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for #5, 3iii <=,  DE and AB are parallel since they are medians.  So big triangle and inner triangle are similar.  so 2 bottom angles are equal so is an iso triangle. - Sue
 
for #5, 3iii <=,  DE and AB are parallel since they are medians.  So big triangle and inner triangle are similar.  so 2 bottom angles are equal so is an iso triangle. - Sue
 +
I don't think we know that the 2 "bottom" angles are equal in the inner triangle. I am not sure how you proved that.--[[User:Jrhaynie|Jrhaynie]] 16:31, 30 September 2009 (UTC)
  
 
for ii <=, can we do theorem 21?  we know some equal angles.  This would make for some equal sides if the sines are equal and than work around that?  - Sue
 
for ii <=, can we do theorem 21?  we know some equal angles.  This would make for some equal sides if the sines are equal and than work around that?  - Sue

Revision as of 11:31, 30 September 2009


On number 5, I have been able to prove the => for all three of them, but I am struggling with the <= for (i) and (ii). Any hints on where to start?-Lauren

Lauren, for (i)<= use the fact that altitudes are perpendicular so we have right triangles. They have an equal leg (the base of the big triangle) and the hypotenuse of both are equal (given-they are the two altitudes). Now use Theorem 9 to prove conguent triangles and then the base angles of the big triangle are equal-then use theorem 5. Hope this helps. ~Janelle

Lauren, I am having trouble with the <= for (iii) could you help me out there? ~Janelle

for #5, 3iii <=, DE and AB are parallel since they are medians. So big triangle and inner triangle are similar. so 2 bottom angles are equal so is an iso triangle. - Sue I don't think we know that the 2 "bottom" angles are equal in the inner triangle. I am not sure how you proved that.--Jrhaynie 16:31, 30 September 2009 (UTC)

for ii <=, can we do theorem 21? we know some equal angles. This would make for some equal sides if the sines are equal and than work around that? - Sue

Sue, since we only have to do two of the three, you might want to do i and iii. These proofs are much easier. -Jennie

Does anyone have hints for #3,4, or 7?

For #4, try looking for different instances of Menalaus' theorem inside the triangle and combine them. -Tim

Does anyone have a hint for 3? - Dana

For 7, use Thm 16 to makes two different sets of lines parallel. -Mary

I am having trouble with 6, is it similar to case 1? --Jrhaynie 16:15, 30 September 2009 (UTC)


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