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#26 Help Me ! » Functions » 2014-08-14 01:20:45
- thedarktiger
- Replies: 1
Consider the functions
f(x) = sqrt((x-7)/(x+3)) and g(x) = sqrt(x-7)/sqrt(x+3)
Explain why f and g are not the same function.
#27 Help Me ! » Minimum problem » 2014-08-06 23:09:47
- thedarktiger
- Replies: 4
Find all values of p such that 2(x+4)(x-2p) has a minimum value of -18.
Thanks
#28 Help Me ! » Inequality stuff :P » 2014-08-01 00:49:26
- thedarktiger
- Replies: 1
For what values of x is (x^2 + x + 3)/(2x^2 + x - 6) >= 0?
I got (-inf, -2) U (1.5, inf) with wolfram alpha, but I want to know how.
Thanks 
#29 Help Me ! » Circles intersecting with triangles » 2014-04-01 01:27:47
- thedarktiger
- Replies: 1
Let \overline{PQ} be a diameter of a circle and T be a point on the circle besides P and Q. The tangent to the circle through point Q intersects line PT at R, and the tangent through T intersects \overline{QR} at M. Prove that M is the midpoint of \overline{QR}.
thanks!
#30 Re: Help Me ! » Some trig » 2014-04-01 01:04:24
Thanks!
#31 Help Me ! » Some trig » 2014-03-31 00:51:02
- thedarktiger
- Replies: 2
(a) Prove that BC = BD = AD.
(b) Let x = BC and let y = CD. Using similar triangles ABC and BCD, write an equation relating x and y.
(c) Write the equation from Part b in terms of
and find r.(d) Compute
and using parts a-c. (Do not use a calculator!)Thanks 
#32 Re: Help Me ! » Triangles » 2014-03-19 20:51:39
Thanks!
Good proof.
#33 Re: Help Me ! » Triangles » 2014-03-17 14:24:50
Thanks... this was in the analytic geometry part...
Good luck!
#34 Re: Help Me ! » Graphing stuff :/ » 2014-03-17 00:37:00
Wow thanks! What software? Mathematica?
Wow these problems keep getting harder
#35 Re: Help Me ! » Triangles » 2014-03-15 19:55:41
wow... mind BLOWN
thanks
#36 Help Me ! » Triangles » 2014-03-14 16:19:12
- thedarktiger
- Replies: 31
In triangle ABC, AB = AC, D is the midpoint of \overline{BC}, E is the foot of the perpendicular from D to \overline{AC}, and F is the midpoint of \overline{DE}. Prove that \overline{AF} is perpendicular to \overline{BE}.
thank you
#37 Help Me ! » Graphing stuff :/ » 2014-03-14 16:17:21
- thedarktiger
- Replies: 5
Let A = (1,2), B = (0,1), and C = (5,0). There exists a point Q and a constant k such that for any point P, PA^2 + PB^2 + PC^2 = 3PQ^2 + k. Find the point Q and the constant k. What is the significance of point Q with respect to triangle ABC?
thanks
#38 Re: Help Me ! » hyperbolas and orthocenters DX » 2014-03-11 00:08:13
Thank you!
#39 Help Me ! » hyperbolas and orthocenters DX » 2014-03-08 14:45:56
- thedarktiger
- Replies: 2
Let A, B, and C be three points on the curve xy = 1 (which is a hyperbola). Prove that the orthocenter of triangle ABC also lies on the curve xy = 1.
thanks! 
#40 Help Me ! » dilation of a triangle (whatever that means) » 2014-03-07 14:22:34
- thedarktiger
- Replies: 1
Equilateral triangle ABC has centroid G. Triangle A'B'C' is the image of triangle ABC upon a dilation with center G and scale factor -2/3. Let K be the area of the region that is within both triangles. Find K/[ABC].
Meh. To many fancy words.
thanks!
#41 Re: Help Me ! » some squares and a triangle... » 2014-03-06 00:32:33
Yes Im a full member!!!!!! YEEESSSS!!!!
#42 Re: Help Me ! » some squares and a triangle... » 2014-03-06 00:31:30
aha here it is: 
#43 Help Me ! » some squares and a triangle... » 2014-03-04 00:37:40
- thedarktiger
- Replies: 10
Let ABC be a triangle. We construct squares ABST and ACUV with centers O_1 and O_2, respectively, as shown. Let M be the midpoint of \overline{BC}.
unitsize(0.8 cm);pair A, B, C, M, S, T, U, V;pair[] O;A = (3,3);B = (0,0);C = (4,0);S = rotate(90,B)*(A);T = A + S - B;V = ro...
(a) Prove that \overline{BV} and \overline{CT} are equal in length and perpendicular.
(b) Prove that \overline{O_1 M} and \overline{O_2 M} are equal in length and perpendicular.
thanks
#44 Re: Help Me ! » Point inside a square » 2014-03-04 00:36:04
ᶘᵒᴥᵒᶅ
Still works!
#45 Re: Help Me ! » Point inside a square » 2014-03-02 15:02:54
Thanks guys! Makes sense to rotate.
It looks like it is 135.
ಠ_ಠ ಥ_ಥ ಠ▃ಠ ლ(ಠ_ಠლ)
#46 Re: Help Me ! » tetrahedrons :P » 2014-03-01 19:38:12
Thank you so much! I think I got it.
#47 Help Me ! » Point inside a square » 2014-03-01 19:37:11
- thedarktiger
- Replies: 9
Let P be a point inside square ABCD such that PA = 1, PB = 2, and PC = 3. Find \angle APB.
So how to do this one? I can't find any angles aaagggh
Thanks!
#48 Re: Dark Discussions at Cafe Infinity » Check your mental age » 2014-02-25 00:28:23
omg it put as 33 and I answred honestly...
wow thats so much older than me
#49 Help Me ! » tetrahedrons :P » 2014-02-23 22:43:44
- thedarktiger
- Replies: 2
In tetrahedron ABCD, \angle ADB = \angle ADC = \angle BDC = 90^\circ. Let a = AD, b = BD, and c = CD.
(a) Find the circumradius of tetrahedron ABCD in terms of a, b, and c. (The circumradius of a tetrahedron is the radius of the sphere that passes through all four vertices, and the circumcenter is the center of this sphere.)
(b) Let O be the circumcenter of tetrahedron ABCD. Prove that \overline{OD} passes through the centroid of triangle ABC.
Oh well. Thanks!
#50 Re: Help Me ! » stuff in a box » 2014-02-20 21:36:55
Yes thats it! thanks.