AElig; 	U+000C6 	Æ 
AMP; 	U+00026 	& 
Aacute; 	U+000C1 	Á 
Abreve; 	U+00102 	Ă 
Acirc; 	U+000C2 	Â 
Acy; 	U+00410 	А 
Afr; 	U+1D504 	𝔄 
Agrave; 	U+000C0 	À 
Alpha; 	U+00391 	Α 
Amacr; 	U+00100 	Ā 
And; 	U+02A53 	⩓ 
Aogon; 	U+00104 	Ą 
Aopf; 	U+1D538 	𝔸 
ApplyFunction; 	U+02061 	⁡ 
Aring; 	U+000C5 	Å 
Ascr; 	U+1D49C 	𝒜 
Assign; 	U+02254 	≔ 
Atilde; 	U+000C3 	Ã 
Auml; 	U+000C4 	Ä 
Backslash; 	U+02216 	∖ 
Barv; 	U+02AE7 	⫧ 
Barwed; 	U+02306 	⌆ 
Bcy; 	U+00411 	Б 
Because; 	U+02235 	∵ 
Bernoullis; 	U+0212C 	ℬ 
Beta; 	U+00392 	Β 
Bfr; 	U+1D505 	𝔅 
Bopf; 	U+1D539 	𝔹 
Breve; 	U+002D8 	˘ 
Bscr; 	U+0212C 	ℬ 
Bumpeq; 	U+0224E 	≎ 
CHcy; 	U+00427 	Ч 
COPY; 	U+000A9 	© 
Cacute; 	U+00106 	Ć 
Cap; 	U+022D2 	⋒ 
CapitalDifferentialD; 	U+02145 	ⅅ 
Cayleys; 	U+0212D 	ℭ 
Ccaron; 	U+0010C 	Č 
Ccedil; 	U+000C7 	Ç 
Ccirc; 	U+00108 	Ĉ 
Cconint; 	U+02230 	∰ 
Cdot; 	U+0010A 	Ċ 
Cedilla; 	U+000B8 	¸ 
CenterDot; 	U+000B7 	· 
Cfr; 	U+0212D 	ℭ 
Chi; 	U+003A7 	Χ 
CircleDot; 	U+02299 	⊙ 
CircleMinus; 	U+02296 	⊖ 
CirclePlus; 	U+02295 	⊕ 
CircleTimes; 	U+02297 	⊗ 
ClockwiseContourIntegral; 	U+02232 	∲ 
CloseCurlyDoubleQuote; 	U+0201D 	” 
CloseCurlyQuote; 	U+02019 	’ 
Colon; 	U+02237 	∷ 
Colone; 	U+02A74 	⩴ 
Congruent; 	U+02261 	≡ 
Conint; 	U+0222F 	∯ 
ContourIntegral; 	U+0222E 	∮ 
Copf; 	U+02102 	ℂ 
Coproduct; 	U+02210 	∐ 
CounterClockwiseContourIntegral; 	U+02233 	∳ 
Cross; 	U+02A2F 	⨯ 
Cscr; 	U+1D49E 	𝒞 
Cup; 	U+022D3 	⋓ 
CupCap; 	U+0224D 	≍ 
DD; 	U+02145 	ⅅ 
DDotrahd; 	U+02911 	⤑ 
DJcy; 	U+00402 	Ђ 
DScy; 	U+00405 	Ѕ 
DZcy; 	U+0040F 	Џ 
Dagger; 	U+02021 	‡ 
Darr; 	U+021A1 	↡ 
Dashv; 	U+02AE4 	⫤ 
Dcaron; 	U+0010E 	Ď 
Dcy; 	U+00414 	Д 
Del; 	U+02207 	∇ 
Delta; 	U+00394 	Δ 
Dfr; 	U+1D507 	𝔇 
DiacriticalAcute; 	U+000B4 	´ 
DiacriticalDot; 	U+002D9 	˙ 
DiacriticalDoubleAcute; 	U+002DD 	˝ 
DiacriticalGrave; 	U+00060 	` 
DiacriticalTilde; 	U+002DC 	˜ 
Diamond; 	U+022C4 	⋄ 
DifferentialD; 	U+02146 	ⅆ 
Dopf; 	U+1D53B 	𝔻 
Dot; 	U+000A8 	¨ 
DotDot; 	U+020DC 	◌⃜ 
DotEqual; 	U+02250 	≐ 
DoubleContourIntegral; 	U+0222F 	∯ 
DoubleDot; 	U+000A8 	¨ 
DoubleDownArrow; 	U+021D3 	⇓ 
DoubleLeftArrow; 	U+021D0 	⇐ 
DoubleLeftRightArrow; 	U+021D4 	⇔ 
DoubleLeftTee; 	U+02AE4 	⫤ 
DoubleLongLeftArrow; 	U+027F8 	⟸ 
DoubleLongLeftRightArrow; 	U+027FA 	⟺ 
DoubleLongRightArrow; 	U+027F9 	⟹ 
DoubleRightArrow; 	U+021D2 	⇒ 
DoubleRightTee; 	U+022A8 	⊨ 
DoubleUpArrow; 	U+021D1 	⇑ 
DoubleUpDownArrow; 	U+021D5 	⇕ 
DoubleVerticalBar; 	U+02225 	∥ 
DownArrow; 	U+02193 	↓ 
DownArrowBar; 	U+02913 	⤓ 
DownArrowUpArrow; 	U+021F5 	⇵ 
DownBreve; 	U+00311 	◌̑ 
DownLeftRightVector; 	U+02950 	⥐ 
DownLeftTeeVector; 	U+0295E 	⥞ 
DownLeftVector; 	U+021BD 	↽ 
DownLeftVectorBar; 	U+02956 	⥖ 
DownRightTeeVector; 	U+0295F 	⥟ 
DownRightVector; 	U+021C1 	⇁ 
DownRightVectorBar; 	U+02957 	⥗ 
DownTee; 	U+022A4 	⊤ 
DownTeeArrow; 	U+021A7 	↧ 
Downarrow; 	U+021D3 	⇓ 
Dscr; 	U+1D49F 	𝒟 
Dstrok; 	U+00110 	Đ 
ENG; 	U+0014A 	Ŋ 
ETH; 	U+000D0 	Ð 
Eacute; 	U+000C9 	É 
Ecaron; 	U+0011A 	Ě 
Ecirc; 	U+000CA 	Ê 
Ecy; 	U+0042D 	Э 
Edot; 	U+00116 	Ė 
Efr; 	U+1D508 	𝔈 
Egrave; 	U+000C8 	È 
Element; 	U+02208 	∈ 
Emacr; 	U+00112 	Ē 
EmptySmallSquare; 	U+025FB 	◻ 
EmptyVerySmallSquare; 	U+025AB 	▫ 
Eogon; 	U+00118 	Ę 
Eopf; 	U+1D53C 	𝔼 
Epsilon; 	U+00395 	Ε 
Equal; 	U+02A75 	⩵ 
EqualTilde; 	U+02242 	≂ 
Equilibrium; 	U+021CC 	⇌ 
Escr; 	U+02130 	ℰ 
Esim; 	U+02A73 	⩳ 
Eta; 	U+00397 	Η 
Euml; 	U+000CB 	Ë 
Exists; 	U+02203 	∃ 
ExponentialE; 	U+02147 	ⅇ 
Fcy; 	U+00424 	Ф 
Ffr; 	U+1D509 	𝔉 
FilledSmallSquare; 	U+025FC 	◼ 
FilledVerySmallSquare; 	U+025AA 	▪ 
Fopf; 	U+1D53D 	𝔽 
ForAll; 	U+02200 	∀ 
Fouriertrf; 	U+02131 	ℱ 
Fscr; 	U+02131 	ℱ 
GJcy; 	U+00403 	Ѓ 
GT; 	U+0003E 	> 
Gamma; 	U+00393 	Γ 
Gammad; 	U+003DC 	Ϝ 
Gbreve; 	U+0011E 	Ğ 
Gcedil; 	U+00122 	Ģ 
Gcirc; 	U+0011C 	Ĝ 
Gcy; 	U+00413 	Г 
Gdot; 	U+00120 	Ġ 
Gfr; 	U+1D50A 	𝔊 
Gg; 	U+022D9 	⋙ 
Gopf; 	U+1D53E 	𝔾 
GreaterEqual; 	U+02265 	≥ 
GreaterEqualLess; 	U+022DB 	⋛ 
GreaterFullEqual; 	U+02267 	≧ 
GreaterGreater; 	U+02AA2 	⪢ 
GreaterLess; 	U+02277 	≷ 
GreaterSlantEqual; 	U+02A7E 	⩾ 
GreaterTilde; 	U+02273 	≳ 
Gscr; 	U+1D4A2 	𝒢 
Gt; 	U+0226B 	≫ 
HARDcy; 	U+0042A 	Ъ 
Hacek; 	U+002C7 	ˇ 
Hat; 	U+0005E 	^ 
Hcirc; 	U+00124 	Ĥ 
Hfr; 	U+0210C 	ℌ 
HilbertSpace; 	U+0210B 	ℋ 
Hopf; 	U+0210D 	ℍ 
HorizontalLine; 	U+02500 	─ 
Hscr; 	U+0210B 	ℋ 
Hstrok; 	U+00126 	Ħ 
HumpDownHump; 	U+0224E 	≎ 
HumpEqual; 	U+0224F 	≏ 
IEcy; 	U+00415 	Е 
IJlig; 	U+00132 	Ĳ 
IOcy; 	U+00401 	Ё 
Iacute; 	U+000CD 	Í 
Icirc; 	U+000CE 	Î 
Icy; 	U+00418 	И 
Idot; 	U+00130 	İ 
Ifr; 	U+02111 	ℑ 
Igrave; 	U+000CC 	Ì 
Im; 	U+02111 	ℑ 
Imacr; 	U+0012A 	Ī 
ImaginaryI; 	U+02148 	ⅈ 
Implies; 	U+021D2 	⇒ 
Int; 	U+0222C 	∬ 
Integral; 	U+0222B 	∫ 
Intersection; 	U+022C2 	⋂ 
InvisibleComma; 	U+02063 	⁣ 
InvisibleTimes; 	U+02062 	⁢ 
Iogon; 	U+0012E 	Į 
Iopf; 	U+1D540 	𝕀 
Iota; 	U+00399 	Ι 
Iscr; 	U+02110 	ℐ 
Itilde; 	U+00128 	Ĩ 
Iukcy; 	U+00406 	І 
Iuml; 	U+000CF 	Ï 
Jcirc; 	U+00134 	Ĵ 
Jcy; 	U+00419 	Й 
Jfr; 	U+1D50D 	𝔍 
Jopf; 	U+1D541 	𝕁 
Jscr; 	U+1D4A5 	𝒥 
Jsercy; 	U+00408 	Ј 
Jukcy; 	U+00404 	Є 
KHcy; 	U+00425 	Х 
KJcy; 	U+0040C 	Ќ 
Kappa; 	U+0039A 	Κ 
Kcedil; 	U+00136 	Ķ 
Kcy; 	U+0041A 	К 
Kfr; 	U+1D50E 	𝔎 
Kopf; 	U+1D542 	𝕂 
Kscr; 	U+1D4A6 	𝒦 
LJcy; 	U+00409 	Љ 
LT; 	U+0003C 	< 
Lacute; 	U+00139 	Ĺ 
Lambda; 	U+0039B 	Λ 
Lang; 	U+027EA 	⟪ 
Laplacetrf; 	U+02112 	ℒ 
Larr; 	U+0219E 	↞ 
Lcaron; 	U+0013D 	Ľ 
Lcedil; 	U+0013B 	Ļ 
Lcy; 	U+0041B 	Л 
LeftAngleBracket; 	U+027E8 	〈 
LeftArrow; 	U+02190 	← 
LeftArrowBar; 	U+021E4 	⇤ 
LeftArrowRightArrow; 	U+021C6 	⇆ 
LeftCeiling; 	U+02308 	⌈ 
LeftDoubleBracket; 	U+027E6 	⟦ 
LeftDownTeeVector; 	U+02961 	⥡ 
LeftDownVector; 	U+021C3 	⇃ 
LeftDownVectorBar; 	U+02959 	⥙ 
LeftFloor; 	U+0230A 	⌊ 
LeftRightArrow; 	U+02194 	↔ 
LeftRightVector; 	U+0294E 	⥎ 
LeftTee; 	U+022A3 	⊣ 
LeftTeeArrow; 	U+021A4 	↤ 
LeftTeeVector; 	U+0295A 	⥚ 
LeftTriangle; 	U+022B2 	⊲ 
LeftTriangleBar; 	U+029CF 	⧏ 
LeftTriangleEqual; 	U+022B4 	⊴ 
LeftUpDownVector; 	U+02951 	⥑ 
LeftUpTeeVector; 	U+02960 	⥠ 
LeftUpVector; 	U+021BF 	↿ 
LeftUpVectorBar; 	U+02958 	⥘ 
LeftVector; 	U+021BC 	↼ 
LeftVectorBar; 	U+02952 	⥒ 
Leftarrow; 	U+021D0 	⇐ 
Leftrightarrow; 	U+021D4 	⇔ 
LessEqualGreater; 	U+022DA 	⋚ 
LessFullEqual; 	U+02266 	≦ 
LessGreater; 	U+02276 	≶ 
LessLess; 	U+02AA1 	⪡ 
LessSlantEqual; 	U+02A7D 	⩽ 
LessTilde; 	U+02272 	≲ 
Lfr; 	U+1D50F 	𝔏 
Ll; 	U+022D8 	⋘ 
Lleftarrow; 	U+021DA 	⇚ 
Lmidot; 	U+0013F 	Ŀ 
LongLeftArrow; 	U+027F5 	⟵ 
LongLeftRightArrow; 	U+027F7 	⟷ 
LongRightArrow; 	U+027F6 	⟶ 
Longleftarrow; 	U+027F8 	⟸ 
Longleftrightarrow; 	U+027FA 	⟺ 
Longrightarrow; 	U+027F9 	⟹ 
Lopf; 	U+1D543 	𝕃 
LowerLeftArrow; 	U+02199 	↙ 
LowerRightArrow; 	U+02198 	↘ 
Lscr; 	U+02112 	ℒ 
Lsh; 	U+021B0 	↰ 
Lstrok; 	U+00141 	Ł 
Lt; 	U+0226A 	≪ 
Map; 	U+02905 	⤅ 
Mcy; 	U+0041C 	М 
MediumSpace; 	U+0205F 	
Mellintrf; 	U+02133 	ℳ 
Mfr; 	U+1D510 	𝔐 
MinusPlus; 	U+02213 	∓ 
Mopf; 	U+1D544 	𝕄 
Mscr; 	U+02133 	ℳ 
Mu; 	U+0039C 	Μ 
NJcy; 	U+0040A 	Њ 
Nacute; 	U+00143 	Ń 
Ncaron; 	U+00147 	Ň 
Ncedil; 	U+00145 	Ņ 
Ncy; 	U+0041D 	Н 
NegativeMediumSpace; 	U+0200B 	​ 
NegativeThickSpace; 	U+0200B 	​ 
NegativeThinSpace; 	U+0200B 	​ 
NegativeVeryThinSpace; 	U+0200B 	​ 
NestedGreaterGreater; 	U+0226B 	≫ 
NestedLessLess; 	U+0226A 	≪ 
NewLine; 	U+0000A 	␊ 
Nfr; 	U+1D511 	𝔑 
NoBreak; 	U+02060 	⁠ 
NonBreakingSpace; 	U+000A0 	  
Nopf; 	U+02115 	ℕ 
Not; 	U+02AEC 	⫬ 
NotCongruent; 	U+02262 	≢ 
NotCupCap; 	U+0226D 	≭ 
NotDoubleVerticalBar; 	U+02226 	∦ 
NotElement; 	U+02209 	∉ 
NotEqual; 	U+02260 	≠ 
NotEqualTilde; 	U+02242 U+00338 	≂̸ 
NotExists; 	U+02204 	∄ 
NotGreater; 	U+0226F 	≯ 
NotGreaterEqual; 	U+02271 	≱ 
NotGreaterFullEqual; 	U+02267 U+00338 	≧̸ 
NotGreaterGreater; 	U+0226B U+00338 	≫̸ 
NotGreaterLess; 	U+02279 	≹ 
NotGreaterSlantEqual; 	U+02A7E U+00338 	⩾̸ 
NotGreaterTilde; 	U+02275 	≵ 
NotHumpDownHump; 	U+0224E U+00338 	≎̸ 
NotHumpEqual; 	U+0224F U+00338 	≏̸ 
NotLeftTriangle; 	U+022EA 	⋪ 
NotLeftTriangleBar; 	U+029CF U+00338 	⧏̸ 
NotLeftTriangleEqual; 	U+022EC 	⋬ 
NotLess; 	U+0226E 	≮ 
NotLessEqual; 	U+02270 	≰ 
NotLessGreater; 	U+02278 	≸ 
NotLessLess; 	U+0226A U+00338 	≪̸ 
NotLessSlantEqual; 	U+02A7D U+00338 	⩽̸ 
NotLessTilde; 	U+02274 	≴ 
NotNestedGreaterGreater; 	U+02AA2 U+00338 	⪢̸ 
NotNestedLessLess; 	U+02AA1 U+00338 	⪡̸ 
NotPrecedes; 	U+02280 	⊀ 
NotPrecedesEqual; 	U+02AAF U+00338 	⪯̸ 
NotPrecedesSlantEqual; 	U+022E0 	⋠ 
NotReverseElement; 	U+0220C 	∌ 
NotRightTriangle; 	U+022EB 	⋫ 
NotRightTriangleBar; 	U+029D0 U+00338 	⧐̸ 
NotRightTriangleEqual; 	U+022ED 	⋭ 
NotSquareSubset; 	U+0228F U+00338 	⊏̸ 
NotSquareSubsetEqual; 	U+022E2 	⋢ 
NotSquareSuperset; 	U+02290 U+00338 	⊐̸ 
NotSquareSupersetEqual; 	U+022E3 	⋣ 
NotSubset; 	U+02282 U+020D2 	⊂⃒ 
NotSubsetEqual; 	U+02288 	⊈ 
NotSucceeds; 	U+02281 	⊁ 
NotSucceedsEqual; 	U+02AB0 U+00338 	⪰̸ 
NotSucceedsSlantEqual; 	U+022E1 	⋡ 
NotSucceedsTilde; 	U+0227F U+00338 	≿̸ 
NotSuperset; 	U+02283 U+020D2 	⊃⃒ 
NotSupersetEqual; 	U+02289 	⊉ 
NotTilde; 	U+02241 	≁ 
NotTildeEqual; 	U+02244 	≄ 
NotTildeFullEqual; 	U+02247 	≇ 
NotTildeTilde; 	U+02249 	≉ 
NotVerticalBar; 	U+02224 	∤ 
Nscr; 	U+1D4A9 	𝒩 
Ntilde; 	U+000D1 	Ñ 
Nu; 	U+0039D 	Ν 
OElig; 	U+00152 	Œ 
Oacute; 	U+000D3 	Ó 
Ocirc; 	U+000D4 	Ô 
Ocy; 	U+0041E 	О 
Odblac; 	U+00150 	Ő 
Ofr; 	U+1D512 	𝔒 
Ograve; 	U+000D2 	Ò 
Omacr; 	U+0014C 	Ō 
Omega; 	U+003A9 	Ω 
Omicron; 	U+0039F 	Ο 
Oopf; 	U+1D546 	𝕆 
OpenCurlyDoubleQuote; 	U+0201C 	“ 
OpenCurlyQuote; 	U+02018 	‘ 
Or; 	U+02A54 	⩔ 
Oscr; 	U+1D4AA 	𝒪 
Oslash; 	U+000D8 	Ø 
Otilde; 	U+000D5 	Õ 
Otimes; 	U+02A37 	⨷ 
Ouml; 	U+000D6 	Ö 
OverBar; 	U+0203E 	‾ 
OverBrace; 	U+023DE 	⏞ 
OverBracket; 	U+023B4 	⎴ 
OverParenthesis; 	U+023DC 	⏜ 
PartialD; 	U+02202 	∂ 
Pcy; 	U+0041F 	П 
Pfr; 	U+1D513 	𝔓 
Phi; 	U+003A6 	Φ 
Pi; 	U+003A0 	Π 
PlusMinus; 	U+000B1 	± 
Poincareplane; 	U+0210C 	ℌ 
Popf; 	U+02119 	ℙ 
Pr; 	U+02ABB 	⪻ 
Precedes; 	U+0227A 	≺ 
PrecedesEqual; 	U+02AAF 	⪯ 
PrecedesSlantEqual; 	U+0227C 	≼ 
PrecedesTilde; 	U+0227E 	≾ 
Prime; 	U+02033 	″ 
Product; 	U+0220F 	∏ 
Proportion; 	U+02237 	∷ 
Proportional; 	U+0221D 	∝ 
Pscr; 	U+1D4AB 	𝒫 
Psi; 	U+003A8 	Ψ 
QUOT; 	U+00022 	" 
Qfr; 	U+1D514 	𝔔 
Qopf; 	U+0211A 	ℚ 
Qscr; 	U+1D4AC 	𝒬 
RBarr; 	U+02910 	⤐ 
REG; 	U+000AE 	® 
Racute; 	U+00154 	Ŕ 
Rang; 	U+027EB 	⟫ 
Rarr; 	U+021A0 	↠ 
Rarrtl; 	U+02916 	⤖ 
Rcaron; 	U+00158 	Ř 
Rcedil; 	U+00156 	Ŗ 
Rcy; 	U+00420 	Р 
Re; 	U+0211C 	ℜ 
ReverseElement; 	U+0220B 	∋ 
ReverseEquilibrium; 	U+021CB 	⇋ 
ReverseUpEquilibrium; 	U+0296F 	⥯ 
Rfr; 	U+0211C 	ℜ 
Rho; 	U+003A1 	Ρ 
RightAngleBracket; 	U+027E9 	〉 
RightArrow; 	U+02192 	→ 
RightArrowBar; 	U+021E5 	⇥ 
RightArrowLeftArrow; 	U+021C4 	⇄ 
RightCeiling; 	U+02309 	⌉ 
RightDoubleBracket; 	U+027E7 	⟧ 
RightDownTeeVector; 	U+0295D 	⥝ 
RightDownVector; 	U+021C2 	⇂ 
RightDownVectorBar; 	U+02955 	⥕ 
RightFloor; 	U+0230B 	⌋ 
RightTee; 	U+022A2 	⊢ 
RightTeeArrow; 	U+021A6 	↦ 
RightTeeVector; 	U+0295B 	⥛ 
RightTriangle; 	U+022B3 	⊳ 
RightTriangleBar; 	U+029D0 	⧐ 
RightTriangleEqual; 	U+022B5 	⊵ 
RightUpDownVector; 	U+0294F 	⥏ 
RightUpTeeVector; 	U+0295C 	⥜ 
RightUpVector; 	U+021BE 	↾ 
RightUpVectorBar; 	U+02954 	⥔ 
RightVector; 	U+021C0 	⇀ 
RightVectorBar; 	U+02953 	⥓ 
Rightarrow; 	U+021D2 	⇒ 
Ropf; 	U+0211D 	ℝ 
RoundImplies; 	U+02970 	⥰ 
Rrightarrow; 	U+021DB 	⇛ 
Rscr; 	U+0211B 	ℛ 
Rsh; 	U+021B1 	↱ 
RuleDelayed; 	U+029F4 	⧴ 
SHCHcy; 	U+00429 	Щ 
SHcy; 	U+00428 	Ш 
SOFTcy; 	U+0042C 	Ь 
Sacute; 	U+0015A 	Ś 
Sc; 	U+02ABC 	⪼ 
Scaron; 	U+00160 	Š 
Scedil; 	U+0015E 	Ş 
Scirc; 	U+0015C 	Ŝ 
Scy; 	U+00421 	С 
Sfr; 	U+1D516 	𝔖 
ShortDownArrow; 	U+02193 	↓ 
ShortLeftArrow; 	U+02190 	← 
ShortRightArrow; 	U+02192 	→ 
ShortUpArrow; 	U+02191 	↑ 
Sigma; 	U+003A3 	Σ 
SmallCircle; 	U+02218 	∘ 
Sopf; 	U+1D54A 	𝕊 
Sqrt; 	U+0221A 	√ 
Square; 	U+025A1 	□ 
SquareIntersection; 	U+02293 	⊓ 
SquareSubset; 	U+0228F 	⊏ 
SquareSubsetEqual; 	U+02291 	⊑ 
SquareSuperset; 	U+02290 	⊐ 
SquareSupersetEqual; 	U+02292 	⊒ 
SquareUnion; 	U+02294 	⊔ 
Sscr; 	U+1D4AE 	𝒮 
Star; 	U+022C6 	⋆ 
Sub; 	U+022D0 	⋐ 
Subset; 	U+022D0 	⋐ 
SubsetEqual; 	U+02286 	⊆ 
Succeeds; 	U+0227B 	≻ 
SucceedsEqual; 	U+02AB0 	⪰ 
SucceedsSlantEqual; 	U+0227D 	≽ 
SucceedsTilde; 	U+0227F 	≿ 
SuchThat; 	U+0220B 	∋ 
Sum; 	U+02211 	∑ 
Sup; 	U+022D1 	⋑ 
Superset; 	U+02283 	⊃ 
SupersetEqual; 	U+02287 	⊇ 
Supset; 	U+022D1 	⋑ 
THORN; 	U+000DE 	Þ 
TRADE; 	U+02122 	™ 
TSHcy; 	U+0040B 	Ћ 
TScy; 	U+00426 	Ц 
Tab; 	U+00009 	␉ 
Tau; 	U+003A4 	Τ 
Tcaron; 	U+00164 	Ť 
Tcedil; 	U+00162 	Ţ 
Tcy; 	U+00422 	Т 
Tfr; 	U+1D517 	𝔗 
Therefore; 	U+02234 	∴ 
Theta; 	U+00398 	Θ 
ThickSpace; 	U+0205F U+0200A 	  
ThinSpace; 	U+02009 	  
Tilde; 	U+0223C 	∼ 
TildeEqual; 	U+02243 	≃ 
TildeFullEqual; 	U+02245 	≅ 
TildeTilde; 	U+02248 	≈ 
Topf; 	U+1D54B 	𝕋 
TripleDot; 	U+020DB 	◌⃛ 
Tscr; 	U+1D4AF 	𝒯 
Tstrok; 	U+00166 	Ŧ 
Uacute; 	U+000DA 	Ú 
Uarr; 	U+0219F 	↟ 
Uarrocir; 	U+02949 	⥉ 
Ubrcy; 	U+0040E 	Ў 
Ubreve; 	U+0016C 	Ŭ 
Ucirc; 	U+000DB 	Û 
Ucy; 	U+00423 	У 
Udblac; 	U+00170 	Ű 
Ufr; 	U+1D518 	𝔘 
Ugrave; 	U+000D9 	Ù 
Umacr; 	U+0016A 	Ū 
UnderBar; 	U+0005F 	_ 
UnderBrace; 	U+023DF 	⏟ 
UnderBracket; 	U+023B5 	⎵ 
UnderParenthesis; 	U+023DD 	⏝ 
Union; 	U+022C3 	⋃ 
UnionPlus; 	U+0228E 	⊎ 
Uogon; 	U+00172 	Ų 
Uopf; 	U+1D54C 	𝕌 
UpArrow; 	U+02191 	↑ 
UpArrowBar; 	U+02912 	⤒ 
UpArrowDownArrow; 	U+021C5 	⇅ 
UpDownArrow; 	U+02195 	↕ 
UpEquilibrium; 	U+0296E 	⥮ 
UpTee; 	U+022A5 	⊥ 
UpTeeArrow; 	U+021A5 	↥ 
Uparrow; 	U+021D1 	⇑ 
Updownarrow; 	U+021D5 	⇕ 
UpperLeftArrow; 	U+02196 	↖ 
UpperRightArrow; 	U+02197 	↗ 
Upsi; 	U+003D2 	ϒ 
Upsilon; 	U+003A5 	Υ 
Uring; 	U+0016E 	Ů 
Uscr; 	U+1D4B0 	𝒰 
Utilde; 	U+00168 	Ũ 
Uuml; 	U+000DC 	Ü 
VDash; 	U+022AB 	⊫ 
Vbar; 	U+02AEB 	⫫ 
Vcy; 	U+00412 	В 
Vdash; 	U+022A9 	⊩ 
Vdashl; 	U+02AE6 	⫦ 
Vee; 	U+022C1 	⋁ 
Verbar; 	U+02016 	‖ 
Vert; 	U+02016 	‖ 
VerticalBar; 	U+02223 	∣ 
VerticalLine; 	U+0007C 	| 
VerticalSeparator; 	U+02758 	❘ 
VerticalTilde; 	U+02240 	≀ 
VeryThinSpace; 	U+0200A 	  
Vfr; 	U+1D519 	𝔙 
Vopf; 	U+1D54D 	𝕍 
Vscr; 	U+1D4B1 	𝒱 
Vvdash; 	U+022AA 	⊪ 
Wcirc; 	U+00174 	Ŵ 
Wedge; 	U+022C0 	⋀ 
Wfr; 	U+1D51A 	𝔚 
Wopf; 	U+1D54E 	𝕎 
Wscr; 	U+1D4B2 	𝒲 
Xfr; 	U+1D51B 	𝔛 
Xi; 	U+0039E 	Ξ 
Xopf; 	U+1D54F 	𝕏 
Xscr; 	U+1D4B3 	𝒳 
YAcy; 	U+0042F 	Я 
YIcy; 	U+00407 	Ї 
YUcy; 	U+0042E 	Ю 
Yacute; 	U+000DD 	Ý 
Ycirc; 	U+00176 	Ŷ 
Ycy; 	U+0042B 	Ы 
Yfr; 	U+1D51C 	𝔜 
Yopf; 	U+1D550 	𝕐 
Yscr; 	U+1D4B4 	𝒴 
Yuml; 	U+00178 	Ÿ 
ZHcy; 	U+00416 	Ж 
Zacute; 	U+00179 	Ź 
Zcaron; 	U+0017D 	Ž 
Zcy; 	U+00417 	З 
Zdot; 	U+0017B 	Ż 
ZeroWidthSpace; 	U+0200B 	​ 
Zeta; 	U+00396 	Ζ 
Zfr; 	U+02128 	ℨ 
Zopf; 	U+02124 	ℤ 
Zscr; 	U+1D4B5 	𝒵 
aacute; 	U+000E1 	á 
abreve; 	U+00103 	ă 
ac; 	U+0223E 	∾ 
acE; 	U+0223E U+00333 	∾̳ 
acd; 	U+0223F 	∿ 
acirc; 	U+000E2 	â 
acute; 	U+000B4 	´ 
acy; 	U+00430 	а 
aelig; 	U+000E6 	æ 
af; 	U+02061 	⁡ 
afr; 	U+1D51E 	𝔞 
agrave; 	U+000E0 	à 
alefsym; 	U+02135 	ℵ 
aleph; 	U+02135 	ℵ 
alpha; 	U+003B1 	α 
amacr; 	U+00101 	ā 
amalg; 	U+02A3F 	⨿ 
amp; 	U+00026 	& 
and; 	U+02227 	∧ 
andand; 	U+02A55 	⩕ 
andd; 	U+02A5C 	⩜ 
andslope; 	U+02A58 	⩘ 
andv; 	U+02A5A 	⩚ 
ang; 	U+02220 	∠ 
ange; 	U+029A4 	⦤ 
angle; 	U+02220 	∠ 
angmsd; 	U+02221 	∡ 
angmsdaa; 	U+029A8 	⦨ 
angmsdab; 	U+029A9 	⦩ 
angmsdac; 	U+029AA 	⦪ 
angmsdad; 	U+029AB 	⦫ 
angmsdae; 	U+029AC 	⦬ 
angmsdaf; 	U+029AD 	⦭ 
angmsdag; 	U+029AE 	⦮ 
angmsdah; 	U+029AF 	⦯ 
angrt; 	U+0221F 	∟ 
angrtvb; 	U+022BE 	⊾ 
angrtvbd; 	U+0299D 	⦝ 
angsph; 	U+02222 	∢ 
angst; 	U+000C5 	Å 
angzarr; 	U+0237C 	⍼ 
aogon; 	U+00105 	ą 
aopf; 	U+1D552 	𝕒 
ap; 	U+02248 	≈ 
apE; 	U+02A70 	⩰ 
apacir; 	U+02A6F 	⩯ 
ape; 	U+0224A 	≊ 
apid; 	U+0224B 	≋ 
apos; 	U+00027 	' 
approx; 	U+02248 	≈ 
approxeq; 	U+0224A 	≊ 
aring; 	U+000E5 	å 
ascr; 	U+1D4B6 	𝒶 
ast; 	U+0002A 	* 
asymp; 	U+02248 	≈ 
asympeq; 	U+0224D 	≍ 
atilde; 	U+000E3 	ã 
auml; 	U+000E4 	ä 
awconint; 	U+02233 	∳ 
awint; 	U+02A11 	⨑ 
bNot; 	U+02AED 	⫭ 
backcong; 	U+0224C 	≌ 
backepsilon; 	U+003F6 	϶ 
backprime; 	U+02035 	‵ 
backsim; 	U+0223D 	∽ 
backsimeq; 	U+022CD 	⋍ 
barvee; 	U+022BD 	⊽ 
barwed; 	U+02305 	⌅ 
barwedge; 	U+02305 	⌅ 
bbrk; 	U+023B5 	⎵ 
bbrktbrk; 	U+023B6 	⎶ 
bcong; 	U+0224C 	≌ 
bcy; 	U+00431 	б 
bdquo; 	U+0201E 	„ 
becaus; 	U+02235 	∵ 
because; 	U+02235 	∵ 
bemptyv; 	U+029B0 	⦰ 
bepsi; 	U+003F6 	϶ 
bernou; 	U+0212C 	ℬ 
beta; 	U+003B2 	β 
beth; 	U+02136 	ℶ 
between; 	U+0226C 	≬ 
bfr; 	U+1D51F 	𝔟 
bigcap; 	U+022C2 	⋂ 
bigcirc; 	U+025EF 	◯ 
bigcup; 	U+022C3 	⋃ 
bigodot; 	U+02A00 	⨀ 
bigoplus; 	U+02A01 	⨁ 
bigotimes; 	U+02A02 	⨂ 
bigsqcup; 	U+02A06 	⨆ 
bigstar; 	U+02605 	★ 
bigtriangledown; 	U+025BD 	▽ 
bigtriangleup; 	U+025B3 	△ 
biguplus; 	U+02A04 	⨄ 
bigvee; 	U+022C1 	⋁ 
bigwedge; 	U+022C0 	⋀ 
bkarow; 	U+0290D 	⤍ 
blacklozenge; 	U+029EB 	⧫ 
blacksquare; 	U+025AA 	▪ 
blacktriangle; 	U+025B4 	▴ 
blacktriangledown; 	U+025BE 	▾ 
blacktriangleleft; 	U+025C2 	◂ 
blacktriangleright; 	U+025B8 	▸ 
blank; 	U+02423 	␣ 
blk12; 	U+02592 	▒ 
blk14; 	U+02591 	░ 
blk34; 	U+02593 	▓ 
block; 	U+02588 	█ 
bne; 	U+0003D U+020E5 	=⃥ 
bnequiv; 	U+02261 U+020E5 	≡⃥ 
bnot; 	U+02310 	⌐ 
bopf; 	U+1D553 	𝕓 
bot; 	U+022A5 	⊥ 
bottom; 	U+022A5 	⊥ 
bowtie; 	U+022C8 	⋈ 
boxDL; 	U+02557 	╗ 
boxDR; 	U+02554 	╔ 
boxDl; 	U+02556 	╖ 
boxDr; 	U+02553 	╓ 
boxH; 	U+02550 	═ 
boxHD; 	U+02566 	╦ 
boxHU; 	U+02569 	╩ 
boxHd; 	U+02564 	╤ 
boxHu; 	U+02567 	╧ 
boxUL; 	U+0255D 	╝ 
boxUR; 	U+0255A 	╚ 
boxUl; 	U+0255C 	╜ 
boxUr; 	U+02559 	╙ 
boxV; 	U+02551 	║ 
boxVH; 	U+0256C 	╬ 
boxVL; 	U+02563 	╣ 
boxVR; 	U+02560 	╠ 
boxVh; 	U+0256B 	╫ 
boxVl; 	U+02562 	╢ 
boxVr; 	U+0255F 	╟ 
boxbox; 	U+029C9 	⧉ 
boxdL; 	U+02555 	╕ 
boxdR; 	U+02552 	╒ 
boxdl; 	U+02510 	┐ 
boxdr; 	U+0250C 	┌ 
boxh; 	U+02500 	─ 
boxhD; 	U+02565 	╥ 
boxhU; 	U+02568 	╨ 
boxhd; 	U+0252C 	┬ 
boxhu; 	U+02534 	┴ 
boxminus; 	U+0229F 	⊟ 
boxplus; 	U+0229E 	⊞ 
boxtimes; 	U+022A0 	⊠ 
boxuL; 	U+0255B 	╛ 
boxuR; 	U+02558 	╘ 
boxul; 	U+02518 	┘ 
boxur; 	U+02514 	└ 
boxv; 	U+02502 	│ 
boxvH; 	U+0256A 	╪ 
boxvL; 	U+02561 	╡ 
boxvR; 	U+0255E 	╞ 
boxvh; 	U+0253C 	┼ 
boxvl; 	U+02524 	┤ 
boxvr; 	U+0251C 	├ 
bprime; 	U+02035 	‵ 
breve; 	U+002D8 	˘ 
brvbar; 	U+000A6 	¦ 
bscr; 	U+1D4B7 	𝒷 
bsemi; 	U+0204F 	⁏ 
bsim; 	U+0223D 	∽ 
bsime; 	U+022CD 	⋍ 
bsol; 	U+0005C 	\ 
bsolb; 	U+029C5 	⧅ 
bsolhsub; 	U+027C8 	⟈ 
bull; 	U+02022 	• 
bullet; 	U+02022 	• 
bump; 	U+0224E 	≎ 
bumpE; 	U+02AAE 	⪮ 
bumpe; 	U+0224F 	≏ 
bumpeq; 	U+0224F 	≏ 
cacute; 	U+00107 	ć 
cap; 	U+02229 	∩ 
capand; 	U+02A44 	⩄ 
capbrcup; 	U+02A49 	⩉ 
capcap; 	U+02A4B 	⩋ 
capcup; 	U+02A47 	⩇ 
capdot; 	U+02A40 	⩀ 
caps; 	U+02229 U+0FE00 	∩︀ 
caret; 	U+02041 	⁁ 
caron; 	U+002C7 	ˇ 
ccaps; 	U+02A4D 	⩍ 
ccaron; 	U+0010D 	č 
ccedil; 	U+000E7 	ç 
ccirc; 	U+00109 	ĉ 
ccups; 	U+02A4C 	⩌ 
ccupssm; 	U+02A50 	⩐ 
cdot; 	U+0010B 	ċ 
cedil; 	U+000B8 	¸ 
cemptyv; 	U+029B2 	⦲ 
cent; 	U+000A2 	¢ 
centerdot; 	U+000B7 	· 
cfr; 	U+1D520 	𝔠 
chcy; 	U+00447 	ч 
check; 	U+02713 	✓ 
checkmark; 	U+02713 	✓ 
chi; 	U+003C7 	χ 
cir; 	U+025CB 	○ 
cirE; 	U+029C3 	⧃ 
circ; 	U+002C6 	ˆ 
circeq; 	U+02257 	≗ 
circlearrowleft; 	U+021BA 	↺ 
circlearrowright; 	U+021BB 	↻ 
circledR; 	U+000AE 	® 
circledS; 	U+024C8 	Ⓢ 
circledast; 	U+0229B 	⊛ 
circledcirc; 	U+0229A 	⊚ 
circleddash; 	U+0229D 	⊝ 
cire; 	U+02257 	≗ 
cirfnint; 	U+02A10 	⨐ 
cirmid; 	U+02AEF 	⫯ 
cirscir; 	U+029C2 	⧂ 
clubs; 	U+02663 	♣ 
clubsuit; 	U+02663 	♣ 
colon; 	U+0003A 	: 
colone; 	U+02254 	≔ 
coloneq; 	U+02254 	≔ 
comma; 	U+0002C 	, 
commat; 	U+00040 	@ 
comp; 	U+02201 	∁ 
compfn; 	U+02218 	∘ 
complement; 	U+02201 	∁ 
complexes; 	U+02102 	ℂ 
cong; 	U+02245 	≅ 
congdot; 	U+02A6D 	⩭ 
conint; 	U+0222E 	∮ 
copf; 	U+1D554 	𝕔 
coprod; 	U+02210 	∐ 
copy; 	U+000A9 	© 
copysr; 	U+02117 	℗ 
crarr; 	U+021B5 	↵ 
cross; 	U+02717 	✗ 
cscr; 	U+1D4B8 	𝒸 
csub; 	U+02ACF 	⫏ 
csube; 	U+02AD1 	⫑ 
csup; 	U+02AD0 	⫐ 
csupe; 	U+02AD2 	⫒ 
ctdot; 	U+022EF 	⋯ 
cudarrl; 	U+02938 	⤸ 
cudarrr; 	U+02935 	⤵ 
cuepr; 	U+022DE 	⋞ 
cuesc; 	U+022DF 	⋟ 
cularr; 	U+021B6 	↶ 
cularrp; 	U+0293D 	⤽ 
cup; 	U+0222A 	∪ 
cupbrcap; 	U+02A48 	⩈ 
cupcap; 	U+02A46 	⩆ 
cupcup; 	U+02A4A 	⩊ 
cupdot; 	U+0228D 	⊍ 
cupor; 	U+02A45 	⩅ 
cups; 	U+0222A U+0FE00 	∪︀ 
curarr; 	U+021B7 	↷ 
curarrm; 	U+0293C 	⤼ 
curlyeqprec; 	U+022DE 	⋞ 
curlyeqsucc; 	U+022DF 	⋟ 
curlyvee; 	U+022CE 	⋎ 
curlywedge; 	U+022CF 	⋏ 
curren; 	U+000A4 	¤ 
curvearrowleft; 	U+021B6 	↶ 
curvearrowright; 	U+021B7 	↷ 
cuvee; 	U+022CE 	⋎ 
cuwed; 	U+022CF 	⋏ 
cwconint; 	U+02232 	∲ 
cwint; 	U+02231 	∱ 
cylcty; 	U+0232D 	⌭ 
dArr; 	U+021D3 	⇓ 
dHar; 	U+02965 	⥥ 
dagger; 	U+02020 	† 
daleth; 	U+02138 	ℸ 
darr; 	U+02193 	↓ 
dash; 	U+02010 	‐ 
dashv; 	U+022A3 	⊣ 
dbkarow; 	U+0290F 	⤏ 
dblac; 	U+002DD 	˝ 
dcaron; 	U+0010F 	ď 
dcy; 	U+00434 	д 
dd; 	U+02146 	ⅆ 
ddagger; 	U+02021 	‡ 
ddarr; 	U+021CA 	⇊ 
ddotseq; 	U+02A77 	⩷ 
deg; 	U+000B0 	° 
delta; 	U+003B4 	δ 
demptyv; 	U+029B1 	⦱ 
dfisht; 	U+0297F 	⥿ 
dfr; 	U+1D521 	𝔡 
dharl; 	U+021C3 	⇃ 
dharr; 	U+021C2 	⇂ 
diam; 	U+022C4 	⋄ 
diamond; 	U+022C4 	⋄ 
diamondsuit; 	U+02666 	♦ 
diams; 	U+02666 	♦ 
die; 	U+000A8 	¨ 
digamma; 	U+003DD 	ϝ 
disin; 	U+022F2 	⋲ 
div; 	U+000F7 	÷ 
divide; 	U+000F7 	÷ 
divideontimes; 	U+022C7 	⋇ 
divonx; 	U+022C7 	⋇ 
djcy; 	U+00452 	ђ 
dlcorn; 	U+0231E 	⌞ 
dlcrop; 	U+0230D 	⌍ 
dollar; 	U+00024 	$ 
dopf; 	U+1D555 	𝕕 
dot; 	U+002D9 	˙ 
doteq; 	U+02250 	≐ 
doteqdot; 	U+02251 	≑ 
dotminus; 	U+02238 	∸ 
dotplus; 	U+02214 	∔ 
dotsquare; 	U+022A1 	⊡ 
doublebarwedge; 	U+02306 	⌆ 
downarrow; 	U+02193 	↓ 
downdownarrows; 	U+021CA 	⇊ 
downharpoonleft; 	U+021C3 	⇃ 
downharpoonright; 	U+021C2 	⇂ 
drbkarow; 	U+02910 	⤐ 
drcorn; 	U+0231F 	⌟ 
drcrop; 	U+0230C 	⌌ 
dscr; 	U+1D4B9 	𝒹 
dscy; 	U+00455 	ѕ 
dsol; 	U+029F6 	⧶ 
dstrok; 	U+00111 	đ 
dtdot; 	U+022F1 	⋱ 
dtri; 	U+025BF 	▿ 
dtrif; 	U+025BE 	▾ 
duarr; 	U+021F5 	⇵ 
duhar; 	U+0296F 	⥯ 
dwangle; 	U+029A6 	⦦ 
dzcy; 	U+0045F 	џ 
dzigrarr; 	U+027FF 	⟿ 
eDDot; 	U+02A77 	⩷ 
eDot; 	U+02251 	≑ 
eacute; 	U+000E9 	é 
easter; 	U+02A6E 	⩮ 
ecaron; 	U+0011B 	ě 
ecir; 	U+02256 	≖ 
ecirc; 	U+000EA 	ê 
ecolon; 	U+02255 	≕ 
ecy; 	U+0044D 	э 
edot; 	U+00117 	ė 
ee; 	U+02147 	ⅇ 
efDot; 	U+02252 	≒ 
efr; 	U+1D522 	𝔢 
eg; 	U+02A9A 	⪚ 
egrave; 	U+000E8 	è 
egs; 	U+02A96 	⪖ 
egsdot; 	U+02A98 	⪘ 
el; 	U+02A99 	⪙ 
elinters; 	U+023E7 	⏧ 
ell; 	U+02113 	ℓ 
els; 	U+02A95 	⪕ 
elsdot; 	U+02A97 	⪗ 
emacr; 	U+00113 	ē 
empty; 	U+02205 	∅ 
emptyset; 	U+02205 	∅ 
emptyv; 	U+02205 	∅ 
emsp; 	U+02003 	  
emsp13; 	U+02004 	  
emsp14; 	U+02005 	  
eng; 	U+0014B 	ŋ 
ensp; 	U+02002 	  
eogon; 	U+00119 	ę 
eopf; 	U+1D556 	𝕖 
epar; 	U+022D5 	⋕ 
eparsl; 	U+029E3 	⧣ 
eplus; 	U+02A71 	⩱ 
epsi; 	U+003B5 	ε 
epsilon; 	U+003B5 	ε 
epsiv; 	U+003F5 	ϵ 
eqcirc; 	U+02256 	≖ 
eqcolon; 	U+02255 	≕ 
eqsim; 	U+02242 	≂ 
eqslantgtr; 	U+02A96 	⪖ 
eqslantless; 	U+02A95 	⪕ 
equals; 	U+0003D 	= 
equest; 	U+0225F 	≟ 
equiv; 	U+02261 	≡ 
equivDD; 	U+02A78 	⩸ 
eqvparsl; 	U+029E5 	⧥ 
erDot; 	U+02253 	≓ 
erarr; 	U+02971 	⥱ 
escr; 	U+0212F 	ℯ 
esdot; 	U+02250 	≐ 
esim; 	U+02242 	≂ 
eta; 	U+003B7 	η 
eth; 	U+000F0 	ð 
euml; 	U+000EB 	ë 
euro; 	U+020AC 	€ 
excl; 	U+00021 	! 
exist; 	U+02203 	∃ 
expectation; 	U+02130 	ℰ 
exponentiale; 	U+02147 	ⅇ 
fallingdotseq; 	U+02252 	≒ 
fcy; 	U+00444 	ф 
female; 	U+02640 	♀ 
ffilig; 	U+0FB03 	ﬃ 
fflig; 	U+0FB00 	ﬀ 
ffllig; 	U+0FB04 	ﬄ 
ffr; 	U+1D523 	𝔣 
filig; 	U+0FB01 	ﬁ 
fjlig; 	U+00066 U+0006A 	fj 
flat; 	U+0266D 	♭ 
fllig; 	U+0FB02 	ﬂ 
fltns; 	U+025B1 	▱ 
fnof; 	U+00192 	ƒ 
fopf; 	U+1D557 	𝕗 
forall; 	U+02200 	∀ 
fork; 	U+022D4 	⋔ 
forkv; 	U+02AD9 	⫙ 
fpartint; 	U+02A0D 	⨍ 
frac12; 	U+000BD 	½ 
frac13; 	U+02153 	⅓ 
frac14; 	U+000BC 	¼ 
frac15; 	U+02155 	⅕ 
frac16; 	U+02159 	⅙ 
frac18; 	U+0215B 	⅛ 
frac23; 	U+02154 	⅔ 
frac25; 	U+02156 	⅖ 
frac34; 	U+000BE 	¾ 
frac35; 	U+02157 	⅗ 
frac38; 	U+0215C 	⅜ 
frac45; 	U+02158 	⅘ 
frac56; 	U+0215A 	⅚ 
frac58; 	U+0215D 	⅝ 
frac78; 	U+0215E 	⅞ 
frasl; 	U+02044 	⁄ 
frown; 	U+02322 	⌢ 
fscr; 	U+1D4BB 	𝒻 
gE; 	U+02267 	≧ 
gEl; 	U+02A8C 	⪌ 
gacute; 	U+001F5 	ǵ 
gamma; 	U+003B3 	γ 
gammad; 	U+003DD 	ϝ 
gap; 	U+02A86 	⪆ 
gbreve; 	U+0011F 	ğ 
gcirc; 	U+0011D 	ĝ 
gcy; 	U+00433 	г 
gdot; 	U+00121 	ġ 
ge; 	U+02265 	≥ 
gel; 	U+022DB 	⋛ 
geq; 	U+02265 	≥ 
geqq; 	U+02267 	≧ 
geqslant; 	U+02A7E 	⩾ 
ges; 	U+02A7E 	⩾ 
gescc; 	U+02AA9 	⪩ 
gesdot; 	U+02A80 	⪀ 
gesdoto; 	U+02A82 	⪂ 
gesdotol; 	U+02A84 	⪄ 
gesl; 	U+022DB U+0FE00 	⋛︀ 
gesles; 	U+02A94 	⪔ 
gfr; 	U+1D524 	𝔤 
gg; 	U+0226B 	≫ 
ggg; 	U+022D9 	⋙ 
gimel; 	U+02137 	ℷ 
gjcy; 	U+00453 	ѓ 
gl; 	U+02277 	≷ 
glE; 	U+02A92 	⪒ 
gla; 	U+02AA5 	⪥ 
glj; 	U+02AA4 	⪤ 
gnE; 	U+02269 	≩ 
gnap; 	U+02A8A 	⪊ 
gnapprox; 	U+02A8A 	⪊ 
gne; 	U+02A88 	⪈ 
gneq; 	U+02A88 	⪈ 
gneqq; 	U+02269 	≩ 
gnsim; 	U+022E7 	⋧ 
gopf; 	U+1D558 	𝕘 
grave; 	U+00060 	` 
gscr; 	U+0210A 	ℊ 
gsim; 	U+02273 	≳ 
gsime; 	U+02A8E 	⪎ 
gsiml; 	U+02A90 	⪐ 
gt; 	U+0003E 	> 
gtcc; 	U+02AA7 	⪧ 
gtcir; 	U+02A7A 	⩺ 
gtdot; 	U+022D7 	⋗ 
gtlPar; 	U+02995 	⦕ 
gtquest; 	U+02A7C 	⩼ 
gtrapprox; 	U+02A86 	⪆ 
gtrarr; 	U+02978 	⥸ 
gtrdot; 	U+022D7 	⋗ 
gtreqless; 	U+022DB 	⋛ 
gtreqqless; 	U+02A8C 	⪌ 
gtrless; 	U+02277 	≷ 
gtrsim; 	U+02273 	≳ 
gvertneqq; 	U+02269 U+0FE00 	≩︀ 
gvnE; 	U+02269 U+0FE00 	≩︀ 
hArr; 	U+021D4 	⇔ 
hairsp; 	U+0200A 	  
half; 	U+000BD 	½ 
hamilt; 	U+0210B 	ℋ 
hardcy; 	U+0044A 	ъ 
harr; 	U+02194 	↔ 
harrcir; 	U+02948 	⥈ 
harrw; 	U+021AD 	↭ 
hbar; 	U+0210F 	ℏ 
hcirc; 	U+00125 	ĥ 
hearts; 	U+02665 	♥ 
heartsuit; 	U+02665 	♥ 
hellip; 	U+02026 	… 
hercon; 	U+022B9 	⊹ 
hfr; 	U+1D525 	𝔥 
hksearow; 	U+02925 	⤥ 
hkswarow; 	U+02926 	⤦ 
hoarr; 	U+021FF 	⇿ 
homtht; 	U+0223B 	∻ 
hookleftarrow; 	U+021A9 	↩ 
hookrightarrow; 	U+021AA 	↪ 
hopf; 	U+1D559 	𝕙 
horbar; 	U+02015 	― 
hscr; 	U+1D4BD 	𝒽 
hslash; 	U+0210F 	ℏ 
hstrok; 	U+00127 	ħ 
hybull; 	U+02043 	⁃ 
hyphen; 	U+02010 	‐ 
iacute; 	U+000ED 	í 
ic; 	U+02063 	⁣ 
icirc; 	U+000EE 	î 
icy; 	U+00438 	и 
iecy; 	U+00435 	е 
iexcl; 	U+000A1 	¡ 
iff; 	U+021D4 	⇔ 
ifr; 	U+1D526 	𝔦 
igrave; 	U+000EC 	ì 
ii; 	U+02148 	ⅈ 
iiiint; 	U+02A0C 	⨌ 
iiint; 	U+0222D 	∭ 
iinfin; 	U+029DC 	⧜ 
iiota; 	U+02129 	℩ 
ijlig; 	U+00133 	ĳ 
imacr; 	U+0012B 	ī 
image; 	U+02111 	ℑ 
imagline; 	U+02110 	ℐ 
imagpart; 	U+02111 	ℑ 
imath; 	U+00131 	ı 
imof; 	U+022B7 	⊷ 
imped; 	U+001B5 	Ƶ 
in; 	U+02208 	∈ 
incare; 	U+02105 	℅ 
infin; 	U+0221E 	∞ 
infintie; 	U+029DD 	⧝ 
inodot; 	U+00131 	ı 
int; 	U+0222B 	∫ 
intcal; 	U+022BA 	⊺ 
integers; 	U+02124 	ℤ 
intercal; 	U+022BA 	⊺ 
intlarhk; 	U+02A17 	⨗ 
intprod; 	U+02A3C 	⨼ 
iocy; 	U+00451 	ё 
iogon; 	U+0012F 	į 
iopf; 	U+1D55A 	𝕚 
iota; 	U+003B9 	ι 
iprod; 	U+02A3C 	⨼ 
iquest; 	U+000BF 	¿ 
iscr; 	U+1D4BE 	𝒾 
isin; 	U+02208 	∈ 
isinE; 	U+022F9 	⋹ 
isindot; 	U+022F5 	⋵ 
isins; 	U+022F4 	⋴ 
isinsv; 	U+022F3 	⋳ 
isinv; 	U+02208 	∈ 
it; 	U+02062 	⁢ 
itilde; 	U+00129 	ĩ 
iukcy; 	U+00456 	і 
iuml; 	U+000EF 	ï 
jcirc; 	U+00135 	ĵ 
jcy; 	U+00439 	й 
jfr; 	U+1D527 	𝔧 
jmath; 	U+00237 	ȷ 
jopf; 	U+1D55B 	𝕛 
jscr; 	U+1D4BF 	𝒿 
jsercy; 	U+00458 	ј 
jukcy; 	U+00454 	є 
kappa; 	U+003BA 	κ 
kappav; 	U+003F0 	ϰ 
kcedil; 	U+00137 	ķ 
kcy; 	U+0043A 	к 
kfr; 	U+1D528 	𝔨 
kgreen; 	U+00138 	ĸ 
khcy; 	U+00445 	х 
kjcy; 	U+0045C 	ќ 
kopf; 	U+1D55C 	𝕜 
kscr; 	U+1D4C0 	𝓀 
lAarr; 	U+021DA 	⇚ 
lArr; 	U+021D0 	⇐ 
lAtail; 	U+0291B 	⤛ 
lBarr; 	U+0290E 	⤎ 
lE; 	U+02266 	≦ 
lEg; 	U+02A8B 	⪋ 
lHar; 	U+02962 	⥢ 
lacute; 	U+0013A 	ĺ 
laemptyv; 	U+029B4 	⦴ 
lagran; 	U+02112 	ℒ 
lambda; 	U+003BB 	λ 
lang; 	U+027E8 	〈 
langd; 	U+02991 	⦑ 
langle; 	U+027E8 	〈 
lap; 	U+02A85 	⪅ 
laquo; 	U+000AB 	« 
larr; 	U+02190 	← 
larrb; 	U+021E4 	⇤ 
larrbfs; 	U+0291F 	⤟ 
larrfs; 	U+0291D 	⤝ 
larrhk; 	U+021A9 	↩ 
larrlp; 	U+021AB 	↫ 
larrpl; 	U+02939 	⤹ 
larrsim; 	U+02973 	⥳ 
larrtl; 	U+021A2 	↢ 
lat; 	U+02AAB 	⪫ 
latail; 	U+02919 	⤙ 
late; 	U+02AAD 	⪭ 
lates; 	U+02AAD U+0FE00 	⪭︀ 
lbarr; 	U+0290C 	⤌ 
lbbrk; 	U+02772 	❲ 
lbrace; 	U+0007B 	{ 
lbrack; 	U+0005B 	[ 
lbrke; 	U+0298B 	⦋ 
lbrksld; 	U+0298F 	⦏ 
lbrkslu; 	U+0298D 	⦍ 
lcaron; 	U+0013E 	ľ 
lcedil; 	U+0013C 	ļ 
lceil; 	U+02308 	⌈ 
lcub; 	U+0007B 	{ 
lcy; 	U+0043B 	л 
ldca; 	U+02936 	⤶ 
ldquo; 	U+0201C 	“ 
ldquor; 	U+0201E 	„ 
ldrdhar; 	U+02967 	⥧ 
ldrushar; 	U+0294B 	⥋ 
ldsh; 	U+021B2 	↲ 
le; 	U+02264 	≤ 
leftarrow; 	U+02190 	← 
leftarrowtail; 	U+021A2 	↢ 
leftharpoondown; 	U+021BD 	↽ 
leftharpoonup; 	U+021BC 	↼ 
leftleftarrows; 	U+021C7 	⇇ 
leftrightarrow; 	U+02194 	↔ 
leftrightarrows; 	U+021C6 	⇆ 
leftrightharpoons; 	U+021CB 	⇋ 
leftrightsquigarrow; 	U+021AD 	↭ 
leftthreetimes; 	U+022CB 	⋋ 
leg; 	U+022DA 	⋚ 
leq; 	U+02264 	≤ 
leqq; 	U+02266 	≦ 
leqslant; 	U+02A7D 	⩽ 
les; 	U+02A7D 	⩽ 
lescc; 	U+02AA8 	⪨ 
lesdot; 	U+02A7F 	⩿ 
lesdoto; 	U+02A81 	⪁ 
lesdotor; 	U+02A83 	⪃ 
lesg; 	U+022DA U+0FE00 	⋚︀ 
lesges; 	U+02A93 	⪓ 
lessapprox; 	U+02A85 	⪅ 
lessdot; 	U+022D6 	⋖ 
lesseqgtr; 	U+022DA 	⋚ 
lesseqqgtr; 	U+02A8B 	⪋ 
lessgtr; 	U+02276 	≶ 
lesssim; 	U+02272 	≲ 
lfisht; 	U+0297C 	⥼ 
lfloor; 	U+0230A 	⌊ 
lfr; 	U+1D529 	𝔩 
lg; 	U+02276 	≶ 
lgE; 	U+02A91 	⪑ 
lhard; 	U+021BD 	↽ 
lharu; 	U+021BC 	↼ 
lharul; 	U+0296A 	⥪ 
lhblk; 	U+02584 	▄ 
ljcy; 	U+00459 	љ 
ll; 	U+0226A 	≪ 
llarr; 	U+021C7 	⇇ 
llcorner; 	U+0231E 	⌞ 
llhard; 	U+0296B 	⥫ 
lltri; 	U+025FA 	◺ 
lmidot; 	U+00140 	ŀ 
lmoust; 	U+023B0 	⎰ 
lmoustache; 	U+023B0 	⎰ 
lnE; 	U+02268 	≨ 
lnap; 	U+02A89 	⪉ 
lnapprox; 	U+02A89 	⪉ 
lne; 	U+02A87 	⪇ 
lneq; 	U+02A87 	⪇ 
lneqq; 	U+02268 	≨ 
lnsim; 	U+022E6 	⋦ 
loang; 	U+027EC 	⟬ 
loarr; 	U+021FD 	⇽ 
lobrk; 	U+027E6 	⟦ 
longleftarrow; 	U+027F5 	⟵ 
longleftrightarrow; 	U+027F7 	⟷ 
longmapsto; 	U+027FC 	⟼ 
longrightarrow; 	U+027F6 	⟶ 
looparrowleft; 	U+021AB 	↫ 
looparrowright; 	U+021AC 	↬ 
lopar; 	U+02985 	⦅ 
lopf; 	U+1D55D 	𝕝 
loplus; 	U+02A2D 	⨭ 
lotimes; 	U+02A34 	⨴ 
lowast; 	U+02217 	∗ 
lowbar; 	U+0005F 	_ 
loz; 	U+025CA 	◊ 
lozenge; 	U+025CA 	◊ 
lozf; 	U+029EB 	⧫ 
lpar; 	U+00028 	( 
lparlt; 	U+02993 	⦓ 
lrarr; 	U+021C6 	⇆ 
lrcorner; 	U+0231F 	⌟ 
lrhar; 	U+021CB 	⇋ 
lrhard; 	U+0296D 	⥭ 
lrm; 	U+0200E 	‎ 
lrtri; 	U+022BF 	⊿ 
lsaquo; 	U+02039 	‹ 
lscr; 	U+1D4C1 	𝓁 
lsh; 	U+021B0 	↰ 
lsim; 	U+02272 	≲ 
lsime; 	U+02A8D 	⪍ 
lsimg; 	U+02A8F 	⪏ 
lsqb; 	U+0005B 	[ 
lsquo; 	U+02018 	‘ 
lsquor; 	U+0201A 	‚ 
lstrok; 	U+00142 	ł 
lt; 	U+0003C 	< 
ltcc; 	U+02AA6 	⪦ 
ltcir; 	U+02A79 	⩹ 
ltdot; 	U+022D6 	⋖ 
lthree; 	U+022CB 	⋋ 
ltimes; 	U+022C9 	⋉ 
ltlarr; 	U+02976 	⥶ 
ltquest; 	U+02A7B 	⩻ 
ltrPar; 	U+02996 	⦖ 
ltri; 	U+025C3 	◃ 
ltrie; 	U+022B4 	⊴ 
ltrif; 	U+025C2 	◂ 
lurdshar; 	U+0294A 	⥊ 
luruhar; 	U+02966 	⥦ 
lvertneqq; 	U+02268 U+0FE00 	≨︀ 
lvnE; 	U+02268 U+0FE00 	≨︀ 
mDDot; 	U+0223A 	∺ 
macr; 	U+000AF 	¯ 
male; 	U+02642 	♂ 
malt; 	U+02720 	✠ 
maltese; 	U+02720 	✠ 
map; 	U+021A6 	↦ 
mapsto; 	U+021A6 	↦ 
mapstodown; 	U+021A7 	↧ 
mapstoleft; 	U+021A4 	↤ 
mapstoup; 	U+021A5 	↥ 
marker; 	U+025AE 	▮ 
mcomma; 	U+02A29 	⨩ 
mcy; 	U+0043C 	м 
mdash; 	U+02014 	— 
measuredangle; 	U+02221 	∡ 
mfr; 	U+1D52A 	𝔪 
mho; 	U+02127 	℧ 
micro; 	U+000B5 	µ 
mid; 	U+02223 	∣ 
midast; 	U+0002A 	* 
midcir; 	U+02AF0 	⫰ 
middot; 	U+000B7 	· 
minus; 	U+02212 	− 
minusb; 	U+0229F 	⊟ 
minusd; 	U+02238 	∸ 
minusdu; 	U+02A2A 	⨪ 
mlcp; 	U+02ADB 	⫛ 
mldr; 	U+02026 	… 
mnplus; 	U+02213 	∓ 
models; 	U+022A7 	⊧ 
mopf; 	U+1D55E 	𝕞 
mp; 	U+02213 	∓ 
mscr; 	U+1D4C2 	𝓂 
mstpos; 	U+0223E 	∾ 
mu; 	U+003BC 	μ 
multimap; 	U+022B8 	⊸ 
mumap; 	U+022B8 	⊸ 
nGg; 	U+022D9 U+00338 	⋙̸ 
nGt; 	U+0226B U+020D2 	≫⃒ 
nGtv; 	U+0226B U+00338 	≫̸ 
nLeftarrow; 	U+021CD 	⇍ 
nLeftrightarrow; 	U+021CE 	⇎ 
nLl; 	U+022D8 U+00338 	⋘̸ 
nLt; 	U+0226A U+020D2 	≪⃒ 
nLtv; 	U+0226A U+00338 	≪̸ 
nRightarrow; 	U+021CF 	⇏ 
nVDash; 	U+022AF 	⊯ 
nVdash; 	U+022AE 	⊮ 
nabla; 	U+02207 	∇ 
nacute; 	U+00144 	ń 
nang; 	U+02220 U+020D2 	∠⃒ 
nap; 	U+02249 	≉ 
napE; 	U+02A70 U+00338 	⩰̸ 
napid; 	U+0224B U+00338 	≋̸ 
napos; 	U+00149 	ŉ 
napprox; 	U+02249 	≉ 
natur; 	U+0266E 	♮ 
natural; 	U+0266E 	♮ 
naturals; 	U+02115 	ℕ 
nbsp; 	U+000A0 	  
nbump; 	U+0224E U+00338 	≎̸ 
nbumpe; 	U+0224F U+00338 	≏̸ 
ncap; 	U+02A43 	⩃ 
ncaron; 	U+00148 	ň 
ncedil; 	U+00146 	ņ 
ncong; 	U+02247 	≇ 
ncongdot; 	U+02A6D U+00338 	⩭̸ 
ncup; 	U+02A42 	⩂ 
ncy; 	U+0043D 	н 
ndash; 	U+02013 	– 
ne; 	U+02260 	≠ 
neArr; 	U+021D7 	⇗ 
nearhk; 	U+02924 	⤤ 
nearr; 	U+02197 	↗ 
nearrow; 	U+02197 	↗ 
nedot; 	U+02250 U+00338 	≐̸ 
nequiv; 	U+02262 	≢ 
nesear; 	U+02928 	⤨ 
nesim; 	U+02242 U+00338 	≂̸ 
nexist; 	U+02204 	∄ 
nexists; 	U+02204 	∄ 
nfr; 	U+1D52B 	𝔫 
ngE; 	U+02267 U+00338 	≧̸ 
nge; 	U+02271 	≱ 
ngeq; 	U+02271 	≱ 
ngeqq; 	U+02267 U+00338 	≧̸ 
ngeqslant; 	U+02A7E U+00338 	⩾̸ 
nges; 	U+02A7E U+00338 	⩾̸ 
ngsim; 	U+02275 	≵ 
ngt; 	U+0226F 	≯ 
ngtr; 	U+0226F 	≯ 
nhArr; 	U+021CE 	⇎ 
nharr; 	U+021AE 	↮ 
nhpar; 	U+02AF2 	⫲ 
ni; 	U+0220B 	∋ 
nis; 	U+022FC 	⋼ 
nisd; 	U+022FA 	⋺ 
niv; 	U+0220B 	∋ 
njcy; 	U+0045A 	њ 
nlArr; 	U+021CD 	⇍ 
nlE; 	U+02266 U+00338 	≦̸ 
nlarr; 	U+0219A 	↚ 
nldr; 	U+02025 	‥ 
nle; 	U+02270 	≰ 
nleftarrow; 	U+0219A 	↚ 
nleftrightarrow; 	U+021AE 	↮ 
nleq; 	U+02270 	≰ 
nleqq; 	U+02266 U+00338 	≦̸ 
nleqslant; 	U+02A7D U+00338 	⩽̸ 
nles; 	U+02A7D U+00338 	⩽̸ 
nless; 	U+0226E 	≮ 
nlsim; 	U+02274 	≴ 
nlt; 	U+0226E 	≮ 
nltri; 	U+022EA 	⋪ 
nltrie; 	U+022EC 	⋬ 
nmid; 	U+02224 	∤ 
nopf; 	U+1D55F 	𝕟 
not; 	U+000AC 	¬ 
notin; 	U+02209 	∉ 
notinE; 	U+022F9 U+00338 	⋹̸ 
notindot; 	U+022F5 U+00338 	⋵̸ 
notinva; 	U+02209 	∉ 
notinvb; 	U+022F7 	⋷ 
notinvc; 	U+022F6 	⋶ 
notni; 	U+0220C 	∌ 
notniva; 	U+0220C 	∌ 
notnivb; 	U+022FE 	⋾ 
notnivc; 	U+022FD 	⋽ 
npar; 	U+02226 	∦ 
nparallel; 	U+02226 	∦ 
nparsl; 	U+02AFD U+020E5 	⫽⃥ 
npart; 	U+02202 U+00338 	∂̸ 
npolint; 	U+02A14 	⨔ 
npr; 	U+02280 	⊀ 
nprcue; 	U+022E0 	⋠ 
npre; 	U+02AAF U+00338 	⪯̸ 
nprec; 	U+02280 	⊀ 
npreceq; 	U+02AAF U+00338 	⪯̸ 
nrArr; 	U+021CF 	⇏ 
nrarr; 	U+0219B 	↛ 
nrarrc; 	U+02933 U+00338 	⤳̸ 
nrarrw; 	U+0219D U+00338 	↝̸ 
nrightarrow; 	U+0219B 	↛ 
nrtri; 	U+022EB 	⋫ 
nrtrie; 	U+022ED 	⋭ 
nsc; 	U+02281 	⊁ 
nsccue; 	U+022E1 	⋡ 
nsce; 	U+02AB0 U+00338 	⪰̸ 
nscr; 	U+1D4C3 	𝓃 
nshortmid; 	U+02224 	∤ 
nshortparallel; 	U+02226 	∦ 
nsim; 	U+02241 	≁ 
nsime; 	U+02244 	≄ 
nsimeq; 	U+02244 	≄ 
nsmid; 	U+02224 	∤ 
nspar; 	U+02226 	∦ 
nsqsube; 	U+022E2 	⋢ 
nsqsupe; 	U+022E3 	⋣ 
nsub; 	U+02284 	⊄ 
nsubE; 	U+02AC5 U+00338 	⫅̸ 
nsube; 	U+02288 	⊈ 
nsubset; 	U+02282 U+020D2 	⊂⃒ 
nsubseteq; 	U+02288 	⊈ 
nsubseteqq; 	U+02AC5 U+00338 	⫅̸ 
nsucc; 	U+02281 	⊁ 
nsucceq; 	U+02AB0 U+00338 	⪰̸ 
nsup; 	U+02285 	⊅ 
nsupE; 	U+02AC6 U+00338 	⫆̸ 
nsupe; 	U+02289 	⊉ 
nsupset; 	U+02283 U+020D2 	⊃⃒ 
nsupseteq; 	U+02289 	⊉ 
nsupseteqq; 	U+02AC6 U+00338 	⫆̸ 
ntgl; 	U+02279 	≹ 
ntilde; 	U+000F1 	ñ 
ntlg; 	U+02278 	≸ 
ntriangleleft; 	U+022EA 	⋪ 
ntrianglelefteq; 	U+022EC 	⋬ 
ntriangleright; 	U+022EB 	⋫ 
ntrianglerighteq; 	U+022ED 	⋭ 
nu; 	U+003BD 	ν 
num; 	U+00023 	# 
numero; 	U+02116 	№ 
numsp; 	U+02007 	  
nvDash; 	U+022AD 	⊭ 
nvHarr; 	U+02904 	⤄ 
nvap; 	U+0224D U+020D2 	≍⃒ 
nvdash; 	U+022AC 	⊬ 
nvge; 	U+02265 U+020D2 	≥⃒ 
nvgt; 	U+0003E U+020D2 	>⃒ 
nvinfin; 	U+029DE 	⧞ 
nvlArr; 	U+02902 	⤂ 
nvle; 	U+02264 U+020D2 	≤⃒ 
nvlt; 	U+0003C U+020D2 	<⃒ 
nvltrie; 	U+022B4 U+020D2 	⊴⃒ 
nvrArr; 	U+02903 	⤃ 
nvrtrie; 	U+022B5 U+020D2 	⊵⃒ 
nvsim; 	U+0223C U+020D2 	∼⃒ 
nwArr; 	U+021D6 	⇖ 
nwarhk; 	U+02923 	⤣ 
nwarr; 	U+02196 	↖ 
nwarrow; 	U+02196 	↖ 
nwnear; 	U+02927 	⤧ 
oS; 	U+024C8 	Ⓢ 
oacute; 	U+000F3 	ó 
oast; 	U+0229B 	⊛ 
ocir; 	U+0229A 	⊚ 
ocirc; 	U+000F4 	ô 
ocy; 	U+0043E 	о 
odash; 	U+0229D 	⊝ 
odblac; 	U+00151 	ő 
odiv; 	U+02A38 	⨸ 
odot; 	U+02299 	⊙ 
odsold; 	U+029BC 	⦼ 
oelig; 	U+00153 	œ 
ofcir; 	U+029BF 	⦿ 
ofr; 	U+1D52C 	𝔬 
ogon; 	U+002DB 	˛ 
ograve; 	U+000F2 	ò 
ogt; 	U+029C1 	⧁ 
ohbar; 	U+029B5 	⦵ 
ohm; 	U+003A9 	Ω 
oint; 	U+0222E 	∮ 
olarr; 	U+021BA 	↺ 
olcir; 	U+029BE 	⦾ 
olcross; 	U+029BB 	⦻ 
oline; 	U+0203E 	‾ 
olt; 	U+029C0 	⧀ 
omacr; 	U+0014D 	ō 
omega; 	U+003C9 	ω 
omicron; 	U+003BF 	ο 
omid; 	U+029B6 	⦶ 
ominus; 	U+02296 	⊖ 
oopf; 	U+1D560 	𝕠 
opar; 	U+029B7 	⦷ 
operp; 	U+029B9 	⦹ 
oplus; 	U+02295 	⊕ 
or; 	U+02228 	∨ 
orarr; 	U+021BB 	↻ 
ord; 	U+02A5D 	⩝ 
order; 	U+02134 	ℴ 
orderof; 	U+02134 	ℴ 
ordf; 	U+000AA 	ª 
ordm; 	U+000BA 	º 
origof; 	U+022B6 	⊶ 
oror; 	U+02A56 	⩖ 
orslope; 	U+02A57 	⩗ 
orv; 	U+02A5B 	⩛ 
oscr; 	U+02134 	ℴ 
oslash; 	U+000F8 	ø 
osol; 	U+02298 	⊘ 
otilde; 	U+000F5 	õ 
otimes; 	U+02297 	⊗ 
otimesas; 	U+02A36 	⨶ 
ouml; 	U+000F6 	ö 
ovbar; 	U+0233D 	⌽ 
par; 	U+02225 	∥ 
para; 	U+000B6 	¶ 
parallel; 	U+02225 	∥ 
parsim; 	U+02AF3 	⫳ 
parsl; 	U+02AFD 	⫽ 
part; 	U+02202 	∂ 
pcy; 	U+0043F 	п 
percnt; 	U+00025 	% 
period; 	U+0002E 	. 
permil; 	U+02030 	‰ 
perp; 	U+022A5 	⊥ 
pertenk; 	U+02031 	‱ 
pfr; 	U+1D52D 	𝔭 
phi; 	U+003C6 	φ 
phiv; 	U+003D5 	ϕ 
phmmat; 	U+02133 	ℳ 
phone; 	U+0260E 	☎ 
pi; 	U+003C0 	π 
pitchfork; 	U+022D4 	⋔ 
piv; 	U+003D6 	ϖ 
planck; 	U+0210F 	ℏ 
planckh; 	U+0210E 	ℎ 
plankv; 	U+0210F 	ℏ 
plus; 	U+0002B 	+ 
plusacir; 	U+02A23 	⨣ 
plusb; 	U+0229E 	⊞ 
pluscir; 	U+02A22 	⨢ 
plusdo; 	U+02214 	∔ 
plusdu; 	U+02A25 	⨥ 
pluse; 	U+02A72 	⩲ 
plusmn; 	U+000B1 	± 
plussim; 	U+02A26 	⨦ 
plustwo; 	U+02A27 	⨧ 
pm; 	U+000B1 	± 
pointint; 	U+02A15 	⨕ 
popf; 	U+1D561 	𝕡 
pound; 	U+000A3 	£ 
pr; 	U+0227A 	≺ 
prE; 	U+02AB3 	⪳ 
prap; 	U+02AB7 	⪷ 
prcue; 	U+0227C 	≼ 
pre; 	U+02AAF 	⪯ 
prec; 	U+0227A 	≺ 
precapprox; 	U+02AB7 	⪷ 
preccurlyeq; 	U+0227C 	≼ 
preceq; 	U+02AAF 	⪯ 
precnapprox; 	U+02AB9 	⪹ 
precneqq; 	U+02AB5 	⪵ 
precnsim; 	U+022E8 	⋨ 
precsim; 	U+0227E 	≾ 
prime; 	U+02032 	′ 
primes; 	U+02119 	ℙ 
prnE; 	U+02AB5 	⪵ 
prnap; 	U+02AB9 	⪹ 
prnsim; 	U+022E8 	⋨ 
prod; 	U+0220F 	∏ 
profalar; 	U+0232E 	⌮ 
profline; 	U+02312 	⌒ 
profsurf; 	U+02313 	⌓ 
prop; 	U+0221D 	∝ 
propto; 	U+0221D 	∝ 
prsim; 	U+0227E 	≾ 
prurel; 	U+022B0 	⊰ 
pscr; 	U+1D4C5 	𝓅 
psi; 	U+003C8 	ψ 
puncsp; 	U+02008 	  
qfr; 	U+1D52E 	𝔮 
qint; 	U+02A0C 	⨌ 
qopf; 	U+1D562 	𝕢 
qprime; 	U+02057 	⁗ 
qscr; 	U+1D4C6 	𝓆 
quaternions; 	U+0210D 	ℍ 
quatint; 	U+02A16 	⨖ 
quest; 	U+0003F 	? 
questeq; 	U+0225F 	≟ 
quot; 	U+00022 	" 
rAarr; 	U+021DB 	⇛ 
rArr; 	U+021D2 	⇒ 
rAtail; 	U+0291C 	⤜ 
rBarr; 	U+0290F 	⤏ 
rHar; 	U+02964 	⥤ 
race; 	U+0223D U+00331 	∽̱ 
racute; 	U+00155 	ŕ 
radic; 	U+0221A 	√ 
raemptyv; 	U+029B3 	⦳ 
rang; 	U+027E9 	〉 
rangd; 	U+02992 	⦒ 
range; 	U+029A5 	⦥ 
rangle; 	U+027E9 	〉 
raquo; 	U+000BB 	» 
rarr; 	U+02192 	→ 
rarrap; 	U+02975 	⥵ 
rarrb; 	U+021E5 	⇥ 
rarrbfs; 	U+02920 	⤠ 
rarrc; 	U+02933 	⤳ 
rarrfs; 	U+0291E 	⤞ 
rarrhk; 	U+021AA 	↪ 
rarrlp; 	U+021AC 	↬ 
rarrpl; 	U+02945 	⥅ 
rarrsim; 	U+02974 	⥴ 
rarrtl; 	U+021A3 	↣ 
rarrw; 	U+0219D 	↝ 
ratail; 	U+0291A 	⤚ 
ratio; 	U+02236 	∶ 
rationals; 	U+0211A 	ℚ 
rbarr; 	U+0290D 	⤍ 
rbbrk; 	U+02773 	❳ 
rbrace; 	U+0007D 	} 
rbrack; 	U+0005D 	] 
rbrke; 	U+0298C 	⦌ 
rbrksld; 	U+0298E 	⦎ 
rbrkslu; 	U+02990 	⦐ 
rcaron; 	U+00159 	ř 
rcedil; 	U+00157 	ŗ 
rceil; 	U+02309 	⌉ 
rcub; 	U+0007D 	} 
rcy; 	U+00440 	р 
rdca; 	U+02937 	⤷ 
rdldhar; 	U+02969 	⥩ 
rdquo; 	U+0201D 	” 
rdquor; 	U+0201D 	” 
rdsh; 	U+021B3 	↳ 
real; 	U+0211C 	ℜ 
realine; 	U+0211B 	ℛ 
realpart; 	U+0211C 	ℜ 
reals; 	U+0211D 	ℝ 
rect; 	U+025AD 	▭ 
reg; 	U+000AE 	® 
rfisht; 	U+0297D 	⥽ 
rfloor; 	U+0230B 	⌋ 
rfr; 	U+1D52F 	𝔯 
rhard; 	U+021C1 	⇁ 
rharu; 	U+021C0 	⇀ 
rharul; 	U+0296C 	⥬ 
rho; 	U+003C1 	ρ 
rhov; 	U+003F1 	ϱ 
rightarrow; 	U+02192 	→ 
rightarrowtail; 	U+021A3 	↣ 
rightharpoondown; 	U+021C1 	⇁ 
rightharpoonup; 	U+021C0 	⇀ 
rightleftarrows; 	U+021C4 	⇄ 
rightleftharpoons; 	U+021CC 	⇌ 
rightrightarrows; 	U+021C9 	⇉ 
rightsquigarrow; 	U+0219D 	↝ 
rightthreetimes; 	U+022CC 	⋌ 
ring; 	U+002DA 	˚ 
risingdotseq; 	U+02253 	≓ 
rlarr; 	U+021C4 	⇄ 
rlhar; 	U+021CC 	⇌ 
rlm; 	U+0200F 	‏ 
rmoust; 	U+023B1 	⎱ 
rmoustache; 	U+023B1 	⎱ 
rnmid; 	U+02AEE 	⫮ 
roang; 	U+027ED 	⟭ 
roarr; 	U+021FE 	⇾ 
robrk; 	U+027E7 	⟧ 
ropar; 	U+02986 	⦆ 
ropf; 	U+1D563 	𝕣 
roplus; 	U+02A2E 	⨮ 
rotimes; 	U+02A35 	⨵ 
rpar; 	U+00029 	) 
rpargt; 	U+02994 	⦔ 
rppolint; 	U+02A12 	⨒ 
rrarr; 	U+021C9 	⇉ 
rsaquo; 	U+0203A 	› 
rscr; 	U+1D4C7 	𝓇 
rsh; 	U+021B1 	↱ 
rsqb; 	U+0005D 	] 
rsquo; 	U+02019 	’ 
rsquor; 	U+02019 	’ 
rthree; 	U+022CC 	⋌ 
rtimes; 	U+022CA 	⋊ 
rtri; 	U+025B9 	▹ 
rtrie; 	U+022B5 	⊵ 
rtrif; 	U+025B8 	▸ 
rtriltri; 	U+029CE 	⧎ 
ruluhar; 	U+02968 	⥨ 
rx; 	U+0211E 	℞ 
sacute; 	U+0015B 	ś 
sbquo; 	U+0201A 	‚ 
sc; 	U+0227B 	≻ 
scE; 	U+02AB4 	⪴ 
scap; 	U+02AB8 	⪸ 
scaron; 	U+00161 	š 
sccue; 	U+0227D 	≽ 
sce; 	U+02AB0 	⪰ 
scedil; 	U+0015F 	ş 
scirc; 	U+0015D 	ŝ 
scnE; 	U+02AB6 	⪶ 
scnap; 	U+02ABA 	⪺ 
scnsim; 	U+022E9 	⋩ 
scpolint; 	U+02A13 	⨓ 
scsim; 	U+0227F 	≿ 
scy; 	U+00441 	с 
sdot; 	U+022C5 	⋅ 
sdotb; 	U+022A1 	⊡ 
sdote; 	U+02A66 	⩦ 
seArr; 	U+021D8 	⇘ 
searhk; 	U+02925 	⤥ 
searr; 	U+02198 	↘ 
searrow; 	U+02198 	↘ 
sect; 	U+000A7 	§ 
semi; 	U+0003B 	; 
seswar; 	U+02929 	⤩ 
setminus; 	U+02216 	∖ 
setmn; 	U+02216 	∖ 
sext; 	U+02736 	✶ 
sfr; 	U+1D530 	𝔰 
sfrown; 	U+02322 	⌢ 
sharp; 	U+0266F 	♯ 
shchcy; 	U+00449 	щ 
shcy; 	U+00448 	ш 
shortmid; 	U+02223 	∣ 
shortparallel; 	U+02225 	∥ 
shy; 	U+000AD 	
sigma; 	U+003C3 	σ 
sigmaf; 	U+003C2 	ς 
sigmav; 	U+003C2 	ς 
sim; 	U+0223C 	∼ 
simdot; 	U+02A6A 	⩪ 
sime; 	U+02243 	≃ 
simeq; 	U+02243 	≃ 
simg; 	U+02A9E 	⪞ 
simgE; 	U+02AA0 	⪠ 
siml; 	U+02A9D 	⪝ 
simlE; 	U+02A9F 	⪟ 
simne; 	U+02246 	≆ 
simplus; 	U+02A24 	⨤ 
simrarr; 	U+02972 	⥲ 
slarr; 	U+02190 	← 
smallsetminus; 	U+02216 	∖ 
smashp; 	U+02A33 	⨳ 
smeparsl; 	U+029E4 	⧤ 
smid; 	U+02223 	∣ 
smile; 	U+02323 	⌣ 
smt; 	U+02AAA 	⪪ 
smte; 	U+02AAC 	⪬ 
smtes; 	U+02AAC U+0FE00 	⪬︀ 
softcy; 	U+0044C 	ь 
sol; 	U+0002F 	/ 
solb; 	U+029C4 	⧄ 
solbar; 	U+0233F 	⌿ 
sopf; 	U+1D564 	𝕤 
spades; 	U+02660 	♠ 
spadesuit; 	U+02660 	♠ 
spar; 	U+02225 	∥ 
sqcap; 	U+02293 	⊓ 
sqcaps; 	U+02293 U+0FE00 	⊓︀ 
sqcup; 	U+02294 	⊔ 
sqcups; 	U+02294 U+0FE00 	⊔︀ 
sqsub; 	U+0228F 	⊏ 
sqsube; 	U+02291 	⊑ 
sqsubset; 	U+0228F 	⊏ 
sqsubseteq; 	U+02291 	⊑ 
sqsup; 	U+02290 	⊐ 
sqsupe; 	U+02292 	⊒ 
sqsupset; 	U+02290 	⊐ 
sqsupseteq; 	U+02292 	⊒ 
squ; 	U+025A1 	□ 
square; 	U+025A1 	□ 
squarf; 	U+025AA 	▪ 
squf; 	U+025AA 	▪ 
srarr; 	U+02192 	→ 
sscr; 	U+1D4C8 	𝓈 
ssetmn; 	U+02216 	∖ 
ssmile; 	U+02323 	⌣ 
sstarf; 	U+022C6 	⋆ 
star; 	U+02606 	☆ 
starf; 	U+02605 	★ 
straightepsilon; 	U+003F5 	ϵ 
straightphi; 	U+003D5 	ϕ 
strns; 	U+000AF 	¯ 
sub; 	U+02282 	⊂ 
subE; 	U+02AC5 	⫅ 
subdot; 	U+02ABD 	⪽ 
sube; 	U+02286 	⊆ 
subedot; 	U+02AC3 	⫃ 
submult; 	U+02AC1 	⫁ 
subnE; 	U+02ACB 	⫋ 
subne; 	U+0228A 	⊊ 
subplus; 	U+02ABF 	⪿ 
subrarr; 	U+02979 	⥹ 
subset; 	U+02282 	⊂ 
subseteq; 	U+02286 	⊆ 
subseteqq; 	U+02AC5 	⫅ 
subsetneq; 	U+0228A 	⊊ 
subsetneqq; 	U+02ACB 	⫋ 
subsim; 	U+02AC7 	⫇ 
subsub; 	U+02AD5 	⫕ 
subsup; 	U+02AD3 	⫓ 
succ; 	U+0227B 	≻ 
succapprox; 	U+02AB8 	⪸ 
succcurlyeq; 	U+0227D 	≽ 
succeq; 	U+02AB0 	⪰ 
succnapprox; 	U+02ABA 	⪺ 
succneqq; 	U+02AB6 	⪶ 
succnsim; 	U+022E9 	⋩ 
succsim; 	U+0227F 	≿ 
sum; 	U+02211 	∑ 
sung; 	U+0266A 	♪ 
sup; 	U+02283 	⊃ 
sup1; 	U+000B9 	¹ 
sup2; 	U+000B2 	² 
sup3; 	U+000B3 	³ 
supE; 	U+02AC6 	⫆ 
supdot; 	U+02ABE 	⪾ 
supdsub; 	U+02AD8 	⫘ 
supe; 	U+02287 	⊇ 
supedot; 	U+02AC4 	⫄ 
suphsol; 	U+027C9 	⟉ 
suphsub; 	U+02AD7 	⫗ 
suplarr; 	U+0297B 	⥻ 
supmult; 	U+02AC2 	⫂ 
supnE; 	U+02ACC 	⫌ 
supne; 	U+0228B 	⊋ 
supplus; 	U+02AC0 	⫀ 
supset; 	U+02283 	⊃ 
supseteq; 	U+02287 	⊇ 
supseteqq; 	U+02AC6 	⫆ 
supsetneq; 	U+0228B 	⊋ 
supsetneqq; 	U+02ACC 	⫌ 
supsim; 	U+02AC8 	⫈ 
supsub; 	U+02AD4 	⫔ 
supsup; 	U+02AD6 	⫖ 
swArr; 	U+021D9 	⇙ 
swarhk; 	U+02926 	⤦ 
swarr; 	U+02199 	↙ 
swarrow; 	U+02199 	↙ 
swnwar; 	U+0292A 	⤪ 
szlig; 	U+000DF 	ß 
target; 	U+02316 	⌖ 
tau; 	U+003C4 	τ 
tbrk; 	U+023B4 	⎴ 
tcaron; 	U+00165 	ť 
tcedil; 	U+00163 	ţ 
tcy; 	U+00442 	т 
tdot; 	U+020DB 	◌⃛ 
telrec; 	U+02315 	⌕ 
tfr; 	U+1D531 	𝔱 
there4; 	U+02234 	∴ 
therefore; 	U+02234 	∴ 
theta; 	U+003B8 	θ 
thetasym; 	U+003D1 	ϑ 
thetav; 	U+003D1 	ϑ 
thickapprox; 	U+02248 	≈ 
thicksim; 	U+0223C 	∼ 
thinsp; 	U+02009 	  
thkap; 	U+02248 	≈ 
thksim; 	U+0223C 	∼ 
thorn; 	U+000FE 	þ 
tilde; 	U+002DC 	˜ 
times; 	U+000D7 	× 
timesb; 	U+022A0 	⊠ 
timesbar; 	U+02A31 	⨱ 
timesd; 	U+02A30 	⨰ 
tint; 	U+0222D 	∭ 
toea; 	U+02928 	⤨ 
top; 	U+022A4 	⊤ 
topbot; 	U+02336 	⌶ 
topcir; 	U+02AF1 	⫱ 
topf; 	U+1D565 	𝕥 
topfork; 	U+02ADA 	⫚ 
tosa; 	U+02929 	⤩ 
tprime; 	U+02034 	‴ 
trade; 	U+02122 	™ 
triangle; 	U+025B5 	▵ 
triangledown; 	U+025BF 	▿ 
triangleleft; 	U+025C3 	◃ 
trianglelefteq; 	U+022B4 	⊴ 
triangleq; 	U+0225C 	≜ 
triangleright; 	U+025B9 	▹ 
trianglerighteq; 	U+022B5 	⊵ 
tridot; 	U+025EC 	◬ 
trie; 	U+0225C 	≜ 
triminus; 	U+02A3A 	⨺ 
triplus; 	U+02A39 	⨹ 
trisb; 	U+029CD 	⧍ 
tritime; 	U+02A3B 	⨻ 
trpezium; 	U+023E2 	⏢ 
tscr; 	U+1D4C9 	𝓉 
tscy; 	U+00446 	ц 
tshcy; 	U+0045B 	ћ 
tstrok; 	U+00167 	ŧ 
twixt; 	U+0226C 	≬ 
twoheadleftarrow; 	U+0219E 	↞ 
twoheadrightarrow; 	U+021A0 	↠ 
uArr; 	U+021D1 	⇑ 
uHar; 	U+02963 	⥣ 
uacute; 	U+000FA 	ú 
uarr; 	U+02191 	↑ 
ubrcy; 	U+0045E 	ў 
ubreve; 	U+0016D 	ŭ 
ucirc; 	U+000FB 	û 
ucy; 	U+00443 	у 
udarr; 	U+021C5 	⇅ 
udblac; 	U+00171 	ű 
udhar; 	U+0296E 	⥮ 
ufisht; 	U+0297E 	⥾ 
ufr; 	U+1D532 	𝔲 
ugrave; 	U+000F9 	ù 
uharl; 	U+021BF 	↿ 
uharr; 	U+021BE 	↾ 
uhblk; 	U+02580 	▀ 
ulcorn; 	U+0231C 	⌜ 
ulcorner; 	U+0231C 	⌜ 
ulcrop; 	U+0230F 	⌏ 
ultri; 	U+025F8 	◸ 
umacr; 	U+0016B 	ū 
uml; 	U+000A8 	¨ 
uogon; 	U+00173 	ų 
uopf; 	U+1D566 	𝕦 
uparrow; 	U+02191 	↑ 
updownarrow; 	U+02195 	↕ 
upharpoonleft; 	U+021BF 	↿ 
upharpoonright; 	U+021BE 	↾ 
uplus; 	U+0228E 	⊎ 
upsi; 	U+003C5 	υ 
upsih; 	U+003D2 	ϒ 
upsilon; 	U+003C5 	υ 
upuparrows; 	U+021C8 	⇈ 
urcorn; 	U+0231D 	⌝ 
urcorner; 	U+0231D 	⌝ 
urcrop; 	U+0230E 	⌎ 
uring; 	U+0016F 	ů 
urtri; 	U+025F9 	◹ 
uscr; 	U+1D4CA 	𝓊 
utdot; 	U+022F0 	⋰ 
utilde; 	U+00169 	ũ 
utri; 	U+025B5 	▵ 
utrif; 	U+025B4 	▴ 
uuarr; 	U+021C8 	⇈ 
uuml; 	U+000FC 	ü 
uwangle; 	U+029A7 	⦧ 
vArr; 	U+021D5 	⇕ 
vBar; 	U+02AE8 	⫨ 
vBarv; 	U+02AE9 	⫩ 
vDash; 	U+022A8 	⊨ 
vangrt; 	U+0299C 	⦜ 
varepsilon; 	U+003F5 	ϵ 
varkappa; 	U+003F0 	ϰ 
varnothing; 	U+02205 	∅ 
varphi; 	U+003D5 	ϕ 
varpi; 	U+003D6 	ϖ 
varpropto; 	U+0221D 	∝ 
varr; 	U+02195 	↕ 
varrho; 	U+003F1 	ϱ 
varsigma; 	U+003C2 	ς 
varsubsetneq; 	U+0228A U+0FE00 	⊊︀ 
varsubsetneqq; 	U+02ACB U+0FE00 	⫋︀ 
varsupsetneq; 	U+0228B U+0FE00 	⊋︀ 
varsupsetneqq; 	U+02ACC U+0FE00 	⫌︀ 
vartheta; 	U+003D1 	ϑ 
vartriangleleft; 	U+022B2 	⊲ 
vartriangleright; 	U+022B3 	⊳ 
vcy; 	U+00432 	в 
vdash; 	U+022A2 	⊢ 
vee; 	U+02228 	∨ 
veebar; 	U+022BB 	⊻ 
veeeq; 	U+0225A 	≚ 
vellip; 	U+022EE 	⋮ 
verbar; 	U+0007C 	| 
vert; 	U+0007C 	| 
vfr; 	U+1D533 	𝔳 
vltri; 	U+022B2 	⊲ 
vnsub; 	U+02282 U+020D2 	⊂⃒ 
vnsup; 	U+02283 U+020D2 	⊃⃒ 
vopf; 	U+1D567 	𝕧 
vprop; 	U+0221D 	∝ 
vrtri; 	U+022B3 	⊳ 
vscr; 	U+1D4CB 	𝓋 
vsubnE; 	U+02ACB U+0FE00 	⫋︀ 
vsubne; 	U+0228A U+0FE00 	⊊︀ 
vsupnE; 	U+02ACC U+0FE00 	⫌︀ 
vsupne; 	U+0228B U+0FE00 	⊋︀ 
vzigzag; 	U+0299A 	⦚ 
wcirc; 	U+00175 	ŵ 
wedbar; 	U+02A5F 	⩟ 
wedge; 	U+02227 	∧ 
wedgeq; 	U+02259 	≙ 
weierp; 	U+02118 	℘ 
wfr; 	U+1D534 	𝔴 
wopf; 	U+1D568 	𝕨 
wp; 	U+02118 	℘ 
wr; 	U+02240 	≀ 
wreath; 	U+02240 	≀ 
wscr; 	U+1D4CC 	𝓌 
xcap; 	U+022C2 	⋂ 
xcirc; 	U+025EF 	◯ 
xcup; 	U+022C3 	⋃ 
xdtri; 	U+025BD 	▽ 
xfr; 	U+1D535 	𝔵 
xhArr; 	U+027FA 	⟺ 
xharr; 	U+027F7 	⟷ 
xi; 	U+003BE 	ξ 
xlArr; 	U+027F8 	⟸ 
xlarr; 	U+027F5 	⟵ 
xmap; 	U+027FC 	⟼ 
xnis; 	U+022FB 	⋻ 
xodot; 	U+02A00 	⨀ 
xopf; 	U+1D569 	𝕩 
xoplus; 	U+02A01 	⨁ 
xotime; 	U+02A02 	⨂ 
xrArr; 	U+027F9 	⟹ 
xrarr; 	U+027F6 	⟶ 
xscr; 	U+1D4CD 	𝓍 
xsqcup; 	U+02A06 	⨆ 
xuplus; 	U+02A04 	⨄ 
xutri; 	U+025B3 	△ 
xvee; 	U+022C1 	⋁ 
xwedge; 	U+022C0 	⋀ 
yacute; 	U+000FD 	ý 
yacy; 	U+0044F 	я 
ycirc; 	U+00177 	ŷ 
ycy; 	U+0044B 	ы 
yen; 	U+000A5 	¥ 
yfr; 	U+1D536 	𝔶 
yicy; 	U+00457 	ї 
yopf; 	U+1D56A 	𝕪 
yscr; 	U+1D4CE 	𝓎 
yucy; 	U+0044E 	ю 
yuml; 	U+000FF 	ÿ 
zacute; 	U+0017A 	ź 
zcaron; 	U+0017E 	ž 
zcy; 	U+00437 	з 
zdot; 	U+0017C 	ż 
zeetrf; 	U+02128 	ℨ 
zeta; 	U+003B6 	ζ 
zfr; 	U+1D537 	𝔷 
zhcy; 	U+00436 	ж 
zigrarr; 	U+021DD 	⇝ 
zopf; 	U+1D56B 	𝕫 
zscr; 	U+1D4CF 	𝓏 
zwj; 	U+0200D 	‍ 
zwnj; 	U+0200C 	‌ 
AElig 	U+000C6 	Æ 
AMP 	U+00026 	& 
Aacute 	U+000C1 	Á 
Acirc 	U+000C2 	Â 
Agrave 	U+000C0 	À 
Aring 	U+000C5 	Å 
Atilde 	U+000C3 	Ã 
Auml 	U+000C4 	Ä 
COPY 	U+000A9 	© 
Ccedil 	U+000C7 	Ç 
ETH 	U+000D0 	Ð 
Eacute 	U+000C9 	É 
Ecirc 	U+000CA 	Ê 
Egrave 	U+000C8 	È 
Euml 	U+000CB 	Ë 
GT 	U+0003E 	> 
Iacute 	U+000CD 	Í 
Icirc 	U+000CE 	Î 
Igrave 	U+000CC 	Ì 
Iuml 	U+000CF 	Ï 
LT 	U+0003C 	< 
Ntilde 	U+000D1 	Ñ 
Oacute 	U+000D3 	Ó 
Ocirc 	U+000D4 	Ô 
Ograve 	U+000D2 	Ò 
Oslash 	U+000D8 	Ø 
Otilde 	U+000D5 	Õ 
Ouml 	U+000D6 	Ö 
QUOT 	U+00022 	" 
REG 	U+000AE 	® 
THORN 	U+000DE 	Þ 
Uacute 	U+000DA 	Ú 
Ucirc 	U+000DB 	Û 
Ugrave 	U+000D9 	Ù 
Uuml 	U+000DC 	Ü 
Yacute 	U+000DD 	Ý 
aacute 	U+000E1 	á 
acirc 	U+000E2 	â 
acute 	U+000B4 	´ 
aelig 	U+000E6 	æ 
agrave 	U+000E0 	à 
amp 	U+00026 	& 
aring 	U+000E5 	å 
atilde 	U+000E3 	ã 
auml 	U+000E4 	ä 
brvbar 	U+000A6 	¦ 
ccedil 	U+000E7 	ç 
cedil 	U+000B8 	¸ 
cent 	U+000A2 	¢ 
copy 	U+000A9 	© 
curren 	U+000A4 	¤ 
deg 	U+000B0 	° 
divide 	U+000F7 	÷ 
eacute 	U+000E9 	é 
ecirc 	U+000EA 	ê 
egrave 	U+000E8 	è 
eth 	U+000F0 	ð 
euml 	U+000EB 	ë 
frac12 	U+000BD 	½ 
frac14 	U+000BC 	¼ 
frac34 	U+000BE 	¾ 
gt 	U+0003E 	> 
iacute 	U+000ED 	í 
icirc 	U+000EE 	î 
iexcl 	U+000A1 	¡ 
igrave 	U+000EC 	ì 
iquest 	U+000BF 	¿ 
iuml 	U+000EF 	ï 
laquo 	U+000AB 	« 
lt 	U+0003C 	< 
macr 	U+000AF 	¯ 
micro 	U+000B5 	µ 
middot 	U+000B7 	· 
nbsp 	U+000A0 	  
not 	U+000AC 	¬ 
ntilde 	U+000F1 	ñ 
oacute 	U+000F3 	ó 
ocirc 	U+000F4 	ô 
ograve 	U+000F2 	ò 
ordf 	U+000AA 	ª 
ordm 	U+000BA 	º 
oslash 	U+000F8 	ø 
otilde 	U+000F5 	õ 
ouml 	U+000F6 	ö 
para 	U+000B6 	¶ 
plusmn 	U+000B1 	± 
pound 	U+000A3 	£ 
quot 	U+00022 	" 
raquo 	U+000BB 	» 
reg 	U+000AE 	® 
sect 	U+000A7 	§ 
shy 	U+000AD 	
sup1 	U+000B9 	¹ 
sup2 	U+000B2 	² 
sup3 	U+000B3 	³ 
szlig 	U+000DF 	ß 
thorn 	U+000FE 	þ 
times 	U+000D7 	× 
uacute 	U+000FA 	ú 
ucirc 	U+000FB 	û 
ugrave 	U+000F9 	ù 
uml 	U+000A8 	¨ 
uuml 	U+000FC 	ü 
yacute 	U+000FD 	ý 
yen 	U+000A5 	¥ 
yuml 	U+000FF 
