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

6336 questions
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Finding the centre of a circle under a specific condition

Question: Consider a circle, say $\mathscr{C}_1$ with the equation $x^2 + (y-L)^2=r^2$. A second circle, say $\mathscr{C}_2,$ with equal radii that has a centre $(x_0,y_0)$ which lies on the line $y=mx$. Find an expression for $x_0$ and $y_0$, in…
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A general circle through the intersection points of line $L$ and circle $S_1$ has the form $S_1+\lambda L$. What is the significance of $\lambda$?

We write a general line $L$ passing through intersection of two lines $L_1$ and $L_2$ as $L= L_1 + (\lambda) L_2$ where $\lambda$ is a variable. Even in family of circles we write a general circle $S$ passing through points of intersection of a…
Akshat
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What is the length of the sides of a hexagon containing 19 x Ø2" billiard balls?

I'm looking to make a hexagon wooden rack to hold 19 x Ø2" billiard balls. What is the length of the inside sides of the hexagon containing 19 x Ø2" billiard balls?
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Given three circles (not concentric) if a variable circle cuts all three circle at equal angles.Then the locus of center of variable circle?

Given three circles (not concentric) if a variable circle cuts all three circle at equal angles.Then the locus of center of variable circle? I don’t know how to find locus without assuming the equation of three circle.
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whats the simplest way to find this circle's center if known its tangent line

the circle has a tangent line $y = 2x + 1$ at $(2,5)$ and its center on the line $y = 9 - x$. If that's circle intersect the $x$ -axis at $x_1, x_2$ what's $x_1 + x_2$ ? i understand than $x_1 + x_2 = 2x_0$ when $x_0$ is the circle's center. we can…
Dini
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Determine the diameter of a circle with constraints

I would like to solve in analytical way the following problem: I have a circle with diameter D1=70mm I have another circle with diameter D2=Xmm which is my unknown of this problem The center to center distance between the circles is 250mm The…
kalo86
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Calculating circle equation given 2 points on it

Let's assume we have 2 points which are on the one base unit circle. There is another circle which passes through those points. How to determine circle equation given coordinates for those points. You can see what I mean in the image below
hero_05
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What is the maximum number of circles in proximity to a given point.

The title maybe a bit obscure so I'll try my best to explain the problem here. Below is the Picture that I'll take help from. Say I have a circle A of Radius R now if I take a point C inside this circle then obviously the center A will lie inside…
Kraken
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Prove that AF=AB

Question - Draw a circle with centre O .choose a point A and cut off chord AB,BC,CD,DE,EF each equal to radius .prove that AF=AB My try - I know this is very simple question but I am not getting.. I tried angle chasing , try to show some…
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How to find the intersection of two circles

I am doing a question on coordinate geometry. It asks to find the points of intersection of the two circles: $\\(x+1)^2+(y-2)^2=10$ and $\\(x-1)^2+(y-3)^2=5$ And then find the area of the triangle formed by the two points and the origin. I am…
harpomiel
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Why does this would eventually simplify into the original circle equation?

I was trying to solve this problem: The point $A$ has coordinates $(5, 16)$ and the point $B$ has coordinates $(-4,4)$. The variable $P$ has coordinate $(x,y)$ and moves on a path such that $ AP = 2BP$. Show that the Cartesian equation of the path…
Henry Cai
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Geometric Proofs

I am not sure where I went wrong in this question. I am meant to find the length of the belt that is around the pulley. I have also attached my working out. Thank you!!
Aleesha
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Finding orthogonal circle

How to find the equation of a circle which is orthogonal to both the circles $x^2+y^2=4$ and $x^2+y^2-8x-8y+28=0$?? Me got the equation of radical axis, now i thought the centre of the required circle lies on radical axis ,but how to proceed…
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ABCD is a rectangle. $AB=1$, $AD=\sqrt{3}$. Using $B$ as the center and $BA$ as the radius,

ABCD is a rectangle. $AB=1$, $AD=\sqrt{3}$. Using $B$ as the center and $BA$ as the radius, draw a circle that intersects $BC$ at $E$. $P$ is a point on arc $AE$. Draw circle $B$'s tangent line through point $P$ that intersects $AD$ at $S$ and $BC$…
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In right triangle $ABC$, $AC=BC$, arc $DEF$'s center is $A$, if the two shaded segments have the same area, what is $AD:DB$?

I'm working on this question for a math class I'm taking. I don't think it's very hard, but for some reason I can't really get anywhere with it. Since triangle $ABC$ is 45-45-90, I called $AD$ $x$ and $BD$ $y$, then drew line segment $AE$ and tried…