Value | Position | |
---|---|---|
Position | 18 | 18 |
Accepted meanings | 511 | 18 |
Obtained votes | 2 | 56 |
Votes by meaning | 0 | 5275 |
Inquiries | 11848 | 20 |
Queries by meaning | 23 | 5275 |
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"Statistics updated on 5/1/2024 11:02:35 PM"
To meet with mathematicians, physicists, philosophers and curious, discussing the postulate poverty and happiness of my authorship, you came to the conclusion that poverty and happiness are inversely proportional and not relative says the " philosopher " Felipe Lorenzo de el Río.Se must keep in mind, that regard are different readings given by observers in different positions with respect to a same experiment. Read the relativity of Albert Einstein and the open dictionary, read related recreational sets. POSDATAUn ten times-poor man and a tenth of happy, is poorer and less happy than a three times-poor man and one-third of happy.
It is assumed that, through a rectangle divided into forms congruent rectangles, one, two or three of order ( m, r ) m greater than r, r greater than or equal to two, is built a polygon concave ordered divided into forms congruent diamond one, two or three respectively data ( m, r, n ) m greater than r, r greater than n, n greater or equal to one.
Is assumed that using a diamond shape divided into forms congruent rhomboid one, two or three of order ( m, r ) m greater than r, r greater than or equal to two, is built a polygon concave ordered divided into forms congruent rhomboid one, two or three respectively data ( m, r, n ) m greater than r, r greater than n, n greater or equal to one.
Is assumed that using a square divided into congruent rectangles of only one form of order ( m, r ) m greater than r, r greater than or equal to two, builds a polygon concave ordered divided into congruent Rhombus of unique shape one data ( m, r, r ) m greater than r, r greater than or equal to two.
Is assumed by a diamond divided at rhomboid congruent of only one form of order ( m, r ) m greater than r, r greater than or equal to two, builds a polygon concave ordered divided at rhomboid congruent of the uniquely one data ( m, r, r ) m greater than r, r greater than or equal to two.
It is assumed that through a rectangle divided into two unique order 40 form congruent squares; m, r ) m greater than r, r greater than or equal to two, builds a polygon concave ordered divided into congruent squares unique shape two data ( m, r, r ) m greater than r, r greater than or equal to two.
Is assumed by a diamond shape divided into congruent order 40 only form two rhombuses; m, r ) m greater than r, r greater than or equal to two, builds a polygon concave ordered divided into congruent rectangles of the uniquely two data ( m, r, r ) m greater than r, r greater than or equal to two.
It is assumed that by means of a diamond shape divided into congruent rhomboids of two equal ( m, 41 m order form; m greater than or equal to two, builds a polygon concave ordered divided at rhomboid congruent in the same way two data ( m, mm, n ) m greater than n, n greater or equal to one.
Is assumed that using a square divided into congruent rectangles of only one form of order ( m, r ) m greater than r, r greater than or equal to two, builds a polygon concave ordered divided into congruent Rhombus of unique shape one data ( m, r, n ) m greater than r, r greater than n, n greater or equal to one.
Is assumed by a diamond divided at rhomboid congruent of only one form of order ( m, r ) m greater than r, r greater than or equal to two, builds a polygon concave ordered divided at rhomboid congruent of the uniquely one data ( m, r, n ) m greater than r, r greater than n, n greater or equal to one.
It is assumed that through a rectangle divided into two unique order 40 form congruent squares; m, r ) m greater than r, r greater than or equal to two, builds a polygon concave ordered divided into congruent squares unique shape two data ( m, r, n ) m greater than r, r greater than n, n greater or equal to one.
Is assumed by a diamond shape divided into congruent order 40 only form two rhombuses; m, r ) m greater than r, r greater than or equal to two, builds a polygon concave ordered divided into congruent rectangles of the uniquely two data ( m, r, n ) m greater than r, r greater than n, n greater or equal to one.
The perimeter of the polygons sorted concave, where the sides of the broken lines have two different lengths and gives data ( m, ) m greater than n, n greater or equal to two, is equal to 2m by the sum of the lengths of the sides of longer and shorter length of the broken lines.