Description

= ​ **Super 4pts ** = =Description= A description is a writing form used to create an impression of an object, person, place, event, process, mechanism, etc. You can describe people, objects, animals, plants, or you can also describe how an event happened, how a mechanism operates, etcetera. In a description you find many ** adjectives ** which are the words that will characterize any thing you want to describe. __Example 1:__ In an **equilateral triangle**, all sides are of equal length. An equilateral triangle is also an equiangular polygon, i.e. all its internal angles are equal—namely, 60°; it is a regular polygon. This description was taken from the following web page: [] __Example 2:__ A polygon that is not convex is called **concave**.[|[2]] A concave polygon will always have an interior angle with a measure that is greater than 180 degrees. It is possible to cut a concave polygon into a set of convex polygons This description was taken from the following web page: []  =Assignment= [] 1. There is a definition of fractals there. Please identify it and identify its components. a. the term to be defined b. the general class word and c. the characteristics
 * I. In the text you will find when you click the link below, extract the first two paragraphs and please find all the characteristics of fractals and underline them. Also find the adjectives and circle them. Be careful ! ! ! **

2. There is a description there, please identify it and tell me how you found it. What helped you when locating it.

A fractal often has the following features: Because they appear **//similar//** at all levels of magnification, __fractals are often considered to be infinitely **//complex//** (in **//informal//** terms).__ __**//Natural//** objects that approximate fractals to a degree include clouds, mountain ranges, **//lightning//** bolts, coastlines, snow flakes, various vegetables (cauliflower and broccoli), and **//animal//** coloration patterns. However, not all **//self-similar//** objects are fractals—for example, the **//real//** line (a **//straight//** **//Euclidean//** line) is formally **//self-similar//** but fails to have other **//fractal//** characteristics; for instance, it is **//regular//** enough to be described in **//Euclidean//** terms.__
 * fractal ** is " a **//r//** **//ough//** or //**fragmented geometric**// shape that can be split into parts, each of which is (at least approximately) a **//reduced-size//** copy of the whole ," a property called self-similarity. Roots of **//mathematical//** interest on fractals can be traced back to the late 19th Century; however, the term "fractal" was coined by Benoît Mandelbrot in 1975 and was derived from the Latin //fractus// meaning "**//broken//**" or "**//fractured//**." A **//mathematical//** fractal is based on an equation that undergoes iteration, a form of feedback based on recursion.
 * __It has a **//fine//** structure at arbitrarily **//small//** scales.__
 * __It is too **//irregular//** to be easily described in **//traditional//** Euclidean **//geometric//** language.__
 * __It is__ **//__self-similar__//** __(at least approximately or stochastically).__
 * __It has a Hausdorff dimension which is **//greater//** than its //**topological**// dimension (although this requirement is not met by **//space-filling//** curves such as the Hilbert curve).__
 * __It has a **//simple//** and **//recursive//** definition.__

--> I could find the description by means of some adjectives that they accompany on the name or noun to which describing this one; also I could find her for the series of characteristics that give of something.
 * Good **
 * I **** I: Now write a description of any mathematical word or topic. **

The multiplication is one of the four basic mathematical operations in which there is a multiplier and a multiplicand. It can be applied to both integers and rational numbers by means of the sum repeated, that is to say, "n" times the multiplier for the multiplicand.

This operation has certain properties:

- Commutative property: the order of the factors being multiplied does not alter the product.

- Associative property: the order in which three numbers are multiplied does not affect the result. These three numbers can be paired up in any order by using parenthesis.

- Distributive property: every term of the sum expressed inside the parenthesis is multiplied by the multiplier on the outside.

- Identity element: any number multiplied by one is always equal to the same number.

- Zero element: any number multiplied by zero is always equal to zero.

- Inverse property: the multiplication of any number by its inverse is equal to one. This applies to all numbers except for zero.


 * perfect **

NOTA: no supe encerrar en un círculo los adjetivos por lo que los coloqué en negrita y cursiva (inclinado)
 * No problem ! ! **

**Please visit the following link for more information.**
[]Type in the content of your page here.