Questions tagged [circles]

For elementary questions concerning circles (or disks). A circle is the locus of points in a plane that are at a fixed distance from a fixed point. Use this tag alongside [geometry], [Euclidean geometry], or something similar. Do not use this tag for more advanced topics, such as complex analysis or topology.

A circle is a shape in geometry, defined as the locus of points that have a fixed distance from a certain point, called the centre. The fixed distance from the centre of a circle to any of its points is called the radius. The length of the set of points is called the circumference, and for Euclidean space is related to the length of the radius by:

\begin{equation}\text{circumference}=2\pi\times\text{radius}\end{equation}

Similarly, in Euclidean space the area enclosed by a circle is given by:

\begin{equation}\text{area}=\pi\times\text{radius}^2\end{equation}

Because of their radial symmetry and structure, circles have a large number of desirable properties. These include:

  • The circle is the shape with the largest area for a given length of perimeter.
  • The circle is a highly symmetric shape: every line through the centre forms a line of reflection symmetry and it has rotational symmetry around the centre for every angle.
  • All circles are similar.
    • A circle's circumference and radius are proportional.
    • The area enclosed and the square of its radius are proportional.
  • The circle that is centred at the origin with radius 1 is called the unit circle.
    • Thought of as a great circle of the unit sphere, it becomes the Riemannian circle. Through any three points, not all on the same line, there lies a unique circle.
    • In Cartesian coordinates, it is possible to give explicit formulae for the coordinates of the centre of the circle and the radius in terms of the coordinates of the three given points.

There are many more properties of circles, see the following source for more information: https://en.wikipedia.org/wiki/Circle

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Is it possible to prove existence of the circle.

Is it possible to demonstrate a geometric proof to prove the existence of a circle? In Euclid's first proposition, he uses circles to prove the existence of an equilateral triangle, yet does not start by proving the existence of the circle. Is this…
Alaska
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Locus of a Point at which two circles subtend equal angles

The locus of a point at which two given unequal circles subtend equal angles is? Ans- Circle My work: I assumed two circles with different general equations and the required point be P(h,k). Then i drew a pair of tangent to both circles and…
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Find the equation of the circle passing ...

Find the equation of the circle passing through the points $P(5,7)$, $Q(6,6)$ and $R(2,-2)$. My Attempt: Let the equation of the circle be: $$x^2+y^2+2gx+2fy+c=0$$ The point $P(5,7)$ lies on the circle…
pi-π
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Finding the locus of a point $P$ if the tangents drawn from $P$ to circle $x^2 + y^2 = a^2$ so that the tangents are perpendicular to each other?

Question: Find the locus of a point $P$ if the tangents drawn from $P$ to circle $x^2 + y^2 = a^2$ so that the tangents are perpendicular to each other. I tried solving this and then I got to this condition here, after I applied the formulua for…
dada wilson
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In the figure, two circles intersect at $P$ and $Q$...

In the figure, two circles intersect at $P $ and $Q$. $O$ is the centre of the smaller circle which lies on the circumference of the larger circle and $RO$ is joined and produced to meet $QS$ at $X$. Prove that $RQ=RS$ My Attempt $1. \angle…
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calculate the correct space between dots on a dashed circle, to have a perfect alignment

I want to draw a dashed circle, with a diameter D, and X dots composing the circle, like on this image: dashed circle How can I define the exact space I should have between the different dots, to avoid the misalignment you can see on the right of…
Jeremy
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A calculation involving two circles

I have two circles, one of which is completely within the other. They do not touch, but are not necessarily concentric. I am given the sum of their circumferences, and the difference in their areas (ie, the area of the space inside the outer circle…
John
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Finding End point of an Arc in Cartesian Coordinates while radius, arc length and one end of Arc is given?

I want to find the position of a robot using single tire model while rotating. I am assuming robot is moving along a circle. I know its radius, length or arc and starting point of arc. This time arc direction is clockwise but it could also be…
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4 circles one thread circling them

Can somebody tell me how to measure the length of a thread which is wrapped around 4 circles the radius of each is 1m. The four circles are touching but their centers don't form a square when they are connected. Can you please explain the steps and…
adib
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What is the equation of circle with radius $\sqrt{2}$, tangent to the line $x+y=3$, and having its center on the line $y=4x$?

What is the equation of circle with radius $\sqrt{2}$, tangent to the line $x+y=3$, and having its center on the line $y=4x$? Can someone help me please?
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Circles and mid bisector

Let the point $M -$ bisector middle $AD$ acute triangle $ABC$. A circle $\omega_1$ with a diameter of $AC$ intersects the segment $BM$ at point $E$, and a circle $\omega_2$ with a diameter of $AB$ intersects the segment $CM$ at point $F$. Prove that…
Roman83
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If A, B, C, D are four points on a circle in order such that AB = CD, prove that AC = BD.

If A, B, C, D are four points on a circle in order such that AB = CD. How do you prove that AC = BD.
Indu
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circle segment height by given fill fraction

At work I was facing the problem of how to calculate the height of a water column inside an horizontal cylinder given the volume of the liquid. A plot of this function and a visual explanation can be found…
Stephan
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Work out radius from arc sector and angle

I am trying to work out the radius of a sector with arc length of 47.6 and a angle of 210. I tried a formula which was $r=\frac{L}{2π}\times \frac{360}{\theta}$ I saw but kept ending up with 128.176 Thank you for reading.
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Calculate the diameter of an inscribed circle inside a sector of circle

$AOB$ is a sector of a circle with center $O$, angle = 45° and radius $OA=10$. Find the radius of the chord inscribed circle in this sector such that it touches radius $OA$, radius $OB$ and arc $AB$.