Value Position Position 18 18 Accepted meanings 511 18 Obtained votes 165 56 Votes by meaning 0.32 5275 Inquiries 11993 20 Queries by meaning 23 5275 Feed + Pdf
"Statistics updated on 5/18/2024 8:07:34 PM"
they are those whose elements one assumptions tell us that the real to make element is which is written in special squares equidistant squares. One sets assumptions are classified into: sets one imaginary; sets one complexes; sets one hipercomplejo... n-complejos sets.
they are those whose elements one imaginary tell us that the real to make element is which is written in special squares equidistant squares. If in the boxes of the Q-variable elements are written one imaginary, it is necessary to write real elements.
They are those whose elements tell us that the element one imaginary to make is which is written in special squares equidistant squares. If elements are written in the boxes of the Q-variable complexes, one is required to write imaginary and real elements.
They are those whose elements one hipercomplejos tell us that the element one complex to make is which is written in special squares equidistant squares. If in the boxes of the Q-variable elements are written one incredibly necessary to write: element one complex; elements one imaginary and real elements.
They are the ones whose elements two assumptions tell us that the real to make element is which is written in two equally spaced boxes of the special boxes. Two alleged sets are classified in: sets two imaginary; sets two complex; sets two hipercomplejos and sets 2n-complexes.
They are those whose elements two imaginary tell us that the real to make element is which is written in two equally spaced boxes of the special boxes. If the Q-variable boxes are written two imaginary it is necessary to write real elements.
They are those whose elements tell us two complexes that the element zero imagination or one imagined to make is which is written in two equally spaced boxes of the special boxes. If in the boxes of the Q-variable elements are written two complexes is necessary to write elements zero imaginary or elements one imaginary and real elements.
They are those whose elements two hipercomplejos tell us that the element zero complex or one complex to make is which is written in two equally spaced boxes of the special boxes. If in the boxes of the Q-variable elements are written two hipercomplejos need to write: elements complex zero or one complex; elements zero imaginary or one imaginary and real elements.
Two consecutive squares of polygons are simple different seen in the same direction, where a she's main square and the other is secondary box.
They are those who are from the reference boxes found by the diagonals of elderly multiple polygons of rectangular boxes and are not seen in separate polygons.
Is made up of all the polygons entertainment, where elements are written in all its boxes.
She is made up of all the polygons entertainment, where elements are written in a few boxes and others are not written elements.
Polygon playfulness of the variable classes, where all their boxes are elements entertainment, in such a way that the item to make is which is written in special boxes and in the equally spaced boxes of them.
Polygon playful variable-constante class, where a box are written the joint entertainment elements and elements, in such a way that the element to perform is the writing in the boxes or tabs are not written in other boxes.
They are those whose simple elements indicate a concept to make and in some cases are defined and, in other cases not. The joint entertainment are classified in groups: absolute; Relative; equidistant; directional; real; alleged and universal.
They are the ones whose composite elements are formed by two or more simple elements of a same set or different sets. The composite elements are obtained by the Cartesian product of simple elements of simple sets in question.
They are the ones whose absolute elements have the same reading to the be seen in different directions when they are written on the tabs and in the boxes of the polygons entertainment of the variable class and the variable-constante class. Absolute sets with defined and undefined elements are given.
They are the ones whose elements have different readings to the be seen in different directions when they are written in the tabs and in the boxes of the playful polygons of the variable class and the variable-constante class. Relating sets with defined elements and elements not defined are given.
Formed by the real that she is defined on a priority basis and using elements underlying all forms of play in recreational polygons. The actual sets are classified in: independent sets and dependent assemblies.
They are those formed by elements of major movements that run through any number of squares by recreational guides or travel a number set of squares in one direction and crossing a box in another direction. The sets of main movements are classified into: sets of joint and basic movements of multiple movements.