Originally posted by: heliomphalodon
We're given a square ABCD together with a point E in the square such that angle(EAB) = angle(EBA) = 15.
To prove: triangle DEC is equilateral.
Consider the triangle AEB. Reflect it in the line AC so that A->A, B->D and E->E'.
Now consider triangle AEE'. It is equilateral.
Thus triangles AE'D and DE'E are congruent, so
triangle ADE is isosceles and thus
triangle DEC is equilateral. QED
Now that's the sort of proof I like!
Originally posted by: bizmark
Originally posted by: heliomphalodon
We're given a square ABCD together with a point E in the square such that angle(EAB) = angle(EBA) = 15.
To prove: triangle DEC is equilateral.
Consider the triangle AEB. Reflect it in the line AC so that A->A, B->D and E->E'.
Now consider triangle AEE'. It is equilateral.
Thus triangles AE'D and DE'E are congruent, so
triangle ADE is isosceles and thus
triangle DEC is equilateral. QED
Now that's the sort of proof I like!
pic of solution
Very nice. I've got to admit I was skeptical at the beginning. How do you *know* that AEE' is equilateral, though? It's still not really apparant to me Of course it's obvious if you already know that DEC is equilateral, but....
P.S. it's *very* obvious that AEE' is isosceles, but how do we know that EE' is the same length as the other two sides? Again, you could do it if you knew that the angle ADE was 30 degrees, but then the problem is already solved.
Originally posted by: heliomphalodon
As you say, it's very obvious that triangle EAE' is isosceles. To see that it is in fact equilateral, observe that angle(EAE') = 60.
Thanks for putting up a picture!
Please give me the exact decimal notation of Pi.
Originally posted by: BumJCRules
heliomphalodon,
You said... "Close, and probably the right approach, but once you introduce an approximation you have lost rigor. A correct proof must be exact (or symbolic). I think your use of the Law of Sines is probably the key to a clean result, but we're not there yet..."
How accurate do you want a figure? Once you move out toward the millionths and beyond the number is only getting minutely closer to the exact but never quite close enough. When using trig, calculus, dify q, etc to do math you will round a lot. Spend some time in an engineering or science lab for any length of time and rounding is normal. What kind of error limits do you want?
BTW: What eductaion level are you at? Junior High, High School, University, Grad School, Doctorate, Post Doctorate?
If you want me to leave the answers in fractional notation, that would be 100% accurate. However human brains do not think that abstractly. Unless you can think of Pi, fractals,l and all other forms of repeating digit numerals to their fullest decimal extent.
On the contrary -- when using trig, calculus, differential equations, etc. to do math (not engineering) one rarely rounds at all, because the results are symbolic, not numeric.When using trig, calculus, dify q, etc to do math you will round a lot.
No "error limit" is acceptable in a proof of the kind under consideration in this thread.What kind of error limits do you want?
But of course they do. You merely muddy the waters with approximations and their decimal expansion representations. The point is that this is a proof, and as such is entirely abstract.However human brains do not think that abstractly.
I am a graduate student. My undergraduate degree is in mathematics. My concentrations of study are the foundations of mathematics, and the theory of computation. My undergraduate thesis was titled, "Latin Squares and Finite Projective Planes."BTW: What eductaion level are you at?
Originally posted by: BumJCRules
It is sarcasim... Sorry. I thought that I could use some after that comment about exact figures.
Like saying 400/3MHz. People don't understand it. So most people say 133MHz, even thought it is an aproximation. Most people need hard figures to make it compute in their minds. May most of you are the exception to the rule.
Originally posted by: heliomphalodon
I'm genuinely curious -- just how precise and consistent are the clocks in a modern PC?
Originally posted by: bizmark
pic of solutionVery nice. I've got to admit I was skeptical at the beginning. How do you *know* that AEE' is equilateral, though? It's still not really apparant to me Of course it's obvious if you already know that DEC is equilateral, but....P.S. it's *very* obvious that AEE' is isosceles, but how do we know that EE' is the same length as the other two sides? Again, you could do it if you knew that the angle ADE was 30 degrees, but then the problem is already solved.Originally posted by: heliomphalodonWe're given a square ABCD together with a point E in the square such that angle(EAB) = angle(EBA) = 15.To prove: triangle DEC is equilateral.Consider the triangle AEB. Reflect it in the line AC so that A->A, B->D and E->E'.Now consider triangle AEE'. It is equilateral.Thus triangles AE'D and DE'E are congruent, sotriangle ADE is isosceles and thustriangle DEC is equilateral. QED Now that's the sort of proof I like!
Originally posted by: rbhawcroft
just use SOH CAH TOA it only takes three calculations ffs. just divide the side triangle into two right angled triangle and the third calc is the length of the equilateral triangles middle spar, on the relevant side.
Originally posted by: Turkey
How about this?
since tri(AEB) is isosceles & ABCD is a square:
ang(EAD) = ang(EBC) = 90 - 15 = 75
ang(EDC) = ang(ECD)
ang(DEA) = ang(BEC)
75 + ang(DEA) + ang(ADE) = 180
ang(DEC) + 2 * ang(EDC) = 180
150 + 2 * ang(DEA) + ang(DEC) = 360
ang(EDC) = 90 - ang(ADE)
4 equations, 4 unknowns... use your favorite reduction method to determine that ang(DEC) = ang(EDC) = ang(ECD) = 60.
Originally posted by: Weyoun
Here's a simple proof. I finished it up the other night, but since rbhawcroft's method has just been refuted, I'll prove it for him.
Let EF be a point parallel to the top side meeting BC at F
therefore, BEF and ECF are right angled triangles
^EBY = 75 (angle sum, 90)
^BEY = 15 (corresponding angles of parallel lines)
EY = L/2, where L is the length of one of the sides of the square
let BF = y
let CF = x
let THETA = ^ECY
Tan75 = L/2y --> y = L/(2Tan75)
Tan THETA = L/2x --> x = L/(2Tan THETA)
now, x + y = L
L/(2Tan75) + L/(2Tan THETA) = L
1/(2Tan75) + 1/(2Tan THETA) = 1
1/(2Tan THETA) = 1 - 1/(2Tan75)
= (2Tan75 - 1)/2Tan75
Tan THETA = Tan75 / (2Tan75 - 1)
Which you algebra buffs can simply or you calculator buffs can evaluate. Either way, THETA = 30 is the solution to this equation.
Hope this helps