Question | Answer |
(1) Draw an example of Alternate Interior Angles if lines are parallel. | n/a
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(2) Draw an example of Corresponding Angles but the lines are NOT parallel. Are they congruent? | n/a
| (3) Draw an example of Same Side Interior Angles with parallel lines. | n/a
| (4) Draw an example of Alternate Exterior Angles if lines are parallel | n/a
| (5) Take a look at the promethean board. If m<1 = 1 degrees, What is m<2 = ? | m<2=179
| (6) Take a look at the promethean board. If m<6 = 123 degrees, what is m<8 = ? | m<8=123
| (7) Take a look at the promethean board. m<5 = 130 and m<7 = 4x + 8, solve for x. | x = 30.5
| (8) Take a look at the promethean board. m<4 = x + 45, m<5 = 65. Solve for x. | x = 75
| (9) Take a look at the promethean board. Name the angles NOT congruent to < 4. | <1, <5, < 3, <7
| (10) Take a look at the promethean board. Name the angles congruent to <4. | <2, <6, <8
| (11) Take a look at the promethean board. Prove that <1 is congruent to <7 using a proof table. You can do it! | na
| (12) Take a look at the promethean board. <1= (-2n) and <7=(14-4n) Solve for n. | na
| (13) Take a look at the promethean board. Prove that <3 is congruent to <5 using a proof table. You can do it! | na
| (14) Take a look at the promethean board. <4= (12k+15) and <6=(35+2k) Solve for ALL ANGLES. | na
| (15) Take a look at the promethean board. Prove that <4 and <5 are supplementary using a proof table. You can do it! | na
| (16) Take a look at the promethean board. Transversal t is perpendicular to line a. Prove that t is also perpendicular to line b using a proof table. | na
| (17) Take a look at the promethean board. <4 = 7x + 53 and < 5 = 6x + 127. Solve for x. | na
| (18) Take a look at the promethean board. <3 = 5(3x + 5) and <7 = 7x + 8 | na
| (19) Take a look at the promethean board. <2 = 6x + 11 and <5 = 8x - 13 | na
| (20) Take a look at the promethean board. Name ALL the angle pairs that are supplementary. (Hint: there are 14). | na |