Welcome to Anagrammer Crossword Genius! Keep reading below to see if summationa is an answer to any crossword puzzle or word game (Scrabble, Words With Friends etc). Scroll down to see all the info we have compiled on summationa.
summationa
Searching in Crosswords ...
The answer SUMMATIONA has 0 possible clue(s) in existing crosswords.
Searching in Word Games ...
The word SUMMATIONA is NOT valid in any word game. (Sorry, you cannot play SUMMATIONA in Scrabble, Words With Friends etc)
There are 10 letters in SUMMATIONA ( A1I1M3N1O1S1T1U1 )
To search all scrabble anagrams of SUMMATIONA, to go: SUMMATIONA?
Rearrange the letters in SUMMATIONA and see some winning combinations
Scrabble results that can be created with an extra letter added to SUMMATIONA
9 letters out of SUMMATIONA
7 letters out of SUMMATIONA
6 letters out of SUMMATIONA
5 letters out of SUMMATIONA
AMAIN
AMIAS
AMINO
AMINS
AMMOS
AMNIA
AMNIO
ANIMA
ANOAS
ANTAS
ANTIS
ATMAN
ATMAS
ATOMS
AUNTS
AUTOS
IMAMS
IMAUM
IOTAS
MAIMS
MAINS
MAIST
MAMAS
MANAS
MANAT
MANIA
MANOS
MANTA
MANUS
MASON
MATIN
MAUTS
MIAOU
MIASM
MINAS
MINTS
MINUS
MOANS
MOATS
MOIST
MOMUS
MONAS
MOUNT
MUNIS
MUONS
MUTON
NOMAS
NOTUM
OMASA
OMITS
ONIUM
OSTIA
SAINT
SANTO
SATIN
SAUNA
SNOUT
SOMAN
STAIN
STOAI
STOMA
SUINT
SUMMA
TAINS
TAMIS
TAUON
TOMAN
TONUS
TUNAS
UMAMI
UNAIS
UNITS
4 letters out of SUMMATIONA
AIMS
AINS
AITS
AMAS
AMIA
AMIN
AMIS
AMMO
AMUS
ANAS
ANIS
ANOA
ANSA
ANTA
ANTI
ANTS
ANUS
ATMA
ATOM
AUNT
AUTO
IMAM
INTO
IONS
IOTA
MAIM
MAIN
MAMA
MANA
MANO
MANS
MASA
MAST
MATS
MAUN
MAUT
MINA
MINT
MISO
MIST
MOAN
MOAS
MOAT
MOMI
MOMS
MONS
MOST
MOTS
MUMS
MUNI
MUNS
MUON
MUST
MUTS
NAOI
NAOS
NIMS
NITS
NOMA
NOMS
NOTA
NOUS
NUTS
OAST
OATS
OMIT
ONUS
OUST
OUTS
SAIN
SATI
SIMA
SMIT
SMUT
SNIT
SNOT
SOMA
STOA
STUM
STUN
SUIT
SUMO
TAIN
TAMS
TANS
TAOS
TAUS
TINS
TOMS
TONS
TUIS
TUNA
TUNS
UNAI
UNIT
UNTO
UTAS
3 letters out of SUMMATIONA
2 letters out of SUMMATIONA
Searching in Dictionaries ...
Definitions of summationa in various dictionaries:
No definitions found
Word Research / Anagrams and more ...
Keep reading for additional results and analysis below.
Summationa might refer to |
---|
In mathematics, summation (denoted with an enlarged capital Greek sigma symbol * * * * * ∑ * * * * {\displaystyle \textstyle \sum } * ) is the addition of a sequence of numbers; the result is their sum or total. If numbers are added sequentially from left to right, any intermediate result is a partial sum, prefix sum, or running total of the summation. * The numbers to be summed (called addends, or sometimes summands) may be integers, rational numbers, real numbers, or complex numbers. Besides numbers, other types of values can be added as well: vectors, matrices, polynomials and, in general, elements of any additive group (or even monoid). * For finite sequences of such elements, summation always produces a well-defined sum. The summation of an infinite sequence of values is called a series. A value of such a series may often be defined by means of a limit (although sometimes the value may be infinite, and often no value results at all). Another notion involving limits of finite sums is integration. * The summation of the sequence [1, 2, 4, 2] is an expression whose value is the sum of each of the members of the sequence. In the example, 1 + 2 + 4 + 2 = 9. Because addition is associative, the sum does not depend on how the additions are grouped, for instance (1 + 2) + (4 + 2) and 1 + ((2 + 4) + 2) both have the value 9; therefore, parentheses are usually omitted in repeated additions. Addition is also commutative, so permuting the terms of a finite sequence does not change its sum. For infinite summations this property may fail. See Absolute convergence for conditions under which it still holds. * There is no special notation for the summation of such explicit sequences, as the corresponding repeated addition expression will do. There is only a slight difficulty if the sequence has fewer than two elements: the summation of a sequence of one term involves no plus sign (it is indistinguishable from the term itself) and the summation of the empty sequence cannot even be written down (but one can write its value "0" in its place). If, however, the terms of the sequence are given by a regular pattern, possibly of variable length, then a summation operator may be useful or even essential. * For the summation of the sequence of consecutive integers from 1 to 100, one could use an addition expression involving an ellipsis to indicate the missing terms: 1 + 2 + 3 + 4 + ... + 99 + 100. In this case, the reader can easily guess the pattern. However, for more complicated patterns, one needs to be precise about the rule used to find successive terms, which can be achieved by using the summation operator "Σ". Using this sigma notation the above summation is written as:* * * * * ∑ * * i * * = * * * 1 * * * 100 * * * i * . * * * {\displaystyle \sum ... |