mο2 is 6y + 12. What is mο1? PROBLEM 5 2 MINUTES If line a is parallel to line b, and line c is parallel to line d, then: 1. what relationship do angles 6 and 11 have? 2. What is the m ο6 + m ο11 ? PROBLEM 6 2 MINUTES Two endpoints A(3, 8) and B(-1, 10) form a line. Find the midpoint and the distance of that line. PROBLEM 7 3 MINUTES Find the value of x. PROBLEM 8 1 MINUTE Find the measurement of angle 2. PROBLEM 9 2 MINUTES If mο12 = 55, then find mο3. PROBLEM 10 1 MINUTE Name the property used below: x=5 and AB=7x+2 AB = 7(5)+2 PROBLEM 11 1 MINUTE If line a is parallel to line b, and line c is parallel to line d, then what relationship do angles 2 and 10 have? PROBLEM 12 4 MINUTES πΈπΊ bisects ο CEF so that mο CEG is 4x + 1 and mο GEF is 6x - 13. - What is x? - What is the m<CEG? - What is the m<CEF? PROBLEM 13 1 MINUTE Name the property used below: 4x+3=12 4x=9 PROBLEM 14 3 MINUTES Find the value of x. PROBLEM 15 1 MINUTE What property is used below? 10x=80 X=8 PROBLEM 16 3 MINUTES The midpoint of a line is (2,-6). One endpoint is G(-3, 5). What is the other endpoint, H? PROBLEM 17 1 MINUTE If mο9 = 140, then find mο11. LET’S REVIEW MISSED PROBLEMS What questions do you have?
