Talk:One-dimensional space

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Angle?

Latest comment: 3 years ago6 comments4 people in discussion

The last section says

The most popular coordinate systems are the number line and the angle.

In what sense can an angle be said to be a one-dimensional concept (bearing in mind that this article is entitled "One-dimensional space")? Loraof (talk) 22:42, 28 September 2017 (UTC)Reply

I don’t see any problems with it: polar coordinates are a coordinate system, a two dimensional one with one coordinate being the radius the other the angle. Isolate either of those you have a one-dimensional system, so the angle can be considered a one-dimensional coordinate system in an obvious way. I edited it for better style but the mathematics is sound.--JohnBlackburne^words_deeds 23:08, 28 September 2017 (UTC)Reply

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  Number line
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  Angle

Right now we have this image of the use of the angle to identify points. It has an x axis and a y axis, which implies 2-dimensionality. So at a minimum I think we should get rid of this image and replace it with something else. This image, unlike the one for the number line coordinate system, does not show the one-dimensional locus being traced out one-for-one with values of theta. So the replacement image ought to show a one-dimensional curve and three points: the point on the curve for which theta = 0, the angle's vertex (off the curve), and the point P (with the angle theta to P being shown).

I still dispute whether this can really be called a one-dimensional coordinate system, since the vertex is off of the one dimension, but at least this proposed diagram would be an improvement. Loraof (talk) 16:59, 29 September 2017 (UTC)Reply

Circular angle is a parameter, not a space. In fact, it is a parameter of the exponential function as in Euler's formula. Another parameter of the same type is hyperbolic angle, also not a space even if in one-to-one correspondence with ℝ. The subject of how these two parameters complement one another was described in Introduction to the Analysis of the Infinite (1748); it is an important part of calculus. Suggesting that angle is a one-dimensional space is likely to spread confusion. — Rgdboer (talk) 21:48, 29 September 2017 (UTC)Reply

I think you have misinterpreted my post. I am not suggesting that "angle is one-dimensional space". The angle is a parameter, and it identifies the location of a point in one-dimensional space, the topic of this article. The leftmost graph copied above shows the one-dimensional space in which locations are parametrized by x, but the rightmost graph unfortunately does not show the one-dimensional space in which locations are parametrized by theta. Instead, it shows two-dimensional space and three parameters: x, y, and theta, which doesn't make sense. Loraof (talk) 23:05, 29 September 2017 (UTC)Reply

Angle is a one-dimensional coodinate, but the question here is can it be the coordinate of a one-dimensional space? "Angle" can only exist as a one-dimensional coordinate embedded in a two-dimensional (or higher) space. As the measure of the intersection of two lines, angles in 1-D space are all zero (or π). SpinningSpark 18:55, 18 August 2020 (UTC)Reply

Hypersphere?

Latest comment: 3 years ago1 comment1 person in discussion

Surely it's Hyposphere. SpinningSpark 18:42, 18 August 2020 (UTC)Reply