Using a compass and a straight edge only, a.) Construct a triangle ABC where side BC is of length...
Using a compass and a straight edge only, a.) Construct a triangle ABC where side BC is of length 2, the circumradius is of length 3/2 and the median AA' is of length 2 such that A' is the midpoint of BC. Note that a segment of length 1 is posted below and must be used) b) Write out step by step instructions of how to construct the figure in part (a) c.) Prove your results
The problem is already solved. From the construction below, prove the results to validate the construction. **Here is an example of a construction and a proof: https://www.mathopenref.com/consttrianglesas.html Just need the proof for the constructible figure Here is the problem and answer. Can someone prove the result: Using a compass and a straight edge only, a.) Construct a triangle ABC where side BC is of length 2, the circumradius is of length 3/2 and the median AA' is of length 2...
Using a compass and straightedge only, do the following: a.) Construct the figure b.) Write out step by step how to construct the figure 1.) Using a compass and straightedge only, construct a segment that is of length . Note, a segment of length 1 is given below and must be used. We were unable to transcribe this imageWe were unable to transcribe this image
Using a compass and straightedge only, do the following: a.) Construct the figure b.) Write out step by step how to construct the figure 1.) Using a compass and straightedge only, construct a segment that is of length . Note, a segment of length 1 is given below and must be used. **Consider the theorems where a+b, |a-b|, ab, 1/a, \sqrt a are constructible lengths. We were unable to transcribe this imageWe were unable to transcribe this image
To do this, we must use angle bisectors. So I know we can connect a to I and b to I then how do we finish using this idea to get Vertex C. Expert Q&A Done Using a compass and straightedge only, construct the last vertex, write out all steps and prove your result Below we are given vertex A and B and the incenter I of triangle ABC. Using a compass and a striaghtedge, construct the last vertex C....
Points W and X are chosen on the side AB of triangle ABC and points Y and Z are chosen on side AC. Suppose that cr(A,W,X,B)=cr(A,Y,Z,C) and that WY is parallel to XZ. Prove that XZ is parallel to BC. Hint: let T be the point where the parallel to XZ through B meets line AC. Note that neither a nor Y can lie on segment TC and use excercise 3C.2 to show that T is C. cr=cross ratio
I need help doing a doing two column for these two propositions. Book 1 Proposition 7: Given two straight lines constructed from the ends of a straight line and meeting in a point, there cannot be constructed from the ends of the same straight line, and on the same side of it, two other straight lines meeting in another point and equal to the former two respectively, namely each equal to that from the same end. Book 3 Proposition 14:...
Numbers 6,10,17 and 29 please. numbers 6,10,17 and 29 please. CONCEPTS 10. A 24 10 1. For triangle ABC with sides a, b, and c the Law of Cosines 20 12 2. In which of the following cases must the Law of Cosines be used to solve a triangle? ASA SSS SAS SSA 11-20Solve triangle ABC SKILLS 3-10Use the Law of Cosines to determine the indicated side x or angle 0 12. 12 120° 4. С *. 13, a С...
Using C++ write a program that keeps reading lines of text using getline(). After reading a paragraph, it adjusts all the lines into an instructed width, so that it can show the words evenly spread out and fit in a straight edge at both margins (similar to "align full" option in a Microsoft word document). As an example, consider a line containing 5 words and 30 characters altogether. If this line needs to be justified into a 40-character width, the...