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 5/6/2024 11:27:54 PM"
If we unite with line segments the midpoints of sides consecutive of each of the congruent parallelograms from a parallelogram of order ( m, r ) or ( r, m ) m more that r, r greater or equal that three odd, and delete the surplus, is obtains a polygon concave ordered of dato ( m, r, r ) or ( r, m, r ) m greater than r, r greater than or equal to three odd.
If we draw the diagonal in each one of them parallelograms consistent of a parallelogram divided in parallelogram of order ( m, r ) or ( r, m ) m more that r, r greater or equal that two pair, and delete them surplus, was obtained a polygon concave ordered of data ( m, r, r ) or ( r, m, r ) m greater than r, r greater than or equal than two pair.
If in them polygons concave ordered, the sides of the lines broken have two lengths different, then the value of the indicator more is 1,2,3... n times the length of the sides of the greater length of the broken lines and the value of the lower indicator is 1,2,3... n times the length of the sides of lower length of the lines broken.
Are joint formed by triads ( n, r, m ) or ( r, m, n ) m greater than or equal to r, r greater than n, n greater or equal to 1, and each one of the triads identified to a polygon ordered concave where m and r are the order and n, is the value of the indicator.
They are those who have four lines broken with different numbers of sides of two in two and four indicators, ( m, r, n ) identify with the shortlisting m greater than r, r greater than n, n greater or equal to 1, and the total of its sides is a term of the sequence 16,20,24,28...
They are the ones that can be separated into two parallelograms split in congruent parallelograms or a parallelogram and a parallelogram divided into congruent parallelograms, and have as a shortlisting ( m, r, 1, ) or ( m, r, 2 ) m greater or equal to r, r greater or equal to two.
There are many methods to build the ordered concave polygons, but assumes they are constructed from the divided into congruent parallelograms parallelograms by joining the midpoints of consecutive sides with line segments or to draw the diagonals in each of the congruent parallelograms and deleting the leftovers, gets a tidy concave polygon.
If we unite with line segments the midpoints of sides consecutive of each of the congruent parallelograms from a parallelogram divided into parallelograms of order ( m, r ) or ( r, m ) m greater or equal to r, r greater that one, and delete them surplus, is Gets a polygon concave ordered of dato ( m, r, n ) or ( r, m, n ) respectively, m greater than or equal to r, r greater than n, greater or equal to one odd.
ordered concave polygons is incorrectly written and should be written as "Ordained concave polygons" being its meaning:
They are those that consist of two or four concave polygonal lines or broken lines and four line segments or indicators that do not belong to the broken lines and can be identified with a triplet or data ( m, r, n ) or ( r, m, n ) m greater than or equal to r, greatest r n, n greater or equal to 1 in such a way that the first two components are the order and the third component is the value of the indicator.