Recent content by anuttarasammyak
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Undergrad ##x = z^y## can't be inverse function of ##y=\int_1^x \frac{1}{t}dt##
We can easily integrate your definition integral and get $$ y=\ln x - \ln 1 = \ln x $$ z does not appear there. So we know yoiur definition gives the condition $$ \ln z =1 $$ to the last equation in post #3 which is a general solution- anuttarasammyak
- Post #4
- Forum: Calculus
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High School Reducing loss of energy for Lasers
Not only laser but light in general do not lose energy in vacuum. Laser beam go in one direction. A beam receiver get the energy without the loss. Light, for an example sun light, goes all the direction whose energy density drops by r^-2 law. Total r^2-surface surrounding the light source get...- anuttarasammyak
- Post #2
- Forum: Quantum Physics
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Undergrad ##x = z^y## can't be inverse function of ##y=\int_1^x \frac{1}{t}dt##
Say $$x=z^y$$, then $$y=\frac{\ln x}{\ln z}$$. Is it enough ? Graphs for some z values.- anuttarasammyak
- Post #2
- Forum: Calculus
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An intuition I had about infinite numbers -- Is it valid?
Yes. For an example, let p, q, r be prime numbers. There are infinite number of prime numbers. Infinite number of sets $$\{p^1,p^2,p^3,...\}$$ are disjoint infinite subsets of $$\{1,2,3,...\}$$. Infinite number of sets $$\{p^{q^1},p^{q^2},p^{q^3},....\}$$ are disjoint infinite subsets of...- anuttarasammyak
- Post #2
- Forum: General Discussion
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Undergrad Uncertainty and particle in a box
These solution wave functions must be zero outside the box. They are not simple sinusoids functions. Their momentum wave functions do not give simple two opposite values. Ref. https://en.wikipedia.org/wiki/Particle_in_a_box- anuttarasammyak
- Post #2
- Forum: Quantum Physics
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Simple kinematics problem — falling from a geostationary satellite
Such a tower is considered as the space elevator- anuttarasammyak
- Post #13
- Forum: Introductory Physics Homework Help
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Question about a proof of the converse of Thales' theorem
$$(x-x_1)(x-x_2)=(x-\frac{x_1+x_2}{2})^2-(\frac{x_1+x_2}{2})^2+x_1x_2=(x-\frac{x_1+x_2}{2})^2-(\frac{x_1-x_2}{2})^2$$ or $$(x-x_1)(x-x_2)=(x-\frac{x_1+x_2}{2}-\frac{x_1-x_2}{2})(x-\frac{x_1+x_2}{2}+\frac{x_1-x_2}{2})=(x-\frac{x_1+x_2}{2})^2-(\frac{x_1-x_2}{2})^2$$ Apply the same method to y...- anuttarasammyak
- Post #2
- Forum: Precalculus Mathematics Homework Help
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Undergrad Why is the Lorentz Force always perpendicular to velocity?
https://www.feynmanlectures.caltech.edu/II_13.html 13-6 shows excellent thought on current wire which seems same to your condensor case.- anuttarasammyak
- Post #57
- Forum: Special and General Relativity
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Graduate Probability puzzle
In case : ##\frac{1m}{v} >>## time resolution width of simultaneity ##>>\frac{1m}{V_{bullet}},##time for information processing and shooting action The players can make use of simultaneity shooting rule : In case the first succeeds, the second shoot within the time resolution to disuturb the...- anuttarasammyak
- Post #23
- Forum: Set Theory, Logic, Probability, Statistics
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Graduate Probability puzzle
Using this optimal case, Plyaer 1 Left would find a strategy which he ties with Player 2 Right. Say Player 2 shoots at this optimal distance in case he has found no shooting of Player 1. Player 1 shoots a tiny bit before the optimal distance so that Player 2 does not recognaize it due to finite...- anuttarasammyak
- Post #21
- Forum: Set Theory, Logic, Probability, Statistics
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Graduate Probability puzzle
I would estimate it using post #5 $$p_1=0.381966... , p_2= 0.618033...$$ where 1 is left and 2 is right. Firing at the same time in that optimal case Probabilities of Player 1 wins : ##p_1(1-p_2)=p_1^2## Player 2 wins : ##p_2(1-p_1)=p_2^2## No contest : ##1-p_1^2-p_2^2## Relative...- anuttarasammyak
- Post #11
- Forum: Set Theory, Logic, Probability, Statistics
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Graduate Probability puzzle
$$p_1(r)+p_2(r)=1$$ gives optimal firing position r for both the players where ##p_i(r)## is the probability of success of i-th player at position r. In this particular case $$1-r+1-r^2=1$$ $$r=\frac{\sqrt{5}-1}{2}$$ $$p_1=\frac{3-\sqrt{5}}{2}$$ $$p_2=\frac{\sqrt{5}-1}{2}$$ Success probalities...- anuttarasammyak
- Post #5
- Forum: Set Theory, Logic, Probability, Statistics
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Graduate Probability puzzle
$$1-x^2=(1-x)(1+x)>1-x$$ I know that the right player has advantage. I do not think the left has a strategy to win with more than 50% probability.- anuttarasammyak
- Post #2
- Forum: Set Theory, Logic, Probability, Statistics
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Graduate Interference with slits of different width
I have learned expansion of $$\cos(A+B),\cos(A-B),\sin(A+B),\sin(A-B)$$ in high school math. Let w=0, d=0 in the formula we get 2 which corresponds to width of a synthesized single slit. Let w=1, d=0, we get 3 which again corresponds to width of a single slit. We deduce that width of a slit is...- anuttarasammyak
- Post #2
- Forum: Other Physics Topics
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Undergrad The natural numbers and logical consequences of them
These are called arithmetic operations. I do not find a direct relation to partitioning or decomposing a set into disjoint subsets which I suspect your main subject is. Results of arithmetic operations to natural number except division by 0 which is not defined belong to 0 and plus-minus...- anuttarasammyak
- Post #19
- Forum: General Math