7/20/2023 0 Comments Gsp5 chapter 9 answersMonday, 10/5/98 Topic: Similarity and Parallels (2) Theorem of Thales as simplest case of similarity.Reading B&B, Chapter 4 Bix, Chapter 1, Section 0. Wednesday 10/7/98 Topic: Division Ratios Signed (Positive and Negative) Ratios are key tools in understanding.Math 487 Lab #2 Wednesday 10/7/98 Topic: Perpendicular Bisectors, Circles and Distance This lab will work through Chapter 3 of GTC.Ģ1-38.Īssignment 3 Due Midpoint Quadrilaterals, cubes and others.The main goal is to see theĬonnection between the perpendicular bisector of a segment and the locus of points Perpendicular bisectors and the constuction of the circumcircle. Reading GTC (Geometry Through the Circle),Chapter 3. Topic: Carpenter's Construction This lab will work through GTC Chapter 4. This is applied to an introduction to moreĪn important application is the construction of the tangent lines to a given circle This uses someĭetailed geometry of the right triangle, especially the fact that the midpoint Of the vertex of right angles ABC for fixed A and B is a circle. Monday, 10/12/98 Topic: Two More Concurrence Theorems.Reading GTC (Geometry Through the Circle), Chapter 4. Where the perpendicular bisectors of the legs interesect is the Proof of perpendicular bisector concurrence for a general triangle.) Midpoint of the hypotenuse, one needs more than equal distances, oneĪlso needs to show the point is on the hypotenuse. Proof of concurrence of medians of a triangle with connection to.Midpoint parallelogram of a quadrilateral. Proof of concurrence of altitudes of triangle ABC the key is toĬonstruct a larger triangle A'B'C' so that ABC is the midpoint.Parallel to the sides of ABC and distances are determined by finding Wednesday 10/14/98 Topic: Line Symmetry and Reflection with a Mirror Using the Reflectview Mirror to reflect objects and investigate symmetry.Some points include how to construct a perpendicularīisector with this mirror. What are the lines of symmetry of familiarįigures such as an equilateral triangle (3), a rhombus (2), a rectangle (2),Ī general paralellogram (0), a circle (infinitely many), a line segment (2),Ī line (infinitely many), and the X-figure made of two intersecting lines ANSWERS TO GSP5 CONSTRUCTING PERPENDICULAR BISECTORS HOW TO ANSWERS TO GSP5 CONSTRUCTING PERPENDICULAR BISECTORS SOFTWARE.ANSWERS TO GSP5 CONSTRUCTING PERPENDICULAR BISECTORS HOW TO.
0 Comments
Leave a Reply. |