Geometry Name:________________________ 1.4 Worksheet – Constructing Parallel and Perpendicular Lines 1. Given AB , use the midpoint construction to construct a perpendicular bisector. Label the intersection, label congruent parts on the diagram, and list one pair of congruent or equal pieces. A A B B Segments: _______ ≅ __________ Angles: ___________ = ____________ 2. Construct the perpendicular line THROUGH A POINT ON THE LINE. Work backwards from the midpoint construction. A C 3. Construct the perpendicular line THROUGH A POINT not on THE LINE. Work backwards through the midpoint construction. B A 4. Given ∠ABC, can you think of a way to create a line parallel to AB through point C? (Hint: How could copying an angle help you?) A B C 5. Create a parallel line to DE through point F. E D F 5. Construct a line parallel to the given line and through the given point. 6. Given sides of a rectangle. Construct the rectangle. (Hint: We need perpendicular lines through A and through B). A B 7. If you are told that MN is the perpendicular bisector of BC where point M is on BC . Draw the diagram and completely label it with all known relationships. 8. If you are constructing the perpendicular line through point A (A is on the line), determine the next step. Step #1 – Place compass at point A, and create two intersections B & C on either side of point A. Step #2 – Place compass pointer at point B and extend its measure beyond A and make an arc above and below point A. Step #3 -- __________________________________________________________________________ 9. COPYING A SEGMENT Given AB, CD, & EF . Use the copy segment construction to create the new lengths listed below. A C E B D F 2.5CD CD + 1.25AB 10. Construct an angle bisector for the given angle. Label the diagram with the congruent parts as a result of the construction.
© Copyright 2024