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In Euclidean Geometry , a circle is the Set of all Points in a plane at a fixed Distance , called the Radius , from a given point, the ''centre''. Circles are Simple Closed Curve s which divide the plane into an interior and exterior. The '' Circumference '' of a circle means the length of the circle, and the interior of the circle is called a '' Disk ''. An '' Arc '' is any Continuous portion of a circle. A circle is a special Ellipse in which the two Foci coincide (i.e., are the same point). Circles are Conic Section s attained when a right circular cone is intersected with a plane perpendicular to the axis of the cone. ANALYTIC RESULTS Equation of a circle In an ''x''-''y'' Coordinate System , the circle with centre (''a'', ''b'') and radius ''r'' is the set of all points (''x'', ''y'') such that :$$ \left( x - a ight)^2 + \left( y - b ight)^2=r^2. If the circle is centred at the origin (0, 0), then this Formula can be simplified to :$x^2\; +\; y^2\; =\; r^2\; \backslash !\backslash$ and its Tangent will be :$xx\_1+yy\_1=r^2\; \backslash !\backslash$ where $x\_1$, $y\_1$ are the coordinates of the common point. When expressed in Parametric Equations , (''x'', ''y'') can be written using the Trigonometric Function s sine and cosine as :$x\; =\; a+r\backslash ,\backslash cos\; t,\backslash ,\backslash !$ :$y\; =\; b+r\backslash ,\backslash sin\; t\backslash ,\backslash !$ where ''t'' is a Parametric Variable , understood as the angle the ray to (''x'', ''y'') makes with the ''x''-axis. In Homogeneous Coordinates each Conic Section with equation of a circle is :$$ ax^2+ay^2+2b_1xz+2b_2yz+cz^2 = 0. It can be proven that a ''conic section'' is a circle if and only if the point I(1,i,0) and J(1,-i,0) lie on the conic section. These points are called the Circular Points At Infinity . In Polar Coordinates the equation of a circle is :$$ r^2 - 2 r r_0 \cos( heta - arphi) + r_0^2 = a^2.\,

PROPERTIES

• The circle is the shape with the highest area for a given length of perimeter. (See Isoperimetry )


• 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. Its Symmetry Group is the Orthogonal Group O(2,R). The group of rotations alone is the Circle Group '''T'''.


• All circles are Similar .


• ---A circle's circumference and radius are Proportional ,


• ---The Area enclosed and the square of its radius are Proportional .


• ---The Constants of proportionality are 2 π and π, respectively.


• The circle centred at the origin with radius 1 is called the Unit Circle .

Chord properties

• Chords equidistant from the centre of a circle are equal (length).


• Equal (length) chords are equidistant from the centre.


• The perpendicular bisector of a chord passes through the centre of a circle; equivalent statements stemming from the uniqueness of the perpendicular bisector:


• --- A perpendicular line from the centre of a circle bisects the chord.


• --- The Line Segment ( Circular Segment ) through the centre bisecting a chord is perpendicular to the chord.


• If a central angle and an Inscribed Angle of a circle are subtended by the same chord and on the same side of the chord, then the central angle is twice the inscribed angle.


• If two angles are inscribed on the same chord and on the same side of the chord, then they are equal.


• If two angles are inscribed on the same chord and on opposite sides of the chord, then they are supplemental.


• --- For a cyclic quadrilateral, the exterior angle is equal to the interior opposite angle.


• An inscribed angle subtended by a diameter is a right angle.


• The diameter is longest chord of the circle.

Sagitta properties

• The sagitta is a line segment drawn perpendicular to a chord, between the midpoint of that chord and the circumference of the circle.


• Given the length of a chord, y, and the length '''x''' of the sagitta, the Pythagorean Theorem can be used to calculate the radius of the unique circle which will fit around the 2 lines :

written by priyam saini


Tangent properties

• The line drawn perpendicular to the end point of a radius is a tangent to the circle.


• A line drawn perpendicular to a tangent at the point of contact with a circle passes through the centre of the circle.


• Tangents drawn from a point outside the circle are equal in length.


• Two tangents can always be drawn from a point outside of the circle.

Theorems


See Also: Power of a point

• The chord theorem states that if two chords, CD and EF, intersect at G, then $CG\; imes\; DG\; =\; EG\; imes\; FG$. (Chord theorem)


• If a tangent from an external point ''D'' meets the circle at ''C'' and a secant from the external point ''D'' meets the circle at ''G'' and ''E'' respectively, then $DC^2\; =\; DG\; imes\; DE$. (tangent-secant theorem)


• If two Secant s, DG and DE, also cut the circle at H and F respectively, then $DH\; imes\; DG\; =\; DF\; imes\; DE$. (Corollary of the tangent-secant theorem)


• The angle between a tangent and chord is equal to the subtended angle on the opposite side of the chord. (Tangent chord property)


• If the angle subtended by the chord at the centre is 90 degrees then ''l'' = √(2) × ''r'', where ''l'' is the length of the chord and ''r'' is the radius of the circle.


• If two secants are inscribed in the circle as shown at right, then the measurement of angle A is equal to one half the difference of the measurements of the enclosed arcs (DE and BC). This is the secant-secant theorem.

INSCRIBED ANGLES


An Inscribed Angle $\backslash psi$ is exactly half of the corresponding Central Angle $heta$ (see Figure).
Hence, all inscribed angles that subtend the same arc have the same value
(cf. the blue and green angles $\backslash psi$ in the Figure). Angles inscribed on the arc are supplementary.
In particular, every inscribed angle that subtends a Diameter
is a Right Angle .


AN ALTERNATIVE DEFINITION OF A CIRCLE


Apollonius Of Perga showed that a circle may also be defined as the set of points having a constant ''ratio'' of distances to two foci, A and B.

The proof is as follows. A line segment PC bisects the interior angle APB, since the segments are similar:

:$$
rac{AP}{BP} = rac{AC}{BC}


Analogously, a line segment PD bisects the corresponding exterior angle. Since the interior and exterior angles sum to $180^\{\backslash circ\}$, the angle CPD is exactly $90^\{\backslash circ\}$, i.e., a Right Angle . The set of points P that form a right angle with a given line segment CD form a circle, of which CD is the diameter.

As a point of clarification, note that C and D are determined by A, B, and the desired ratio; i.e. A and B are not arbitrary points lying on an extension of the diameter of an existing circle.


CALCULATING THE PARAMETERS OF A CIRCLE


, particularly Geometry and Astronomy/astrology , was connected to the divine for most Medieval Scholars .
The Compass in this 13th Century manuscript is a symbol of God's act of Creation , as many believed that there was something intrinsically "divine" or "perfect" that could be found in circles]]

Given three non-collinear points lying on the circle

:$$
\mathrm{P_1} = \begin{bmatrix} x_1 \ y_1 \ z_1 \end{bmatrix},
\mathrm{P_2} = \begin{bmatrix} x_2 \ y_2 \ z_2 \end{bmatrix},
\mathrm{P_3} = \begin{bmatrix} x_3 \ y_3 \ z_3 \end{bmatrix}



Radius


The radius of the circle is given by

:$$
\mathrm{r} = rac






\sin \left( rac{\mathrm{s}}{\mathrm{r}} ight)
\left \hat{n} imes \left( P_0 - P_c ight) ight



REFERENCES


Notes



See also




External links

• Interactive Java applets for the properties of and elementary constructions involving circles.


• Interactive Standard Form Equation of Circle Click and drag points to see standard form equation in action


• Clifford's Circle Chain Theorems. Step by step presentation of the first theorem. Clifford discovered, in the ordinary Euclidean plane, a " Sequence or chain of theorems" of increasing Complexity , each building on the last in a natural progression by Antonio Gutierrez from "Geometry Step by Step from the Land of the Incas"


• Munching on Circles at Cut-the-knot


• Ron Blond homepage - interactive applets


• calculate circumference and area with your own values