| Value | Position | |
|---|---|---|
| Position | 18 | 18 |
| Accepted meanings | 511 | 18 |
| Obtained votes | 2 | 56 |
| Votes by meaning | 0 | 5275 |
| Inquiries | 11817 | 20 |
| Queries by meaning | 23 | 5275 |
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"Statistics updated on 4/26/2024 8:37:50 AM"
If ( m, 41 m; greater than or equal to two, m is the order of a square divided into congruent squares or a diamond divided into diamonds in congruent, they are the same one, if the length of the sides of the square base or the base diamond are m divided times the length of the sides of congruent parallelograms.
If ( m, 41 m; greater than or equal to two, m is the order of a square divided into congruent squares or a diamond divided into diamonds in congruent, they are the same one, if the length of the sides of the square base or the base diamond are m divided times the length of the sides of congruent parallelograms.
If ( m, 41 m; greater than or equal to two, m is the order of a rectangle divided into congruent rectangles or a diamond shape divided at rhomboid congruent, they are the equal two, if length greater side and the lower rectangle side base or rhomboid base are m divided times the length of the sides of longer and shorter length of the congruent parallelograms.
If ( m, r ) or ( r, m ) m greater than r, r greater than or equal to one, is the order of a rectangle divided into congruent rectangles or a diamond shape divided at rhomboid congruent, is given in three different ways to build them, taking into account if length greater side or the lower rectangle side base or rhomboid base are m split times or r times the length of the sides of longer or shorter length of the congruent parallelograms.
If ( m, r ) or ( r, m ) m greater than r, r greater than or equal to one, is the order of a rectangle divided into congruent rectangles or a diamond shape divided at rhomboid congruent, are as one, if length greater side and the lower rectangle side base or rhomboid base are divided m times r times respectively with the length of the longest and shortest of the congruent parallelograms sides respectively.
If ( m, r ) or ( r, m ) m greater than r, r greater than or equal to one, is the order of a rectangle divided into congruent rectangles or a diamond shape divided at rhomboid congruent, are as one, if length greater side and the lower rectangle side base or rhomboid base are divided m times r times respectively with the length of the longest and shortest of the congruent parallelograms sides respectively.
If ( m, r ) or ( r, m ) m greater than r, r greater than or equal to one, is the order of a rectangle divided in congruent rectangles or a diamond shape divided into congruent rhomboids, are the two, if length greater side and the lower rectangle side base or rhomboid base are divided m times r times respectively with the length of the shortest and longest congruent parallelograms sides respectively.
If ( m, r ) or ( r, m ) m greater than r, r greater than or equal to one, is the order of a rectangle divided into congruent rectangles or a diamond shape divided at rhomboid congruent, are the three, if length greater side and the lower rectangle side base or rhomboid base are divided times and m r times respectively with the length of the longest and shortest of the congruent parallelograms sides respectively.
It is impossible to construct a rectangle divided into congruent rectangles or rhomboid divided at rhomboid congruent with order ( m, r ) or ( r, m ) m greater than r, or r greater than or equal to one, so that the higher and the lower parallelogram base side are divided, r m times respectively with the length of the sides of shorter and longer length of the congruent parallelograms and times respectively.
The length of the side of 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 m by the length of the sides of a greater length of the congruent parallelograms.
It is a set of rules, where are ludico-mentales mathematical operations, to play on polygons separated from a larger polygon and perform movements from a separate polygon to another separate polygon and taking into account: recreational guides relevant and equal; real addresses; Casillas referential, primary and secondary.
