ˇ Linux Libertine Open Fonts Project...

☙ Linux Libertine OpenFonts Project ❧

LATEX

Font: Philipp H. PollLATEX-Einbindung: Michael Niedermair

14. Juni 2009

Inhaltsverzeichnis

1 Font 31.1 Source . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 31.2 Änderungen . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 31.3 Danke . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 4

2 Schriftbild 52.1 Übersicht - Libertine . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 5

2.1.1 normal . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 52.1.2 old style . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 52.1.3 old SS . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 62.1.4 Vtted . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 6

2.2 Übersicht - Biolinum . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 72.2.1 normal . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 72.2.2 old style . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 72.2.3 old SS . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 72.2.4 Vtted . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 8

2.3 Zahlen . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 82.4 Aufzählungen . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 8

2.4.1 Aufzählungen mit Nummer . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 82.4.2 Aufzählungen mit Buchstaben . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 9

2.5 Libertine-Logo . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 92.6 Aufruf . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 92.7 Verwendung von Glpyhennamen . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 10

3 Glyphliste 113.1 Libertine . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 113.2 Biolinum . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 65

4 Fonttabellen 118

5 Lizenz 3775.1 GPL . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 3775.2 OFL . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 377

2

1 Font

Es wird ausschließlich die Type1-Version des Libertine- / Biolinum-Fonts verwendet.

Versionen

SFD: Linux Biolinum (0.4.4)SFD: Linux Biolinum Bold (0.4.4)SFD: Linux Libertine (4.4.1)SFD: Linux Libertine Bold (4.1.1)SFD: Linux Libertine Bold Italic (4.0.7)SFD: Linux Libertine Capitals (4.0.4)SFD: Linux Libertine Italic (4.1.0)

Font http://linuxlibertine.svn.sourceforge.net/viewvc/linuxlibertine/trunk/

libertine Version: 2009/05/22a - 4.5.1a

1.1 Source

Die Routinen, um die TEX-Metriken zu erzeugen und die Dokumentation (in LATEX) etc. Vndet man unter der SVN-Verwaltung(siehe hierzu http://linuxlibertine.svn.sourceforge.net/viewvc/linuxlibertine/trunk/).

1.2 Änderungen

22. Mai 2009 • Änderung von ttf nach truetype

• Änderung von otf nach opentype

• xelibertine.sty - libertine.sty

17. Mai 2009 • Neue Font-Version

• Änderungen am MakeVle

16. Mai 2009 • Neues Skript zur Fontgenerierung verwendet

1. Mai 2009 • Verwendung der Biolinum mit geänderten Ligaturen

• Problem mit fetten osf-Zahlen gelöst

29. März 2009 • Verwendung der Biolinum

• komplette Überarbeitung

• LGI entfernt

• LGR entfernt

• Versionsnummer auf Font-Versionsnummer umgestellt.

08. Januar 2008 • Verwendung der SFD-Dateien 2.7.x.

• Anpassung der Versionsnummer an die Font-Versionsnummer.

• Verzeichnisebene ’texmf’ aus Paket entfernt.

• LGI (expertimental).

• Zahlen für Brüche (\xlfrax) (expertimental).

• Parameter ss hinzugefügt (SS anstelle des versalen ß).

• Aufteilung der Dokumentation in mehrere Bereiche.

• Hinzufügen des LGR-Encodings für griechisch (expertimental).

• Fehler mit Aufrufparameter ’osf’ beseitigt.

11. Juni 2007 • Umstellung der Basis-mtx-Erstellung von fontsinst auf ExTeX-Afm2Mtx

• Parameter debug hinzugefügt.

3

http://linuxlibertine.svn.sourceforge.net/viewvc/linuxlibertine/trunk/http://linuxlibertine.svn.sourceforge.net/viewvc/linuxlibertine/trunk/

• Parameter scaled hinzugefügt.

• Parameter osf hinzugefügt.

• Alle Glpyhen lassen sich jetzt über den Glpyhnamen auswählen.

• Hinzufügen des versalen ß.

• Verzeichnisstruktur auf texmf/fonts/afm/public/libertine etc. angepasst.

• Verzeichnis texmf/doc/fonts/libertine angelegt.

1. Mai 2007 • Erste Alpha-Version.

1.3 Danke

Ein besonderer Dank für die Unterstützung geht u. a. an folgende Personen:

Berry, KarlBurnus, TobiasDirr, UlrichHellström, Lars

Niepraschk, RolfThiel, RainerWilland, Alexander

4

2 Schriftbild

2.1 Übersicht - Libertine

2.1.1 normal

(m) normal - (n) normalDies ist ein Beispieltext mit Zahlen 1234567890! öäüß ÖÄÜ U V W X Y Hamburg

Am 30.4.1987 saß ich im „Café Hamburg“ und schlürfte KaUee für 2,65 €!

(m) normal - (it) italicDies ist ein Beispieltext mit Zahlen 1234567890! öäüß ÖÄÜ U V W X Y Hamburg


(b) bold - (n) normalDies ist ein Beispieltext mit Zahlen 1234567890! öäüß ÖÄÜ U V W X Y Hamburg


(b) bold - (it) italicDies ist ein Beispieltext mit Zahlen 1234567890! öäüß ÖÄÜ U V W X Y Hamburg


(m) normal - (sc) capsDies ist ein Beispieltext mit Zahlen 1234567890! öäüß ÖÄÜ ff fi fl ffi ffl Hamburg

Am 30.4.1987 saß ich im „Café Hamburg“ und schlürfte Kaffee für 2,65 €!

(b) bold - (sc) capsDies ist ein Beispieltext mit Zahlen 1234567890! öäüß ÖÄÜ ff fi fl ffi ffl Hamburg


(m) normal - (ic) italic capsDies ist ein Beispieltext mit Zahlen 1234567890! öäüß ÖÄÜ ff fi fl ffi ffl Hamburg


(b) bold - (ic) italic capsDies ist ein Beispieltext mit Zahlen 1234567890! öäüß ÖÄÜ ff fi fl ffi ffl Hamburg


2.1.2 old style













5





2.1.3 old SS

















2.1.4 Vtted













6





2.2 Übersicht - Biolinum

2.2.1 normal



(b) bold - (n) normalDies ist ein Beispieltext mit Zahlen 1234567890! öäüß ÖÄÜ U V W XY Hamburg






2.2.2 old style









2.2.3 old SS









7

2.2.4 Vtted









2.3 Zahlen

Libertine

T1-fxl-m-n 01234567890T1-fxlf-m-n 01234567890T1-fxlj-m-n 01234567890T1-fxlo-m-n 01234567890

Biolinum

T1-fxb-m-n 01234567890T1-fxbf-m-n 01234567890T1-fxbj-m-n 01234567890T1-fxbo-m-n 01234567890

2.4 Aufzählungen

2.4.1 Aufzählungen mit Nummer

Für die „normale“ Aufzählung steht die Umgebung xlenumerate zur Verfügung. Als obtionaler Parameter kann dabei derStartpunkt im Font verwendet werden.

① Punkt 1

② Punkt 2

③ Punkt 3

❶ Punkt 3.1

❷ Punkt 3.2

❸ Punkt 3.3

❹ Punkt 3.4

④ Punkt 4

⓵ Punkt 4.1

⓶ Punkt 4.2

⓷ Punkt 4.3

⓸ Punkt 4.4

\begin{xlenumerate}\item Punkt 1\item Punkt 2\item Punkt 3\begin{xlenumerate}[22]\item Punkt 3.1\item Punkt 3.2\item Punkt 3.3\item Punkt 3.4\end{xlenumerate}\item Punkt 4\begin{xlenumerate}[124]\item Punkt 4.1

8

\item Punkt 4.2\item Punkt 4.3\item Punkt 4.4\end{xlenumerate}\end{xlenumerate}

2.4.2 Aufzählungen mit Buchstaben

Es lassen sich aber auch Buchstaben verwenden, in dem man den Startpunkt auf 65 (entspricht Ⓐ) oder 97 (entspricht ⓐ)setzt.

Ⓐ Punkt 1

Ⓑ Punkt 2

Ⓒ Punkt 3

ⓐ Punkt 3.1

ⓑ Punkt 3.2

ⓒ Punkt 3.3

ⓓ Punkt 3.4

Ⓓ Punkt 4

\begin{xlenumerate}[65]\item Punkt 1\item Punkt 2\item Punkt 3\begin{xlenumerate}[97]\item Punkt 3.1\item Punkt 3.2\item Punkt 3.3\item Punkt 3.4\end{xlenumerate}\item Punkt 4\end{xlenumerate}

2.5 Libertine-Logo

Das Logo wird mit \xllogo angezeigt:

2.6 Aufruf

Für das Einbinden steht das Paket libertine.sty zur Verfügung.

\usepackage{libertine}

Es deVniert für rmdefault die Schrift fxl (normale ZiUern).

Optionen

osf Es werden anstelle der normalen ZiUern MedivalziUern bzw. MinuskelziUern verwendet.

\usepackage[osf]{libertine}

scaled Der Font wird entsprechend skaliert.

\usepackage[scaled=0.95]{libertine}

ss Es wird ss anstelle von ß verwendet.

\usepackage[ss]{libertine}

Ansonsten können Sie jeden Teilbereich über z. B.

\usefont{T1}{fxl}{m}{n}\selectfont

auswählen. Siehe hierzu auch die Fonttabellen.

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2.7 Verwendung von Glpyhennamen

Mit dem Befehl \useTextGlyph{}{} kann jedes Glpyh im Font verwendet werden.

{\Huge\useTextGlyph{fxl}{uni211A}} =ℚ{\Huge\useTextGlyph{fxl}{uni263A}} =☺{\Huge\useTextGlyph{fxl}{Tux}} =�

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3 Glyphliste

3.1 Libertine

a aA Aaacute áAacute Áaacute.sc áa.alt aabreve ăAbreve Ăabreve.sc ăacircumflex âAcircumflex Âacircumflex.sc âacute ´adieresis äAdieresis ÄAdieresis.alt Äadieresis.sc äae æ

AE Æaeacute ǽAEacute Ǽae.alt æae.sc æafii10017 Аafii10018 Бafii10019 Вafii10020 Гafii10021 Дafii10022 Еafii10023 Ёafii10024 Жafii10025 Зafii10026 Иafii10027 Йafii10028 Кafii10029 Л

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afii10030 Мafii10031 Нafii10032 Оafii10033 Пafii10034 Рafii10035 Сafii10036 Тafii10037 Уafii10038 Фafii10039 Хafii10040 Цafii10041 Чafii10042 Шafii10043 Щafii10044 Ъafii10045 Ыafii10046 Ьafii10047 Эafii10048 Юafii10049 Яafii10050 Ґafii10051 Ђ

afii10052 Ѓafii10053 Єafii10054 Ѕafii10055 Іafii10056 Їafii10057 Јafii10058 Љafii10059 Њafii10060 Ћafii10061 Ќafii10062 Ўafii10065 аafii10066 бafii10067 вafii10068 гafii10069 дafii10070 еafii10071 ёafii10072 жafii10073 зafii10074 иafii10075 й

12

afii10076 кafii10077 лafii10078 мafii10079 нafii10080 оafii10081 пafii10082 рafii10083 сafii10084 тafii10085 уafii10086 фafii10087 хafii10088 цafii10089 чafii10090 шafii10091 щafii10092 ъafii10093 ыafii10094 ьafii10095 эafii10096 юafii10097 я

afii10098 ґafii10099 ђafii10100 ѓafii10101 єafii10102 ѕafii10103 іafii10104 їafii10105 јafii10106 љafii10107 њafii10108 ћafii10109 ќafii10110 ўafii10145 Џafii10146 Ѣafii10147 Ѳafii10148 Ѵafii10193 џafii10194 ѣafii10195 ѳafii10196 ѵafii10846 ә

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afii57645 ־afii57658 ׃afii57664 אafii57665 בafii57666 גafii57667 דafii57668 הafii57669 וafii57670 זafii57671 חafii57672 טafii57673 יafii57674 ךafii57675 כafii57676 לafii57677 םafii57678 מafii57679 ןafii57680 נafii57681 סafii57682 עafii57683 ף

afii57684 פafii57685 ץafii57686 צafii57687 קafii57688 רafii57689 שafii57690 תafii57716 װafii57717 ױafii57718 ײafii57842 ׀afii57929 ʼafii61248 ℅afii61289 ℓafii61352 №afii64937 ʽagrave àAgrave Àagrave.sc àa.inferior aaleph ℵalpha α

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Alpha Αalphatonos άAlphatonos Άamacron āAmacron Āampersand &ampersand.alt &ampersand.sc &angle ∠anoteleia ·aogonek ąAogonek Ąaogonek.sc ąapproxequal ≈aring åAring Åaringacute ǻAringacute Ǻaring.sc åarrowboth ↔arrowdblboth ⇔arrowdbldown ⇓

arrowdblleft ⇐arrowdblright ⇒arrowdblup ⇑arrowdown ↓arrowleft ←arrowright →arrowup ↑arrowupdn ↕arrowupdnbse ↨a.sc aa.scalt aasciicircum ^asciitilde ~asterisk *asteriskmath ∗a.superior aat @atilde ãAtilde Ãatilde.sc ãb bB B

15

backslash \bar |beta βBeta Βb.inferior bbraceleft {braceleft.sc {braceright }braceright.sc }bracketleft [bracketleft.sc [bracketright ]bracketright.sc ]breve ˘brokenbar ¦b.sc bb.superior bbullet •c cC Ccacute ćCacute Ć

cacute.sc ćcaron ˇccaron čCcaron Čccaron.sc čccedilla çCcedilla Çccedilla.sc çccircumflex ĉCcircumflex Ĉcdotaccent ċCdotaccent Ċcedilla ¸cent ¢centigrade ℃c_h ;chi χChi Χc.inferior ccircle ○circlemultiply ⊗circleplus ⊕

16

circumflex ˆc_k :colon :comma ,congruent ≅copyright ©c.sc cc.superior cc_t =currency ¤d dD Ddagger †daggerdbl ‡dcaron ďDcaron Ďdcaron.sc ďdcroat đDcroat Đdcroat.sc đdegree °delta δ

Delta ∆dieresis ¨dieresistonos ΅d.inferior ddivide ÷dollar $dong ₫dotaccent ˙dotlessi ıdotlessj dotmath ⋅d.sc dd.superior de eE Eeacute éEacute Éeacute.sc éebreve ĕEbreve Ĕecaron ěEcaron Ě

17

ecaron.sc ěecircumflex êEcircumflex Êecircumflex.sc êedieresis ëEdieresis Ëedieresis.sc ëedotaccent ėEdotaccent Ėegrave èEgrave Èegrave.sc èeight 8eight.fitted 8eight.inferior 8eight.oldstyle 8eightroman ⅷEightroman Ⅷeight.superior 8eight.taboldstyle 8e.inferior eelement ∈

elevenroman ⅺElevenroman Ⅺellipsis …emacron ēEmacron Ēemdash —emptyset ∅emquad �emspace �endash –eng ŋEng Ŋeng.sc ŋenquad �enspace eogonek ęEogonek Ęeogonek.sc ęepsilon εEpsilon Εepsilontonos έEpsilontonos Έ

18

equal =equal.inferior =equal.superior =equivalence ≡e.sc eestimated ℮e.superior eeta ηEta Ηetatonos ήEtatonos Ήeth ðEth Ðeth.sc ðEuro €Euro.fitted €exclam !exclamdbl ‼exclamdown ¡exclamdown.sc ¡exclam_question Iexistential ∃

f fF Ffahrenheit ℉f_b 0female ♀f_f �f_f_b 1f_f_h 2f_f_i �f_f_j 3f_f_k 4f_f_l �f_f.short áf_f_t 5f_h 6f_i �figuredash ‒figurespace �filledbox ■f.inferior ffive 5fiveeighths ⅝

19

five.fitted 5five.inferior 5five.oldstyle 5fiveroman ⅴFiveroman Ⅴfivesixths Zfive.superior 5five.taboldstyle 5f_j 7f_k 8f_l �florin ƒfour 4fourfifths Xfour.fitted 4four.inferior 4four.oldstyle 4fourperemspace �fourroman ⅳFourroman Ⅳfour.superior 4four.taboldstyle 4

fraction ⁄franc ₣f.sc ff.short ff.superior ff_t 9g gG Ggamma γGamma Γgammalatin cgammalatin.superior àgbreve ğGbreve Ğgbreve.sc ğgcaron ǧGcaron Ǧgcircumflex ĝGcircumflex Ĝgcommaaccent ģGcommaaccent Ģgdotaccent ġ

20

Gdotaccent Ġgermandbls ßGermandbls germandbls.alt ßGermandbls.alt Ngermandbls.sc ßgermandbls.scalt ßgermandbls.ss03 ßg.inferior gglottalstopreversed ʕglottalstopreversed.superior ʕgradient ∇grave `greater >greaterequal ≥g.sc gg.superior gguillemotleft «guillemotleft.sc «guillemotright »guillemotright.sc »guilsinglleft ‹

guilsinglleft.sc ‹guilsinglright ›guilsinglright.sc ›h hH HH18533 ●H22073 □hairspace

h.alt hhbar ħHbar Ħhcircumflex ĥHcircumflex Ĥhhook ɦhhook.superior ɦh.inferior hhorizontalbar ―h.sc hh.superior hhungarumlaut ˝hyphen -hyphen.cap -

21

hyphendot 'hyphennobreak �hyphen.sc -hyphentwo ‐i iI Iiacute íIacute Íiacute.sc íibreve ĭIbreve Ĭicircumflex îIcircumflex Îicircumflex.sc îidieresis ïIdieresis Ïidieresis.sc ïIdotaccent İidotaccent.sc ¶Ifraktur ℑigrave ìIgrave Ì

igrave.sc ìi.inferior iij ĳIJ Ĳij.sc ĳimacron īImacron Īinfinity ∞integral ∫interrobang =intersection ∩iogonek įIogonek Įiota ιIota Ιiotadieresis ϊIotadieresis Ϊiotadieresistonos ΐiotatonos ίIotatonos Ίi.sc ii.superior i

22

itilde ĩItilde Ĩj jJ JJ.alt Jjcircumflex ĵJcircumflex Ĵj.inferior jj.sc jj.superior jk kK KK.alt Kkappa κKappa Κkcommaaccent ķKcommaaccent Ķkgreenlandic ĸk.inferior kkreis �k.sc kk.superior k

l lL Llacute ĺLacute Ĺlacute.sc ĺlambda λLambda Λlcaron ľLcaron Ľlcaron.sc ľlcommaaccent ļLcommaaccent Ļldot ŀLdot Ŀless <lessequal ≤l.inferior llira ₤logicaland ∧logicalnot ¬logicalor ∨longs ſ

23

longs_h Glongs_i >longs_l Clongs_longs ?longs_longs_i Dlongs_s Elongs_t �lozenge ◊l.sc llslash łLslash Łlslash.sc łl.superior lm mM Mmacron ¯male ♂m.inferior mminus −minus.inferior −minus.superior −minute ′

m.sc mm.superior mmu µMu Μmultiply ×musicalnote ♪musicalnotedbl ♫n nN Nnacute ńNacute Ńnacute.sc ńnapostrophe ŉncaron ňNcaron Ňncaron.sc ňncommaaccent ņNcommaaccent ŅNearrow ×nine 9nine.fitted 9nine.inferior 9

24

nine.oldstyle 9nineroman ⅸNineroman Ⅸnine.superior 9nine.taboldstyle 9n.inferior nnotelement ∉notequal ≠notsubset ⊄n.sc nn.superior nntilde ñNtilde Ñntilde.sc ñnu νNu Νnumbersign #Nwarrow Öo oO Ooacute óOacute Ó

oacute.sc óobreve ŏObreve Ŏocircumflex ôOcircumflex Ôocircumflex.sc ôodieresis öOdieresis ÖOdieresis.alt Öodieresis.sc öoe œOE Œoe.sc œogonek ˛ograve òOgrave Òograve.sc òohorn ơOhorn Ơohungarumlaut őOhungarumlaut Őohungarumlaut.sc ő

25

o.inferior oomacron ōOmacron Ōomega ωOmega Ωomega1 ϖomegatonos ώOmegatonos Ώomicron οOmicron Οomicrontonos όOmicrontonos Όone 1onedotenleader ․oneeighth ⅛onefifth Uone.fitted 1onehalf ½one.inferior 1onenumerator _one.oldstyle 1onequarter ¼

oneroman ⅰOneroman Ⅰonesixth Yone.superior 1one.taboldstyle 1onethird ⅓openbullet ◦ordfeminine ªordmasculine ºo.sc ooslash øOslash Øoslashacute ǿOslashacute Ǿoslash.sc øo.superior ootilde õOtilde Õotilde.sc õp pP Pparagraph ¶

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parenleft (parenleft.inferior (parenleft.sc (parenleft.superior (parenright )parenright.inferior )parenright.sc )parenright.superior )partialdiff ∂percent %period .periodcentered ·perpendicular ⊥perthousand ‰perthousandzero �peseta ₧phi φPhi Φphi1 ϕpi πPi Πp.inferior p

plus +plus.inferior +plusminus ±plus.superior +primereversed ‵primetriple 4product ∏propersubset ⊂propersuperset ⊃proportional ∝p.sc ppsi ψPsi Ψp.superior ppunctuationspace �q qQ Qq.inferior qq.sc qq.superior qQ_u Hquestion ?

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questiondown ¿questiondown.sc ¿question_exclam Hquestion_question Gquotedbl "quotedblbase „quotedblleft “quotedblrev �quotedblright ”quoteleft ‘quotereversed ‛quoteright ’quotesinglbase ‚quotesingle 'Q_u.sc r rR Rracute ŕRacute Ŕracute.sc ŕradical √R.alt R

rcaron řRcaron Řrcaron.sc řrcommaaccent ŗRcommaaccent Ŗregistered ®Rfraktur ℜrho ρRho Ρrhookturned ɻrhookturned.superior ɻr.inferior rring ˚r.sc rRsmallcap Rsmallinverted ʁRsmallinverted.superior ʁr.superior rrturned ɹrturned.superior ɹs sS S

28

sacute śSacute Śsacute.sc śscaron šScaron Šscaron.sc šscedilla şScedilla Şscedilla.sc şscircumflex ŝScircumflex Ŝscommaaccent șScommaaccent Șscommaaccent.sc șSearrow Øsecond ″section §semicolon ;seven 7seveneighths ⅞seven.fitted 7seven.inferior 7

seven.oldstyle 7sevenroman ⅶSevenroman Ⅶseven.superior 7seven.taboldstyle 7sigma σSigma Σsigma1 ςsimilar ∼s.inferior ssix 6six.fitted 6six.inferior 6six.oldstyle 6sixperemspace �sixroman ⅵSixroman Ⅵsix.superior 6six.taboldstyle 6slash /space s.sc s

29

s.superior ss_t �sterling £suchthat ∋summation ∑Swarrow Ùt tT Ttau τTau Τtbar ŧTbar Ŧtbar.sc ŧtcaron ťTcaron Ťtcaron.sc ťtcedilla ţTcedilla Ţtcedilla.sc ţtcommaaccent ţTcommaaccent Ţtcommaaccent.sc ţ

tenroman ⅹTenroman ⅩT_h Itheta θTheta Θtheta1 ϑthinspace thorn þThorn Þthorn.sc þthree 3threeeighths ⅜threefifths Wthree.fitted 3three.inferior 3three.oldstyle 3threeperemspace �threequarters ¾threeroman ⅲThreeroman Ⅲthree.superior 3three.taboldstyle 3

30

tilde ˜t.inferior ttonos ΄trademark ™triagdn ▼triagup ▲trianglebullet #t.sc tt.superior tt_t <Tux �twelveroman ⅻTwelveroman Ⅻtwo 2twodotenleader ‥twofifths Vtwo.fitted 2two.inferior 2two.oldstyle 2tworoman ⅱTworoman Ⅱtwo.superior 2

two.taboldstyle 2twothirds ⅔t_z Ju uU Uuacute úUacute Úuacute.sc úubreve ŭUbreve Ŭucircumflex ûUcircumflex Ûucircumflex.sc ûudieresis üUdieresis ÜUdieresis.alt Üudieresis.sc üugrave ùUgrave Ùugrave.sc ùuhorn ưUhorn Ư

31

uhungarumlaut űUhungarumlaut Űuhungarumlaut.sc űu.inferior uumacron ūUmacron Ūunderscore _underscoredbl ‗uni00A0 uni00AD uni00B5 µuni0180 ƀuni0181 Ɓuni0182 Ƃuni0183 ƃuni0184 Ƅuni0185 ƅuni0186 Ɔuni0187 Ƈuni0188 ƈuni0189 Ɖuni018A Ɗ

uni018B Ƌuni018C ƌuni018D ƍuni018E Ǝuni018F Əuni0190 Ɛuni0191 Ƒuni0193 Ɠuni0194 Ɣuni0195 ƕuni0196 Ɩuni0197 Ɨuni0198 Ƙuni0199 ƙuni019A ƚuni019B ƛuni019C Ɯuni019D Ɲuni019E ƞuni019F Ɵuni01A2 Ƣuni01A3 ƣ

32

uni01A4 Ƥuni01A5 ƥuni01A6 Ʀuni01A7 Ƨuni01A8 ƨuni01A9 Ʃuni01AA ƪuni01AB ƫuni01AC Ƭuni01AD ƭuni01AE Ʈuni01B1 Ʊuni01B2 Ʋuni01B3 Ƴuni01B4 ƴuni01B5 Ƶuni01B6 ƶuni01B7 Ʒuni01B8 Ƹuni01B9 ƹuni01BA ƺuni01BB ƻ

uni01BC Ƽuni01BD ƽuni01BE ƾuni01BF ƿuni01C0 ǀuni01C1 ǁuni01C2 ǂuni01C3 ǃuni01C4 Ǆuni01C5 ǅuni01C6 ǆuni01C7 Ǉuni01C8 ǈuni01C9 ǉuni01CA Ǌuni01CB ǋuni01CC ǌuni01CD Ǎuni01CE ǎuni01CF Ǐuni01D0 ǐuni01D1 Ǒ

33

uni01D2 ǒuni01D3 Ǔuni01D4 ǔuni01D5 Ǖuni01D6 ǖuni01D7 Ǘuni01D8 ǘuni01D9 Ǚuni01DA ǚuni01DB Ǜuni01DC ǜuni01DD ǝuni01DE Ǟuni01DF ǟuni01E0 Ǡuni01E1 ǡuni01E2 Ǣuni01E3 ǣuni01E4 Ǥuni01E5 ǥuni01E8 Ǩuni01E9 ǩ

uni01EA Ǫuni01EB ǫuni01EC Ǭuni01ED ǭuni01EE Ǯuni01EF ǯuni01F0 ǰuni01F1 Ǳuni01F2 ǲuni01F3 ǳuni01F4 Ǵuni01F5 ǵuni01F6 Ƕuni01F7 Ƿuni01F8 Ǹuni01F9 ǹuni0200 Ȁuni0201 ȁuni0202 Ȃuni0203 ȃuni0204 Ȅuni0205 ȅ

34

uni0206 Ȇuni0207 ȇuni0208 Ȉuni0209 ȉuni020A Ȋuni020B ȋuni020C Ȍuni020D ȍuni020E Ȏuni020F ȏuni0210 Ȑuni0211 ȑuni0212 Ȓuni0213 ȓuni0214 Ȕuni0215 ȕuni0216 Ȗuni0217 ȗuni021C Ȝuni021D ȝuni021E Ȟuni021F ȟ

uni0220 Ƞuni0221 ȡuni0222 Ȣuni0223 ȣuni0224 Ȥuni0225 ȥuni0226 Ȧuni0227 ȧuni0228 Ȩuni0229 ȩuni022A Ȫuni022B ȫuni022C Ȭuni022D ȭuni022E Ȯuni022F ȯuni0230 Ȱuni0231 ȱuni0232 Ȳuni0233 ȳuni0234 ȴuni0235 ȵ

35

uni0236 ȶuni0238 ȸuni0239 ȹuni023A Ⱥuni023B Ȼuni023C ȼuni023D Ƚuni023E Ⱦuni023F ȿuni0241 Ɂuni0243 Ƀuni0250 ɐuni0251 ɑuni0252 ɒuni0253 ɓuni0254 ɔuni0255 ɕuni0256 ɖuni0257 ɗuni0258 ɘuni0259 əuni025A ɚ

uni025B ɛuni025C ɜuni025D ɝuni025E ɞuni025F ɟuni0260 ɠuni0261 ɡuni0262 ɢuni0264 ɤuni0265 ɥuni0267 ɧuni0268 ɨuni0269 ɩuni026A ɪuni026B ɫuni026C ɬuni026D ɭuni026E ɮuni026F ɯuni0270 ɰuni0271 ɱuni0272 ɲ

36

uni0273 ɳuni0274 ɴuni0275 ɵuni0276 ɶuni0277 ɷuni0278 ɸuni027A ɺuni027C ɼuni027D ɽuni027E ɾuni027F ɿuni0282 ʂuni0283 ʃuni0284 ʄuni0285 ʅuni0286 ʆuni0287 ʇuni0288 ʈuni0289 ʉuni028A ʊuni028B ʋuni028C ʌ

uni028D ʍuni028E ʎuni028F ʏuni0290 ʐuni0291 ʑuni0292 ʒuni0293 ʓuni0294 ʔuni0296 ʖuni0297 ʗuni0298 ʘuni0299 ʙuni029A ʚuni029B ʛuni029C ʜuni029D ʝuni029E ʞuni029F ʟuni02A0 ʠuni02A1 ʡuni02A2 ʢuni02A3 ʣ

37

uni02A4 ʤuni02A5 ʥuni02A6 ʦuni02A7 ʧuni02A8 ʨuni02A9 ʩuni02AA ʪuni02AB ʫuni02AC ʬuni02AD ʭuni02AE ʮuni02AF ʯuni02B9 ʹuni02BA ʺuni02BB ʻuni02BE ʾuni02BF ʿuni02C0 ˀuni02C1 ˁuni02C2 ˂uni02C3 ˃uni02C4 ˄

uni02C5 ˅uni02C8 ˈuni02C9 ˉuni02CA ˊuni02CB ˋuni02CC ˌuni02CD ˍuni02CE ˎuni02CF ˏuni02D0 ːuni02D1 ˑuni02D2 ˒uni02D3 ˓uni02D4 ˔uni02D5 ˕uni02D6 ˖uni02D7 ˗uni02DE ˞uni02DF ˟uni02EC ˬuni02ED ˭uni02EE ˮ

38

uni0351 ͑uni0357 ͗uni0358 ͘uni0374 ʹuni0375 ͵uni037A ͺuni037B ͻuni037C ͼuni037D ͽuni037E ;uni03D0 ϐuni03D3 ϓuni03D4 ϔuni03D7 ϗuni03D8 Ϙuni03D9 ϙuni03DA Ϛuni03DB ϛuni03DC Ϝuni03DD ϝuni03DE Ϟuni03DF ϟ

uni03E0 Ϡuni03E1 ϡuni03F0 ϰuni03F1 ϱuni03F2 ϲuni03F3 ϳuni03F4 ϴuni03F5 ϵuni03F6 ϶uni03F8 ϸuni03F9 Ϲuni03FB ϻuni03FD Ͻuni03FE Ͼuni03FF Ͽuni0400 Ѐuni040D Ѝuni0450 ѐuni045D ѝuni0460 Ѡuni0461 ѡuni0464 Ѥ

39

uni0465 ѥuni0466 Ѧuni0467 ѧuni0468 Ѩuni0469 ѩuni046A Ѫuni046B ѫuni046C Ѭuni046D ѭuni046E Ѯuni046F ѯuni0470 Ѱuni0471 ѱuni0476 Ѷuni0477 ѷuni047C Ѽuni047D ѽuni047E Ѿuni047F ѿuni048C Ҍuni048D ҍuni048E Ҏ

uni048F ҏuni0492 Ғuni0493 ғuni0494 Ҕuni0495 ҕuni0496 Җuni0497 җuni0498 Ҙuni0499 ҙuni049A Қuni049B қuni049C Ҝuni049D ҝuni049E Ҟuni049F ҟuni04A0 Ҡuni04A1 ҡuni04A2 Ңuni04A3 ңuni04A4 Ҥuni04A5 ҥuni04A6 Ҧ

40

uni04A7 ҧuni04A8 Ҩuni04A9 ҩuni04AA Ҫuni04AB ҫuni04AC Ҭuni04AD ҭuni04AE Үuni04AF үuni04B0 Ұuni04B1 ұuni04B2 Ҳuni04B3 ҳuni04B4 Ҵuni04B5 ҵuni04B6 Ҷuni04B7 ҷuni04B8 Ҹuni04B9 ҹuni04BA Һuni04BB һuni04BC Ҽ

uni04BD ҽuni04BE Ҿuni04BF ҿuni04C0 Ӏuni04C1 Ӂuni04C2 ӂuni04C3 Ӄuni04C4 ӄuni04C7 Ӈuni04C8 ӈuni04C9 Ӊuni04CA ӊuni04CB Ӌuni04CC ӌuni04D0 Ӑuni04D1 ӑuni04D2 Ӓuni04D3 ӓuni04D4 Ӕuni04D5 ӕuni04D6 Ӗuni04D7 ӗ

41

uni04D8 Әuni04DA Ӛuni04DB ӛuni04DC Ӝuni04DD ӝuni04DE Ӟuni04DF ӟuni04E0 Ӡuni04E1 ӡuni04E2 Ӣuni04E3 ӣuni04E4 Ӥuni04E5 ӥuni04E6 Ӧuni04E7 ӧuni04E8 Өuni04E9 өuni04EA Ӫuni04EB ӫuni04EC Ӭuni04ED ӭuni04EE Ӯ

uni04EF ӯuni04F0 Ӱuni04F1 ӱuni04F2 Ӳuni04F3 ӳuni04F4 Ӵuni04F5 ӵuni04F6 Ӷuni04F7 ӷuni04F8 Ӹuni04F9 ӹuni05C6 ׆uni05F3 ׳uni05F4 ״uni1E00 Ḁuni1E01 ḁuni1E02 Ḃuni1E03 ḃuni1E04 Ḅuni1E05 ḅuni1E06 Ḇuni1E07 ḇ

42

uni1E08 Ḉuni1E09 ḉuni1E0A Ḋuni1E0B ḋuni1E0C Ḍuni1E0D ḍuni1E0E Ḏuni1E0F ḏuni1E10 Ḑuni1E11 ḑuni1E12 Ḓuni1E13 ḓuni1E14 Ḕuni1E15 ḕuni1E16 Ḗuni1E17 ḗuni1E18 Ḙuni1E19 ḙuni1E1A Ḛuni1E1B ḛuni1E1C Ḝuni1E1D ḝ

uni1E1E Ḟuni1E1F ḟuni1E20 Ḡuni1E21 ḡuni1E22 Ḣuni1E23 ḣuni1E24 Ḥuni1E25 ḥuni1E26 Ḧuni1E27 ḧuni1E28 Ḩuni1E29 ḩuni1E2A Ḫuni1E2B ḫuni1E2C Ḭuni1E2D ḭ

uni1E2E Ḯuni1E2F ḯuni1E30 Ḱuni1E31 ḱuni1E32 Ḳuni1E33 ḳ

43

uni1E34 Ḵuni1E35 ḵuni1E36 Ḷuni1E37 ḷuni1E38 Ḹuni1E39 ḹuni1E3A Ḻuni1E3B ḻuni1E3C Ḽuni1E3D ḽuni1E3E Ḿuni1E3F ḿuni1E40 Ṁuni1E41 ṁuni1E42 Ṃuni1E43 ṃuni1E44 Ṅuni1E45 ṅuni1E46 Ṇuni1E47 ṇuni1E48 Ṉuni1E49 ṉ

uni1E4A Ṋuni1E4B ṋuni1E4C Ṍuni1E4D ṍuni1E4E Ṏuni1E4F ṏuni1E50 Ṑuni1E51 ṑuni1E52 Ṓuni1E53 ṓuni1E54 Ṕuni1E55 ṕuni1E56 Ṗuni1E57 ṗuni1E58 Ṙuni1E59 ṙuni1E5A Ṛuni1E5B ṛuni1E5C Ṝuni1E5D ṝuni1E5E Ṟuni1E5F ṟ

44

uni1E60 Ṡuni1E61 ṡuni1E62 Ṣuni1E63 ṣuni1E64 Ṥuni1E65 ṥ

uni1E66 Ṧuni1E67 ṧuni1E68 Ṩuni1E69 ṩuni1E6A Ṫuni1E6B ṫuni1E6C Ṭuni1E6D ṭuni1E6E Ṯuni1E6F ṯuni1E70 Ṱuni1E71 ṱuni1E72 Ṳuni1E73 ṳuni1E74 Ṵuni1E75 ṵ

uni1E76 Ṷuni1E77 ṷuni1E78 Ṹuni1E79 ṹuni1E7A Ṻuni1E7B ṻuni1E7C Ṽuni1E7D ṽuni1E7E Ṿuni1E7F ṿuni1E86 Ẇuni1E87 ẇuni1E88 Ẉuni1E89 ẉuni1E8A Ẋuni1E8B ẋuni1E8C Ẍuni1E8D ẍuni1E8E Ẏuni1E8F ẏuni1E90 Ẑuni1E91 ẑ

45

uni1E92 Ẓuni1E93 ẓuni1E94 Ẕuni1E95 ẕuni1E96 ẖuni1E97 ẗuni1E98 ẘuni1E99 ẙuni1E9A ẚuni1E9B ẛuni1E9C ẜuni1E9D ẝuni1E9F ẟuni1EA0 Ạuni1EA1 ạuni1EA2 Ảuni1EA3 ảuni1EA4 Ấuni1EA5 ấuni1EA6 Ầuni1EA7 ầuni1EA8 Ẩ

uni1EA9 ẩ

uni1EAA Ẫuni1EAB ẫuni1EAC Ậuni1EAD ậ

uni1EAE Ắuni1EAF ắ

uni1EB0 Ằuni1EB1 ằ

uni1EB2 Ẳuni1EB3 ẳ

uni1EB4 Ẵuni1EB5 ẵuni1EB6 Ặuni1EB7 ặuni1EB8 Ẹuni1EB9 ẹuni1EBA Ẻuni1EBB ẻuni1EBC Ẽuni1EBD ẽ

46

uni1EBE Ếuni1EBF ếuni1EC0 Ềuni1EC1 ềuni1EC2 Ểuni1EC3 ể

uni1EC4 Ễuni1EC5 ễuni1EC6 Ệuni1EC7 ệuni1EC8 Ỉuni1EC9 ỉuni1ECA Ịuni1ECB ịuni1ECC Ọuni1ECD ọuni1ECE Ỏuni1ECF ỏuni1ED0 Ốuni1ED1 ốuni1ED2 Ồuni1ED3 ồ

uni1ED4 Ổuni1ED5 ổ

uni1ED6 Ỗuni1ED7 ỗuni1ED8 Ộuni1ED9 ộuni1EDA Ớuni1EDB ớuni1EDC Ờuni1EDD ờuni1EDE Ởuni1EDF ởuni1EE0 Ỡuni1EE1 ỡuni1EE2 Ợuni1EE3 ợuni1EE4 Ụuni1EE5 ụuni1EE6 Ủuni1EE7 ủuni1EE8 Ứuni1EE9 ứ

47

uni1EEA Ừuni1EEB ừuni1EEC Ửuni1EED ửuni1EEE Ữuni1EEF ữuni1EF0 Ựuni1EF1 ựuni1EF4 Ỵuni1EF5 ỵuni1EF6 Ỷuni1EF7 ỷuni1EF8 Ỹuni1EF9 ỹuni1EFA Ỻuni1EFB ỻuni1EFC Ỽuni1EFD ỽuni1EFE Ỿuni1EFF ỿuni1F00 ἀuni1F01 ἁ

uni1F02 ἂuni1F03 ἃuni1F04 ἄuni1F05 ἅuni1F06 ἆuni1F07 ἇuni1F08 Ἀuni1F09 Ἁuni1F0A Ἂuni1F0B Ἃuni1F0C Ἄuni1F0D Ἅuni1F0E Ἆuni1F0F Ἇuni1F10 ἐuni1F11 ἑuni1F12 ἒuni1F13 ἓuni1F14 ἔuni1F15 ἕuni1F18 Ἐuni1F19 Ἑ

48

uni1F1A Ἒuni1F1B Ἓuni1F1C Ἔuni1F1D Ἕuni1F20 ἠuni1F21 ἡuni1F22 ἢuni1F23 ἣuni1F24 ἤuni1F25 ἥuni1F26 ἦuni1F27 ἧuni1F28 Ἠuni1F29 Ἡuni1F2A Ἢuni1F2B Ἣuni1F2C Ἤuni1F2D Ἥuni1F2E Ἦuni1F2F Ἧuni1F30 ἰuni1F31 ἱ

uni1F32 ἲuni1F33 ἳuni1F34 ἴuni1F35 ἵuni1F36 ἶuni1F37 ἷuni1F38 Ἰuni1F39 Ἱuni1F3A Ἲuni1F3B Ἳuni1F3C Ἴuni1F3D Ἵuni1F3E Ἶuni1F3F Ἷuni1F40 ὀuni1F41 ὁuni1F42 ὂuni1F43 ὃuni1F44 ὄuni1F45 ὅuni1F48 Ὀuni1F49 Ὁ

49

uni1F4A Ὂuni1F4B Ὃuni1F4C Ὄuni1F4D Ὅuni1F50 ὐuni1F51 ὑuni1F52 ὒuni1F53 ὓuni1F54 ὔuni1F55 ὕuni1F56 ὖuni1F57 ὗuni1F59 Ὑuni1F5B Ὓuni1F5D Ὕuni1F5F Ὗuni1F60 ὠuni1F61 ὡuni1F62 ὢuni1F63 ὣuni1F64 ὤuni1F65 ὥ

uni1F66 ὦuni1F67 ὧuni1F68 Ὠuni1F69 Ὡuni1F6A Ὢuni1F6B Ὣuni1F6C Ὤuni1F6D Ὥuni1F6E Ὦuni1F6F Ὧuni1F70 ὰuni1F71 άuni1F72 ὲuni1F73 έuni1F74 ὴuni1F75 ήuni1F76 ὶuni1F77 ίuni1F78 ὸuni1F79 όuni1F7A ὺuni1F7B ύ

50

uni1F7C ὼuni1F7D ώuni1F80 ᾀuni1F81 ᾁuni1F82 ᾂuni1F83 ᾃuni1F84 ᾄuni1F85 ᾅuni1F86 ᾆuni1F87 ᾇuni1F88 ᾈuni1F89 ᾉuni1F8A ᾊuni1F8B ᾋuni1F8C ᾌuni1F8D ᾍuni1F8E ᾎuni1F8F ᾏuni1F90 ᾐuni1F91 ᾑuni1F92 ᾒuni1F93 ᾓ

uni1F94 ᾔuni1F95 ᾕuni1F96 ᾖuni1F97 ᾗuni1F98 ᾘuni1F99 ᾙuni1F9A ᾚuni1F9B ᾛuni1F9C ᾜuni1F9D ᾝuni1F9E ᾞuni1F9F ᾟuni1FA0 ᾠuni1FA1 ᾡuni1FA2 ᾢuni1FA3 ᾣuni1FA4 ᾤuni1FA5 ᾥuni1FA6 ᾦuni1FA7 ᾧuni1FA8 ᾨuni1FA9 ᾩ

51

uni1FAA ᾪuni1FAB ᾫuni1FAC ᾬuni1FAD ᾭuni1FAE ᾮuni1FAF ᾯuni1FB0 ᾰuni1FB1 ᾱuni1FB2 ᾲuni1FB3 ᾳuni1FB4 ᾴuni1FB6 ᾶuni1FB7 ᾷuni1FB8 Ᾰuni1FB9 Ᾱuni1FBA Ὰuni1FBB Άuni1FBC ᾼuni1FBD ᾽uni1FBE ιuni1FBF ᾿uni1FC0 ῀

uni1FC1 ῁uni1FC2 ῂuni1FC3 ῃuni1FC4 ῄuni1FC6 ῆuni1FC7 ῇuni1FC8 Ὲuni1FC9 Έuni1FCA Ὴuni1FCB Ήuni1FCC ῌuni1FCD ῍uni1FCE ῎uni1FCF ῏uni1FD0 ῐuni1FD1 ῑuni1FD2 ῒuni1FD3 ΐuni1FD6 ῖuni1FD7 ῗuni1FD8 Ῐuni1FD9 Ῑ

52

uni1FDA Ὶuni1FDB Ίuni1FDD ῝uni1FDE ῞uni1FDF ῟uni1FE0 ῠuni1FE1 ῡuni1FE2 ῢuni1FE3 ΰuni1FE4 ῤuni1FE5 ῥuni1FE6 ῦuni1FE7 ῧuni1FE8 Ῠuni1FE9 Ῡuni1FEA Ὺuni1FEB Ύuni1FEC Ῥuni1FED ῭uni1FEE ΅uni1FEF `uni1FF2 ῲ

uni1FF3 ῳuni1FF4 ῴuni1FF6 ῶuni1FF7 ῷuni1FF8 Ὸuni1FF9 Όuni1FFA Ὼuni1FFB Ώuni1FFC ῼuni1FFD ´uni1FFE ῾uni2016 ‖uni202F  uni2031 ‱uni2036 ‶uni2037 ‷uni203B ※uni203E ‾uni2042 ⁂uni204A ⁊uni204B ⁋uni204F ⁏

53

uni2094 ₔuni2098 ₘuni2099 ₙuni20A2 ₢uni20A8 ₨uni20AF ₯uni20B1 ₱uni2100 ℀uni2101 ℁uni2102 ℂuni2106 ℆uni210C ℌuni210D ℍuni210E ℎuni210F ℏuni2115 ℕuni2119 ℙuni211A ℚuni211D ℝuni2120 ℠uni2124 ℤuni2126 Ω

uni2127 ℧uni2136 ℶuni2137 ℷuni2138 ℸuni2139 ℹuni214F ⅏uni216C Ⅼuni216D Ⅽuni216E Ⅾuni216F Ⅿuni217C ⅼuni217D ⅽuni217E ⅾuni217F ⅿuni2180 ↀuni2181 ↁuni2182 ↂuni2183 Ↄuni2184 ↄuni2196 ↖uni2197 ↗uni2198 ↘

54

uni2199 ↙uni219A ↚uni219B ↛uni21A6 ↦uni21AE ↮uni21BC ↼uni21BD ↽uni21C0 ⇀uni21C1 ⇁uni21CB ⇋uni21CC ⇌uni21CD ⇍uni21CE ⇎uni21CF ⇏uni21D5 ⇕uni2201 ∁uni2204 ∄uni2206 ∆uni220A ∊uni220C ∌uni220D ∍uni2210 ∐

uni2213 ∓uni2214 ∔uni2215 ∕uni2216 ∖uni2218 ∘uni2219 ∙uni221B ∛uni221C ∜uni221F ∟uni2221 ∡uni2222 ∢uni2223 ∣uni2224 ∤uni2225 ∥uni2226 ∦uni222C ∬uni222D ∭uni222E ∮uni2236 ∶uni2241 ≁uni2249 ≉uni2259 ≙

55

uni2262 ≢uni226A ≪uni226B ≫uni226E ≮uni226F ≯uni2270 ≰uni2271 ≱uni2285 ⊅uni2296 ⊖uni2298 ⊘uni22A2 ⊢uni22A3 ⊣uni22A4 ⊤uni22A6 ⊦uni22B6 ⊶uni22B7 ⊷uni22EE ⋮uni22EF ⋯uni2300 ⌀uni2302 ⌂uni2303 ⌃uni2310 ⌐

uni2320 ⌠uni2321 ⌡uni2326 ⌦uni2327 ⌧uni2329 〈uni232A 〉uni232B ⌫uni237D ⍽uni2380 ⎀uni23D3 ⏓uni2423 ␣uni2460 ①uni2461 ②uni2462 ③uni2463 ④uni2464 ⑤uni2465 ⑥uni2466 ⑦uni2467 ⑧uni2468 ⑨uni2469 ⑩uni246A ⑪

56

uni246B ⑫uni246C ⑬uni246D ⑭uni246E ⑮uni246F ⑯uni2470 ⑰uni2471 ⑱uni2472 ⑲uni2473 ⑳uni2474 ⑴uni2475 ⑵uni2476 ⑶uni2477 ⑷uni2478 ⑸uni2479 ⑹uni247A ⑺uni247B ⑻uni247C ⑼uni247D ⑽uni247E ⑾uni247F ⑿uni2480 ⒀

uni2481 ⒁uni2482 ⒂uni2483 ⒃uni2484 ⒄uni2485 ⒅uni2486 ⒆uni2487 ⒇uni24B6 Ⓐuni24B7 Ⓑuni24B8 Ⓒuni24B9 Ⓓuni24BA Ⓔuni24BB Ⓕuni24BC Ⓖuni24BD Ⓗuni24BE Ⓘuni24BF Ⓙuni24C0 Ⓚuni24C1 Ⓛuni24C2 Ⓜuni24C3 Ⓝuni24C4 Ⓞ

57

uni24C5 Ⓟuni24C6 Ⓠuni24C7 Ⓡuni24C8 Ⓢuni24C9 Ⓣuni24CA Ⓤuni24CB Ⓥuni24CC Ⓦuni24CD Ⓧuni24CE Ⓨuni24CF Ⓩuni24D0 ⓐuni24D1 ⓑuni24D2 ⓒuni24D3 ⓓuni24D4 ⓔuni24D5 ⓕuni24D6 ⓖuni24D7 ⓗuni24D8 ⓘuni24D9 ⓙuni24DA ⓚ

uni24DB ⓛuni24DC ⓜuni24DD ⓝuni24DE ⓞuni24DF ⓟuni24E0 ⓠuni24E1 ⓡuni24E2 ⓢuni24E3 ⓣuni24E4 ⓤuni24E5 ⓥuni24E6 ⓦuni24E7 ⓧuni24E8 ⓨuni24E9 ⓩuni24EA ⓪uni24EB ⓫uni24EC ⓬uni24ED ⓭uni24EE ⓮uni24EF ⓯uni24F0 ⓰

58

uni24F1 ⓱uni24F2 ⓲uni24F3 ⓳uni24F4 ⓴uni24F5 ⓵uni24F6 ⓶uni24F7 ⓷uni24F8 ⓸uni24F9 ⓹uni24FA ⓺uni24FB ⓻uni24FC ⓼uni24FD ⓽uni24FE ⓾uni24FF ⓿uni25B3 △uni25B6 ▶uni25B7 ▷uni25BD ▽uni25C0 ◀uni25C1 ◁uni25C6 ◆

uni25C7 ◇uni25C9 ◉uni25CE ◎uni25D0 ◐uni25D1 ◑uni25D2 ◒uni25D3 ◓uni25D4 ◔uni25D5 ◕uni25D6 ◖uni25D7 ◗uni2605 ★uni2609 ☉uni2619 ☙uni261B ☛uni261E ☞uni2627 ☧uni262F ☯uni2639 ☹uni263A ☺uni263B ☻uni263C ☼

59

uni263D ☽uni263E ☾uni263F ☿uni2641 ♁uni2643 ♃uni2644 ♄uni2645 ♅uni2646 ♆uni2647 ♇uni2648 ♈uni2649 ♉uni264A ♊uni264B ♋uni264C ♌uni264D ♍uni264E ♎uni264F ♏uni2650 ♐uni2651 ♑uni2652 ♒uni2653 ♓uni2660 ♠

uni2663 ♣uni2665 ♥uni2666 ♦uni2669 ♩uni266C ♬uni2695 ⚕uni2698 ⚘uni26A2 ⚢uni26A3 ⚣uni26A4 ⚤uni26A5 ⚥uni26AC ⚬uni26AD ⚭uni26AE ⚮uni26AF ⚯uni2714 ✔uni2718 ✘uni2767 ❧uni2776 ❶uni2777 ❷uni2778 ❸uni2779 ❹

60

uni277A ❺uni277B ❻uni277C ❼uni277D ❽uni277E ❾uni277F ❿uni27C2 ⟂uni27E6 ⟦uni27E7 ⟧uni2C60 Ⱡuni2C61 ⱡuni2C62 Ɫuni2C63 Ᵽuni2C64 Ɽuni2C65 ⱥuni2C66 ⱦuni2C67 Ⱨuni2C68 ⱨuni2C69 Ⱪuni2C6A ⱪuni2C6B Ⱬuni2C6C ⱬ

uni2C74 ⱴuni2C75 Ⱶuni2C76 ⱶuni2C77 ⱷuniA720 ꜠uniA721 ꜡uniA765 ꝥuniE001 uniE002 uniE003 uniE004 uniE005 uniE006 uniE007 uniE008 uniE009 uniE00A uniE00B uniE040 uniE041 uniE04F uniE06B

61

uniE0CB uniE0E8 uniE0EE uniE0EF uniE0F0 uniE0F2 uniE0F3 uniE0F4 uniE0F5 uniE0F9 uniE0FB uniE101 uniE104 uniE105 uniE106 uniE107 uniE128 uniE129 uniE12A uniE130 uniF6BE uniFFFD �

union ∪universal ∀uogonek ųUogonek Ųupsilon υUpsilon ΥUpsilon1 ϒupsilondieresis ϋUpsilondieresis Ϋupsilondieresistonos ΰupsilontonos ύUpsilontonos Ύuring ůUring Ůuring.sc ůu.sc uu.superior uutilde ũUtilde Ũv vV VV.alt V

62

v.inferior vv.sc vv.superior vw wW Wwacute ẃWacute Ẃw.alt wW.alt Wwcircumflex ŵWcircumflex Ŵwdieresis ẅWdieresis Ẅwgrave ẁWgrave Ẁw.inferior ww.sc ww.superior wx xX Xxi ξXi Ξ

x.inferior xx.sc xx.superior xy yY Yyacute ýYacute Ýyacute.sc ýy.alt yycircumflex ŷYcircumflex Ŷydieresis ÿYdieresis Ÿydieresis.sc ÿyen ¥Yen.fitted �ygrave ỳYgrave Ỳy.inferior yy.sc yy.superior yz z

63

Z Zzacute źZacute Źzacute.sc źzcaron žZcaron Žzcaron.sc žzdotaccent żZdotaccent Żzdotaccent.sc żzero 0zero.fitted 0

zero.inferior 0

zero.oldstyle 0

zero.slash 0

zero.slashfitted 0

zero.superior 0

zero.taboldstyle 0

zeta ζ

Zeta Ζ

z.inferior z

z.sc z

z.superior z

64

3.2 Biolinum

a aA Aaacute áAacute Áaacute.sc áa.alt aabreve ăAbreve Ăabreve.sc ăacircumflex âAcircumflex Âacircumflex.sc âacute ´adieresis äAdieresis ÄAdieresis.alt Äadieresis.sc äae æAE Æaeacute ǽAEacute Ǽ

ae.alt æae.sc æafii10017 Аafii10018 Бafii10019 Вafii10020 Гafii10021 Дafii10022 Еafii10023 Ёafii10024 Жafii10025 Зafii10026 Иafii10027 Йafii10028 Кafii10029 Лafii10030 Мafii10031 Нafii10032 Оafii10033 Пafii10034 Рafii10035 С

65

afii10036 Тafii10037 Уafii10038 Фafii10039 Хafii10040 Цafii10041 Чafii10042 Шafii10043 Щafii10044 Ъafii10045 Ыafii10046 Ьafii10047 Эafii10048 Юafii10049 Яafii10050 Ґafii10051 Ђafii10052 Ѓafii10053 Єafii10054 Ѕafii10055 Іafii10056 Їafii10057 Ј

afii10058 Љafii10059 Њafii10060 Ћafii10061 Ќafii10062 Ўafii10065 аafii10066 бafii10067 вafii10068 гafii10069 дafii10070 еafii10071 ёafii10072 жafii10073 зafii10074 иafii10075 йafii10076 кafii10077 лafii10078 мafii10079 нafii10080 оafii10081 п

66

afii10082 рafii10083 сafii10084 тafii10085 уafii10086 фafii10087 хafii10088 цafii10089 чafii10090 шafii10091 щafii10092 ъafii10093 ыafii10094 ьafii10095 эafii10096 юafii10097 яafii10098 ґafii10099 ђafii10100 ѓafii10101 єafii10102 ѕafii10103 і

afii10104 їafii10105 јafii10106 љafii10107 њafii10108 ћafii10109 ќafii10110 ўafii10145 Џafii10146 Ѣafii10147 Ѳafii10148 Ѵafii10193 џafii10194 ѣafii10195 ѳafii10196 ѵafii10846 әafii57645 ־afii57658 ׃afii57664 אafii57665 בafii57666 גafii57667 ד

67

afii57668 הafii57669 וafii57670 זafii57671 חafii57672 טafii57673 יafii57674 ךafii57675 כafii57676 לafii57677 םafii57678 מafii57679 ןafii57680 נafii57681 סafii57682 עafii57683 ףafii57684 פafii57685 ץafii57686 צafii57687 קafii57688 רafii57689 ש

afii57690 תafii57716 װafii57717 ױafii57718 ײafii57842 ׀afii57929 ʼafii61248 ℅afii61289 ℓafii61352 №afii64937 ʽagrave àAgrave Àagrave.sc àa.inferior aaleph ℵalpha αAlpha Αalphatonos άAlphatonos Άamacron āAmacron Āampersand &

68

ampersand.alt &ampersand.sc &anoteleia ·aogonek ąAogonek Ąaogonek.sc ąapproxequal ≈aring åAring Åaringacute ǻAringacute Ǻaring.sc åarrowboth ↔arrowdblboth ⇔arrowdbldown ⇓arrowdblleft ⇐arrowdblright ⇒arrowdblup ⇑arrowdown ↓arrowleft ←arrowright →arrowup ↑

arrowupdn ↕arrowupdnbse ↨a.sc aa.scalt aasciicircum ^asciitilde ~asterisk *asteriskmath ∗a.superior aat @atilde ãAtilde Ãatilde.sc ãb bB Bbackslash \bar |beta βBeta Βb.inferior bbraceleft {braceleft.sc {

69

braceright }braceright.sc }bracketleft [bracketleft.sc [bracketright ]bracketright.sc ]breve ˘brokenbar ¦b.sc bb.superior bbullet •c cC Ccacute ćCacute Ćcacute.sc ćcaron ˇccaron čCcaron Čccaron.sc čccedilla çCcedilla Ç

ccedilla.sc çccircumflex ĉCcircumflex Ĉcdotaccent ċCdotaccent Ċcedilla ¸cent ¢centigrade ℃c_h ;chi χChi Χc.inferior ccircle ○circlemultiply ⊗circleplus ⊕circumflex ˆc_k :colon :comma ,congruent ≅copyright ©c.sc c

70

c.superior cc_t =currency ¤d dD Ddagger †daggerdbl ‡dcaron ďDcaron Ďdcaron.sc ďdcroat đDcroat Đdcroat.sc đdegree °delta δDelta ∆dieresis ¨dieresistonos ΅d.inferior ddivide ÷dollar $dong ₫

dotaccent ˙dotlessi ıdotlessj dotmath ⋅d.sc dd.superior de eE Eeacute éEacute Éeacute.sc éebreve ĕEbreve Ĕecaron ěEcaron Ěecaron.sc ěecircumflex êEcircumflex Êecircumflex.sc êedieresis ëEdieresis Ëedieresis.sc ë

71

edotaccent ėEdotaccent Ėegrave èEgrave Èegrave.sc èeight 8eight.fitted 8eight.inferior 8eight.oldstyle 8eightroman ⅷEightroman Ⅷeight.superior 8eight.taboldstyle 8e.inferior eelement ∈elevenroman ⅺElevenroman Ⅺellipsis …emacron ēEmacron Ēemdash —emptyset ∅

emquad �emspace �endash –eng ŋEng Ŋeng.sc ŋenquad �enspace eogonek ęEogonek Ęeogonek.sc ęepsilon εEpsilon Εepsilontonos έEpsilontonos Έequal =equal.inferior =equal.superior =equivalence ≡e.sc eestimated ℮e.superior e

72

eta ηEta Ηetatonos ήEtatonos Ήeth ðEth Ðeth.sc ðEuro €Euro.fitted €exclam !exclamdbl ‼exclamdown ¡exclamdown.sc ¡exclam_question Iexistential ∃f fF Ffahrenheit ℉female ♀f_f �f_f_i �f_f_l �

f_i �figuredash ‒figurespace �filledbox ■f.inferior ffive 5fiveeighths ⅝five.fitted 5five.inferior 5five.oldstyle 5fiveroman ⅴFiveroman Ⅴfivesixths Zfive.superior 5five.taboldstyle 5f_l �florin ƒfour 4fourfifths Xfour.fitted 4four.inferior 4four.oldstyle 4

73

fourperemspace �fourroman ⅳFourroman Ⅳfour.superior 4four.taboldstyle 4fraction ⁄franc ₣f.sc ff.superior ff_t 9g gG Ggamma γGamma Γgammalatin cgammalatin.superior àgbreve ğGbreve Ğgbreve.sc ğgcaron ǧGcaron Ǧgcircumflex ĝ

Gcircumflex Ĝgcommaaccent ģGcommaaccent Ģgdotaccent ġGdotaccent Ġgermandbls ßGermandbls germandbls.alt ßGermandbls.alt Ngermandbls.sc ßgermandbls.scalt ßgermandbls.ss03 ßg.inferior gglottalstopreversed ʕglottalstopreversed.superior ʕgradient ∇grave `greater >greaterequal ≥g.sc gg.superior gguillemotleft «

74

guillemotleft.sc «guillemotright »guillemotright.sc »guilsinglleft ‹guilsinglleft.sc ‹guilsinglright ›guilsinglright.sc ›h hH HH18533 ●H22073 □hairspace

h.alt hhbar ħHbar Ħhcircumflex ĥHcircumflex Ĥhhook ɦhhook.superior ɦh.inferior hhorizontalbar ―h.sc h

h.superior hhungarumlaut ˝hyphen -hyphen.cap -hyphendot 'hyphennobreak �hyphen.sc -hyphentwo ‐i iI Iiacute íIacute Íiacute.sc íibreve ĭIbreve Ĭicircumflex îIcircumflex Îicircumflex.sc îidieresis ïIdieresis Ïidieresis.sc ïIdotaccent İ

75

idotaccent.sc ¶Ifraktur ℑigrave ìIgrave Ìigrave.sc ìi.inferior iij ĳIJ Ĳij.sc ĳimacron īImacron Īinfinity ∞integral ∫interrobang =intersection ∩iogonek įIogonek Įiota ιIota Ιiotadieresis ϊIotadieresis Ϊiotadieresistonos ΐ

iotatonos ίIotatonos Ίi.sc ii.superior iitilde ĩItilde Ĩj jJ JJ.alt Jjcircumflex ĵJcircumflex Ĵj.inferior jj.sc jj.superior jk kK KK.alt Kkappa κKappa Κkcommaaccent ķKcommaaccent Ķkgreenlandic ĸ

76

k.inferior kkreis �k.sc kk.superior kl lL Llacute ĺLacute Ĺlacute.sc ĺlambda λLambda Λlcaron ľLcaron Ľlcaron.sc ľlcommaaccent ļLcommaaccent Ļldot ŀLdot Ŀless <lessequal ≤l.inferior llira ₤

logicaland ∧logicalnot ¬logicalor ∨longs ſlongs_s Elongs_t �lozenge ◊l.sc llslash łLslash Łlslash.sc łl.superior lm mM Mmacron ¯male ♂m.inferior mminus −minus.inferior −minus.superior −minute ′m.sc m

77

m.superior mmu µMu Μmultiply ×musicalnote ♪musicalnotedbl ♫n nN Nnacute ńNacute Ńnacute.sc ńnapostrophe ŉncaron ňNcaron Ňncaron.sc ňncommaaccent ņNcommaaccent ŅNearrow ×nine 9nine.fitted 9nine.inferior 9nine.oldstyle 9

nineroman ⅸNineroman Ⅸnine.superior 9nine.taboldstyle 9n.inferior nnotelement ∉notequal ≠notsubset ⊄n.sc nn.superior nntilde ñNtilde Ñntilde.sc ñnu νNu Νnumbersign #Nwarrow Öo oO Ooacute óOacute Óoacute.sc ó

78

obreve ŏObreve Ŏocircumflex ôOcircumflex Ôocircumflex.sc ôodieresis öOdieresis ÖOdieresis.alt Öodieresis.sc öoe œOE Œoe.sc œogonek ˛ograve òOgrave Òograve.sc òohorn ơOhorn Ơohungarumlaut őOhungarumlaut Őohungarumlaut.sc őo.inferior o

omacron ōOmacron Ōomega ωOmega Ωomega1 ϖomegatonos ώOmegatonos Ώomicron οOmicron Οomicrontonos όOmicrontonos Όone 1onedotenleader ․oneeighth ⅛onefifth Uone.fitted 1onehalf ½one.inferior 1onenumerator _one.oldstyle 1onequarter ¼oneroman ⅰ

79

Oneroman Ⅰonesixth Yone.superior 1one.taboldstyle 1onethird ⅓openbullet ◦ordfeminine ªordmasculine ºo.sc ooslash øOslash Øoslashacute ǿOslashacute Ǿoslash.sc øo.superior ootilde õOtilde Õotilde.sc õp pP Pparagraph ¶parenleft (

parenleft.inferior (parenleft.sc (parenleft.superior (parenright )parenright.inferior )parenright.sc )parenright.superior )partialdiff ∂percent %period .periodcentered ·perpendicular ⊥perthousand ‰perthousandzero �peseta ₧phi φPhi Φphi1 ϕpi πPi Πp.inferior pplus +

80

plus.inferior +plusminus ±plus.superior +primereversed ‵primetriple 4product ∏propersubset ⊂propersuperset ⊃proportional ∝p.sc ppsi ψPsi Ψp.superior ppunctuationspace �q qQ Qq.inferior qq.sc qq.superior qQ_u Hquestion ?questiondown ¿

questiondown.sc ¿question_exclam Hquestion_question Gquotedbl "quotedblbase „quotedblleft “quotedblrev �quotedblright ”quoteleft ‘quotereversed ‛quoteright ’quotesinglbase ‚quotesingle 'r rR Rracute ŕRacute Ŕracute.sc ŕradical √R.alt Rrcaron řRcaron Ř

81

rcaron.sc řrcommaaccent ŗRcommaaccent Ŗregistered ®Rfraktur ℜrho ρRho Ρrhookturned ɻrhookturned.superior ɻr.inferior rring ˚r.sc rRsmallcap Rsmallinverted ʁRsmallinverted.superior ʁr.superior rrturned ɹrturned.superior ɹs sS Ssacute śSacute Ś

sacute.sc śscaron šScaron Šscaron.sc šscedilla şScedilla Şscedilla.sc şscircumflex ŝScircumflex Ŝscommaaccent șScommaaccent Șscommaaccent.sc șSearrow Øsecond ″section §semicolon ;seven 7seveneighths ⅞seven.fitted 7seven.inferior 7seven.oldstyle 7sevenroman ⅶ

82

Sevenroman Ⅶseven.superior 7seven.taboldstyle 7sigma σSigma Σsigma1 ςsimilar ∼s.inferior ssix 6six.fitted 6six.inferior 6six.oldstyle 6sixperemspace �sixroman ⅵSixroman Ⅵsix.superior 6six.taboldstyle 6slash /space s.sc ss.superior ss_t �

sterling £suchthat ∋summation ∑Swarrow Ùt tT Ttau τTau Τtbar ŧTbar Ŧtbar.sc ŧtcaron ťTcaron Ťtcaron.sc ťtcedilla ţTcedilla Ţtcedilla.sc ţtcommaaccent ţTcommaaccent Ţtcommaaccent.sc ţtenroman ⅹTenroman Ⅹ

83

T_h Itheta θTheta Θtheta1 ϑthinspace thorn þThorn Þthorn.sc þthree 3threeeighths ⅜threefifths Wthree.fitted 3three.inferior 3three.oldstyle 3threeperemspace �threequarters ¾threeroman ⅲThreeroman Ⅲthree.superior 3three.taboldstyle 3tilde ˜t.inferior t

tonos ΄trademark ™triagdn ▼triagup ▲trianglebullet #t.sc tt.superior tt_t <Tux �twelveroman ⅻTwelveroman Ⅻtwo 2twodotenleader ‥twofifths Vtwo.fitted 2two.inferior 2two.oldstyle 2tworoman ⅱTworoman Ⅱtwo.superior 2two.taboldstyle 2twothirds ⅔

84

t_z Ju uU Uuacute úUacute Úuacute.sc úubreve ŭUbreve Ŭucircumflex ûUcircumflex Ûucircumflex.sc ûudieresis üUdieresis ÜUdieresis.alt Üudieresis.sc üugrave ùUgrave Ùugrave.sc ùuhorn ưUhorn Ưuhungarumlaut űUhungarumlaut Ű

uhungarumlaut.sc űu.inferior uumacron ūUmacron Ūunderscore _underscoredbl ‗uni00A0 uni00AD uni00B5 µuni0180 ƀuni0181 Ɓuni0182 Ƃuni0183 ƃuni0184 Ƅuni0185 ƅuni0186 Ɔuni0187 Ƈuni0188 ƈuni0189 Ɖuni018A Ɗuni018B Ƌuni018C ƌ

85

uni018D ƍuni018E Ǝuni018F Əuni0190 Ɛuni0191 Ƒuni0193 Ɠuni0194 Ɣuni0195 ƕuni0196 Ɩuni0197 Ɨuni0198 Ƙuni0199 ƙuni019A ƚuni019B ƛuni019C Ɯuni019D Ɲuni019E ƞuni019F Ɵuni01A2 Ƣuni01A3 ƣuni01A4 Ƥuni01A5 ƥ

uni01A6 Ʀuni01A7 Ƨuni01A8 ƨuni01A9 Ʃuni01AA ƪuni01AB ƫuni01AC Ƭuni01AD ƭuni01AE Ʈuni01B1 Ʊuni01B2 Ʋuni01B3 Ƴuni01B4 ƴuni01B5 Ƶuni01B6 ƶuni01B7 Ʒuni01B8 Ƹuni01B9 ƹuni01BA ƺuni01BB ƻuni01BC Ƽuni01BD ƽ

86

uni01BE ƾuni01BF ƿuni01C0 ǀuni01C1 ǁuni01C2 ǂuni01C3 ǃuni01C4 Ǆuni01C5 ǅuni01C6 ǆuni01C7 Ǉuni01C8 ǈuni01C9 ǉuni01CA Ǌuni01CB ǋuni01CC ǌuni01CD Ǎuni01CE ǎuni01CF Ǐuni01D0 ǐuni01D1 Ǒuni01D2 ǒuni01D3 Ǔ

uni01D4 ǔuni01D5 Ǖuni01D6 ǖuni01D7 Ǘuni01D8 ǘuni01D9 Ǚuni01DA ǚuni01DB Ǜuni01DC ǜuni01DD ǝuni01DE Ǟuni01DF ǟuni01E0 Ǡuni01E1 ǡuni01E2 Ǣuni01E3 ǣuni01E4 Ǥuni01E5 ǥuni01E8 Ǩuni01E9 ǩuni01EA Ǫuni01EB ǫ

87

uni01EC Ǭuni01ED ǭuni01EE Ǯuni01EF ǯuni01F0 ǰuni01F1 Ǳuni01F2 ǲuni01F3 ǳuni01F4 Ǵuni01F5 ǵuni01F6 Ƕuni01F7 Ƿuni01F8 Ǹuni01F9 ǹuni0200 Ȁuni0201 ȁuni0202 Ȃuni0203 ȃuni0204 Ȅuni0205 ȅuni0206 Ȇuni0207 ȇ

uni0208 Ȉuni0209 ȉuni020A Ȋuni020B ȋuni020C Ȍuni020D ȍuni020E Ȏuni020F ȏuni0210 Ȑuni0211 ȑuni0212 Ȓuni0213 ȓuni0214 Ȕuni0215 ȕuni0216 Ȗuni0217 ȗuni021C Ȝuni021D ȝuni021E Ȟuni021F ȟuni0220 Ƞuni0221 ȡ

88

uni0222 Ȣuni0223 ȣuni0224 Ȥuni0225 ȥuni0226 Ȧuni0227 ȧuni0228 Ȩuni0229 ȩuni022A Ȫuni022B ȫuni022C Ȭuni022D ȭuni022E Ȯuni022F ȯuni0230 Ȱuni0231 ȱuni0232 Ȳuni0233 ȳuni0234 ȴuni0235 ȵuni0236 ȶuni0238 ȸ

uni0239 ȹuni023A Ⱥuni023B Ȼuni023C ȼuni023D Ƚuni023E Ⱦuni023F ȿuni0241 Ɂuni0243 Ƀuni0250 ɐuni0251 ɑuni0252 ɒuni0253 ɓuni0254 ɔuni0255 ɕuni0256 ɖuni0257 ɗuni0258 ɘuni0259 əuni025A ɚuni025B ɛuni025C ɜ

89

uni025D ɝuni025E ɞuni025F ɟuni0260 ɠuni0261 ɡuni0262 ɢuni0264 ɤuni0265 ɥuni0267 ɧuni0268 ɨuni0269 ɩuni026A ɪuni026B ɫuni026C ɬuni026D ɭuni026E ɮuni026F ɯuni0270 ɰuni0271 ɱuni0272 ɲuni0273 ɳuni0274 ɴ

uni0275 ɵuni0276 ɶuni0277 ɷuni0278 ɸuni027A ɺuni027C ɼuni027D ɽuni027E ɾuni027F ɿuni0282 ʂuni0283 ʃuni0284 ʄuni0285 ʅuni0286 ʆuni0287 ʇuni0288 ʈuni0289 ʉuni028A ʊuni028B ʋuni028C ʌuni028D ʍuni028E ʎ

90

uni028F ʏuni0290 ʐuni0291 ʑuni0292 ʒuni0293 ʓuni0294 ʔuni0296 ʖuni0297 ʗuni0298 ʘuni0299 ʙuni029A ʚuni029B ʛuni029C ʜuni029D ʝuni029E ʞuni029F ʟuni02A0 ʠuni02A1 ʡuni02A2 ʢuni02A3 ʣuni02A4 ʤuni02A5 ʥ

uni02A6 ʦuni02A7 ʧuni02A8 ʨuni02A9 ʩuni02AA ʪuni02AB ʫuni02AC ʬuni02AD ʭuni02AE ʮuni02AF ʯuni02B9 ʹuni02BA ʺuni02BB ʻuni02BE ʾuni02BF ʿuni02C0 ˀuni02C1 ˁuni02C2 ˂uni02C3 ˃uni02C4 ˄uni02C5 ˅uni02C8 ˈ

91

uni02C9 ˉuni02CA ˊuni02CB ˋuni02CC ˌuni02CD ˍuni02CE ˎuni02CF ˏuni02D0 ːuni02D1 ˑuni02D2 ˒uni02D3 ˓uni02D4 ˔uni02D5 ˕uni02D6 ˖uni02D7 ˗uni02DE ˞uni02DF ˟uni02EC ˬuni02ED ˭uni02EE ˮuni0351 ͑uni0357 ͗

uni0364 ͤuni0374 ʹuni0375 ͵uni037A ͺuni037B ͻuni037C ͼuni037D ͽuni037E ;uni03D0 ϐuni03D3 ϓuni03D4 ϔuni03D7 ϗuni03D8 Ϙuni03D9 ϙuni03DA Ϛuni03DB ϛuni03DC Ϝuni03DD ϝuni03DE Ϟuni03DF ϟuni03E0 Ϡuni03E1 ϡ

92

uni03F0 ϰuni03F1 ϱuni03F2 ϲuni03F3 ϳuni03F4 ϴuni03F5 ϵuni03F6 ϶uni03F8 ϸuni03F9 Ϲuni03FB ϻuni03FD Ͻuni03FE Ͼuni03FF Ͽuni0400 Ѐuni040D Ѝuni0450 ѐuni045D ѝuni0460 Ѡuni0461 ѡuni0464 Ѥuni0465 ѥuni0466 Ѧ

uni0467 ѧuni0468 Ѩuni0469 ѩuni046A Ѫuni046B ѫuni046C Ѭuni046D ѭuni046E Ѯuni046F ѯuni0470 Ѱuni0471 ѱuni0476 Ѷuni0477 ѷuni047C Ѽuni047D ѽuni047E Ѿuni047F ѿuni048C Ҍuni048D ҍuni048E Ҏuni048F ҏuni0492 Ғ

93

uni0493 ғuni0494 Ҕuni0495 ҕuni0496 Җuni0497 җuni0498 Ҙuni0499 ҙuni049A Қuni049B қuni049C Ҝuni049D ҝuni049E Ҟuni049F ҟuni04A0 Ҡuni04A1 ҡuni04A2 Ңuni04A3 ңuni04A4 Ҥuni04A5 ҥuni04A6 Ҧuni04A7 ҧuni04A8 Ҩ

uni04A9 ҩuni04AA Ҫuni04AB ҫuni04AC Ҭuni04AD ҭuni04AE Үuni04AF үuni04B0 Ұuni04B1 ұuni04B2 Ҳuni04B3 ҳuni04B4 Ҵuni04B5 ҵuni04B6 Ҷuni04B7 ҷuni04B8 Ҹuni04B9 ҹuni04BA Һuni04BB һuni04BC Ҽuni04BD ҽuni04BE Ҿ

94

uni04BF ҿuni04C0 Ӏuni04C1 Ӂuni04C2 ӂuni04C3 Ӄuni04C4 ӄuni04C7 Ӈuni04C8 ӈuni04C9 Ӊuni04CA ӊuni04CB Ӌuni04CC ӌuni04D0 Ӑuni04D1 ӑuni04D2 Ӓuni04D3 ӓuni04D4 Ӕuni04D5 ӕuni04D6 Ӗuni04D7 ӗuni04D8 Әuni04DA Ӛ

uni04DB ӛuni04DC Ӝuni04DD ӝuni04DE Ӟuni04DF ӟuni04E0 Ӡuni04E1 ӡuni04E2 Ӣuni04E3 ӣuni04E4 Ӥuni04E5 ӥuni04E6 Ӧuni04E7 ӧuni04E8 Өuni04E9 өuni04EA Ӫuni04EB ӫuni04EC Ӭuni04ED ӭuni04EE Ӯuni04EF ӯuni04F0 Ӱ

95

uni04F1 ӱuni04F2 Ӳuni04F3 ӳuni04F4 Ӵuni04F5 ӵuni04F6 Ӷuni04F7 ӷuni04F8 Ӹuni04F9 ӹuni05C6 ׆uni05F3 ׳uni05F4 ״uni1E00 Ḁuni1E01 ḁuni1E02 Ḃuni1E03 ḃuni1E04 Ḅuni1E05 ḅuni1E06 Ḇuni1E07 ḇuni1E08 Ḉuni1E09 ḉ

uni1E0A Ḋuni1E0B ḋuni1E0C Ḍuni1E0D ḍuni1E0E Ḏuni1E0F ḏuni1E10 Ḑuni1E11 ḑuni1E12 Ḓuni1E13 ḓuni1E14 Ḕuni1E15 ḕuni1E16 Ḗuni1E17 ḗuni1E18 Ḙuni1E19 ḙuni1E1A Ḛuni1E1B ḛuni1E1C Ḝuni1E1D ḝuni1E1E Ḟuni1E1F ḟ

96

uni1E20 Ḡuni1E21 ḡuni1E22 Ḣuni1E23 ḣuni1E24 Ḥuni1E25 ḥuni1E26 Ḧuni1E27 ḧuni1E28 Ḩuni1E29 ḩuni1E2A Ḫuni1E2B ḫuni1E2C Ḭuni1E2D ḭ

uni1E2E Ḯuni1E2F ḯuni1E30 Ḱuni1E31 ḱuni1E32 Ḳuni1E33 ḳuni1E34 Ḵuni1E35 ḵ

uni1E36 Ḷuni1E37 ḷuni1E38 Ḹuni1E39 ḹuni1E3A Ḻuni1E3B ḻuni1E3C Ḽuni1E3D ḽuni1E3E Ḿuni1E3F ḿuni1E40 Ṁuni1E41 ṁuni1E42 Ṃuni1E43 ṃuni1E44 Ṅuni1E45 ṅuni1E46 Ṇuni1E47 ṇuni1E48 Ṉuni1E49 ṉuni1E4A Ṋuni1E4B ṋ

97

uni1E4C Ṍuni1E4D ṍuni1E4E Ṏuni1E4F ṏuni1E50 Ṑuni1E51 ṑuni1E52 Ṓuni1E53 ṓuni1E54 Ṕuni1E55 ṕuni1E56 Ṗuni1E57 ṗuni1E58 Ṙuni1E59 ṙuni1E5A Ṛuni1E5B ṛuni1E5C Ṝuni1E5D ṝuni1E5E Ṟuni1E5F ṟuni1E60 Ṡuni1E61 ṡ

uni1E62 Ṣuni1E63 ṣuni1E64 Ṥuni1E65 ṥ

uni1E66 Ṧuni1E67 ṧuni1E68 Ṩuni1E69 ṩuni1E6A Ṫuni1E6B ṫuni1E6C Ṭuni1E6D ṭuni1E6E Ṯuni1E6F ṯuni1E70 Ṱuni1E71 ṱuni1E72 Ṳuni1E73 ṳuni1E74 Ṵuni1E75 ṵuni1E76 Ṷuni1E77 ṷ

98

uni1E78 Ṹuni1E79 ṹuni1E7A Ṻuni1E7B ṻuni1E7C Ṽuni1E7D ṽuni1E7E Ṿuni1E7F ṿuni1E86 Ẇuni1E87 ẇuni1E88 Ẉuni1E89 ẉuni1E8A Ẋuni1E8B ẋuni1E8C Ẍuni1E8D ẍuni1E8E Ẏuni1E8F ẏuni1E90 Ẑuni1E91 ẑuni1E92 Ẓuni1E93 ẓ

uni1E94 Ẕuni1E95 ẕuni1E96 ẖuni1E97 ẗuni1E98 ẘuni1E99 ẙuni1E9A ẚuni1E9B ẛuni1E9C ẜuni1E9D ẝuni1E9F ẟuni1EA0 Ạuni1EA1 ạuni1EA2 Ảuni1EA3 ảuni1EA4 Ấuni1EA5 ấuni1EA6 Ầuni1EA7 ầuni1EA8 Ẩuni1EA9 ẩ

uni1EAA Ẫ99

uni1EAB ẫuni1EAC Ậuni1EAD ậ

uni1EAE Ắuni1EAF ắ

uni1EB0 Ằuni1EB1 ằ

uni1EB2 Ẳuni1EB3 ẳ

uni1EB4 Ẵuni1EB5 ẵuni1EB6 Ặuni1EB7 ặuni1EB8 Ẹuni1EB9 ẹuni1EBA Ẻuni1EBB ẻuni1EBC Ẽuni1EBD ẽ

uni1EBE Ếuni1EBF ế

uni1EC0 Ềuni1EC1 ềuni1EC2 Ểuni1EC3 ể

uni1EC4 Ễuni1EC5 ễuni1EC6 Ệuni1EC7 ệuni1EC8 Ỉuni1EC9 ỉuni1ECA Ịuni1ECB ịuni1ECC Ọuni1ECD ọuni1ECE Ỏuni1ECF ỏuni1ED0 Ốuni1ED1 ốuni1ED2 Ồuni1ED3 ồuni1ED4 Ổuni1ED5 ổ

100

uni1ED6 Ỗuni1ED7 ỗuni1ED8 Ộuni1ED9 ộuni1EDA Ớuni1EDB ớuni1EDC Ờuni1EDD ờuni1EDE Ởuni1EDF ởuni1EE0 Ỡuni1EE1 ỡuni1EE2 Ợuni1EE3 ợuni1EE4 Ụuni1EE5 ụuni1EE6 Ủuni1EE7 ủuni1EE8 Ứuni1EE9 ứuni1EEA Ừuni1EEB ừ

uni1EEC Ửuni1EED ửuni1EEE Ữuni1EEF ữuni1EF0 Ựuni1EF1 ựuni1EF4 Ỵuni1EF5 ỵuni1EF6 Ỷuni1EF7 ỷuni1EF8 Ỹuni1EF9 ỹuni1EFA Ỻuni1EFB ỻuni1EFC Ỽuni1EFD ỽuni1EFE Ỿuni1EFF ỿuni1F00 ἀuni1F01 ἁuni1F02 ἂuni1F03 ἃ

101

uni1F04 ἄuni1F05 ἅuni1F06 ἆuni1F07 ἇuni1F08 Ἀuni1F09 Ἁuni1F0A Ἂuni1F0B Ἃuni1F0C Ἄuni1F0D Ἅuni1F0E Ἆuni1F0F Ἇuni1F10 ἐuni1F11 ἑuni1F12 ἒuni1F13 ἓuni1F14 ἔuni1F15 ἕuni1F18 Ἐuni1F19 Ἑuni1F1A Ἒuni1F1B Ἓ

uni1F1C Ἔuni1F1D Ἕuni1F20 ἠuni1F21 ἡuni1F22 ἢuni1F23 ἣuni1F24 ἤuni1F25 ἥuni1F26 ἦuni1F27 ἧuni1F28 Ἠuni1F29 Ἡuni1F2A Ἢuni1F2B Ἣuni1F2C Ἤuni1F2D Ἥuni1F2E Ἦuni1F2F Ἧuni1F30 ἰuni1F31 ἱuni1F32 ἲuni1F33 ἳ

102

uni1F34 ἴuni1F35 ἵuni1F36 ἶuni1F37 ἷuni1F38 Ἰuni1F39 Ἱuni1F3A Ἲuni1F3B Ἳuni1F3C Ἴuni1F3D Ἵuni1F3E Ἶuni1F3F Ἷuni1F40 ὀuni1F41 ὁuni1F42 ὂuni1F43 ὃuni1F44 ὄuni1F45 ὅuni1F48 Ὀuni1F49 Ὁuni1F4A Ὂuni1F4B Ὃ

uni1F4C Ὄuni1F4D Ὅuni1F50 ὐuni1F51 ὑuni1F52 ὒuni1F53 ὓuni1F54 ὔuni1F55 ὕuni1F56 ὖuni1F57 ὗuni1F59 Ὑuni1F5B Ὓuni1F5D Ὕuni1F5F Ὗuni1F60 ὠuni1F61 ὡuni1F62 ὢuni1F63 ὣuni1F64 ὤuni1F65 ὥuni1F66 ὦuni1F67 ὧ

103

uni1F68 Ὠuni1F69 Ὡuni1F6A Ὢuni1F6B Ὣuni1F6C Ὤuni1F6D Ὥuni1F6E Ὦuni1F6F Ὧuni1F70 ὰuni1F71 άuni1F72 ὲuni1F73 έuni1F74 ὴuni1F75 ήuni1F76 ὶuni1F77 ίuni1F78 ὸuni1F79 όuni1F7A ὺuni1F7B ύuni1F7C ὼuni1F7D ώ

uni1F80 ᾀuni1F81 ᾁuni1F82 ᾂuni1F83 ᾃuni1F84 ᾄuni1F85 ᾅuni1F86 ᾆuni1F87 ᾇuni1F88 ᾈuni1F89 ᾉuni1F8A ᾊuni1F8B ᾋuni1F8C ᾌuni1F8D ᾍuni1F8E ᾎuni1F8F ᾏuni1F90 ᾐuni1F91 ᾑuni1F92 ᾒuni1F93 ᾓuni1F94 ᾔuni1F95 ᾕ

104

uni1F96 ᾖuni1F97 ᾗuni1F98 ᾘuni1F99 ᾙuni1F9A ᾚuni1F9B ᾛuni1F9C ᾜuni1F9D ᾝuni1F9E ᾞuni1F9F ᾟuni1FA0 ᾠuni1FA1 ᾡuni1FA2 ᾢuni1FA3 ᾣuni1FA4 ᾤuni1FA5 ᾥuni1FA6 ᾦuni1FA7 ᾧuni1FA8 ᾨuni1FA9 ᾩuni1FAA ᾪuni1FAB ᾫ

uni1FAC ᾬuni1FAD ᾭuni1FAE ᾮuni1FAF ᾯuni1FB0 ᾰuni1FB1 ᾱuni1FB2 ᾲuni1FB3 ᾳuni1FB4 ᾴuni1FB6 ᾶuni1FB7 ᾷuni1FB8 Ᾰuni1FB9 Ᾱuni1FBA Ὰuni1FBB Άuni1FBC ᾼuni1FBD ᾽uni1FBE ιuni1FBF ᾿uni1FC0 ῀uni1FC1 ῁uni1FC2 ῂ

105

uni1FC3 ῃuni1FC4 ῄuni1FC6 ῆuni1FC7 ῇuni1FC8 Ὲuni1FC9 Έuni1FCA Ὴuni1FCB Ήuni1FCC ῌuni1FCD ῍uni1FCE ῎uni1FCF ῏uni1FD0 ῐuni1FD1 ῑuni1FD2 ῒuni1FD3 ΐuni1FD6 ῖuni1FD7 ῗuni1FD8 Ῐuni1FD9 Ῑuni1FDA Ὶuni1FDB Ί

uni1FDD ῝uni1FDE ῞uni1FDF ῟uni1FE0 ῠuni1FE1 ῡuni1FE2 ῢuni1FE3 ΰuni1FE4 ῤuni1FE5 ῥuni1FE6 ῦuni1FE7 ῧuni1FE8 Ῠuni1FE9 Ῡuni1FEA Ὺuni1FEB Ύuni1FEC Ῥuni1FED ῭uni1FEE ΅uni1FEF `uni1FF2 ῲuni1FF3 ῳuni1FF4 ῴ

106

uni1FF6 ῶuni1FF7 ῷuni1FF8 Ὸuni1FF9 Όuni1FFA Ὼuni1FFB Ώuni1FFC ῼuni1FFD ´uni1FFE ῾uni2016 ‖uni202F  uni2031 ‱uni2036 ‶uni2037 ‷uni203B ※uni203E ‾uni2042 ⁂uni204A ⁊uni204B ⁋uni204F ⁏uni2094 ₔuni2098 ₘ

uni2099 ₙuni20A2 ₢uni20A8 ₨uni20AF ₯uni20B1 ₱uni2100 ℀uni2101 ℁uni2102 ℂuni2106 ℆uni210C ℌuni210D ℍuni210E ℎuni210F ℏuni2115 ℕuni2119 ℙuni211A ℚuni211D ℝuni2120 ℠uni2124 ℤuni2126 Ωuni2127 ℧uni2136 ℶ

107

uni2137 ℷuni2138 ℸuni2139 ℹuni214F ⅏uni216C Ⅼuni216D Ⅽuni216E Ⅾuni216F Ⅿuni217C ⅼuni217D ⅽuni217E ⅾuni217F ⅿuni2180 ↀuni2181 ↁuni2182 ↂuni2183 Ↄuni2184 ↄuni2196 ↖uni2197 ↗uni2198 ↘uni2199 ↙uni219A ↚

uni219B ↛uni21A6 ↦uni21AE ↮uni21BC ↼uni21BD ↽uni21C0 ⇀uni21C1 ⇁uni21CB ⇋uni21CC ⇌uni21CD ⇍uni21CE ⇎uni21CF ⇏uni21D5 ⇕uni2201 ∁uni2204 ∄uni2206 ∆uni220A ∊uni220C ∌uni220D ∍uni2210 ∐uni2213 ∓uni2214 ∔

108

uni2215 ∕uni2216 ∖uni2218 ∘uni2219 ∙uni221B ∛uni221C ∜uni221F ∟uni2223 ∣uni2224 ∤uni2225 ∥uni2226 ∦uni2236 ∶uni2241 ≁uni2249 ≉uni2259 ≙uni2262 ≢uni226A ≪uni226B ≫uni226E ≮uni226F ≯uni2270 ≰uni2271 ≱

uni2285 ⊅uni2296 ⊖uni2298 ⊘uni22A2 ⊢uni22A3 ⊣uni22A4 ⊤uni22A6 ⊦uni22EE ⋮uni22EF ⋯uni2300 ⌀uni2302 ⌂uni2303 ⌃uni2310 ⌐uni2320 ⌠uni2321 ⌡uni2326 ⌦uni2327 ⌧uni2329 〈uni232A 〉uni232B ⌫uni237D ⍽uni2380 ⎀

109

uni23D3 ⏓uni2423 ␣uni2460 ①uni2461 ②uni2462 ③uni2463 ④uni2464 ⑤uni2465 ⑥uni2466 ⑦uni2467 ⑧uni2468 ⑨uni2469 ⑩uni246A ⑪uni246B ⑫uni246C ⑬uni246D ⑭uni246E ⑮uni246F ⑯uni2470 ⑰uni2471 ⑱uni2472 ⑲uni2473 ⑳

uni2474 ⑴uni2475 ⑵uni2476 ⑶uni2477 ⑷uni2478 ⑸uni2479 ⑹uni247A ⑺uni247B ⑻uni247C ⑼uni247D ⑽uni247E ⑾uni247F ⑿uni2480 ⒀uni2481 ⒁uni2482 ⒂uni2483 ⒃uni2484 ⒄uni2485 ⒅uni2486 ⒆uni2487 ⒇uni24B6 Ⓐuni24B7 Ⓑ

110

uni24B8 Ⓒuni24B9 Ⓓuni24BA Ⓔuni24BB Ⓕuni24BC Ⓖuni24BD Ⓗuni24BE Ⓘuni24BF Ⓙuni24C0 Ⓚuni24C1 Ⓛuni24C2 Ⓜuni24C3 Ⓝuni24C4 Ⓞuni24C5 Ⓟuni24C6 Ⓠuni24C7 Ⓡuni24C8 Ⓢuni24C9 Ⓣuni24CA Ⓤuni24CB Ⓥuni24CC Ⓦuni24CD Ⓧ

uni24CE Ⓨuni24CF Ⓩuni24D0 ⓐuni24D1 ⓑuni24D2 ⓒuni24D3 ⓓuni24D4 ⓔuni24D5 ⓕuni24D6 ⓖuni24D7 ⓗuni24D8 ⓘuni24D9 ⓙuni24DA ⓚuni24DB ⓛuni24DC ⓜuni24DD ⓝuni24DE ⓞuni24DF ⓟuni24E0 ⓠuni24E1 ⓡuni24E2 ⓢuni24E3 ⓣ

111

uni24E4 ⓤuni24E5 ⓥuni24E6 ⓦuni24E7 ⓧuni24E8 ⓨuni24E9 ⓩuni24EA ⓪uni24EB ⓫uni24EC ⓬uni24ED ⓭uni24EE ⓮uni24EF ⓯uni24F0 ⓰uni24F1 ⓱uni24F2 ⓲uni24F3 ⓳uni24F4 ⓴uni24F5 ⓵uni24F6 ⓶uni24F7 ⓷uni24F8 ⓸uni24F9 ⓹

uni24FA ⓺uni24FB ⓻uni24FC ⓼uni24FD ⓽uni24FE ⓾uni24FF ⓿uni25B3 △uni25B6 ▶uni25B7 ▷uni25BD ▽uni25C0 ◀uni25C1 ◁uni25C6 ◆uni25C7 ◇uni25C9 ◉uni25CE ◎uni25D0 ◐uni25D1 ◑uni25D2 ◒uni25D3 ◓uni25D4 ◔uni25D5 ◕

112

uni25D6 ◖uni25D7 ◗uni2605 ★uni2619 ☙uni261B ☛uni261E ☞uni2627 ☧uni262F ☯uni2639 ☹uni263A ☺uni263B ☻uni263C ☼uni263D ☽uni263E ☾uni263F ☿uni2641 ♁uni2643 ♃uni2644 ♄uni2645 ♅uni2646 ♆uni2647 ♇uni2648 ♈

uni2649 ♉uni264A ♊uni264B ♋uni264C ♌uni264D ♍uni264E ♎uni264F ♏uni2650 ♐uni2651 ♑uni2652 ♒uni2653 ♓uni2660 ♠uni2663 ♣uni2665 ♥uni2666 ♦uni2669 ♩uni266C ♬uni2695 ⚕uni2698 ⚘uni26A2 ⚢uni26A3 ⚣uni26A4 ⚤

113

uni26A5 ⚥uni26AD ⚭uni2767 ❧uni2776 ❶uni2777 ❷uni2778 ❸uni2779 ❹uni277A ❺uni277B ❻uni277C ❼uni277D ❽uni277E ❾uni277F ❿uni27C2 ⟂uni27E6 ⟦uni27E7 ⟧uni2C60 Ⱡuni2C61 ⱡuni2C62 Ɫuni2C63 Ᵽuni2C64 Ɽuni2C65 ⱥ

uni2C66 ⱦuni2C67 Ⱨuni2C68 ⱨuni2C69 Ⱪuni2C6A ⱪuni2C6B Ⱬuni2C6C ⱬuni2C74 ⱴuni2C75 Ⱶuni2C76 ⱶuni2C77 ⱷuniA720 ꜠uniA721 ꜡uniE001 uniE002 uniE003 uniE004 uniE005 uniE006 uniE007 uniE008 uniE009

114

uniE00A uniE00B uniE040 uniE041 uniE04F uniE06B uniE0CB uniE0E8 uniE0EE uniE0EF uniE0F0 uniE0F2 uniE0F3 uniE0F4 uniE0F5 uniE0F9 uniE0FB uniE101 uniE104 uniE105 uniE106 uniE107

uniE128 uniE129 uniE12A uniE130 uniF6BE uniFFFD �union ∪universal ∀uogonek ųUogonek Ųupsilon υUpsilon ΥUpsilon1 ϒupsilondieresis ϋUpsilondieresis Ϋupsilondieresistonos ΰupsilontonos ύUpsilontonos Ύuring ůUring Ůuring.sc ůu.sc u

115

u.superior uutilde ũUtilde Ũv vV VV.alt Vv.inferior vv.sc vv.superior vw wW Wwacute ẃWacute Ẃw.alt wW.alt Wwcircumflex ŵWcircumflex Ŵwdieresis ẅWdieresis Ẅwgrave ẁWgrave Ẁw.inferior w

w.sc ww.superior wx xX Xxi ξXi Ξx.inferior xx.sc xx.superior xy yY Yyacute ýYacute Ýyacute.sc ýy.alt yycircumflex ŷYcircumflex Ŷydieresis ÿYdieresis Ÿydieresis.sc ÿyen ¥Yen.fitted �

116

ygrave ỳYgrave Ỳy.inferior yy.sc yy.superior yz zZ Zzacute źZacute Źzacute.sc źzcaron žZcaron Žzcaron.sc žzdotaccent żZdotaccent Ż

zdotaccent.sc ż

zero 0

zero.fitted 0

zero.inferior 0

zero.oldstyle 0

zero.slash 0

zero.slashfitted 0

zero.superior 0

zero.taboldstyle 0

zeta ζ

Zeta Ζ

z.inferior z

z.sc z

z.superior z

117

4 Fonttabellen

T1 – fxb – m – n

(m) normal - (n) normal

0 ` 1 ´ 2 ˆ 3 ˜ 4 ¨ 5 ˝ 6 ˚ 7 ˇ8 ˘ 9 ¯ 10 ˙ 11 ¸ 12 ˛ 13 ‚ 14 ‹ 15 ›16 “ 17 ” 18 „ 19 « 20 » 21 – 22 — 2324 � 25 ı 26 27 U 28 V 29 W 30 X 31 Y32 33 ! 34 " 35 # 36 $ 37 % 38 & 39 ’40 ( 41 ) 42 * 43 + 44 , 45 - 46 . 47 /48 0 49 1 50 2 51 3 52 4 53 5 54 6 55 756 8 57 9 58 : 59 ; 60 < 61 = 62 > 63 ?64 @ 65 A 66 B 67 C 68 D 69 E 70 F 71 G72 H 73 I 74 J 75 K 76 L 77 M 78 N 79 O80 P 81 Q 82 R 83 S 84 T 85 U 86 V 87 W88 X 89 Y 90 Z 91 [ 92 \ 93 ] 94 ^ 95 _96 ‘ 97 a 98 b 99 c 100 d 101 e 102 f 103 g104 h 105 i 106 j 107 k 108 l 109 m 110 n 111 o112 p 113 q 114 r 115 s 116 t 117 u 118 v 119 w120 x 121 y 122 z 123 { 124 | 125 } 126 ~ 127 -128 Ă 129 Ą 130 Ć 131 Č 132 Ď 133 Ě 134 Ę 135 Ğ136 Ĺ 137 Ľ 138 Ł 139 Ń 140 Ň 141 Ŋ 142 Ő 143 Ŕ144 Ř 145 Ś 146 Š 147 Ş 148 Ť 149 Ţ 150 Ű 151 Ů152 Ÿ 153 Ź 154 Ž 155 Ż 156 Ĳ 157 İ 158 đ 159 §160 ă 161 ą 162 ć 163 č 164 ď 165 ě 166 ę 167 ğ168 ĺ 169 ľ 170 ł 171 ń 172 ň 173 ŋ 174 ő 175 ŕ176 ř 177 ś 178 š 179 ş 180 ť 181 ţ 182 ű 183 ů184 ÿ 185 ź 186 ž 187 ż 188 ĳ 189 ¡ 190 ¿ 191 £192 À 193 Á 194 Â 195 Ã 196 Ä 197 Å 198 Æ 199 Ç200 È 201 É 202 Ê 203 Ë 204 Ì 205 Í 206 Î 207 Ï208 Ð 209 Ñ 210 Ò 211 Ó 212 Ô 213 Õ 214 Ö 215 Œ216 Ø 217 Ù 218 Ú 219 Û 220 Ü 221 Ý 222 Þ 223 224 à 225 á 226 â 227 ã 228 ä 229 å 230 æ 231 ç232 è 233 é 234 ê 235 ë 236 ì 237 í 238 î 239 ï240 ð 241 ñ 242 ò 243 ó 244 ô 245 õ 246 ö 247 œ248 ø 249 ù 250 ú 251 û 252 ü 253 ý 254 þ 255 ß

118

T1 – fxb – b – n

(b) bold - (n) normal


119

T1 – fxb – m – sc

(m) normal - (sc) caps

0 ` 1 ´ 2 ˆ 3 ˜ 4 ¨ 5 ˝ 6 ˚ 7 ˇ8 ˘ 9 ¯ 10 ˙ 11 ¸ 12 ˛ 13 ‚ 14 ‹ 15 ›16 “ 17 ” 18 „ 19 « 20 » 21 – 22 — 2324 � 25 i 26 j 27 ff 28 fi 29 fl 30 ffi 31 ffl32 33 ! 34 " 35 # 36 $ 37 % 38 & 39 ’40 ( 41 ) 42 * 43 + 44 , 45 - 46 . 47 /48 0 49 1 50 2 51 3 52 4 53 5 54 6 55 756 8 57 9 58 : 59 ; 60 < 61 = 62 > 63 ?64 @ 65 A 66 B 67 C 68 D 69 E 70 F 71 G72 H 73 I 74 J 75 K 76 L 77 M 78 N 79 O80 P 81 Q 82 R 83 S 84 T 85 U 86 V 87 W88 X 89 Y 90 Z 91 [ 92 \ 93 ] 94 ^ 95 _96 ‘ 97 a 98 b 99 c 100 d 101 e 102 f 103 g104 h 105 i 106 j 107 k 108 l 109 m 110 n 111 o112 p 113 q 114 r 115 s 116 t 117 u 118 v 119 w120 x 121 y 122 z 123 { 124 | 125 } 126 ~ 127 -128 Ă 129 Ą 130 Ć 131 Č 132 Ď 133 Ě 134 Ę 135 Ğ136 Ĺ 137 Ľ 138 Ł 139 Ń 140 Ň 141 Ŋ 142 Ő 143 Ŕ144 Ř 145 Ś 146 Š 147 Ş 148 Ť 149 Ţ 150 Ű 151 Ů152 Ÿ 153 Ź 154 Ž 155 Ż 156 IJ 157 İ 158 đ 159 §160 ă 161 ą 162 ć 163 č 164 ď 165 ě 166 ę 167 ğ168 ĺ 169 ľ 170 ł 171 ń 172 ň 173 ŋ 174 ő 175 ŕ176 ř 177 ś 178 š 179 ş 180 ť 181 ţ 182 ű 183 ů184 ÿ 185 ź 186 ž 187 ż 188 ĳ 189 ¡ 190 ¿ 191 £192 À 193 Á 194 Â 195 Ã 196 Ä 197 Å 198 Æ 199 Ç200 È 201 É 202 Ê 203 Ë 204 Ì 205 Í 206 Î 207 Ï208 Ð 209 Ñ 210 Ò 211 Ó 212 Ô 213 Õ 214 Ö 215 Œ216 Ø 217 Ù 218 Ú 219 Û 220 Ü 221 Ý 222 Þ 223 224 à 225 á 226 â 227 ã 228 ä 229 å 230 æ 231 ç232 è 233 é 234 ê 235 ë 236 ì 237 í 238 î 239 ï240 ð 241 ñ 242 ò 243 ó 244 ô 245 õ 246 ö 247 œ248 ø 249 ù 250 ú 251 û 252 ü 253 ý 254 þ 255 ß

120

T1 – fxb – b – sc

(b) bold - (sc) caps


121

T1 – fxbf – m – n



122

T1 – fxbf – b – n



123

T1 – fxbf – m – sc

(m) normal - (sc) caps


124

T1 – fxbf – b – sc

(b) bold - (sc) caps


125

T1 – fxbj – m – n



126

T1 – fxbj – b – n


0 ` 1 ´ 2 ˆ 3 ˜ 4 ¨ 5 ˝ 6 ˚ 7 ˇ8 ˘ 9 ¯ 10 ˙ 11 ¸ 12 ˛ 13 ‚ 14 ‹ 15 ›16 “ 17 ” 18 „ 19 « 20 » 21 – 22 — 2324 � 25 ı 26 27 U 28 V 29 W 30 X 31 Y32 33 ! 34 " 35 # 36 $ 37 % 38 & 39 ’40 ( 41 ) 42 * 43 + 44 , 45 - 46 . 47 /48 0 49 1 50 2 51 3 52 4 53 5 54 6 55 756 8 57 9 58 : 59 ; 60 < 61 = 62 > 63 ?64 @ 65 A 66 B 67 C 68 D 69 E 70 F 71 G72 H 73 I 74 J 75 K 76 L 77 M 78 N 79 O80 P 81 Q 82 R 83 S 84 T 85 U 86 V 87 W88 X 89 Y 90 Z 91 [ 92 \ 93 ] 94 ^ 95 _96 ‘ 97 a 98 b 99 c 100 d 101 e 102 f 103 g104 h 105 i 106 j 107 k 108 l 109 m 110 n 111 o112 p 113 q 114 r 115 s 116 t 117 u 118 v 119 w120 x 121 y 122 z 123 { 124 | 125 } 126 ~ 127 -128 Ă 129 Ą 130 Ć 131 Č 132 Ď 133 Ě 134 Ę 135 Ğ136 Ĺ 137 Ľ 138 Ł 139 Ń 140 Ň 141 Ŋ 142 Ő 143 Ŕ144 Ř 145 Ś 146 Š 147 Ş 148 Ť 149 Ţ 150 Ű 151 Ů152 Ÿ 153 Ź 154 Ž 155 Ż 156 Ĳ 157 İ 158 đ 159 §160 ă 161 ą 162 ć 163 č 164 ď 165 ě 166 ę 167 ğ168 ĺ 169 ľ 170 ł 171 ń 172 ň 173 ŋ 174 ő 175 ŕ176 ř 177 ś 178 š 179 ş 180 ť 181 ţ 182 ű 183 ů184 ÿ 185 ź 186 ž 187 ż 188 ĳ 189 ¡ 190 ¿ 191 £192 À 193 Á 194 Â 195 Ã 196 Ä 197 Å 198 Æ 199 Ç200 È 201 É 202 Ê 203 Ë 204 Ì 205 Í 206 Î 207 Ï208 Ð 209 Ñ 210 Ò 211 Ó 212 Ô 213 Õ 214 Ö 2

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