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Template:No footnotes In Geometry, a locus (plural: loci) is a set of points whose location satisfies or is determined by one or more specified conditions i.e., 1)every point satisfies a given condition and 2)every point satisfiying it is in that particular locus

Commonly studied loci

Examples from plane geometry:

• The set of points equidistant from two points is a perpendicular bisector to the line segment connecting the two points.

• The set of points equidistant from two lines which cross is the angle bisector.

• All conic sections are loci:
  • Parabola: the set of points equidistant from a single point (the focus) and a line (the directrix).
  • Circle: the set of points for which the distance from a single point is constant (the radius). The set of points for each of which the ratio of the distances to two given foci is a positive constant (that is not 1) is referred to as a Circle of Apollonius.
  • Hyperbola: the set of points for each of which the absolute value of the difference between the distances to two given foci is a constant.
  • Ellipse: the set of points for each of which the sum of the distances to two given foci is a constant. In particular, the circle is a locus.

Proof of a Locus

In order to prove the correctness of a locus, one generally divides the proof into two stages:

• Proof that all the points that satisfy the conditions are on the locus.
• Proof that all the points on the locus satisfy the conditions.

Examples

The locus of the points P that have a given ratio of distances k = d1/d2 to two given points.
In this example we choose k = 3 , A(-1,0) and B(0,2) as the fixed points.

P(x,y) is a point of the locus

${\displaystyle \Leftrightarrow |PA|=3|PB|}$

${\displaystyle \Leftrightarrow |PA|^{2}=9|PB|^{2}}$

${\displaystyle \Leftrightarrow (x+1)^{2}+(y-0)^{2}=9(x-0)^{2}+9(y-2)^{2}}$

${\displaystyle \Leftrightarrow 8(x^{2}+y^{2})-2x-36y+35=0}$

${\displaystyle \Leftrightarrow \left(x-{\frac {1}{8}}\right)^{2}+\left(y-{\frac {9}{4}}\right)^{2}={\frac {45}{64}}}$

This equation represents a circle with center (1/8,9/4) and radius ${\displaystyle {\frac {3}{8}}{\sqrt {5}}}$.

A triangle ABC has a fixed side [AB] with length c. We determine the locus of the third vertex C such that the medians from A en C are orthogonal.

We choose an orthonormal coordinate system such that A(-c/2,0), B(c/2,0). C(x,y) is the variable third vertex. The center of [BC] is M( (2x+c)/4, y/2 ). The median from C has a slope y/x. The median AM has a slope 2y/(2x+3c).

C(x,y) is a point of the locus

${\displaystyle \Leftrightarrow }$ The medians from A and C are orthogonal

${\displaystyle \Leftrightarrow {\frac {y}{x}}\cdot {\frac {2y}{2x+3c}}=-1}$

${\displaystyle \Leftrightarrow 2y^{2}+2x^{2}+3cx=0}$

${\displaystyle \Leftrightarrow x^{2}+y^{2}+(3c/2)x=0}$

${\displaystyle \Leftrightarrow (x+3c/4)^{2}+y^{2}=9c^{2}/16}$

The locus of the vertex C is a circle with center (-3c/4,0) and radius 3c/4.

A locus can also be defined by two associated curves depending on one common parameter. If the parameter varies, the intersection points of the associated curves describe the locus.

On the figure, the points K and L are fixed points on a given line m. The line k is a variable line through K. The line l through L is perpendicular to k. The angle between k and m is the parameter. k and l are associated lines depending on the common parameter. The variable intersection point S of k and l describes a circle. This circle is the locus of the intersection point of the two associated lines.

See also

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References

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• Robert Clarke James, Glenn James: Mathematics Dictionary. Springer 1992, ISBN 978-0-412-99041-0, p. 255 (Template:Google books)
• Alfred North Whitehead: An Introduction to Mathematics. BiblioBazaar LLC 2009 (reprint), ISBN 978-1-103-19784-2, pp. 121 (Template:Google books)
• George Wentworth: Junior High School Mathematics: Book III. BiblioBazaar LLC 2009 (reprint), ISBN 978-1-103-15236-0, pp. 265 (Template:Google books)