DimaMazin Posted April 18, 2023 Posted April 18, 2023 a = (Pi - 2)/4 + sin(a) a is unknown angle(rad) in unit circle a/2 is area of sector of angle a (Pi-2)/8 is area of segment of angle a
joigus Posted April 18, 2023 Posted April 18, 2023 This is a transcendental equation. You cannot solve but by means of approximate methods, like iterations that are known to converge to a solution, etc.
studiot Posted April 18, 2023 Posted April 18, 2023 (edited) Firstly @DimaMazin Please number your equations for discussion in future. Calling them 1, 2 and 3 in the order in which they appear in the OP, This is not a valid question. Equation 1 may be simply derived from equation 3 and is an identity so valid for all values of a, where a is measured in radians. Since I can no longer use either of my maths computers here you will all have to put up with crappy english language. The standard expression for the area, A, of a segment of a circle of radius R is A = R^2/2 (a - sina) Since you say R = 1 We have (Pi - 2) / 8 = 1/2 (a - sina) Multiply through by 2 ( Pi - 2 ) / 4 = a - sina Which is your equation 1 Perhaps you are looking for an angle a where the area is the same for both sector and segment ? Edited April 18, 2023 by studiot
studiot Posted April 18, 2023 Posted April 18, 2023 33 minutes ago, Genady said: a=1.226819... How does that work out with Dima's equation2, given that the standard area for a sector is Ra ?
Genady Posted April 18, 2023 Posted April 18, 2023 5 minutes ago, studiot said: How does that work out with Dima's equation2, given that the standard area for a sector is Ra ? Area of a sector with angle a in radians and unit radius is a/(2p)*(p*r^2)=a/2 for any a. 2
studiot Posted April 18, 2023 Posted April 18, 2023 37 minutes ago, Genady said: Area of a sector with angle a in radians and unit radius is a/(2p)*(p*r^2)=a/2 for any a. Yes you are right, the formula is R^2a/2 = a/2 in this case, so it does fit +1
joigus Posted April 19, 2023 Posted April 19, 2023 Genady is right. It's not a transcendental equation. I made a mistake. Sorry. Somehow I thought I saw an "a" in the first term, which wasn't there.
Genady Posted April 19, 2023 Posted April 19, 2023 5 hours ago, joigus said: Genady is right. It's not a transcendental equation. I made a mistake. Sorry. Somehow I thought I saw an "a" in the first term, which wasn't there. I think, you were right, and it is a transcendental equation. I've solved it with a very simple approximation procedure and Excel. Here it is: f(x) = (Pi - 2)/4 + sin(x) - x 2
joigus Posted April 19, 2023 Posted April 19, 2023 4 hours ago, Genady said: I think, you were right, and it is a transcendental equation. I've solved it with a very simple approximation procedure and Excel. Here it is: Yes, thank you. It is. Every time I look at this thread I look without looking, if you know what I mean. a = const. + sin(a) is a transcendental equation. Doh!!
DimaMazin Posted April 21, 2023 Author Posted April 21, 2023 I have got so complex equation for definition of sine of the angle a ,but I am not sure it is correct. 4sin2 +4sin*cos-2sin-Pi*sin+Pi*cos-2cos=0 If we use Genady's definition then we can approximately check it. I have used method of disproportionate division of segment of angle Pi/2 (area of wich is (Pi-2)/4) and second part of the sector of the angle Pi/2 ,area of wich is 1/2. It is when angle a and angle Pi/2 -a disproportionately divide the parts. Then every of the 4 parts has the same disproportionate unknown(for 2 parts it is u and for 2 other parts it is -u). It is not working for definition sine and cosine of 1 radian relative to Pi, therefore rather it is nonsense.
DimaMazin Posted June 12, 2023 Author Posted June 12, 2023 (edited) On 4/18/2023 at 11:24 AM, John Cuthber said: I wonder if there's a geometrical solution. Yes. But we can solve simpler problem. a=2sin(a) ((sin-P/4)*2-sin*(-cos))*2 = sin-2sin*(-cos)-4(sin-P/4) sin = (2/7)P a=(4/7)P Area of segment of angle a = (1/7)P Area of segment of angle (3/14)P = (1/14)P Exuse me. I have mistaken again. I incorectly made the equation. In correct equation the variables annihilate. Edited June 12, 2023 by DimaMazin
DimaMazin Posted June 22, 2023 Author Posted June 22, 2023 I think the simplest problem, of the similars, is sector area = chord2 a/2 = 2-2cos(a) But I don't know how to solve it.
DimaMazin Posted December 10 Author Posted December 10 Let's consider speculation how to solve a=2sin(a). Sector of such angle is special. Any sector has two parts of its area. One part of its area=sin/2. And second part is segment area. Two parts of the sector are equal. Then let's consider else two sectors. Sector of half of the angle a/2 and sector of angle (Pi-a)/2+a. My speculative idea is: (area of segment of angle(Pi-a)/2+a) ÷ sin(of the angle)/2 = sin(a/2) ÷ (area of segment of angle a/2) Can it be so?
DimaMazin Posted December 11 Author Posted December 11 On 12/10/2024 at 5:09 PM, Genady said: a=1.8954942670... Thanks. My idea is wrong.
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