Value | Position | |
---|---|---|
Position | 18 | 18 |
Accepted meanings | 511 | 18 |
Obtained votes | 2 | 56 |
Votes by meaning | 0 | 5275 |
Inquiries | 11867 | 20 |
Queries by meaning | 23 | 5275 |
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"Statistics updated on 5/7/2024 2:11:54 AM"
If in them polygons concave ordered, them sides of them lines broken have two lengths different, then the value of the indicator greater is given by the ratio between the length of the indicator greater and the length of them sides of greater length of them lines broken and the value of the indicator less is given by the ratio between the length of the indicator less and the length of them sides of less length of them lines broken.
If unite with segments of straight them points means of sides consecutive or draw them diagonal in each one of them square consistent of a parallelogram divided in square and delete them surplus, is obtains a polygon concave ordered that is divided in square
If unite with segments of straight them points media of sides consecutive or if draw the diagonal in each one of them rectangles congruent of a parallelogram divided in rectangles and delete them surplus, is obtains a polygon concave ordered that is divided in diamonds.
If unite with segments of straight them points media of sides consecutive or if draw the diagonal in each one of them diamonds congruent of a parallelogram divided in rhombuses and delete them surplus, is obtains a polygon concave ordered that is divided in rectangle.
If unite with segments of straight them points media of sides consecutive or if draw them diagonal in each one of them rhomboid congruent of a parallelogram divided at rhomboid and delete them surplus, is obtains a polygon concave ordered that is divided in rhomboid.
A biunivocal relation between the set of polygons arranged concave of data there is ( m, r, 1, ) m more that r, r greater or equal to two, and the joint of parallelograms divided in parallelograms congruent of order ( m, r ) m more that r, r greater or equal to two.
Yes ( m, r, n ) m greater or equal that r, r greater that n, n greater or equal that three odd, is the data of a polygon concave ordered, then ( n-1 ) ² is the total of parallelograms that you are missing to them polygons concave ordered incomplete, to be polygons concave ordered complete.
If we draw the diagonal in each one of them parallelograms consistent of a parallelograms divided in parallelograms of order ( m, r ) or ( r, m ) m greater than or equal to r, r greater than or equal to two, and delete leftovers, gets a polygon data ordered concave ( m, r, n ) or ( r, m, n ) m greater or equal to r, r greater that n, n greater or equal that two pair.