| 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 8:12:33 AM"
The perimeter of a parallelogram, divided into congruent parallelograms of two equal ( m, 41 m order form; m greater than or equal to two, is equal to 2m by the sum of the length of the side of a greater length of the congruent parallelograms most the length of the side of shorter length of the congruent parallelograms.
The perimeter of a parallelogram, divided into congruent parallelograms of only one form of order ( m, r ) or ( r, m ) m greater than r, r greater than or equal to one, is equal to 4m by the length of the side of shorter length of the congruent parallelograms or equals 4r by the length of the side of a greater length of the congruent parallelograms.
The perimeter of a parallelogram, divided into congruent parallelograms of only one form of order ( m, r ) or ( r, m ) m greater than r, r greater than or equal to one, is equal to 4m by the length of the side of shorter length of the congruent parallelograms or equals 4r by the length of the side of a greater length of the congruent parallelograms.
The perimeter of a parallelogram, 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 2 that multiplies the sum of m by the length of the side of a greater length of the congruent parallelograms more r by the length of the side of shorter length of the congruent parallelograms.
The perimeter of a parallelogram divided into congruent parallelograms in the way two and three way to order ( m, r ) or ( r, m ) m greater than r, r greater than or equal to one, is equal to 2 that multiplies the sum of m by the length of the shorter length of the congruent parallelograms side more r by the length of the side of a greater 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 square divided into congruent rectangles or a diamond divided at rhomboid congruent, they are the only one, because the length of the sides of the square base or diamond base are divided n times r times the length of the sides of longer and shorter length of the congruent parallelograms.
If ( m, r ) or ( r, m ) m more that r, r greater than or equal to one is a rectangle divided into congruent squares or a diamond shape divided into diamonds in congruent, order are of the form only two, if the length of the higher side and under the rectangle base or rhomboid side base, m divided times and are r times respectively with the length of the sides of congruent parallelograms.
