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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Length of tangent from one circle to another

Show that length of tangent from any point on the circle$ x^2 + y^2 + 2gx + 2fy +c=0 $ to the circle $x^2 + y^2 + 2gx + 2fy +c_1 =0 $ is $\sqrt {c}-c_1$
Bhavya
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Find the equation of the circle which touches the $X$ axis at t

Find the equation of the circle which touches the $X$ axis at the point $(4,0)$ and passes through the point $(2,2)$ . My Attempt: since the circle touches the $x$ axis, y- co ordinate of the centre is equal to the radius of circle. But, I don't see…
pi-π
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For any point outside of a circle, is there ever only one tangent to the circle that passes through the point?

For any point outside of a circle, is there ever only one tangent to the circle that passes through the point? Are there ever more than two such tangents? (I cannot find the exact answer i need through the other question answered. My question does…
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equation of the circle which passes through two points and the chord joining them making an angle $\theta$ in the major segment of the circle

I am facing trouble finding out the equation of the circle which passes through two points ($x_1,y_1$) and ($x_2,y_2$) and the chord joining ($x_1,y_1$) and ($x_2,y_2$) making an angle $\theta$ in the major segment of the circle. I thought of…
Navin
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Find circle given diameter and string function

I have a circle that the center goes through $ y = 2x$ and $R=2$. I need to find the circle equation if it's given that $y = x+3$ cuts the circle in a string of length $\sqrt{8}$. I drew all this information in GeoGebra $5$ and I think it would look…
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The line $ y=x/3+5$ is a tangent to a circle with centre $(-2,1)$. Find the equation of the circle

I've been given this as a question for my maths AS homework but don't understand how to start. I understand that you need to find the radius to complete the equation but don't know how to do this. So far I have worked out that $(x+2)^2+(y-1)^2=r^2 $…
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Area of a circle from equation for circle

Q. Equation of circle- $2x^2+ \lambda xy+2y^2+( \lambda -4)x+6y-5=0$ find area of the circle. Attempt- For converting the equation from second degree to first degree $\lambda xy=0$. Thus, $\lambda =0$ and- $$(\lambda -4)x = 2gx$$ $$…
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Coordinates of a pt., inside a curve

$Q.(\lambda,\lambda + 1) \text {lies inside the curve } x= \sqrt{25-y^{2}} \space and \ y-axis, \ find \ \lambda$ Attempt- From the given equation, we deduce that the shape is circle. For a point inside the circle, the equation of circle is-…
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Find the intersection between point and circle

given a line segment with endpoints P1 and P2 and a Circle with Center C and Radius R where it is known that P1 lies outside the circle and P2 lies inside the circle, what is an efficient way to find the intersection point between the two, P3?
Eric
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Find the locus of the point..

Find the locus of a point from which the lengths of the tangents to the circles $x^2+y^2+4x+3=0$ and $x^2+y^2-6x+5=0$ are in the ratio $2:3$. My Attempt: Given circles are: $$x^2+y^2+4x+3=0$$ and, $$x^2+y^2-6x+5=0$$. Let, $P(x_1,y_1)$ be a point on…
pi-π
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Problem with a circumference

I have the following equation for a circumference: $$9 X^2 + 25 Y^2 - 36 X - 50 Y = 154.$$ So far I only used this general equation: $X^2 + Y^2 + A X + B Y + C = 0$, but now $X^2$ and $Y^2$ are not alone and are being multiplied by an integer. I…
Pacha
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Given one endpoint of diameter and diameter length of a circle, how to find the other end point of diameter.?

I am trying to solve a coding question in which I need to get the endpoint of diameter, given is one end point and diameter length. (0,1) is point and 1 is diameter of circle.
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Calculating center point coordinates given three coordinates on circle

I have been trying to calculate the center point of a circle based on three coordinates on the circle, using the formula found on this website: http://paulbourke.net/geometry/circlesphere/ The same formula is used on other web sites so I can check…
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Formula for calculating x2 and y2 of a line that behaves like a clock hand?

In the image below, the diameter of the circle is 100, and x1=50 and y1=50 for the line's starting point in the middle. I'd like to be able to draw the line so that it is pointing at different parts of the outer circle, similar to a clock hand.…
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If the circles $x^2+y^2........$

If the circles $x^2+y^2+2ax+c^2=0$ and $x^2+y^2+2by+c^2=0$ touch externally, prove that $\frac {1}{a^2} +\frac {1}{b^2}=\frac {1}{c^2}$. My Attempt Here $$x^2+y^2+2ax+c^2=0$$ $$x^2+2.x.a+a^2-a^2+y^2+c^2=0$$ $$(x+a)^2=a^2-c^2-y^2$$ Then what should…