This time we are looking on the **crossword puzzle clue** for: *Totals.*

it’s A 6 letters **crossword definition**.

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## Possible Answers:
**SUMS**.

**SUMS**.

Last seen on: –Thomas Joseph – King Feature Syndicate Crossword – Apr 21 2021

–LA Times Crossword 30 Mar 21, Tuesday

–LA Times Crossword 30 Mar 21, Tuesday

–The Washington Post Crossword – Mar 30 2021

–Eugene Sheffer – King Feature Syndicate Crossword – Feb 19 2021

–USA Today Crossword – Jan 29 2021

–Eugene Sheffer – King Feature Syndicate Crossword – Oct 9 2020

–The Washington Post Crossword – Sep 13 2020

–LA Times Crossword 13 Sep 20, Sunday

–NY Times Crossword 18 Aug 20, Tuesday

–Eugene Sheffer – King Feature Syndicate Crossword – Mar 2 2020

NY Times Crossword 20 Aug 19, Tuesday

### Random information on the term “Totals”:

In mathematics, a total order, simple order, linear order, connex order, or full order[page needed] is a binary relation on some set X {\displaystyle X} , which is antisymmetric, transitive, and a connex relation. A set paired with a total order is called a chain, a totally ordered set, a simply ordered set, or a linearly ordered set.

Formally, a binary relation ≤ {\displaystyle \leq } is a total order on a set X {\displaystyle X} if the following statements hold for all a , b {\displaystyle a,b} and c {\displaystyle c} in X {\displaystyle X} :

Antisymmetry eliminates uncertain cases when both a {\displaystyle a} precedes b {\displaystyle b} and b {\displaystyle b} precedes a {\displaystyle a} .:325 A relation having the connex property means that any pair of elements in the set of the relation are comparable under the relation. This also means that the set can be diagrammed as a line of elements, giving it the name linear.:330 The connex property also implies reflexivity, i.e., a ≤ a. Therefore, a total order is also a (special case of a) partial order, as, for a partial order, the connex property is replaced by the weaker reflexivity property. An extension of a given partial order to a total order is called a linear extension of that partial order.