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mobiusstrips
mobius strips
Searching in Crosswords ...
The answer MOBIUSSTRIPS (mobius strips) has 0 possible clue(s) in existing crosswords.
Searching in Word Games ...
The word MOBIUSSTRIPS (mobius strips) is NOT valid in any word game. (Sorry, you cannot play MOBIUSSTRIPS (mobius strips) in Scrabble, Words With Friends etc)
There are 12 letters in MOBIUSSTRIPS ( B3I1M3O1P3R1S1T1U1 )
To search all scrabble anagrams of MOBIUSSTRIPS, to go: MOBIUSSTRIPS?
Rearrange the letters in MOBIUSSTRIPS and see some winning combinations
9 letters out of MOBIUSSTRIPS
8 letters out of MOBIUSSTRIPS
7 letters out of MOBIUSSTRIPS
BISTROS
BOSSISM
BRUTISM
IMPIOUS
IMPORTS
IMPOSTS
MISSORT
MISSOUT
MISSTOP
MISSUIT
MITOSIS
OBIISMS
PISSOIR
PISTOUS
PORISMS
POSSUMS
PROBITS
PROTIUM
PURISMS
PURISTS
RIPOSTS
SIMIOUS
SISTRUM
SPIRITS
SPROUTS
STIBIUM
STUPORS
SUBMISS
SUBMITS
SUBSIST
SUITORS
SUMOIST
SURIMIS
TOSSUPS
TOURISM
TRISMUS
TROPISM
TRUISMS
TSOURIS
TUSSORS
UPSTIRS
UTOPISM
6 letters out of MOBIUSSTRIPS
BISTRO
BRUITS
BURSTS
IMPORT
IMPOST
MIOSIS
MISSIS
MISSUS
OBIISM
OPIUMS
ORBITS
ORIBIS
OSTIUM
PISTOU
PORISM
POSITS
POSSUM
PRIMOS
PRIMUS
PRISMS
PROBIT
PROSIT
PTOSIS
PURISM
PURIST
RIMOUS
RIPOST
ROBUST
ROUSTS
SIRUPS
SITUPS
SPIRIT
SPIRTS
SPORTS
SPOUTS
SPRITS
SPROUT
SPURTS
STIRPS
STOMPS
STORMS
STOUPS
STOURS
STRIPS
STROPS
STRUMS
STUMPS
STUPOR
SUBITO
SUBMIT
SUITOR
SURIMI
TOSSUP
TRIPOS
TROMPS
TRUISM
TRUMPS
TSORIS
TSURIS
TUMORS
TURBOS
TUSSIS
TUSSOR
UPMOST
UPSTIR
UPTOSS
5 letters out of MOBIUSSTRIPS
BIROS
BORTS
BOUTS
BRIMS
BRIOS
BRISS
BRITS
BRUIT
BRUTS
BUMPS
BURPS
BURST
BUSTS
IMPIS
MISOS
MISTS
MITIS
MOIST
MORTS
MOSTS
MUSTS
OBITS
OMITS
OPIUM
ORBIT
ORIBI
OUSTS
PIOUS
PISOS
PORTS
POSIT
POSTS
POURS
POUTS
PRIMI
PRIMO
PRIMS
PRISM
PRISS
PROMS
PROSS
PROST
PUBIS
PURIS
RIOTS
RISUS
ROMPS
ROTIS
ROUPS
ROUST
ROUTS
RUMPS
RUSTS
SIMPS
SIRUP
SITUP
SITUS
SMUTS
SORBS
SORTS
SORUS
SOUPS
SOURS
SPIRT
SPITS
SPORT
SPOTS
SPOUT
SPRIT
SPURS
SPURT
STIRP
STIRS
STOBS
STOMP
STOPS
STORM
STOSS
STOUP
STOUR
STRIP
STROP
STRUM
STUBS
STUMP
STUMS
SUITS
SUMOS
SUMPS
TIPIS
TIROS
TOMBS
TOPIS
TORII
TORSI
TORUS
TOURS
TRIMS
TRIOS
TRIPS
TROIS
TROMP
TRUMP
TRUSS
TUMOR
TUMPS
TURBO
TURPS
UMBOS
4 letters out of MOBIUSSTRIPS
BIOS
BIRO
BITS
BOPS
BORT
BOSS
BOTS
BOUT
BRIM
BRIO
BRIS
BRIT
BROS
BRUT
BUMP
BUMS
BURP
BURS
BUSS
BUST
BUTS
IBIS
IMPI
IMPS
IRIS
ISMS
MIBS
MIPS
MIRI
MIRS
MISO
MISS
MIST
MOBS
MOPS
MORS
MORT
MOSS
MOST
MOTS
MUSS
MUST
MUTS
OBIS
OBIT
OMIT
OPTS
OPUS
ORBS
ORTS
OURS
OUST
OUTS
PISO
PISS
PITS
POIS
POMS
PORT
POST
POTS
POUR
POUT
PRIM
PROM
PROS
PSIS
PSST
PTUI
PUBS
PURI
PURS
PUSS
PUTS
RIBS
RIMS
RIOT
RIPS
ROBS
ROMP
ROMS
ROTI
ROTS
ROUP
ROUT
RUBS
RUMP
RUMS
RUST
RUTS
SIBS
SIMP
SIMS
SIPS
SIRS
SITS
SMIT
SMUT
SOBS
SOMS
SOPS
SORB
SORI
SORT
SOTS
SOUP
SOUR
SOUS
SPIT
SPOT
SPUR
SRIS
STIR
STOB
STOP
STUB
STUM
SUBS
SUIT
SUMO
SUMP
SUMS
SUPS
SUSS
TIPI
TIPS
TIRO
TOMB
TOMS
TOPI
TOPS
TORI
TORS
TOSS
TOUR
TRIM
TRIO
TRIP
TROP
TUBS
TUIS
TUMP
TUPS
UMBO
UMPS
URBS
URPS
3 letters out of MOBIUSSTRIPS
BIO
BIS
BIT
BOP
BOS
BOT
BRO
BUM
BUR
BUS
BUT
IMP
ISM
ITS
MIB
MIR
MIS
MOB
MOP
MOR
MOS
MOT
MUS
MUT
OBI
OMS
OPS
OPT
ORB
ORS
ORT
OUR
OUT
PIS
PIT
PIU
POI
POM
POT
PRO
PSI
PST
PUB
PUR
PUS
PUT
RIB
RIM
RIP
ROB
ROM
ROT
RUB
RUM
RUT
SIB
SIM
SIP
SIR
SIS
SIT
SOB
SOM
SOP
SOS
SOT
SOU
SRI
SUB
SUM
SUP
TIP
TIS
TOM
TOP
TOR
TUB
TUI
TUP
UMP
UPO
UPS
URB
URP
UTS
Searching in Dictionaries ...
Definitions of mobius strips in various dictionaries:
noun - a continuous closed surface with only one side
Word Research / Anagrams and more ...
Keep reading for additional results and analysis below.
Last Seen in these Crosswords & Puzzles |
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Nov 5 2018 The Times - Cryptic |
Mobius strips might refer to |
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The Möbius strip or Möbius band (UK: , US: ; German: [ˈmøːbi̯ʊs]), also spelled Mobius or Moebius, is a surface with only one side (when embedded in three-dimensional Euclidean space) and only one boundary. The Möbius strip has the mathematical property of being unorientable. It can be realized as a ruled surface. Its discovery is attributed to the German mathematicians August Ferdinand Möbius and Johann Benedict Listing in 1858, though a structure similar to Möbius strip can be seen in Roman mosaics dated circa 200–250 AD.An example of a Möbius strip can be created by taking a paper strip and giving it a half-twist, and then joining the ends of the strip to form a loop. However, the Möbius strip is not a surface of only one exact size and shape, such as the half-twisted paper strip depicted in the illustration. Rather, mathematicians refer to the closed Möbius band as any surface that is homeomorphic to this strip. Its boundary is a simple closed curve, i.e., homeomorphic to a circle. This allows for a very wide variety of geometric versions of the Möbius band as surfaces each having a definite size and shape. For example, any rectangle can be glued to itself (by identifying one edge with the opposite edge after a reversal of orientation) to make a Möbius band. Some of these can be smoothly modeled in Euclidean space, and others cannot. * A half-twist clockwise gives an embedding of the Möbius strip different from that of a half-twist counterclockwise – that is, as an embedded object in Euclidean space, the Möbius strip is a chiral object with right- or left-handedness. However, the underlying topological spaces within the Möbius strip are homeomorphic in each case. An infinite number of topologically different embeddings of the same topological space into three-dimensional space exist, as the Möbius strip can also be formed by twisting the strip an odd number of times greater than one, or by knotting and twisting the strip, before joining its ends. The complete open Möbius band is an example of a topological surface that is closely related to the standard Möbius strip, but that is not homeomorphic to it. * Finding algebraic equations, the solutions of which have the topology of a Möbius strip, is straightforward, but, in general, these equations do not describe the same geometric shape that one gets from the twisted paper model described above. In particular, the twisted paper model is a developable surface, having zero Gaussian curvature. A system of differential-algebraic equations that describes models of this type was published in 2007 together with its numerical solution.The Euler characteristic of the Möbius strip is zero. |