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#51 Help Me ! » stuff in a box » 2014-02-19 21:02:08
- thedarktiger
- Replies: 12
Let ABCDEFGH be a rectangular prism, as shown, where AB = 2, AD = 3, and AE = 5. Find the volume of pyramid ACFH.
Wow I how I'm a full member soon, so I can post pictures. So annoying ><
how to do this one? whats the volume of the parts surronding the pyramid? Is there a formula?
thanks!:P
#52 Re: Help Me ! » some 3d stuff :D » 2014-02-19 20:47:45
Wow thanks!
#53 Re: Help Me ! » 3d plane in a cube » 2014-02-18 00:21:40
Thank you! I think I got it. Thats a cool solution!
#54 Re: Help Me ! » 3d plane in a cube » 2014-02-16 22:18:01
Q is (0,0,1).
G is (5,5,5).
H is (5,0,5).
Wow, you guys make great tutors. 
#55 Re: Help Me ! » 3d plane in a cube » 2014-02-16 10:56:57
okay!
funfunfunfunfun...
#56 Help Me ! » 3d plane in a cube » 2014-02-15 18:30:08
- thedarktiger
- Replies: 22
Let ABCDEFGH be a cube of side length 5, as shown. Let P and Q be points on \overline{AB} and \overline{AE}, respectively, such that AP = 2 and AQ = 1. The plane through C, P, and Q intersects \overline{DH} at R. Find DR.
http://cache.artofproblemsolving.com/asyforum/1/1/8/118d23c1a4792612d4a97f539003b085e17242f2.png
agg how to do this
#57 Re: Help Me ! » power of a point » 2014-02-15 17:43:35
and x+3 = 9
#58 Re: Help Me ! » power of a point » 2014-02-15 17:41:37
Hey I got it its 9!!!!!!!!!!
wow I was dumb.
if x = AD then we get the equation
x^2+3x-54 = 0
then factors to (x-6)(x+9) = 0
and x = 6
#59 Re: Help Me ! » power of a point » 2014-02-15 17:37:05
hmm. looks like the answer is not 3 or 18/5 or 3/5 for some reason.
@bob, I know what you mean in your first post.
I really hate these ><
#60 Help Me ! » some 3d stuff :D » 2014-02-15 17:31:34
- thedarktiger
- Replies: 19
We are given a cube of side length 1. We then slice a pyramid off each corner, as shown, so that every side length of the remaining polyhedron has the same length. Let A, P, Q, and R be the vertices shown.
Cache.artofproblemsolving.Com/asyforum/8/1/a/81ad9bccc16be74ecf4a456247ceaf4290418ffc.png
import three;unitsize(1 cm);currentprojection=perspective(6,3,2);triple A, B, C, D, E, F, G, H;A = (1,1,0);B = (1,0,0);C = (0...
(a) Let x = AP, y = AQ, and z = AR. Prove that x = y = z.
(b) Find x.
(c) Find the volume of the remaining polyhedron.
wow this ones killing me 
#61 Help Me ! » power of a point » 2014-02-13 01:07:16
- thedarktiger
- Replies: 9
Let \overline{BC} and \overline{DE} be chords of a circle, which intersect at A, as shown. If AB = 3, BC = 15, and DE = 3, then find AE.
This ones bugging me. how to get it? Its not 18, is it?
thanks!
#62 Re: Help Me ! » sort of power of a point » 2014-02-10 20:40:50
Yup. don't want a math problem to do THAT. 
#63 Re: Help Me ! » sort of power of a point » 2014-02-09 22:25:15
Thanks for the anwser, anonimnystefy! I think my head has already burst. That problem was plain evil.
I'm sure anybody named bob will agree. aaaaaaggggghhhhhh.
#64 Help Me ! » sort of power of a point » 2014-02-08 20:23:31
- thedarktiger
- Replies: 14
Let \overline{PA} and \overline{PC} be tangents from P to a circle. Let B and D be points on the circle such that B, D, and P are collinear. Prove that AB \cdot CD = BC \cdot DA.
This is driving me CRAZY and the moment. 
several swearing smileys should make me feel better. 
#65 Help Me ! » angles in a circle » 2014-02-08 16:34:05
- thedarktiger
- Replies: 1
In triangle ABC, AB = 5, AC = 4, and BC = 3. Let P be the point on the circumcircle of triangle ABC so that \angle PCA = 45^\circ. Find CP.
This is pretty hard. I got to where AB is a diameter (ACB is 90 degrees) and the radius is 2.5, but what next?
thanks!
#66 Re: Help Me ! » Triangles and tangents galore » 2014-02-08 16:30:35
so it is
#67 Re: Help Me ! » Triangles and tangents galore » 2014-02-07 14:54:50
Hmmm. Thanks for the demonstration phronstister! wow, It looks like geoebra is amust
#68 Help Me ! » Triangles and tangents galore » 2014-02-02 22:34:02
- thedarktiger
- Replies: 19
Triangle ABC, inscribed in a circle, has AB = 15 and BC = 25. A tangent to the circle is drawn at B, and a line through A parallel to this tangent intersects \overline{BC} at D. Find DC.
This is weird. I tried stuff I know 'bout circles and triangles...(which is pretty close to nil)...but I can't get it.
Thanks!:D:D
#69 Re: Help Me ! » 4 secants circle geometry » 2014-02-02 21:54:57
thanks a lot for the video! So I guess they are always perpendicular.
I think there should be some kind of theorem ... maybe the bob-tister-bob theorem of secants.
Maybe I will make a wikipedia page.
#70 Re: Help Me ! » Gergonne triangle (fancy name from da wiki :D) » 2014-02-02 21:49:01
thanks!
#71 Help Me ! » Gergonne triangle (fancy name from da wiki :D) » 2014-01-31 22:53:48
- thedarktiger
- Replies: 2
Let the incircle of triangle ABC be tangent to sides
and at D, E, and F, respectively. Prove that triangle DEF is acute.I just have no idea how to do this. I think I should find the angles in terms of the larger triangles angles, but I duno how...:/
this thing is haaard. thanks!!!:D
#72 Re: Help Me ! » 4 secants circle geometry » 2014-01-28 19:51:05
wow! thanks! @bob bundy, you are really good at geometry. phrostister and bobbym, thanks for the pics!
#73 Help Me ! » 4 secants circle geometry » 2014-01-27 20:58:21
- thedarktiger
- Replies: 17
Let ABCD be a cyclic quadrilateral. Let P be the intersection of \overline{AD} and \overline{BC}, and let Q be the intersection of \overline{AB} and \overline{CD}. Prove that the angle bisectors of \angle DPC and \angle AQD are perpendicular.
I just don't know how to get this one. This problem in one word=aggggggghhhhhh.
would power of a point help?
thanks!
#74 Re: Help Me ! » Intersecting circles » 2014-01-27 20:34:00
Thanks bob bundy! Sorry I couldn't reply right away, because my family moved to Australia
a month ago and the time difference is 8 hours I was sleeping.
Just one thing... could you explain why ASB = 90? It seems the angle would change as the circles came closer, right?
Oh I got it because they are both radii and ab=sqrt(2) they have to be perpendicular.
thank you bob Ive got it!
by the way, check out the oatmeal comics. He has some very funny comics on the Bob cats.
#75 Help Me ! » Intersecting circles » 2014-01-26 20:28:43
- thedarktiger
- Replies: 3
Circles S and T have radii 1, and intersect at A and B. The distance between their centers is \sqrt{2}.
Let P be a point on major arc AB of circle S, and let \overline{PA} and \overline{PB} intersect circle T again at C and D, respectively. Show that \overline{CD} is a diameter of circle T.
this has me stumped. I found that minor arc AB = arc CD/2 (CD opposite AB) but this doesent help much
thanks a lot I really want to see how to do this one!