L: 9.1inv_gsp
Transcription
L: 9.1inv_gsp
DG4GSP_897_09.qxd 12/20/06 1:33 PM Page 122 Lesson 9.1 • The Theorem of Pythagoras The Pythagorean Theorem states a relationship between the areas of squares constructed on the three sides of a right triangle. In this investigation you’ll explore this relationship in two ways: first, by measuring and calculating and, second, by cutting the squares on the two legs of the right triangle and arranging them to fit in the square on the hypotenuse. Investigation: The Three Sides of a Right Triangle Sketch Step 1 !. In a new sketch, construct AB Step 2 !. Construct the midpoint C of AB Step 3 Construct a circle centered at C with radius endpoint B. Step 4 !! and BD !, where point D is a point on the circle. Construct AD Step 5 Hide the circle and the midpoint. Drag points A, B, and D to be sure your triangle stays a right triangle. Step 6 Open a sketch that has a Custom tool for creating a square. This can be either a sketch you have made yourself or the sketch Polygons.gsp. Step 7 Construct squares on the outsides of the triangle. Step 8 Measure the areas of the three squares. D D A C B B A Steps 1–4 Step 7 Investigate 1. Drag vertices of the triangle and look for a relationship among the areas of the three squares. Use the calculator to confirm your observation. State a conjecture about these three areas (The Pythagorean Theorem). (continued) 122 CHAPTER 9 Discovering Geometry with The Geometer’s Sketchpad ©2008 Key Curriculum Press DG4GSP_897_09.qxd 12/20/06 1:33 PM Page 123 Lesson 9.1 • The Theorem of Pythagoras (continued) Sketch You can use dissection puzzles to demonstrate that figures have equal areas without measuring them. Continue in your sketch to create a dissection that demonstrates the Pythagorean Theorem. Step 9 Delete the square interiors on the longer leg and on the hypotenuse, but not on the smaller leg. Step 10 Find point O, the center of the square on the longer leg, by constructing the diagonals. Step 11 Hide the diagonals. Step 12 Construct a line through point O parallel to hypotenuse AB. Step 13 Construct a line through point O perpendicular to hypotenuse AB. Step 14 Construct the four points where these two new lines intersect the sides of the square. Step 15 Construct the polygon interiors of the four quadrilaterals in the larger square. Give them all different colors. Step 16 Hide the lines. D O O D B A B A Steps 9 and 10 Steps 12–16 Investigate 2. You should now have a five-piece puzzle. One piece is the square on the small leg, and four pieces form the square on the longer leg. The object of the puzzle is to arrange these five pieces to fit in the square on the hypotenuse. In turn, select each of the five interiors, choose Cut from the Edit menu, then choose Paste. Hide any extraneous points. Your five pieces are now free to be moved. Click in a blank area of your sketch to deselect everything, then drag each piece and find a way to fit all the pieces in the square on the hypotenuse. When you finish, draw the solution on your paper. (That is, draw a square and sketch how the five pieces fit into the square.) 3. Explain how this dissection demonstrates the Pythagorean Theorem. Discovering Geometry with The Geometer’s Sketchpad ©2008 Key Curriculum Press CHAPTER 9 123