| Value | Position | |
|---|---|---|
| Position | 18 | 18 |
| Accepted meanings | 511 | 18 |
| Obtained votes | 2 | 56 |
| Votes by meaning | 0 | 5275 |
| Inquiries | 11818 | 20 |
| Queries by meaning | 23 | 5275 |
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"Statistics updated on 4/27/2024 2:23:56 AM"
All polygon concave ordered full divided in fact congruent Rhombus ( m, r, 2 ) greater than r m r greater than two, is separated into a diamond shape divided into congruent Rhombus and a diamond divided into blunt congruent order ( m, r-1 ) and ( m-1, r ) respectively, if and only if m and r are consecutive numbers.
It is the one that contains all polygons sorted concave data ( m, r, n ) greater than r, r greater than n, n greater or equal that one, which is divided in congruent diamond or rhomboid congruent and that limited him a square and a rhombus respectively, also contains all congruent parallelograms order ( m, r ) m greater than r, r greater than or equal to two, and only if, they are squares divided into congruent rectangles or rhombuses divided at rhomboid congruent and through them is supposed that the ordered concave polygons are built forms only one respectively.
It is the one that contains all polygons sorted concave data ( m, r, n ) greater than r, r greater than n, n greater than or equal to one, which are divided into congruent squares or in congruent rectangles and is circumscribing a rectangle and a diamond shape respectively, also contains all the parallelograms split in order 40 congruent parallelograms; m, r ) m more that r, r greater than or equal to one, if and only if, they are rectangle divided into congruent squares or rhomboids divided in congruent Rhombus and through them is supposed that the ordered concave polygons are built is only two respectively.
They are those that contain all the polygons sorted concave data ( m, r, n ) m greater than r, r greater than n, n greater or equal to one, which are divided into diamonds consistent or congruent rhomboid and which are limited him a rectangle and a diamond shape respectively. In shape one side more and less than the circumscribed parallelogram can be divided m and r times with the major and minor of congruent parallelograms length respectively.
They are those that contain all the polygons sorted concave data ( m, r, n ) m greater than r, r greater than n, n greater or equal to one, which are divided into diamonds consistent or congruent rhomboid and that limited him a rectangle and a diamond shape respectively. As two, the major and minor of the circumscribed parallelogram, side can be divided m and r times with the major and minor of congruent parallelograms length respectively.
They are those that contain all the polygons sorted concave data ( m, r, n ) m greater than r, r greater than n, n greater or equal to one, which are divided into diamonds consistent or congruent rhomboid and that limited him a rectangle and a diamond shape respectively. As two, the major and minor of the circumscribed parallelogram, side can be divided m and r times with the major and minor of congruent parallelograms length respectively.
They are those that contain all the polygons sorted concave data ( m, r, n ) m greater than r, r greater than n, n greater or equal to one, which are divided into diamonds consistent or congruent rhomboid and that limited him a rectangle and a diamond shape respectively. In form three, the major and minor of the circumscribed parallelogram side can be divided r and m times with the major and minor of congruent parallelograms length respectively.
They are the various defined elements of absolute sets and related assemblies that should be a tab in one game either, because the element defined for this function: the defined absolute elements that are written in the boxes and the address that have defined regarding items that are written in the boxes.
they are defined different elements of absolute sets that must be mentally make a tab that has written on one side of the elements not defined on sets, so that mentally the absolute element defined to make, this depending on the direction of its corresponding element not defined that is written on the tab that is placed in the boxes of the playful.
The length of the side less than the parallelogram base divided into congruent parallelograms of shape one on order ( m, r ) or ( r, m ) m greater than r, r greater than or equal to one, is equal to r by the length of the sides of shorter length of the congruent parallelograms.
All parallelograms divided into congruent parallelograms of order ( m, r ) or ( r, m ) m greater than r, r greater than or equal to one, are grouped into an ordered collection consisting of infinite members ( 41 sets; ordered, where each Member has infinite items or orders.
