Value | Position | |
---|---|---|
Position | 18 | 18 |
Accepted meanings | 511 | 18 |
Obtained votes | 2 | 56 |
Votes by meaning | 0 | 5275 |
Inquiries | 11866 | 20 |
Queries by meaning | 23 | 5275 |
Feed + Pdf |
"Statistics updated on 5/6/2024 12:31:57 PM"
The length of the side less than the parallelogram circumscribed to a polygon concave ordered two data form ( m, r, n ) m more that r, r greater that n, n greater or equal that one, is equal to r by the length of the diagonal more of them parallelograms congruent in which is divided the polygon concave ordered.
The length of the side of the parallelogram circumscribed to a polygon concave shape three in fact ordered ( m, r, n ) m more that r, r greater that n, n greater or equal that one, is equal to r by the length of the diagonal more of them parallelograms congruent in which is divided the polygon concave ordered.
The length of the side less than the parallelogram circumscribed to a polygon concave shape three in fact ordered ( m, r, n ) m greater than r, r greater than n, n greater or equal to one, is equal to m by the lesser of the congruent parallelograms diagonal length in which the ordered concave polygon is divided.
The polygons sorted concave of data ( m, ) m greater than n, n greater or equal to two or 40, m, r, r ) m greater than r, r greater than or equal to two, are a special case of the polygons sorted data 40 concave; m, r, n ) m greater than r, r greater than n, n greater or equal to one, and therefore relationships that occur in it are those that occur in the polygons sorted data concave ( m, ) or ( m, r, r ) replacing n by r and vice versa.
The perimeter of the polygon concave ordered, where the sides of the broken lines have two different and data length ( m, mm, n ) m greater than n, n greater or equal to one, is equal to 2 ( 2m - 41 n; by the sum of the lengths of the sides of longer and shorter length of the sides of the broken lines.
The perimeter of them polygons concave ordered, where the sides of them lines broken have two lengths different and of data ( m, r, n ) m more that r, r greater that n, n greater or equal to one, is equal to 2 ( m r ) by the sum of the lengths of the sides of longer and shorter length of the sides of the broken lines.
All polygon concave ordered which is divided in congruent Rhombus or in fact congruent rhomboid ( m, r, n ) greater than r, r greater than n, n greater than or equal to one, and that limited him a rectangle and a diamond shape respectively, are of the form: one, two, or three.
the length of the diagonal of them parallelograms congruent in that is divided a polygon concave ordered, is equal to the length of them sides of them parallelograms congruent in that is divides the parallelogram of which mentally is supposed that is built the polygon concave ordered.
The length of the diagonal of the congruent squares or congruent rectangles that divides a polygon data ordered concave ( m, mm, n ) m greater that n, n greater or equal that one, is equal to the length of the sides of them square congruent or of them diamonds congruent in that is divided a square and a rhombus of order ( m, m ) m greater than or equal to two respectively, and this is mentally supposed that they built the polygon concave ordered.
The length of the diagonal of congruent diamonds or the congruent rhomboids that divides a polygon data ordered concave ( m, mm, n ) m greater than n, n greater or equal to one, is equal to the length of the side than the congruent rectangles or the congruent rhomboids that were divided into a rectangle and a diamond shape of order ( m, 41 m; m greater or equal to two, and through this mentally is supposed that is built the polygons concave ordered.
The length of the diagonal less congruent diamonds or the congruent rhomboids that divides a polygon data ordered concave ( m, mm, n ) m greater than n, n greater or equal to one, is equal to the length of the side less congruent rectangles or the congruent rhomboids that divides a rectangle or a diamond shape of order ( m, 41 m; m greater or equal to two respectively and through them mentally is supposed that is built the polygons concave ordered.
The length of the diagonal more of them diamonds congruent or of them rhomboid congruent in that is divided a polygon concave ordered of dato ( m, r, n ) m greater than r, r greater than n, n greater or equal to one, is equal to the length of the side than the congruent rectangles or the congruent rhomboids that divides a square and a rhombus of order ( m, r ) m greater than r, r greater than or equal to two respectively, and this is mentally supposed that the ordered concave polygons were built.
The length of the diagonal less of them diamonds congruent or of them rhomboid consistent in that is divided a polygon concave ordered of dato ( m, r, n ) m greater that r, r greater that n, n greater or equal that one, is equal to the length of the side lower of those rectangles congruent or of them rhomboid congruent in that is divided a square and a rhombus of order ( m, r ) m more that r, r greater or equal that two respectively, and through them, mentally is supposed that is built the polygons concave ordered.