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iscometries
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The answer ISCOMETRIES has 0 possible clue(s) in existing crosswords.
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There are 11 letters in ISCOMETRIES ( C3E1I1M3O1R1S1T1 )
To search all scrabble anagrams of ISCOMETRIES, to go: ISCOMETRIES?
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Scrabble results that can be created with an extra letter added to ISCOMETRIES
11 letters out of ISCOMETRIES
10 letters out of ISCOMETRIES
9 letters out of ISCOMETRIES
8 letters out of ISCOMETRIES
7 letters out of ISCOMETRIES
CERISES
CERITES
CERMETS
COESITE
CORSETS
COSIEST
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COSTERS
COTERIE
CRESSET
EMERITI
EMETICS
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STEREOS
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TIERCES
TRIOSES
TRISEME
TRISMIC
TRISOME
6 letters out of ISCOMETRIES
CERISE
CERITE
CERMET
CERTES
CESTOI
CESTOS
CITERS
CITIES
COMERS
COMETS
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IRISES
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OSIERS
OSMICS
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REESTS
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TMESES
TMESIS
TORICS
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TOSSER
TRICES
TRIOSE
TSORES
TSORIS
5 letters out of ISCOMETRIES
CERES
CEROS
CESTI
CETES
CIRES
CISTS
CITER
CITES
COIRS
COMER
COMES
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COMTE
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ERECT
EROSE
ERSES
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ICIER
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OMITS
OSIER
OSMIC
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REEST
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RIOTS
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SEMES
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TORIC
TORII
TORSE
TORSI
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TRESS
TRICE
TRIES
TRIMS
TRIOS
TROIS
4 letters out of ISCOMETRIES
CEES
CERE
CERO
CESS
CETE
CIRE
CIST
CITE
COIR
COME
CORE
CORM
CORS
COSS
COST
COTE
COTS
CRIS
CRIT
EMES
EMIC
EMIR
EMIT
EROS
ERST
ESES
ETIC
ICES
IRES
IRIS
ISMS
ITEM
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MERE
MESS
METE
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MIRE
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MISS
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MORE
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MORT
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MOTE
MOTS
OMER
OMIT
ORCS
ORES
ORTS
OSES
OTIC
RECS
REES
REIS
REMS
REST
RETE
RETS
RICE
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RIOT
RISE
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ROES
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ROTE
ROTI
ROTS
SCOT
SECS
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SIRE
SIRS
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SMIT
SOME
SOMS
SORE
SORI
SORT
SOTS
SRIS
STEM
STIR
TEEM
TEES
TERM
TICS
TIER
TIES
TIME
TIRE
TIRO
TOES
TOME
TOMS
TORC
TORE
TORI
TORS
TOSS
TREE
TRES
TRIM
TRIO
3 letters out of ISCOMETRIES
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Definitions of iscometries in various dictionaries:
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| Iscometries might refer to |
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In physics, a symmetry of a physical system is a physical or mathematical feature of the system (observed or intrinsic) that is preserved or remains unchanged under some transformation. * A family of particular transformations may be continuous (such as rotation of a circle) or discrete (e.g., reflection of a bilaterally symmetric figure, or rotation of a regular polygon). Continuous and discrete transformations give rise to corresponding types of symmetries. Continuous symmetries can be described by Lie groups while discrete symmetries are described by finite groups (see Symmetry group). * These two concepts, Lie and finite groups, are the foundation for the fundamental theories of modern physics. Symmetries are frequently amenable to mathematical formulations such as group representations and can, in addition, be exploited to simplify many problems. * Arguably the most important example of a symmetry in physics is that the speed of light has the same value in all frames of reference, which is known in mathematical terms as Poincaré group, the symmetry group of special relativity. Another important example is the invariance of the form of physical laws under arbitrary differentiable coordinate transformations, which is an important idea in general relativity. |