Line 20: Line 20:
  
 
Hey Jon, number 6 is exactly like the proof in the book for case one...the congruent triangles are simply on the outside of triangle(ABC).  Just connect AX,BX,PX,and CX and look at congruent triangles formed! --[[User:Jrhaynie|Jrhaynie]] 15:01, 16 September 2009 (UTC)
 
Hey Jon, number 6 is exactly like the proof in the book for case one...the congruent triangles are simply on the outside of triangle(ABC).  Just connect AX,BX,PX,and CX and look at congruent triangles formed! --[[User:Jrhaynie|Jrhaynie]] 15:01, 16 September 2009 (UTC)
 +
 +
[[ so # 6 isn't that bad once you get the congruent triangles) - Sue
  
 
For number 8, what two pairs of similar triangles do you use to prove part b? - Jon Maser
 
For number 8, what two pairs of similar triangles do you use to prove part b? - Jon Maser
 +
 +
[[ for # 8,  just keep finding similar triangles.  All of them.  Then start looking at the ratios and a and b will be solved. 
  
 
Jon, for part b i used that triangle AGF is similar to EHF and that triangle BGF is similar to DHF.  Hope that helps! -Jennie
 
Jon, for part b i used that triangle AGF is similar to EHF and that triangle BGF is similar to DHF.  Hope that helps! -Jennie

Latest revision as of 14:39, 17 September 2009


HW 3

Does anybody know what the ratio in #1 is supposed to come out to be? I've tried everything and can't get it to work. - Mark

Mark, check page 38 of the notes. The problem is actually Theorem 28.

Does anyone have any hints for #2. I can't seem to figure it out, I may be misunderstanding some of the directions. -Mary

I figured out how to do #2. Add the distances from the legs of the angle to the point p, and subtract that number by the distance from point p to leg inside the angle. -Craig

Do you mean number 2 the geometer's sketchpad? Or do you mean number two as in the proof section?? -Brittany

I know a lot of people have been having trouble with this problem. I know someone was going to email Uli last night. I would just continually check on here for help. - Dana

I'm not sure if you are having trouble drawing the figure or figuring out the equation. So I'll try to cover both, for drawing the figure start with two points and then make a segment between them. Then choose one of the points and the segment and ask for a circle with radius. Do the same thing again only using the other point, then the third point is the intersection of the circles. As far as the formula is concerned, use addition and subtraction. Hope this is helpful.--Shore 14:20, 16 September 2009 (UTC)

Does anyone have something for problem 6. I'm having trouble with it for some reason. -Jon

Hey Jon, number 6 is exactly like the proof in the book for case one...the congruent triangles are simply on the outside of triangle(ABC). Just connect AX,BX,PX,and CX and look at congruent triangles formed! --Jrhaynie 15:01, 16 September 2009 (UTC)

[[ so # 6 isn't that bad once you get the congruent triangles) - Sue

For number 8, what two pairs of similar triangles do you use to prove part b? - Jon Maser

[[ for # 8, just keep finding similar triangles. All of them. Then start looking at the ratios and a and b will be solved.

Jon, for part b i used that triangle AGF is similar to EHF and that triangle BGF is similar to DHF. Hope that helps! -Jennie

I am struggling with number 5. I know I should draw a triangle DEF that is similar to ABC, but I'm not sure how to go about proving any of the angles are equal just based on the proportion of the sides. Any hints? -Lauren

Lauren, Go to the course notes and follow what they did in Thm. 17, that will take you step by step all the way up to proving that the two triangles are similar by using SSS, which is what you have set out to prove. -Brian

Back to MA460 (Fall2009Walther) Homework

Back to Prof. Walther MA460 page.

Alumni Liaison

Basic linear algebra uncovers and clarifies very important geometry and algebra.

Dr. Paul Garrett