Station 1
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Station 1: Write an equation, solve and then find mοABC. 1. 2. 3. Station 2: Match the terms: A. A change in position, size or shape of a figure. ______1. Adjacent Angles B. ______2. Distance A transformation in which the figure does not change orientation. C. Two adjacent angles that are supplementary. ______3.Vertical Angles ______4. Perimeter formulas D. √(π₯2 − π₯1 )2 + (π¦2 − π¦1 )2 ______5. Supplementary Angles E. A transformation that requires a center point and an angle ______6. Congruent F. The original figure in a transformation ______7. Linear Pairs G. Separate into two congruent segments with equal measures ______8. Midpoint (π₯2 +π₯1 ) (π¦2 +π¦1 ) ______9. Endpoint ______10.Complementary Angles ______11. Area formulas H. ( 2 , 2 ) I. The figure after a transformation J. It is the same distance to the preimage as it is to the image K. Two nonadjacent, congruent angles formed by intersecting lines. ______12. Transformation ______13. Preimage ______14. Image L. Points on a grid that require surrounding parentheses. ______15. Reflection M. Two angles whose measures have a sum of 180ο° ______16. Rotation N. Figures that have the same measure are said to be this ______17. Translation O. Also called a line of symmetry ______18. Bisect P. 4s; 2l + 2w; a+b+c; 2πr ______19. Line of Reflection ______20. Ordered Pair Q. Two angles that share a ray and do not overlap R. Two angles whose measures have a sum of 90ο° S. Multiply the midpoint by 2, then subtract the known endpoint T. S2; lw; ½ bh; π r2 Station 3 1. 2. 3. Use the angles and figure above to complete the statements: ο1 is adjacent to _______ and ________. ο4 is a linear pair with ________. A pair of vertical angles is _______ and _______. 4. Write equations for each of the following: a. ο6 and ο7 are complementary: ____________________________________ b. ο8 and ο9 are supplementary:_____________________________________ c. ο10 and ο11 are vertical angles:___________________________________ d. ο12and ο13 are a linear pair:___________________________________ Station 4 1. Find the distance from K(5,6) to P(1, – 4 ) as a simplified radical. 2. Find the midpoint M of the Μ Μ Μ Μ πΎπ in # 1. 3. P(1, – 4) is the midpoint of Μ Μ Μ Μ Μ πΎπ. If K is (5, 7), find the other endpoint. 4. Find the coordinates for the midpoint of Μ Μ Μ Μ Μ ππ with endpoints M(– 3, 8) and N(– 9, – 4). 5. Find the length of the segment in number 4 above as a simplified radical. Station 5 4. 5. Station 6 3. 4. Station 7 1. 2. 3. Use the angles and figure above to complete the statements: ο5 is adjacent to _______ and ________. ο3 is a linear pair with ________. A pair of vertical angles is _______ and _______. 4. Write equations for each of the following: a. οP and οQ are complementary: ____________________________________ b. οJ and οK are supplementary:_____________________________________ c. οG and οH are a linear pair:________________________________________ d. οL and οM are vertical angles:_____________________________________
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