Homothety

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In mathematics, a homothety (or homothecy, or homogeneous dilation) is a transformation of an affine space determined by a point S called its center and a nonzero number called its ratio, which sends point to a point by the rule [1]

Homothety: Example with
For one gets the identity (no point is moved),
for an enlargement
for a reduction
Example with
For one gets a point reflection at point
Homothety of a pyramid
for a fixed number .

Using position vectors:

.

In case of (Origin):

,

which is a uniform scaling and shows the meaning of special choices for :

for one gets the identity mapping,
for one gets the reflection at the center,

For one gets the inverse mapping defined by .

In Euclidean geometry homotheties are the similarities that fix a point and either preserve (if ) or reverse (if ) the direction of all vectors. Together with the translations, all homotheties of an affine (or Euclidean) space form a group, the group of dilations or homothety-translations. These are precisely the affine transformations with the property that the image of every line g is a line parallel to g.

In projective geometry, a homothetic transformation is a similarity transformation (i.e., fixes a given elliptic involution) that leaves the line at infinity pointwise invariant.[2]

In Euclidean geometry, a homothety of ratio multiplies distances between points by , areas by and volumes by . Here is the ratio of magnification or dilation factor or scale factor or similitude ratio. Such a transformation can be called an enlargement if the scale factor exceeds 1. The above-mentioned fixed point S is called homothetic center or center of similarity or center of similitude.

The term, coined by French mathematician Michel Chasles, is derived from two Greek elements: the prefix homo- (όμο), meaning "similar", and thesis (Θέσις), meaning "position". It describes the relationship between two figures of the same shape and orientation. For example, two Russian dolls looking in the same direction can be considered homothetic.

Homotheties are used to scale the contents of computer screens; for example, smartphones, notebooks, and laptops.

Properties

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The following properties hold in any dimension.

Mapping lines, line segments and angles

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A homothety has the following properties:

  • A line is mapped onto a parallel line. Hence: angles remain unchanged.
  • The ratio of two line segments is preserved.

Both properties show:

Derivation of the properties: In order to make calculations easy it is assumed that the center   is the origin:  . A line   with parametric representation   is mapped onto the point set   with equation  , which is a line parallel to  .

The distance of two points   is   and   the distance between their images. Hence, the ratio (quotient) of two line segments remains unchanged .

In case of   the calculation is analogous but a little extensive.

Consequences: A triangle is mapped on a similar one. The homothetic image of a circle is a circle. The image of an ellipse is a similar one. i.e. the ratio of the two axes is unchanged.

 
With intercept theorem

Graphical constructions

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using the intercept theorem

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If for a homothety with center   the image   of a point   is given (see diagram) then the image   of a second point  , which lies not on line   can be constructed graphically using the intercept theorem:   is the common point th two lines   and  . The image of a point collinear with   can be determined using  .

 
Pantograph
 
Geometrical background
 
Pantograph 3d rendering

using a pantograph

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Before computers became ubiquitous, scalings of drawings were done by using a pantograph, a tool similar to a compass.

Construction and geometrical background:

  1. Take 4 rods and assemble a mobile parallelogram with vertices   such that the two rods meeting at   are prolonged at the other end as shown in the diagram. Choose the ratio  .
  2. On the prolonged rods mark the two points   such that   and  . This is the case if   (Instead of   the location of the center   can be prescribed. In this case the ratio is  .)
  3. Attach the mobile rods rotatable at point  .
  4. Vary the location of point   and mark at each time point  .

Because of   (see diagram) one gets from the intercept theorem that the points   are collinear (lie on a line) and equation   holds. That shows: the mapping   is a homothety with center   and ratio  .

Composition

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The composition of two homotheties with centers   and ratios   mapping   is a homothety again with its center   on line   with ratio  .
  • The composition of two homotheties with the same center   is again a homothety with center  . The homotheties with center   form a group.
  • The composition of two homotheties with different centers   and its ratios   is
in case of   a homothety with its center on line   and ratio   or
in case of   a translation in direction  . Especially, if   (point reflections).

Derivation:

For the composition   of the two homotheties   with centers   with

 
 

one gets by calculation for the image of point  :

 
 .

Hence, the composition is

in case of   a translation in direction   by vector  .
in case of   point
 

is a fixpoint (is not moved) and the composition

 .

is a homothety with center   and ratio  .   lies on line  .

 
Composition with a translation
  • The composition of a homothety and a translation is a homothety.

Derivation:

The composition of the homothety

  and the translation
  is
 
 

which is a homothety with center   and ratio  .

In homogeneous coordinates

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The homothety   with center   can be written as the composition of a homothety with center   and a translation:

 .

Hence   can be represented in homogeneous coordinates by the matrix:

 

A pure homothety linear transformation is also conformal because it is composed of translation and uniform scale.

See also

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Notes

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  1. ^ Hadamard, p. 145)
  2. ^ Tuller (1967, p. 119)

References

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  • H.S.M. Coxeter, "Introduction to geometry" , Wiley (1961), p. 94
  • Hadamard, J., Lessons in Plane Geometry
  • Meserve, Bruce E. (1955), "Homothetic transformations", Fundamental Concepts of Geometry, Addison-Wesley, pp. 166–169
  • Tuller, Annita (1967), A Modern Introduction to Geometries, University Series in Undergraduate Mathematics, Princeton, NJ: D. Van Nostrand Co.
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