XHTML/MathML Entities Test

Latin-1 Characters (xhtml-lat1.ent)
Special Characters (xhtml-special.ent)
Symbols (xhtml-symbol.ent)
MathML Entities

Latin-1 Characters (xhtml-lat1.ent)

decimal	hexadecimal	entity name	&#nnn;	&#xhhh;	&entity;
160	A0	nbsp
161	A1	iexcl	¡	¡	¡
162	A2	cent	¢	¢	¢
163	A3	pound	£	£	£
164	A4	curren	¤	¤	¤
165	A5	yen	¥	¥	¥
166	A6	brvbar	¦	¦	¦
167	A7	sect	§	§	§
168	A8	uml	¨	¨	¨
169	A9	copy	©	©	©
170	AA	ordf	ª	ª	ª
171	AB	laquo	«	«	«
172	AC	not	¬	¬	¬
173	AD	shy
174	AE	reg	®	®	®
175	AF	macr	¯	¯	¯
176	B0	deg	°	°	°
177	B1	plusmn	±	±	±
178	B2	sup2	²	²	²
179	B3	sup3	³	³	³
180	B4	acute	´	´	´
181	B5	micro	µ	µ	µ
182	B6	para	¶	¶	¶
183	B7	middot	·	·	·
184	B8	cedil	¸	¸	¸
185	B9	sup1	¹	¹	¹
186	BA	ordm	º	º	º
187	BB	raquo	»	»	»
188	BC	frac14	¼	¼	¼
189	BD	frac12	½	½	½
190	BE	frac34	¾	¾	¾
191	BF	iquest	¿	¿	¿
192	C0	Agrave	À	À	À
193	C1	Aacute	Á	Á	Á
194	C2	Acirc	Â	Â	Â
195	C3	Atilde	Ã	Ã	Ã
196	C4	Auml	Ä	Ä	Ä
197	C5	Aring	Å	Å	Å
198	C6	AElig	Æ	Æ	Æ
199	C7	Ccedil	Ç	Ç	Ç
200	C8	Egrave	È	È	È
201	C9	Eacute	É	É	É
202	CA	Ecirc	Ê	Ê	Ê
203	CB	Euml	Ë	Ë	Ë
204	CC	Igrave	Ì	Ì	Ì
205	CD	Iacute	Í	Í	Í
206	CE	Icirc	Î	Î	Î
207	CF	Iuml	Ï	Ï	Ï
208	D0	ETH	Ð	Ð	Ð
209	D1	Ntilde	Ñ	Ñ	Ñ
210	D2	Ograve	Ò	Ò	Ò
211	D3	Oacute	Ó	Ó	Ó
212	D4	Ocirc	Ô	Ô	Ô
213	D5	Otilde	Õ	Õ	Õ
214	D6	Ouml	Ö	Ö	Ö
215	D7	times	×	×	×
216	D8	Oslash	Ø	Ø	Ø
217	D9	Ugrave	Ù	Ù	Ù
218	DA	Uacute	Ú	Ú	Ú
219	DB	Ucirc	Û	Û	Û
220	DC	Uuml	Ü	Ü	Ü
221	DD	Yacute	Ý	Ý	Ý
222	DE	THORN	Þ	Þ	Þ
223	DF	szlig	ß	ß	ß
224	E0	agrave	à	à	à
225	E1	aacute	á	á	á
226	E2	acirc	â	â	â
227	E3	atilde	ã	ã	ã
228	E4	auml	ä	ä	ä
229	E5	aring	å	å	å
230	E6	aelig	æ	æ	æ
231	E7	ccedil	ç	ç	ç
232	E8	egrave	è	è	è
233	E9	eacute	é	é	é
234	EA	ecirc	ê	ê	ê
235	EB	euml	ë	ë	ë
236	EC	igrave	ì	ì	ì
237	ED	iacute	í	í	í
238	EE	icirc	î	î	î
239	EF	iuml	ï	ï	ï
240	F0	eth	ð	ð	ð
241	F1	ntilde	ñ	ñ	ñ
242	F2	ograve	ò	ò	ò
243	F3	oacute	ó	ó	ó
244	F4	ocirc	ô	ô	ô
245	F5	otilde	õ	õ	õ
246	F6	ouml	ö	ö	ö
247	F7	divide	÷	÷	÷
248	F8	oslash	ø	ø	ø
249	F9	ugrave	ù	ù	ù
250	FA	uacute	ú	ú	ú
251	FB	ucirc	û	û	û
252	FC	uuml	ü	ü	ü
253	FD	yacute	ý	ý	ý
254	FE	thorn	þ	þ	þ
255	FF	yuml	ÿ	ÿ	ÿ

Special Characters (xhtml-special.ent)

decimal	hexadecimal	entity name	&#nnn;	&#xhhh;	&entity;
34	22	quot	"	"	"
38	26	amp	&	&	&
60	3C	lt	<	<	<
62	3E	gt	>	>	>
39	27	apos	'	'	'
338	152	OElig	Œ	Œ	Œ
339	153	oelig	œ	œ	œ
352	160	Scaron	Š	Š	Š
353	161	scaron	š	š	š
376	178	Yuml	Ÿ	Ÿ	Ÿ
710	2C6	circ	ˆ	ˆ	ˆ
732	2DC	tilde	˜	˜	˜
8194	2002	ensp
8195	2003	emsp
8201	2009	thinsp
8204	200C	zwnj	‌	‌	‌
8205	200D	zwj	‍	‍	‍
8206	200E	lrm	‎	‎	‎
8207	200F	rlm	‏	‏	‏
8211	2013	ndash	–	–	–
8212	2014	mdash	—	—	—
8216	2018	lsquo	‘	‘	‘
8217	2019	rsquo	’	’	’
8218	201A	sbquo	‚	‚	‚
8220	201C	ldquo	“	“	“
8221	201D	rdquo	”	”	”
8222	201E	bdquo	„	„	„
8224	2020	dagger	†	†	†
8225	2021	Dagger	‡	‡	‡
8240	2030	permil	‰	‰	‰
8249	2039	lsaquo	‹	‹	‹
8250	203A	rsaquo	›	›	›
8364	20AC	euro	€	€	€

Symbols (xhtml-symbol.ent)

decimal	hexadecimal	entity name	&#nnn;	&#xhhh;	&entity;
402	192	fnof	ƒ	ƒ	ƒ
913	391	Alpha	Α	Α	Α
914	392	Beta	Β	Β	Β
915	393	Gamma	Γ	Γ	Γ
916	394	Delta	Δ	Δ	Δ
917	395	Epsilon	Ε	Ε	Ε
918	396	Zeta	Ζ	Ζ	Ζ
919	397	Eta	Η	Η	Η
920	398	Theta	Θ	Θ	Θ
921	399	Iota	Ι	Ι	Ι
922	39A	Kappa	Κ	Κ	Κ
923	39B	Lambda	Λ	Λ	Λ
924	39C	Mu	Μ	Μ	Μ
925	39D	Nu	Ν	Ν	Ν
926	39E	Xi	Ξ	Ξ	Ξ
927	39F	Omicron	Ο	Ο	Ο
928	3A0	Pi	Π	Π	Π
929	3A1	Rho	Ρ	Ρ	Ρ
931	3A3	Sigma	Σ	Σ	Σ
932	3A4	Tau	Τ	Τ	Τ
933	3A5	Upsilon	Υ	Υ	Υ
934	3A6	Phi	Φ	Φ	Φ
935	3A7	Chi	Χ	Χ	Χ
936	3A8	Psi	Ψ	Ψ	Ψ
937	3A9	Omega	Ω	Ω	Ω
945	3B1	alpha	α	α	α
946	3B2	beta	β	β	β
947	3B3	gamma	γ	γ	γ
948	3B4	delta	δ	δ	δ
949	3B5	epsilon	ε	ε	ε
950	3B6	zeta	ζ	ζ	ζ
951	3B7	eta	η	η	η
952	3B8	theta	θ	θ	θ
953	3B9	iota	ι	ι	ι
954	3BA	kappa	κ	κ	κ
955	3BB	lambda	λ	λ	λ
956	3BC	mu	μ	μ	μ
957	3BD	nu	ν	ν	ν
958	3BE	xi	ξ	ξ	ξ
959	3BF	omicron	ο	ο	ο
960	3C0	pi	π	π	π
961	3C1	rho	ρ	ρ	ρ
962	3C2	sigmaf	ς	ς	ς
963	3C3	sigma	σ	σ	σ
964	3C4	tau	τ	τ	τ
965	3C5	upsilon	υ	υ	υ
966	3C6	phi	φ	φ	φ
967	3C7	chi	χ	χ	χ
968	3C8	psi	ψ	ψ	ψ
969	3C9	omega	ω	ω	ω
977	3D1	thetasym	ϑ	ϑ	ϑ
978	3D2	upsih	ϒ	ϒ	ϒ
982	3D6	piv	ϖ	ϖ	ϖ
8226	2022	bull	•	•	•
8230	2026	hellip	…	…	…
8242	2032	prime	′	′	′
8243	2033	Prime	″	″	″
8254	203E	oline	‾	‾	‾
8260	2044	frasl	⁄	⁄	⁄
8472	2118	weierp	℘	℘	℘
8465	2111	image	ℑ	ℑ	ℑ
8476	211C	real	ℜ	ℜ	ℜ
8482	2122	trade	™	™	™
8501	2135	alefsym	ℵ	ℵ	ℵ
8592	2190	larr	←	←	←
8593	2191	uarr	↑	↑	↑
8594	2192	rarr	→	→	→
8595	2193	darr	↓	↓	↓
8596	2194	harr	↔	↔	↔
8629	21B5	crarr	↵	↵	↵
8656	21D0	lArr	⇐	⇐	⇐
8657	21D1	uArr	⇑	⇑	⇑
8658	21D2	rArr	⇒	⇒	⇒
8659	21D3	dArr	⇓	⇓	⇓
8660	21D4	hArr	⇔	⇔	⇔
8704	2200	forall	∀	∀	∀
8706	2202	part	∂	∂	∂
8707	2203	exist	∃	∃	∃
8709	2205	empty	∅	∅	∅
8711	2207	nabla	∇	∇	∇
8712	2208	isin	∈	∈	∈
8713	2209	notin	∉	∉	∉
8715	220B	ni	∋	∋	∋
8719	220F	prod	∏	∏	∏
8721	2211	sum	∑	∑	∑
8722	2212	minus	−	−	−
8727	2217	lowast	∗	∗	∗
8730	221A	radic	√	√	√
8733	221D	prop	∝	∝	∝
8734	221E	infin	∞	∞	∞
8736	2220	ang	∠	∠	∠
8743	2227	and	∧	∧	∧
8744	2228	or	∨	∨	∨
8745	2229	cap	∩	∩	∩
8746	222A	cup	∪	∪	∪
8747	222B	int	∫	∫	∫
8756	2234	there4	∴	∴	∴
8764	223C	sim	∼	∼	∼
8773	2245	cong	≅	≅	≅
8776	2248	asymp	≈	≈	≈
8800	2260	ne	≠	≠	≠
8801	2261	equiv	≡	≡	≡
8804	2264	le	≤	≤	≤
8805	2265	ge	≥	≥	≥
8834	2282	sub	⊂	⊂	⊂
8835	2283	sup	⊃	⊃	⊃
8836	2284	nsub	⊄	⊄	⊄
8838	2286	sube	⊆	⊆	⊆
8839	2287	supe	⊇	⊇	⊇
8853	2295	oplus	⊕	⊕	⊕
8855	2297	otimes	⊗	⊗	⊗
8869	22A5	perp	⊥	⊥	⊥
8901	22C5	sdot	⋅	⋅	⋅
8968	2308	lceil	⌈	⌈	⌈
8969	2309	rceil	⌉	⌉	⌉
8970	230A	lfloor	⌊	⌊	⌊
8971	230B	rfloor	⌋	⌋	⌋
9001	2329	lang	〈	〈	⟨
9002	232A	rang	〉	〉	⟩
9674	25CA	loz	◊	◊	◊
9824	2660	spades	♠	♠	♠
9827	2663	clubs	♣	♣	♣
9829	2665	hearts	♥	♥	♥
9830	2666	diams	♦	♦	♦

MathML Entities

decimal	hexadecimal	entity name	&#nnn;	&#xhhh;	&entity;
198	000C6	AElig	Æ	Æ	Æ
193	000C1	Aacute	Á	Á	Á
258	00102	Abreve	Ă	Ă	Ă
194	000C2	Acirc	Â	Â	Â
1040	00410	Acy	А	А	А
120068	1D504	Afr	𝔄	𝔄	𝔄
192	000C0	Agrave	À	À	À
256	00100	Amacr	Ā	Ā	Ā
10835	02A53	And	⩓	⩓	⩓
260	00104	Aogon	Ą	Ą	Ą
120120	1D538	Aopf	𝔸	𝔸	𝔸
8289	02061	ApplyFunction	⁡	⁡	⁡
197	000C5	Aring	Å	Å	Å
119964	1D49C	Ascr	𝒜	𝒜	𝒜
8788	02254	Assign	≔	≔	≔
195	000C3	Atilde	Ã	Ã	Ã
196	000C4	Auml	Ä	Ä	Ä
8726	02216	Backslash	∖	∖	∖
10983	02AE7	Barv	⫧	⫧	⫧
8966	02306	Barwed	⌆	⌆	⌆
1041	00411	Bcy	Б	Б	Б
8757	02235	Because	∵	∵	∵
8492	0212C	Bernoullis	ℬ	ℬ	ℬ
120069	1D505	Bfr	𝔅	𝔅	𝔅
120121	1D539	Bopf	𝔹	𝔹	𝔹
728	002D8	Breve	˘	˘	˘
8492	0212C	Bscr	ℬ	ℬ	ℬ
8782	0224E	Bumpeq	≎	≎	≎
1063	00427	CHcy	Ч	Ч	Ч
262	00106	Cacute	Ć	Ć	Ć
8914	022D2	Cap	⋒	⋒	⋒
8517	02145	CapitalDifferentialD	ⅅ	ⅅ	ⅅ
8493	0212D	Cayleys	ℭ	ℭ	ℭ
268	0010C	Ccaron	Č	Č	Č
199	000C7	Ccedil	Ç	Ç	Ç
264	00108	Ccirc	Ĉ	Ĉ	Ĉ
8752	02230	Cconint	∰	∰	∰
266	0010A	Cdot	Ċ	Ċ	Ċ
184	000B8	Cedilla	¸	¸	¸
183	000B7	CenterDot	·	·	·
8493	0212D	Cfr	ℭ	ℭ	ℭ
8857	02299	CircleDot	⊙	⊙	⊙
8854	02296	CircleMinus	⊖	⊖	⊖
8853	02295	CirclePlus	⊕	⊕	⊕
8855	02297	CircleTimes	⊗	⊗	⊗
8754	02232	ClockwiseContourIntegral	∲	∲	∲
8221	0201D	CloseCurlyDoubleQuote	”	”	”
8217	02019	CloseCurlyQuote	’	’	’
8759	02237	Colon	∷	∷	∷
10868	02A74	Colone	⩴	⩴	⩴
8801	02261	Congruent	≡	≡	≡
8751	0222F	Conint	∯	∯	∯
8750	0222E	ContourIntegral	∮	∮	∮
8450	02102	Copf	ℂ	ℂ	ℂ
8720	02210	Coproduct	∐	∐	∐
8755	02233	CounterClockwiseContourIntegral	∳	∳	∳
10799	02A2F	Cross	⨯	⨯	⨯
119966	1D49E	Cscr	𝒞	𝒞	𝒞
8915	022D3	Cup	⋓	⋓	⋓
8781	0224D	CupCap	≍	≍	≍
8517	02145	DD	ⅅ	ⅅ	ⅅ
10513	02911	DDotrahd	⤑	⤑	⤑
1026	00402	DJcy	Ђ	Ђ	Ђ
1029	00405	DScy	Ѕ	Ѕ	Ѕ
1039	0040F	DZcy	Џ	Џ	Џ
8225	02021	Dagger	‡	‡	‡
8225	02021	Dagger	‡	‡	‡
8609	021A1	Darr	↡	↡	↡
10980	02AE4	Dashv	⫤	⫤	⫤
270	0010E	Dcaron	Ď	Ď	Ď
1044	00414	Dcy	Д	Д	Д
8711	02207	Del	∇	∇	∇
916	00394	Delta	Δ	Δ	Δ
120071	1D507	Dfr	𝔇	𝔇	𝔇
180	000B4	DiacriticalAcute	´	´	´
729	002D9	DiacriticalDot	˙	˙	˙
733	002DD	DiacriticalDoubleAcute	˝	˝	˝
96	00060	DiacriticalGrave	`	`	`
732	002DC	DiacriticalTilde	˜	˜	˜
8900	022C4	Diamond	⋄	⋄	⋄
8518	02146	DifferentialD	ⅆ	ⅆ	ⅆ
120123	1D53B	Dopf	𝔻	𝔻	𝔻
168	000A8	Dot	¨	¨	¨
8412	020DC	DotDot	⃜	⃜	⃜
8784	02250	DotEqual	≐	≐	≐
8751	0222F	DoubleContourIntegral	∯	∯	∯
168	000A8	DoubleDot	¨	¨	¨
8659	021D3	DoubleDownArrow	⇓	⇓	⇓
8656	021D0	DoubleLeftArrow	⇐	⇐	⇐
8660	021D4	DoubleLeftRightArrow	⇔	⇔	⇔
10980	02AE4	DoubleLeftTee	⫤	⫤	⫤
62841	0F579	DoubleLongLeftArrow			⟸
62843	0F57B	DoubleLongLeftRightArrow			⟺
62842	0F57A	DoubleLongRightArrow			⟹
8658	021D2	DoubleRightArrow	⇒	⇒	⇒
8872	022A8	DoubleRightTee	⊨	⊨	⊨
8657	021D1	DoubleUpArrow	⇑	⇑	⇑
8661	021D5	DoubleUpDownArrow	⇕	⇕	⇕
8741	02225	DoubleVerticalBar	∥	∥	∥
8595	02193	DownArrow	↓	↓	↓
10515	02913	DownArrowBar	⤓	⤓	⤓
8693	021F5	DownArrowUpArrow	⇵	⇵	⇵
785	00311	DownBreve	̑	̑	̑
10576	02950	DownLeftRightVector	⥐	⥐	⥐
10590	0295E	DownLeftTeeVector	⥞	⥞	⥞
8637	021BD	DownLeftVector	↽	↽	↽
10582	02956	DownLeftVectorBar	⥖	⥖	⥖
10591	0295F	DownRightTeeVector	⥟	⥟	⥟
8641	021C1	DownRightVector	⇁	⇁	⇁
10583	02957	DownRightVectorBar	⥗	⥗	⥗
8868	022A4	DownTee	⊤	⊤	⊤
8615	021A7	DownTeeArrow	↧	↧	↧
8659	021D3	Downarrow	⇓	⇓	⇓
119967	1D49F	Dscr	𝒟	𝒟	𝒟
272	00110	Dstrok	Đ	Đ	Đ
330	0014A	ENG	Ŋ	Ŋ	Ŋ
208	000D0	ETH	Ð	Ð	Ð
201	000C9	Eacute	É	É	É
282	0011A	Ecaron	Ě	Ě	Ě
202	000CA	Ecirc	Ê	Ê	Ê
1069	0042D	Ecy	Э	Э	Э
278	00116	Edot	Ė	Ė	Ė
120072	1D508	Efr	𝔈	𝔈	𝔈
200	000C8	Egrave	È	È	È
8712	02208	Element	∈	∈	∈
274	00112	Emacr	Ē	Ē	Ē
9725	025FD	EmptySmallSquare	◽	◽	◻
62876	0F59C	EmptyVerySmallSquare			▫
280	00118	Eogon	Ę	Ę	Ę
120124	1D53C	Eopf	𝔼	𝔼	𝔼
10869	02A75	Equal	⩵	⩵	⩵
8770	02242	EqualTilde	≂	≂	≂
8652	021CC	Equilibrium	⇌	⇌	⇌
8496	02130	Escr	ℰ	ℰ	ℰ
10867	02A73	Esim	⩳	⩳	⩳
203	000CB	Euml	Ë	Ë	Ë
8707	02203	Exists	∃	∃	∃
8519	02147	ExponentialE	ⅇ	ⅇ	ⅇ
1060	00424	Fcy	Ф	Ф	Ф
120073	1D509	Ffr	𝔉	𝔉	𝔉
9726	025FE	FilledSmallSquare	◾	◾	◼
62875	0F59B	FilledVerySmallSquare			▪
120125	1D53D	Fopf	𝔽	𝔽	𝔽
8704	02200	ForAll	∀	∀	∀
8497	02131	Fouriertrf	ℱ	ℱ	ℱ
8497	02131	Fscr	ℱ	ℱ	ℱ
1027	00403	GJcy	Ѓ	Ѓ	Ѓ
915	00393	Gamma	Γ	Γ	Γ
988	003DC	Gammad	Ϝ	Ϝ	Ϝ
286	0011E	Gbreve	Ğ	Ğ	Ğ
290	00122	Gcedil	Ģ	Ģ	Ģ
284	0011C	Gcirc	Ĝ	Ĝ	Ĝ
1043	00413	Gcy	Г	Г	Г
288	00120	Gdot	Ġ	Ġ	Ġ
120074	1D50A	Gfr	𝔊	𝔊	𝔊
8921	022D9	Gg	⋙	⋙	⋙
120126	1D53E	Gopf	𝔾	𝔾	𝔾
8805	02265	GreaterEqual	≥	≥	≥
8923	022DB	GreaterEqualLess	⋛	⋛	⋛
8807	02267	GreaterFullEqual	≧	≧	≧
10914	02AA2	GreaterGreater	⪢	⪢	⪢
8823	02277	GreaterLess	≷	≷	≷
10878	02A7E	GreaterSlantEqual	⩾	⩾	⩾
8819	02273	GreaterTilde	≳	≳	≳
119970	1D4A2	Gscr	𝒢	𝒢	𝒢
8811	0226B	Gt	≫	≫	≫
1066	0042A	HARDcy	Ъ	Ъ	Ъ
711	002C7	Hacek	ˇ	ˇ	ˇ
770	00302	Hat	̂	̂	^
292	00124	Hcirc	Ĥ	Ĥ	Ĥ
8460	0210C	Hfr	ℌ	ℌ	ℌ
8459	0210B	HilbertSpace	ℋ	ℋ	ℋ
8461	0210D	Hopf	ℍ	ℍ	ℍ
9472	02500	HorizontalLine	─	─	─
8459	0210B	Hscr	ℋ	ℋ	ℋ
294	00126	Hstrok	Ħ	Ħ	Ħ
8782	0224E	HumpDownHump	≎	≎	≎
8783	0224F	HumpEqual	≏	≏	≏
1045	00415	IEcy	Е	Е	Е
306	00132	IJlig	Ĳ	Ĳ	Ĳ
1025	00401	IOcy	Ё	Ё	Ё
205	000CD	Iacute	Í	Í	Í
206	000CE	Icirc	Î	Î	Î
1048	00418	Icy	И	И	И
304	00130	Idot	İ	İ	İ
8465	02111	Ifr	ℑ	ℑ	ℑ
204	000CC	Igrave	Ì	Ì	Ì
8465	02111	Im	ℑ	ℑ	ℑ
298	0012A	Imacr	Ī	Ī	Ī
8520	02148	ImaginaryI	ⅈ	ⅈ	ⅈ
8658	021D2	Implies	⇒	⇒	⇒
8748	0222C	Int	∬	∬	∬
8747	0222B	Integral	∫	∫	∫
8898	022C2	Intersection	⋂	⋂	⋂
8203	0200B	InvisibleComma			⁣
8290	02062	InvisibleTimes	⁢	⁢	⁢
302	0012E	Iogon	Į	Į	Į
120128	1D540	Iopf	𝕀	𝕀	𝕀
8464	02110	Iscr	ℐ	ℐ	ℐ
296	00128	Itilde	Ĩ	Ĩ	Ĩ
1030	00406	Iukcy	І	І	І
207	000CF	Iuml	Ï	Ï	Ï
308	00134	Jcirc	Ĵ	Ĵ	Ĵ
1049	00419	Jcy	Й	Й	Й
120077	1D50D	Jfr	𝔍	𝔍	𝔍
120129	1D541	Jopf	𝕁	𝕁	𝕁
119973	1D4A5	Jscr	𝒥	𝒥	𝒥
1032	00408	Jsercy	Ј	Ј	Ј
1028	00404	Jukcy	Є	Є	Є
1061	00425	KHcy	Х	Х	Х
1036	0040C	KJcy	Ќ	Ќ	Ќ
310	00136	Kcedil	Ķ	Ķ	Ķ
1050	0041A	Kcy	К	К	К
120078	1D50E	Kfr	𝔎	𝔎	𝔎
120130	1D542	Kopf	𝕂	𝕂	𝕂
119974	1D4A6	Kscr	𝒦	𝒦	𝒦
1033	00409	LJcy	Љ	Љ	Љ
313	00139	Lacute	Ĺ	Ĺ	Ĺ
923	0039B	Lambda	Λ	Λ	Λ
12298	0300A	Lang	《	《	⟪
8466	02112	Laplacetrf	ℒ	ℒ	ℒ
8606	0219E	Larr	↞	↞	↞
317	0013D	Lcaron	Ľ	Ľ	Ľ
315	0013B	Lcedil	Ļ	Ļ	Ļ
1051	0041B	Lcy	Л	Л	Л
9001	02329	LeftAngleBracket	〈	〈	⟨
8592	02190	LeftArrow	←	←	←
8676	021E4	LeftArrowBar	⇤	⇤	⇤
8646	021C6	LeftArrowRightArrow	⇆	⇆	⇆
8968	02308	LeftCeiling	⌈	⌈	⌈
12314	0301A	LeftDoubleBracket	〚	〚	⟦
10593	02961	LeftDownTeeVector	⥡	⥡	⥡
8643	021C3	LeftDownVector	⇃	⇃	⇃
10585	02959	LeftDownVectorBar	⥙	⥙	⥙
8970	0230A	LeftFloor	⌊	⌊	⌊
8596	02194	LeftRightArrow	↔	↔	↔
10574	0294E	LeftRightVector	⥎	⥎	⥎
8867	022A3	LeftTee	⊣	⊣	⊣
8612	021A4	LeftTeeArrow	↤	↤	↤
10586	0295A	LeftTeeVector	⥚	⥚	⥚
8882	022B2	LeftTriangle	⊲	⊲	⊲
10703	029CF	LeftTriangleBar	⧏	⧏	⧏
8884	022B4	LeftTriangleEqual	⊴	⊴	⊴
10577	02951	LeftUpDownVector	⥑	⥑	⥑
10592	02960	LeftUpTeeVector	⥠	⥠	⥠
8639	021BF	LeftUpVector	↿	↿	↿
10584	02958	LeftUpVectorBar	⥘	⥘	⥘
8636	021BC	LeftVector	↼	↼	↼
10578	02952	LeftVectorBar	⥒	⥒	⥒
8656	021D0	Leftarrow	⇐	⇐	⇐
8660	021D4	Leftrightarrow	⇔	⇔	⇔
8922	022DA	LessEqualGreater	⋚	⋚	⋚
8806	02266	LessFullEqual	≦	≦	≦
8822	02276	LessGreater	≶	≶	≶
10913	02AA1	LessLess	⪡	⪡	⪡
10877	02A7D	LessSlantEqual	⩽	⩽	⩽
8818	02272	LessTilde	≲	≲	≲
120079	1D50F	Lfr	𝔏	𝔏	𝔏
8920	022D8	Ll	⋘	⋘	⋘
8666	021DA	Lleftarrow	⇚	⇚	⇚
319	0013F	Lmidot	Ŀ	Ŀ	Ŀ
62838	0F576	LongLeftArrow			⟵
62840	0F578	LongLeftRightArrow			⟷
62839	0F577	LongRightArrow			⟶
62841	0F579	Longleftarrow			⟸
62843	0F57B	Longleftrightarrow			⟺
62842	0F57A	Longrightarrow			⟹
120131	1D543	Lopf	𝕃	𝕃	𝕃
8601	02199	LowerLeftArrow	↙	↙	↙
8600	02198	LowerRightArrow	↘	↘	↘
8466	02112	Lscr	ℒ	ℒ	ℒ
8624	021B0	Lsh	↰	↰	↰
321	00141	Lstrok	Ł	Ł	Ł
8810	0226A	Lt	≪	≪	≪
10501	02905	Map	⤅	⤅	⤅
1052	0041C	Mcy	М	М	М
8287	0205F	MediumSpace
8499	02133	Mellintrf	ℳ	ℳ	ℳ
120080	1D510	Mfr	𝔐	𝔐	𝔐
8723	02213	MinusPlus	∓	∓	∓
120132	1D544	Mopf	𝕄	𝕄	𝕄
8499	02133	Mscr	ℳ	ℳ	ℳ
1034	0040A	NJcy	Њ	Њ	Њ
323	00143	Nacute	Ń	Ń	Ń
327	00147	Ncaron	Ň	Ň	Ň
325	00145	Ncedil	Ņ	Ņ	Ņ
1053	0041D	Ncy	Н	Н	Н
8287,65024	0205F,0FE00	NegativeMediumSpace	︀	︀
8197,65024	02005,0FE00	NegativeThickSpace	︀	︀
8201,65024	02009,0FE00	NegativeThinSpace	︀	︀
8202,65024	0200A,0FE00	NegativeVeryThinSpace	︀	︀
8811	0226B	NestedGreaterGreater	≫	≫	≫
8810	0226A	NestedLessLess	≪	≪	≪
10	0000A	NewLine
120081	1D511	Nfr	𝔑	𝔑	𝔑
65279	0FEFF	NoBreak			⁠
160	000A0	NonBreakingSpace
8469	02115	Nopf	ℕ	ℕ	ℕ
10988	02AEC	Not	⫬	⫬	⫬
8802	02262	NotCongruent	≢	≢	≢
8813	0226D	NotCupCap	≭	≭	≭
8742	02226	NotDoubleVerticalBar	∦	∦	∦
8713	02209	NotElement	∉	∉	∉
8800	02260	NotEqual	≠	≠	≠
8770,824	02242,00338	NotEqualTilde	≂̸	≂̸	≂̸
8708	02204	NotExists	∄	∄	∄
8815	0226F	NotGreater	≯	≯	≯
8817,8421	02271,020E5	NotGreaterEqual	≱⃥	≱⃥	≱
8816	02270	NotGreaterFullEqual	≰	≰	≧̸
8811,824,65024	0226B,00338,0FE00	NotGreaterGreater	≫̸︀	≫̸︀	≫̸
8825	02279	NotGreaterLess	≹	≹	≹
8817	02271	NotGreaterSlantEqual	≱	≱	⩾̸
8821	02275	NotGreaterTilde	≵	≵	≵
8782,824	0224E,00338	NotHumpDownHump	≎̸	≎̸	≎̸
8783,824	0224F,00338	NotHumpEqual	≏̸	≏̸	≏̸
8938	022EA	NotLeftTriangle	⋪	⋪	⋪
10703,824	029CF,00338	NotLeftTriangleBar	⧏̸	⧏̸	⧏̸
8940	022EC	NotLeftTriangleEqual	⋬	⋬	⋬
8814	0226E	NotLess	≮	≮	≮
8816,8421	02270,020E5	NotLessEqual	≰⃥	≰⃥	≰
8824	02278	NotLessGreater	≸	≸	≸
8810,824,65024	0226A,00338,0FE00	NotLessLess	≪̸︀	≪̸︀	≪̸
8816	02270	NotLessSlantEqual	≰	≰	⩽̸
8820	02274	NotLessTilde	≴	≴	≴
9378,824	024A2,00338	NotNestedGreaterGreater	⒢̸	⒢̸	⪢̸
9377,824	024A1,00338	NotNestedLessLess	⒡̸	⒡̸	⪡̸
8832	02280	NotPrecedes	⊀	⊀	⊀
10927,824	02AAF,00338	NotPrecedesEqual	⪯̸	⪯̸	⪯̸
8928	022E0	NotPrecedesSlantEqual	⋠	⋠	⋠
8716	0220C	NotReverseElement	∌	∌	∌
8939	022EB	NotRightTriangle	⋫	⋫	⋫
10704,824	029D0,00338	NotRightTriangleBar	⧐̸	⧐̸	⧐̸
8941	022ED	NotRightTriangleEqual	⋭	⋭	⋭
8847,824	0228F,00338	NotSquareSubset	⊏̸	⊏̸	⊏̸
8930	022E2	NotSquareSubsetEqual	⋢	⋢	⋢
8848,824	02290,00338	NotSquareSuperset	⊐̸	⊐̸	⊐̸
8931	022E3	NotSquareSupersetEqual	⋣	⋣	⋣
8836	02284	NotSubset	⊄	⊄	⊂⃒
8840	02288	NotSubsetEqual	⊈	⊈	⊈
8833	02281	NotSucceeds	⊁	⊁	⊁
10928,824	02AB0,00338	NotSucceedsEqual	⪰̸	⪰̸	⪰̸
8929	022E1	NotSucceedsSlantEqual	⋡	⋡	⋡
8831,824	0227F,00338	NotSucceedsTilde	≿̸	≿̸	≿̸
8837	02285	NotSuperset	⊅	⊅	⊃⃒
8841	02289	NotSupersetEqual	⊉	⊉	⊉
8769	02241	NotTilde	≁	≁	≁
8772	02244	NotTildeEqual	≄	≄	≄
8775	02247	NotTildeFullEqual	≇	≇	≇
8777	02249	NotTildeTilde	≉	≉	≉
8740	02224	NotVerticalBar	∤	∤	∤
119977	1D4A9	Nscr	𝒩	𝒩	𝒩
209	000D1	Ntilde	Ñ	Ñ	Ñ
338	00152	OElig	Œ	Œ	Œ
211	000D3	Oacute	Ó	Ó	Ó
212	000D4	Ocirc	Ô	Ô	Ô
1054	0041E	Ocy	О	О	О
336	00150	Odblac	Ő	Ő	Ő
120082	1D512	Ofr	𝔒	𝔒	𝔒
210	000D2	Ograve	Ò	Ò	Ò
332	0014C	Omacr	Ō	Ō	Ō
937	003A9	Omega	Ω	Ω	Ω
120134	1D546	Oopf	𝕆	𝕆	𝕆
8220	0201C	OpenCurlyDoubleQuote	“	“	“
8216	02018	OpenCurlyQuote	‘	‘	‘
10836	02A54	Or	⩔	⩔	⩔
119978	1D4AA	Oscr	𝒪	𝒪	𝒪
216	000D8	Oslash	Ø	Ø	Ø
213	000D5	Otilde	Õ	Õ	Õ
10807	02A37	Otimes	⨷	⨷	⨷
214	000D6	Ouml	Ö	Ö	Ö
175	000AF	OverBar	¯	¯	‾
65079	0FE37	OverBrace	︷	︷	⏞
9140	023B4	OverBracket	⎴	⎴	⎴
65077	0FE35	OverParenthesis	︵	︵	⏜
8706	02202	PartialD	∂	∂	∂
1055	0041F	Pcy	П	П	П
120083	1D513	Pfr	𝔓	𝔓	𝔓
934	003A6	Phi	Φ	Φ	Φ
928	003A0	Pi	Π	Π	Π
177	000B1	PlusMinus	±	±	±
8460	0210C	Poincareplane	ℌ	ℌ	ℌ
8473	02119	Popf	ℙ	ℙ	ℙ
10939	02ABB	Pr	⪻	⪻	⪻
8826	0227A	Precedes	≺	≺	≺
10927	02AAF	PrecedesEqual	⪯	⪯	⪯
8828	0227C	PrecedesSlantEqual	≼	≼	≼
8830	0227E	PrecedesTilde	≾	≾	≾
8243	02033	Prime	″	″	″
8719	0220F	Product	∏	∏	∏
8759	02237	Proportion	∷	∷	∷
8733	0221D	Proportional	∝	∝	∝
119979	1D4AB	Pscr	𝒫	𝒫	𝒫
936	003A8	Psi	Ψ	Ψ	Ψ
120084	1D514	Qfr	𝔔	𝔔	𝔔
8474	0211A	Qopf	ℚ	ℚ	ℚ
119980	1D4AC	Qscr	𝒬	𝒬	𝒬
10512	02910	RBarr	⤐	⤐	⤐
340	00154	Racute	Ŕ	Ŕ	Ŕ
12299	0300B	Rang	》	》	⟫
8608	021A0	Rarr	↠	↠	↠
10518	02916	Rarrtl	⤖	⤖	⤖
344	00158	Rcaron	Ř	Ř	Ř
342	00156	Rcedil	Ŗ	Ŗ	Ŗ
1056	00420	Rcy	Р	Р	Р
8476	0211C	Re	ℜ	ℜ	ℜ
8715	0220B	ReverseElement	∋	∋	∋
8651	021CB	ReverseEquilibrium	⇋	⇋	⇋
10607	0296F	ReverseUpEquilibrium	⥯	⥯	⥯
8476	0211C	Rfr	ℜ	ℜ	ℜ
9002	0232A	RightAngleBracket	〉	〉	⟩
8594	02192	RightArrow	→	→	→
8677	021E5	RightArrowBar	⇥	⇥	⇥
8644	021C4	RightArrowLeftArrow	⇄	⇄	⇄
8969	02309	RightCeiling	⌉	⌉	⌉
12315	0301B	RightDoubleBracket	〛	〛	⟧
10589	0295D	RightDownTeeVector	⥝	⥝	⥝
8642	021C2	RightDownVector	⇂	⇂	⇂
10581	02955	RightDownVectorBar	⥕	⥕	⥕
8971	0230B	RightFloor	⌋	⌋	⌋
8866	022A2	RightTee	⊢	⊢	⊢
8614	021A6	RightTeeArrow	↦	↦	↦
10587	0295B	RightTeeVector	⥛	⥛	⥛
8883	022B3	RightTriangle	⊳	⊳	⊳
10704	029D0	RightTriangleBar	⧐	⧐	⧐
8885	022B5	RightTriangleEqual	⊵	⊵	⊵
10575	0294F	RightUpDownVector	⥏	⥏	⥏
10588	0295C	RightUpTeeVector	⥜	⥜	⥜
8638	021BE	RightUpVector	↾	↾	↾
10580	02954	RightUpVectorBar	⥔	⥔	⥔
8640	021C0	RightVector	⇀	⇀	⇀
10579	02953	RightVectorBar	⥓	⥓	⥓
8658	021D2	Rightarrow	⇒	⇒	⇒
8477	0211D	Ropf	ℝ	ℝ	ℝ
10608	02970	RoundImplies	⥰	⥰	⥰
8667	021DB	Rrightarrow	⇛	⇛	⇛
8475	0211B	Rscr	ℛ	ℛ	ℛ
8625	021B1	Rsh	↱	↱	↱
10740	029F4	RuleDelayed	⧴	⧴	⧴
1065	00429	SHCHcy	Щ	Щ	Щ
1064	00428	SHcy	Ш	Ш	Ш
1068	0042C	SOFTcy	Ь	Ь	Ь
346	0015A	Sacute	Ś	Ś	Ś
10940	02ABC	Sc	⪼	⪼	⪼
352	00160	Scaron	Š	Š	Š
350	0015E	Scedil	Ş	Ş	Ş
348	0015C	Scirc	Ŝ	Ŝ	Ŝ
1057	00421	Scy	С	С	С
120086	1D516	Sfr	𝔖	𝔖	𝔖
8964,65024	02304,0FE00	ShortDownArrow	⌄︀	⌄︀	↓
8592,65024	02190,0FE00	ShortLeftArrow	←︀	←︀	←
8594,65024	02192,0FE00	ShortRightArrow	→︀	→︀	→
8963,65024	02303,0FE00	ShortUpArrow	⌃︀	⌃︀	↑
931	003A3	Sigma	Σ	Σ	Σ
8728	02218	SmallCircle	∘	∘	∘
120138	1D54A	Sopf	𝕊	𝕊	𝕊
8730	0221A	Sqrt	√	√	√
9633	025A1	Square	□	□	□
8851	02293	SquareIntersection	⊓	⊓	⊓
8847	0228F	SquareSubset	⊏	⊏	⊏
8849	02291	SquareSubsetEqual	⊑	⊑	⊑
8848	02290	SquareSuperset	⊐	⊐	⊐
8850	02292	SquareSupersetEqual	⊒	⊒	⊒
8852	02294	SquareUnion	⊔	⊔	⊔
119982	1D4AE	Sscr	𝒮	𝒮	𝒮
8902	022C6	Star	⋆	⋆	⋆
8912	022D0	Sub	⋐	⋐	⋐
8912	022D0	Subset	⋐	⋐	⋐
8838	02286	SubsetEqual	⊆	⊆	⊆
8827	0227B	Succeeds	≻	≻	≻
8829	0227D	SucceedsEqual	≽	≽	⪰
8829	0227D	SucceedsSlantEqual	≽	≽	≽
8831	0227F	SucceedsTilde	≿	≿	≿
8715	0220B	SuchThat	∋	∋	∋
8721	02211	Sum	∑	∑	∑
8913	022D1	Sup	⋑	⋑	⋑
8835	02283	Superset	⊃	⊃	⊃
8839	02287	SupersetEqual	⊇	⊇	⊇
8913	022D1	Supset	⋑	⋑	⋑
222	000DE	THORN	Þ	Þ	Þ
1035	0040B	TSHcy	Ћ	Ћ	Ћ
1062	00426	TScy	Ц	Ц	Ц
9	00009	Tab
356	00164	Tcaron	Ť	Ť	Ť
354	00162	Tcedil	Ţ	Ţ	Ţ
1058	00422	Tcy	Т	Т	Т
120087	1D517	Tfr	𝔗	𝔗	𝔗
8756	02234	Therefore	∴	∴	∴
920	00398	Theta	Θ	Θ	Θ
8201,8202,8202	02009,0200A,0200A	ThickSpace
8201	02009	ThinSpace
8764	0223C	Tilde	∼	∼	∼
8771	02243	TildeEqual	≃	≃	≃
8773	02245	TildeFullEqual	≅	≅	≅
8776	02248	TildeTilde	≈	≈	≈
120139	1D54B	Topf	𝕋	𝕋	𝕋
8411	020DB	TripleDot	⃛	⃛	⃛
119983	1D4AF	Tscr	𝒯	𝒯	𝒯
358	00166	Tstrok	Ŧ	Ŧ	Ŧ
218	000DA	Uacute	Ú	Ú	Ú
8607	0219F	Uarr	↟	↟	↟
10569	02949	Uarrocir	⥉	⥉	⥉
1038	0040E	Ubrcy	Ў	Ў	Ў
364	0016C	Ubreve	Ŭ	Ŭ	Ŭ
219	000DB	Ucirc	Û	Û	Û
1059	00423	Ucy	У	У	У
368	00170	Udblac	Ű	Ű	Ű
120088	1D518	Ufr	𝔘	𝔘	𝔘
217	000D9	Ugrave	Ù	Ù	Ù
362	0016A	Umacr	Ū	Ū	Ū
818	00332	UnderBar	̲	̲	_
65080	0FE38	UnderBrace	︸	︸	⏟
9141	023B5	UnderBracket	⎵	⎵	⎵
65078	0FE36	UnderParenthesis	︶	︶	⏝
8899	022C3	Union	⋃	⋃	⋃
8846	0228E	UnionPlus	⊎	⊎	⊎
370	00172	Uogon	Ų	Ų	Ų
120140	1D54C	Uopf	𝕌	𝕌	𝕌
8593	02191	UpArrow	↑	↑	↑
10514	02912	UpArrowBar	⤒	⤒	⤒
8645	021C5	UpArrowDownArrow	⇅	⇅	⇅
8597	02195	UpDownArrow	↕	↕	↕
10606	0296E	UpEquilibrium	⥮	⥮	⥮
8869	022A5	UpTee	⊥	⊥	⊥
8613	021A5	UpTeeArrow	↥	↥	↥
8657	021D1	Uparrow	⇑	⇑	⇑
8661	021D5	Updownarrow	⇕	⇕	⇕
8598	02196	UpperLeftArrow	↖	↖	↖
8599	02197	UpperRightArrow	↗	↗	↗
978	003D2	Upsi	ϒ	ϒ	ϒ
978	003D2	Upsilon	ϒ	ϒ	Υ
366	0016E	Uring	Ů	Ů	Ů
119984	1D4B0	Uscr	𝒰	𝒰	𝒰
360	00168	Utilde	Ũ	Ũ	Ũ
220	000DC	Uuml	Ü	Ü	Ü
8875	022AB	VDash	⊫	⊫	⊫
10987	02AEB	Vbar	⫫	⫫	⫫
1042	00412	Vcy	В	В	В
8873	022A9	Vdash	⊩	⊩	⊩
10982	02AE6	Vdashl	⫦	⫦	⫦
8897	022C1	Vee	⋁	⋁	⋁
8214	02016	Verbar	‖	‖	‖
8214	02016	Vert	‖	‖	‖
8739	02223	VerticalBar	∣	∣	∣
124	0007C	VerticalLine	\|	\|	\|
10072	02758	VerticalSeparator	❘	❘	❘
8768	02240	VerticalTilde	≀	≀	≀
8202	0200A	VeryThinSpace
120089	1D519	Vfr	𝔙	𝔙	𝔙
120141	1D54D	Vopf	𝕍	𝕍	𝕍
119985	1D4B1	Vscr	𝒱	𝒱	𝒱
8874	022AA	Vvdash	⊪	⊪	⊪
372	00174	Wcirc	Ŵ	Ŵ	Ŵ
8896	022C0	Wedge	⋀	⋀	⋀
120090	1D51A	Wfr	𝔚	𝔚	𝔚
120142	1D54E	Wopf	𝕎	𝕎	𝕎
119986	1D4B2	Wscr	𝒲	𝒲	𝒲
120091	1D51B	Xfr	𝔛	𝔛	𝔛
926	0039E	Xi	Ξ	Ξ	Ξ
120143	1D54F	Xopf	𝕏	𝕏	𝕏
119987	1D4B3	Xscr	𝒳	𝒳	𝒳
1071	0042F	YAcy	Я	Я	Я
1031	00407	YIcy	Ї	Ї	Ї
1070	0042E	YUcy	Ю	Ю	Ю
221	000DD	Yacute	Ý	Ý	Ý
374	00176	Ycirc	Ŷ	Ŷ	Ŷ
1067	0042B	Ycy	Ы	Ы	Ы
120092	1D51C	Yfr	𝔜	𝔜	𝔜
120144	1D550	Yopf	𝕐	𝕐	𝕐
119988	1D4B4	Yscr	𝒴	𝒴	𝒴
376	00178	Yuml	Ÿ	Ÿ	Ÿ
1046	00416	ZHcy	Ж	Ж	Ж
377	00179	Zacute	Ź	Ź	Ź
381	0017D	Zcaron	Ž	Ž	Ž
1047	00417	Zcy	З	З	З
379	0017B	Zdot	Ż	Ż	Ż
8203	0200B	ZeroWidthSpace
8488	02128	Zfr	ℨ	ℨ	ℨ
8484	02124	Zopf	ℤ	ℤ	ℤ
119989	1D4B5	Zscr	𝒵	𝒵	𝒵
225	000E1	aacute	á	á	á
259	00103	abreve	ă	ă	ă
10511	0290F	ac	⤏	⤏	∾
10715	029DB	acE	⧛	⧛	∾̳
8767	0223F	acd	∿	∿	∿
226	000E2	acirc	â	â	â
180	000B4	acute	´	´	´
1072	00430	acy	а	а	а
230	000E6	aelig	æ	æ	æ
8289	02061	af	⁡	⁡	⁡
120094	1D51E	afr	𝔞	𝔞	𝔞
224	000E0	agrave	à	à	à
8501	02135	aleph	ℵ	ℵ	ℵ
945	003B1	alpha	α	α	α
257	00101	amacr	ā	ā	ā
10815	02A3F	amalg	⨿	⨿	⨿
38	00026	amp	&	&	&
8743	02227	and	∧	∧	∧
10837	02A55	andand	⩕	⩕	⩕
10844	02A5C	andd	⩜	⩜	⩜
10840	02A58	andslope	⩘	⩘	⩘
10842	02A5A	andv	⩚	⩚	⩚
8736	02220	ang	∠	∠	∠
10660	029A4	ange	⦤	⦤	⦤
8736	02220	angle	∠	∠	∠
8737	02221	angmsd	∡	∡	∡
10664	029A8	angmsdaa	⦨	⦨	⦨
10665	029A9	angmsdab	⦩	⦩	⦩
10666	029AA	angmsdac	⦪	⦪	⦪
10667	029AB	angmsdad	⦫	⦫	⦫
10668	029AC	angmsdae	⦬	⦬	⦬
10669	029AD	angmsdaf	⦭	⦭	⦭
10670	029AE	angmsdag	⦮	⦮	⦮
10671	029AF	angmsdah	⦯	⦯	⦯
8735	0221F	angrt	∟	∟	∟
10653,65024	0299D,0FE00	angrtvb	⦝︀	⦝︀	⊾
10653	0299D	angrtvbd	⦝	⦝	⦝
8738	02222	angsph	∢	∢	∢
8491	0212B	angst	Å	Å	Å
9084	0237C	angzarr	⍼	⍼	⍼
261	00105	aogon	ą	ą	ą
120146	1D552	aopf	𝕒	𝕒	𝕒
8776	02248	ap	≈	≈	≈
8778	0224A	apE	≊	≊	⩰
10863	02A6F	apacir	⩯	⩯	⩯
8778	0224A	ape	≊	≊	≊
8779	0224B	apid	≋	≋	≋
39	00027	apos	'	'	'
8776	02248	approx	≈	≈	≈
8778	0224A	approxeq	≊	≊	≊
229	000E5	aring	å	å	å
119990	1D4B6	ascr	𝒶	𝒶	𝒶
42	0002A	ast	*	*	*
8781	0224D	asymp	≍	≍	≈
227	000E3	atilde	ã	ã	ã
228	000E4	auml	ä	ä	ä
8755	02233	awconint	∳	∳	∳
10769	02A11	awint	⨑	⨑	⨑
10989	02AED	bNot	⫭	⫭	⫭
8780	0224C	backcong	≌	≌	≌
1014	003F6	backepsilon	϶	϶	϶
8245	02035	backprime	‵	‵	‵
8765	0223D	backsim	∽	∽	∽
8909	022CD	backsimeq	⋍	⋍	⋍
8893	022BD	barvee	⊽	⊽	⊽
8892	022BC	barwed	⊼	⊼	⌅
8892	022BC	barwedge	⊼	⊼	⌅
9141	023B5	bbrk	⎵	⎵	⎵
8780	0224C	bcong	≌	≌	≌
1073	00431	bcy	б	б	б
8757	02235	becaus	∵	∵	∵
8757	02235	because	∵	∵	∵
10672	029B0	bemptyv	⦰	⦰	⦰
1014	003F6	bepsi	϶	϶	϶
8492	0212C	bernou	ℬ	ℬ	ℬ
946	003B2	beta	β	β	β
8502	02136	beth	ℶ	ℶ	ℶ
8812	0226C	between	≬	≬	≬
120095	1D51F	bfr	𝔟	𝔟	𝔟
8898	022C2	bigcap	⋂	⋂	⋂
9711	025EF	bigcirc	◯	◯	◯
8899	022C3	bigcup	⋃	⋃	⋃
8857	02299	bigodot	⊙	⊙	⨀
8853	02295	bigoplus	⊕	⊕	⨁
8855	02297	bigotimes	⊗	⊗	⨂
8852	02294	bigsqcup	⊔	⊔	⨆
9733	02605	bigstar	★	★	★
9661	025BD	bigtriangledown	▽	▽	▽
9651	025B3	bigtriangleup	△	△	△
8846	0228E	biguplus	⊎	⊎	⨄
8897	022C1	bigvee	⋁	⋁	⋁
8896	022C0	bigwedge	⋀	⋀	⋀
10509	0290D	bkarow	⤍	⤍	⤍
10731	029EB	blacklozenge	⧫	⧫	⧫
9642	025AA	blacksquare	▪	▪	▪
9652	025B4	blacktriangle	▴	▴	▴
9662	025BE	blacktriangledown	▾	▾	▾
9666	025C2	blacktriangleleft	◂	◂	◂
9656	025B8	blacktriangleright	▸	▸	▸
9251	02423	blank	␣	␣	␣
9618	02592	blk12	▒	▒	▒
9617	02591	blk14	░	░	░
9619	02593	blk34	▓	▓	▓
9608	02588	block	█	█	█
61,8421	0003D,020E5	bne	=⃥	=⃥	=⃥
8801,8421	02261,020E5	bnequiv	≡⃥	≡⃥	≡⃥
8976	02310	bnot	⌐	⌐	⌐
120147	1D553	bopf	𝕓	𝕓	𝕓
8869	022A5	bot	⊥	⊥	⊥
8869	022A5	bottom	⊥	⊥	⊥
8904	022C8	bowtie	⋈	⋈	⋈
9559	02557	boxDL	╗	╗	╗
9556	02554	boxDR	╔	╔	╔
9558	02556	boxDl	╖	╖	╖
9555	02553	boxDr	╓	╓	╓
9552	02550	boxH	═	═	═
9574	02566	boxHD	╦	╦	╦
9577	02569	boxHU	╩	╩	╩
9572	02564	boxHd	╤	╤	╤
9575	02567	boxHu	╧	╧	╧
9565	0255D	boxUL	╝	╝	╝
9562	0255A	boxUR	╚	╚	╚
9564	0255C	boxUl	╜	╜	╜
9561	02559	boxUr	╙	╙	╙
9553	02551	boxV	║	║	║
9580	0256C	boxVH	╬	╬	╬
9571	02563	boxVL	╣	╣	╣
9568	02560	boxVR	╠	╠	╠
9579	0256B	boxVh	╫	╫	╫
9570	02562	boxVl	╢	╢	╢
9567	0255F	boxVr	╟	╟	╟
10697	029C9	boxbox	⧉	⧉	⧉
9557	02555	boxdL	╕	╕	╕
9554	02552	boxdR	╒	╒	╒
9488	02510	boxdl	┐	┐	┐
9484	0250C	boxdr	┌	┌	┌
9472	02500	boxh	─	─	─
9573	02565	boxhD	╥	╥	╥
9576	02568	boxhU	╨	╨	╨
9516	0252C	boxhd	┬	┬	┬
9524	02534	boxhu	┴	┴	┴
8863	0229F	boxminus	⊟	⊟	⊟
8862	0229E	boxplus	⊞	⊞	⊞
8864	022A0	boxtimes	⊠	⊠	⊠
9563	0255B	boxuL	╛	╛	╛
9560	02558	boxuR