Wikipedija:Formule

Matematičke (i druge) formule na Wikipediji se pišu pomoću kôda preuzetog iz uređivačkog programa TeX (vidi: LaTeX). Taj se kôd kod prikazivanja stranice pretvara u HTML kôd (koji se onda prikazuje znak po znak) ili u sliku ekstenzije PNG, ovisno o tome kako je namješteno u postavkama.

Sintaksa

Kôd se upisuje unutar <math> ... </math>, što je dostupno i na traci s alatima (gumb [math]\displaystyle{ \sqrt{n} }[/math]). Slično kao i u HTML-u, višak razmaka i prelazak u novi red se ignoriraju. Wikipedijini alati (npr. podebljan/kurzivni tekst, predlošci, tablice, potpis, određivanje podnaslova itd.) ne rade unutar kôda za matematičke formule.

Prikazivanje

Kad se formula prikazuje u PNG formatu, dobije se crn tekst na bijeloj pozadini (ne prozirnoj). To ne ovisi o pregledniku. Veličina i oblik teksta se razlikuje od normalnog teksta (onog izvan kôda za matematičke formule), a problem je i vertikalno poravnavanje.

Ako želite da se formula prikaže u PNG formatu iako je dovoljno jednostavna da se može prikazati i u HTML formatu, na kraj formule dodajte \!,

Razlike između HTML i TeX kôda

Nekad je jednostavnije koristiti HTML kôd, ali on često nije dovoljno dobar, kao što je prikazano u sljedećoj tablici:

TeX kôd	prikaz u PNG formatu	HTML kôd	prikaz kao HTML
`<math>\alpha\,</math>`	[math]\displaystyle{ \alpha\, }[/math]	`α`	α
`<math>\sqrt{2}</math>`	[math]\displaystyle{ \sqrt{2} }[/math]	`√2`	√2
`<math>\sqrt{1-e^2}</math>`	[math]\displaystyle{ \sqrt{1-e^2} }[/math]	`√(1−''e''²)`	√(1−e²)

Za posebne znakove, eksponente i indekse, vidi Wikipedija:Kako uređivati stranicu#Vrste slova i pisanja.

Zašto HTML

Formule pisane unutar teksta uvijek su pravilno vertikalno poravnane.
Uvijek su iste veličine i oblika teksta i boje pozadine kao i ostatak teksta.
Stranica se brže učitava.

Zašto TeX

Kôd je jednostavnije pisati, i estetski više zadovoljava.
TeX kôd se može pretvoriti u HTML pa se kod jednostavnih formula mogu iskoristiti sve pogodnosti HTML-a.
Može se pretvoriti u MathML i koristiti u preglednicima koji ga podržavaju. (vidi: MathML (engl.) )
Nema razlike u prikazu kod različitih preglednika ili različitih verzija HTML-a.

Funkcije, simboli, posebni znakovi

Naglasci/dijakritici
`\acute{a} \grave{a} \hat{a} \tilde{a} \breve{a}`	[math]\displaystyle{ \acute{a} \grave{a} \hat{a} \tilde{a} \breve{a}\,\! }[/math]
`\check{a} \bar{a} \ddot{a} \dot{a}`	[math]\displaystyle{ \check{a} \bar{a} \ddot{a} \dot{a}\,\! }[/math]
Standardne funkcije
`\sin a \cos b \tan c`	[math]\displaystyle{ \sin a \cos b \tan c\,\! }[/math]
`\sec d \csc e \cot f`	[math]\displaystyle{ \sec d \csc e \cot f\,\! }[/math]
`\arcsin h \arccos i \arctan j`	[math]\displaystyle{ \arcsin h \arccos i \arctan j\,\! }[/math]
`\sinh k \cosh l \tanh m \coth n`	[math]\displaystyle{ \sinh k \cosh l \tanh m \coth n\,\! }[/math]
`\operatorname{sh}o \operatorname{ch}p \operatorname{th}q`	[math]\displaystyle{ \operatorname{sh}o \operatorname{ch}p \operatorname{th}q\,\! }[/math]
`\operatorname{argsh}r \operatorname{argch}s \operatorname{argth}t`	[math]\displaystyle{ \operatorname{argsh}r \operatorname{argch}s \operatorname{argth}t\,\! }[/math]
`\lim u \limsup v \liminf w \min x \max y`	[math]\displaystyle{ \lim u \limsup v \liminf w \min x \max y\,\! }[/math]
`\inf z \sup a \exp b \ln c \lg d \log e \log_{10} f \ker g`	[math]\displaystyle{ \inf z \sup a \exp b \ln c \lg d \log e \log_{10} f \ker g\,\! }[/math]
`\deg h \gcd i \Pr j \det k \hom l \arg m \dim n`	[math]\displaystyle{ \deg h \gcd i \Pr j \det k \hom l \arg m \dim n\,\! }[/math]
Modularna aritmetika
`s_k \equiv 0 \pmod{m} a \bmod b`	[math]\displaystyle{ s_k \equiv 0 \pmod{m} a \bmod b\,\! }[/math]
Derivacije
`\nabla \partial x dx \dot x \ddot y`	[math]\displaystyle{ \nabla \partial x dx \dot x \ddot y\,\! }[/math]
Skupovi
`\forall \exists \empty \emptyset \varnothing`	[math]\displaystyle{ \forall \exists \empty \emptyset \varnothing\,\! }[/math]
`\in \ni \not \in \notin \subset \subseteq \supset \supseteq`	[math]\displaystyle{ \in \ni \not \in \notin \subset \subseteq \supset \supseteq\,\! }[/math]
`\cap \bigcap \cup \bigcup \biguplus \setminus \smallsetminus`	[math]\displaystyle{ \cap \bigcap \cup \bigcup \biguplus \setminus \smallsetminus\,\! }[/math]
`\sqsubset \sqsubseteq \sqsupset \sqsupseteq \sqcap \sqcup \bigsqcup`	[math]\displaystyle{ \sqsubset \sqsubseteq \sqsupset \sqsupseteq \sqcap \sqcup \bigsqcup\,\! }[/math]
Operatori
`+ \oplus \bigoplus \pm \mp -`	[math]\displaystyle{ + \oplus \bigoplus \pm \mp - \,\! }[/math]
`\times \otimes \bigotimes \cdot \circ \bullet \bigodot`	[math]\displaystyle{ \times \otimes \bigotimes \cdot \circ \bullet \bigodot\,\! }[/math]
`\star * / \div \frac{1}{2}`	[math]\displaystyle{ \star * / \div \frac{1}{2}\,\! }[/math]
Logika
`\land \wedge \bigwedge \bar{q} \to p`	[math]\displaystyle{ \land \wedge \bigwedge \bar{q} \to p\,\! }[/math]
`\lor \vee \bigvee \lnot \neg q \And`	[math]\displaystyle{ \lor \vee \bigvee \lnot \neg q \And\,\! }[/math]
Korijeni
`\sqrt{2} \sqrt[n]{x}`	[math]\displaystyle{ \sqrt{2} \sqrt[n]{x}\,\! }[/math]
Relacije
`\sim \approx \simeq \cong \dot= \overset{\underset{\mathrm{def}}{}}{=}`	[math]\displaystyle{ \sim \approx \simeq \cong \dot= \overset{\underset{\mathrm{def}}{}}{=}\,\! }[/math]
`\le < \ll \gg \ge > \equiv \not\equiv \ne \mbox{or} \neq \propto`	[math]\displaystyle{ \le \lt \ll \gg \ge \gt \equiv \not\equiv \ne \mbox{or} \neq \propto\,\! }[/math]
Geometrija
`\Diamond \Box \triangle \angle \perp \mid \nmid \\| 45^\circ`	[math]\displaystyle{ \Diamond \, \Box \, \triangle \, \angle \perp \, \mid \; \nmid \, \\| 45^\circ\,\! }[/math]
Strelice
`\leftarrow \gets \rightarrow \to \not\to \leftrightarrow \longleftarrow \longrightarrow`	[math]\displaystyle{ \leftarrow \gets \rightarrow \to \not\to \leftrightarrow \longleftarrow \longrightarrow\,\! }[/math]
`\mapsto \longmapsto \hookrightarrow \hookleftarrow \nearrow \searrow \swarrow \nwarrow`	[math]\displaystyle{ \mapsto \longmapsto \hookrightarrow \hookleftarrow \nearrow \searrow \swarrow \nwarrow\,\! }[/math]
`\uparrow \downarrow \updownarrow \rightharpoonup \rightharpoondown \leftharpoonup \leftharpoondown \upharpoonleft`	[math]\displaystyle{ \uparrow \downarrow \updownarrow \rightharpoonup \rightharpoondown \leftharpoonup \leftharpoondown \upharpoonleft\,\! }[/math]
`\upharpoonright \downharpoonleft \downharpoonright \rightleftharpoons \Leftarrow \Rightarrow \Leftrightarrow \Longleftarrow`	[math]\displaystyle{ \upharpoonright \downharpoonleft \downharpoonright \rightleftharpoons \Leftarrow \Rightarrow \Leftrightarrow \Longleftarrow\,\! }[/math]
`\Longrightarrow \Longleftrightarrow (or \iff) \Uparrow \Downarrow \Updownarrow \leftleftarrows \leftrightarrows \Lleftarrow \leftarrowtail \looparrowleft`	[math]\displaystyle{ \Longrightarrow \Longleftrightarrow \Uparrow \Downarrow \Updownarrow \leftleftarrows \leftrightarrows \Lleftarrow \leftarrowtail \looparrowleft \,\! }[/math]
`\leftrightharpoons \curvearrowleft \circlearrowleft \Lsh \upuparrows \rightrightarrows \rightleftarrows \Rrightarrow \rightarrowtail \looparrowright`	[math]\displaystyle{ \leftrightharpoons \curvearrowleft \circlearrowleft \Lsh \upuparrows \rightrightarrows \rightleftarrows \Rrightarrow \rightarrowtail \looparrowright\,\! }[/math]
`\curvearrowright \circlearrowright \Rsh \downdownarrows \multimap \leftrightsquigarrow \rightsquigarrow \nLeftarrow \nleftrightarrow \nRightarrow`	[math]\displaystyle{ \curvearrowright \circlearrowright \Rsh \downdownarrows \multimap \leftrightsquigarrow \rightsquigarrow \nLeftarrow \nleftrightarrow \nRightarrow\,\! }[/math]
`\nLeftrightarrow \longleftrightarrow`	[math]\displaystyle{ \nLeftrightarrow \longleftrightarrow\,\! }[/math]
Posebno
`\eth \S \P \% \dagger \ddagger \ldots \cdots`	[math]\displaystyle{ \eth \S \P \% \dagger \ddagger \ldots \cdots\,\! }[/math]
`\smile \frown \wr \triangleleft \triangleright \infty \bot \top`	[math]\displaystyle{ \smile \frown \wr \triangleleft \triangleright \infty \bot \top\,\! }[/math]
`\vdash \vDash \Vdash \models \lVert \rVert \imath \hbar`	[math]\displaystyle{ \vdash \vDash \Vdash \models \lVert \rVert \imath \hbar\,\! }[/math]
`\ell \mho \Finv \Re \Im \wp \complement \diamondsuit`	[math]\displaystyle{ \ell \mho \Finv \Re \Im \wp \complement \diamondsuit\,\! }[/math]
`\heartsuit \clubsuit \spadesuit \Game \flat \natural \sharp`	[math]\displaystyle{ \heartsuit \clubsuit \spadesuit \Game \flat \natural \sharp\,\! }[/math]
Nesortirano
`\vartriangle \triangledown \lozenge \circledS \measuredangle \nexists \Bbbk \backprime \blacktriangle \blacktriangledown`	[math]\displaystyle{ \vartriangle \triangledown \lozenge \circledS \measuredangle \nexists \Bbbk \backprime \blacktriangle \blacktriangledown }[/math]
`\blacksquare \blacklozenge \bigstar \sphericalangle \diagup \diagdown \dotplus \Cap \Cup \barwedge`	[math]\displaystyle{ \blacksquare \blacklozenge \bigstar \sphericalangle \diagup \diagdown \dotplus \Cap \Cup \barwedge }[/math]
`\veebar \doublebarwedge \boxminus \boxtimes \boxdot \boxplus \divideontimes \ltimes \rtimes \leftthreetimes`	[math]\displaystyle{ \veebar \doublebarwedge \boxminus \boxtimes \boxdot \boxplus \divideontimes \ltimes \rtimes \leftthreetimes }[/math]
`\rightthreetimes \curlywedge \curlyvee \circleddash \circledast \circledcirc \centerdot \intercal \leqq \leqslant`	[math]\displaystyle{ \rightthreetimes \curlywedge \curlyvee \circleddash \circledast \circledcirc \centerdot \intercal \leqq \leqslant }[/math]
`\eqslantless \lessapprox \approxeq \lessdot \lll \lessgtr \lesseqgtr \lesseqqgtr \doteqdot \risingdotseq`	[math]\displaystyle{ \eqslantless \lessapprox \approxeq \lessdot \lll \lessgtr \lesseqgtr \lesseqqgtr \doteqdot \risingdotseq }[/math]
`\fallingdotseq \backsim \backsimeq \subseteqq \Subset \preccurlyeq \curlyeqprec \precsim \precapprox \vartriangleleft`	[math]\displaystyle{ \fallingdotseq \backsim \backsimeq \subseteqq \Subset \preccurlyeq \curlyeqprec \precsim \precapprox \vartriangleleft }[/math]
`\Vvdash \bumpeq \Bumpeq \geqq \geqslant \eqslantgtr \gtrsim \gtrapprox \eqsim \gtrdot`	[math]\displaystyle{ \Vvdash \bumpeq \Bumpeq \geqq \geqslant \eqslantgtr \gtrsim \gtrapprox \eqsim \gtrdot }[/math]
`\ggg \gtrless \gtreqless \gtreqqless \eqcirc \circeq \triangleq \thicksim \thickapprox \supseteqq`	[math]\displaystyle{ \ggg \gtrless \gtreqless \gtreqqless \eqcirc \circeq \triangleq \thicksim \thickapprox \supseteqq }[/math]
`\Supset \succcurlyeq \curlyeqsucc \succsim \succapprox \vartriangleright \shortmid \shortparallel \between \pitchfork`	[math]\displaystyle{ \Supset \succcurlyeq \curlyeqsucc \succsim \succapprox \vartriangleright \shortmid \shortparallel \between \pitchfork }[/math]
`\varpropto \blacktriangleleft \therefore \backepsilon \blacktriangleright \because \nleqslant \nleqq \lneq \lneqq`	[math]\displaystyle{ \varpropto \blacktriangleleft \therefore \backepsilon \blacktriangleright \because \nleqslant \nleqq \lneq \lneqq }[/math]
`\lvertneqq \lnsim \lnapprox \nprec \npreceq \precneqq \precnsim \precnapprox \nsim \nshortmid`	[math]\displaystyle{ \lvertneqq \lnsim \lnapprox \nprec \npreceq \precneqq \precnsim \precnapprox \nsim \nshortmid }[/math]
`\nvdash \nVdash \ntriangleleft \ntrianglelefteq \nsubseteq \nsubseteqq \varsubsetneq \subsetneqq \varsubsetneqq \ngtr`	[math]\displaystyle{ \nvdash \nVdash \ntriangleleft \ntrianglelefteq \nsubseteq \nsubseteqq \varsubsetneq \subsetneqq \varsubsetneqq \ngtr }[/math]
`\ngeqslant \ngeqq \gneq \gneqq \gvertneqq \gnsim \gnapprox \nsucc \nsucceq \succneqq`	[math]\displaystyle{ \ngeqslant \ngeqq \gneq \gneqq \gvertneqq \gnsim \gnapprox \nsucc \nsucceq \succneqq }[/math]
`\succnsim \succnapprox \ncong \nshortparallel \nparallel \nvDash \nVDash \ntriangleright \ntrianglerighteq \nsupseteq`	[math]\displaystyle{ \succnsim \succnapprox \ncong \nshortparallel \nparallel \nvDash \nVDash \ntriangleright \ntrianglerighteq \nsupseteq }[/math]
`\nsupseteqq \varsupsetneq \supsetneqq \varsupsetneqq`	[math]\displaystyle{ \nsupseteqq \varsupsetneq \supsetneqq \varsupsetneqq }[/math]
`\jmath \surd \ast \uplus \diamond \bigtriangleup \bigtriangledown \ominus`	[math]\displaystyle{ \jmath \surd \ast \uplus \diamond \bigtriangleup \bigtriangledown \ominus\,\! }[/math]
`\oslash \odot \bigcirc \amalg \prec \succ \preceq \succeq`	[math]\displaystyle{ \oslash \odot \bigcirc \amalg \prec \succ \preceq \succeq\,\! }[/math]
`\dashv \asymp \doteq \parallel`	[math]\displaystyle{ \dashv \asymp \doteq \parallel\,\! }[/math]

Eksponenti, indeksi, integrali

Funkcija	Kôd	Izgled
Funkcija	Kôd	HTML	PNG
Eksponent	`a^2`	[math]\displaystyle{ a^2 }[/math]	[math]\displaystyle{ a^2 \,\! }[/math]
Indeks	`a_2`	[math]\displaystyle{ a_2 }[/math]	[math]\displaystyle{ a_2 \,\! }[/math]
Grupiranje	`a^{2+2}`	[math]\displaystyle{ a^{2+2} }[/math]	[math]\displaystyle{ a^{2+2}\,\! }[/math]
Grupiranje	`a_{i,j}`	[math]\displaystyle{ a_{i,j} }[/math]	[math]\displaystyle{ a_{i,j}\,\! }[/math]
Kombinacija	`x_2^3`	[math]\displaystyle{ x_2^3 }[/math]
Prethodeći i/ili dodani eksponenti i indeksi	`\sideset{_1^2}{_3^4}\prod_a^b`	[math]\displaystyle{ \sideset{_1^2}{_3^4}\prod_a^b }[/math]
Prethodeći i/ili dodani eksponenti i indeksi	`{}_1^2\!\Omega_3^4`	[math]\displaystyle{ {}_1^2\!\Omega_3^4 }[/math]
"Povrh"	`\overset{\alpha}{\omega}`	[math]\displaystyle{ \overset{\alpha}{\omega} }[/math]
	`\underset{\alpha}{\omega}`	[math]\displaystyle{ \underset{\alpha}{\omega} }[/math]
	`\overset{\alpha}{\underset{\gamma}{\omega}}`	[math]\displaystyle{ \overset{\alpha}{\underset{\gamma}{\omega}} }[/math]
	`\stackrel{\alpha}{\omega}`	[math]\displaystyle{ \stackrel{\alpha}{\omega} }[/math]
Derivacije (samo u PNG-u)	<code>x', y'', f', f''\!</code>		[math]\displaystyle{ x', y'', f', f''\! }[/math]
Derivacije (kurzivno f nekad preklapa apostrofe u HTML-u)	<code>x', y'', f', f''</code>	[math]\displaystyle{ x', y'', f', f'' }[/math]	[math]\displaystyle{ x', y'', f', f''\! }[/math]
Točke	`\dot{x}, \ddot{x}`	[math]\displaystyle{ \dot{x}, \ddot{x} }[/math]
Potcrtano, "potez", vektori	`\hat a \ \bar b \ \vec c`	[math]\displaystyle{ \hat a \ \bar b \ \vec c }[/math]
	`\overrightarrow{a b} \ \overleftarrow{c d} \ \widehat{d e f}`	[math]\displaystyle{ \overrightarrow{a b} \ \overleftarrow{c d} \ \widehat{d e f} }[/math]
	`\overline{g h i} \ \underline{j k l}`	[math]\displaystyle{ \overline{g h i} \ \underline{j k l} }[/math]
Strelice	`A \xleftarrow{n+\mu-1} B \xrightarrow[T]{n\pm i-1} C`	[math]\displaystyle{ A \xleftarrow{n+\mu-1} B \xrightarrow[T]{n\pm i-1} C }[/math]
Vitičaste zagrade gore	`\overbrace{ 1+2+\cdots+100 }^{5050}`	[math]\displaystyle{ \overbrace{ 1+2+\cdots+100 }^{5050} }[/math]
Vitičaste zagrade dolje	`\underbrace{ a+b+\cdots+z }_{26}`	[math]\displaystyle{ \underbrace{ a+b+\cdots+z }_{26} }[/math]
Suma	`\sum_{k=1}^N k^2`	[math]\displaystyle{ \sum_{k=1}^N k^2 }[/math]
Suma (drugi oblik)	`\textstyle \sum_{k=1}^N k^2`	[math]\displaystyle{ \textstyle \sum_{k=1}^N k^2 }[/math]
Produkt	`\prod_{i=1}^N x_i`	[math]\displaystyle{ \prod_{i=1}^N x_i }[/math]
Produkt (drugi oblik)	`\textstyle \prod_{i=1}^N x_i`	[math]\displaystyle{ \textstyle \prod_{i=1}^N x_i }[/math]
Koprodukt	`\coprod_{i=1}^N x_i`	[math]\displaystyle{ \coprod_{i=1}^N x_i }[/math]
Koprodukt (drugi oblik)	`\textstyle \coprod_{i=1}^N x_i`	[math]\displaystyle{ \textstyle \coprod_{i=1}^N x_i }[/math]
Limes	`\lim_{n \to \infty}x_n`	[math]\displaystyle{ \lim_{n \to \infty}x_n }[/math]
Limes (drugi oblik)	`\textstyle \lim_{n \to \infty}x_n`	[math]\displaystyle{ \textstyle \lim_{n \to \infty}x_n }[/math]
Integral	`\int_{-N}^{N} e^x\, dx`	[math]\displaystyle{ \int_{-N}^{N} e^x\, dx }[/math]
Integral (drugi oblik)	`\textstyle \int_{-N}^{N} e^x\, dx`	[math]\displaystyle{ \textstyle \int_{-N}^{N} e^x\, dx }[/math]
Dvostruki integral	`\iint_{D}^{W} \, dx\,dy`	[math]\displaystyle{ \iint_{D}^{W} \, dx\,dy }[/math]
Trostruki integral	`\iiint_{E}^{V} \, dx\,dy\,dz`	[math]\displaystyle{ \iiint_{E}^{V} \, dx\,dy\,dz }[/math]
Četverostruki integral	`\iiiint_{F}^{U} \, dx\,dy\,dz\,dt`	[math]\displaystyle{ \iiiint_{F}^{U} \, dx\,dy\,dz\,dt }[/math]
Path integral	`\oint_{C} x^3\, dx + 4y^2\, dy`	[math]\displaystyle{ \oint_{C} x^3\, dx + 4y^2\, dy }[/math]
Presjek	`\bigcap_1^{n} p`	[math]\displaystyle{ \bigcap_1^{n} p }[/math]
Unija	`\bigcup_1^{k} p`	[math]\displaystyle{ \bigcup_1^{k} p }[/math]

Razlomci, matrice, rad u više redova

Vrste slova/fonta

Funkcija	Kôd	Izgled
sprečavanje automatskog kurziva kod slova	\mbox{abc}	[math]\displaystyle{ \mbox{abc} }[/math]	[math]\displaystyle{ \mbox{abc} \,\! }[/math]
pomiješano (loše)	\mbox{if} n \mbox{is even}	[math]\displaystyle{ \mbox{if} n \mbox{is even} }[/math]	[math]\displaystyle{ \mbox{if} n \mbox{is even} \,\! }[/math]
pomiješano (dobro)	\mbox{if }n\mbox{ is even}	[math]\displaystyle{ \mbox{if }n\mbox{ is even} }[/math]	[math]\displaystyle{ \mbox{if }n\mbox{ is even} \,\! }[/math]
mixed italics (pouzdanije: "~" daje razmak koji se neće prekidati na kraju reda, a "\ " samo daje razmak)	\mbox{if}~n\ \mbox{is even}	[math]\displaystyle{ \mbox{if}~n\ \mbox{is even} }[/math]	[math]\displaystyle{ \mbox{if}~n\ \mbox{is even} \,\! }[/math]

Zagrade i slično

Ne koristite unutar matematičkod kôda znakove "(" i ")" ako želite u zagradu staviti razlomke ili nešto "visoko":

Funkcija	Kôd	Izgled
Loše	( \frac{1}{2} )	[math]\displaystyle{ ( \frac{1}{2} ) }[/math]
Dobro	\left ( \frac{1}{2} \right )	[math]\displaystyle{ \left ( \frac{1}{2} \right ) }[/math]

Razmaci

Razmaci se obično ne moraju sređivati jer su pravilno dodani automatski, no, nekad je potrebno ručno ih podesiti.

Funkcija	Kôd	Izgled
dva četverostruka razmaka	a \qquad b	[math]\displaystyle{ a \qquad b }[/math]
četverostruki razmak	a \quad b	[math]\displaystyle{ a \quad b }[/math]
običan razmak	a\ b	[math]\displaystyle{ a\ b }[/math]
običan razmak bez pretvorbe u PNG	a \mbox{ } b	[math]\displaystyle{ a \mbox{ } b }[/math]
velik razmak	a\;b	[math]\displaystyle{ a\;b }[/math]
srednji razmak	a\>b	[nije podržano]
malen razmak	a\,b	[math]\displaystyle{ a\,b }[/math]
bez razmaka	ab	[math]\displaystyle{ ab\, }[/math]
malen "negativan razmak"	a\!b	[math]\displaystyle{ a\!b }[/math]

Boje

{\color{Blue}x^2}+{\color{Brown}2x}-{\color{OliveGreen}1}
[math]\displaystyle{ {\color{Blue}x^2}+{\color{Brown}2x}-{\color{OliveGreen}1} }[/math]

x_{1,2}=\frac{-b\pm\sqrt{\color{Red}b^2-4ac}}{2a}
[math]\displaystyle{ x_{1,2}=\frac{-b\pm\sqrt{\color{Red}b^2-4ac}}{2a} }[/math]

Sve boje koje podržava LaTeX pogledajte ovdje.

Vanjska poveznica

Tutorial za LaTeX (engl.)

Operacija	Kôd	Izgled
Razlomci	`\frac{2}{4}=0.5`	[math]\displaystyle{ \frac{2}{4}=0.5 }[/math]
Mali razlomci	`\tfrac{2}{4} = 0.5`	[math]\displaystyle{ \tfrac{2}{4} = 0.5 }[/math]
Veliki (normalni) razlomci	`\dfrac{2}{4} = 0.5`	[math]\displaystyle{ \dfrac{2}{4} = 0.5 }[/math]
Veliki (ugniježđeni) razlomci	`\cfrac{2}{c + \cfrac{2}{d + \cfrac{2}{4}}} = a`	[math]\displaystyle{ \cfrac{2}{c + \cfrac{2}{d + \cfrac{2}{4}}} = a }[/math]
"Povrh"	`\binom{n}{k}`	[math]\displaystyle{ \binom{n}{k} }[/math]
Mali "Povrh"	`\tbinom{n}{k}`	[math]\displaystyle{ \tbinom{n}{k} }[/math]
Veliki (normalni) "Povrh"	`\dbinom{n}{k}`	[math]\displaystyle{ \dbinom{n}{k} }[/math]
Matrice	\begin{matrix} x & y \\ z & v \end{matrix}	[math]\displaystyle{ \begin{matrix} x & y \\ z & v \end{matrix} }[/math]
	\begin{vmatrix} x & y \\ z & v \end{vmatrix}	[math]\displaystyle{ \begin{vmatrix} x & y \\ z & v \end{vmatrix} }[/math]
	\begin{Vmatrix} x & y \\ z & v \end{Vmatrix}	[math]\displaystyle{ \begin{Vmatrix} x & y \\ z & v \end{Vmatrix} }[/math]
	\begin{bmatrix} 0 & \cdots & 0 \\ \vdots & \ddots & \vdots \\ 0 & \cdots & 0 \end{bmatrix}	[math]\displaystyle{ \begin{bmatrix} 0 & \cdots & 0 \\ \vdots & \ddots & \vdots \\ 0 & \cdots & 0\end{bmatrix} }[/math]
	\begin{Bmatrix} x & y \\ z & v \end{Bmatrix}	[math]\displaystyle{ \begin{Bmatrix} x & y \\ z & v \end{Bmatrix} }[/math]
	\begin{pmatrix} x & y \\ z & v \end{pmatrix}	[math]\displaystyle{ \begin{pmatrix} x & y \\ z & v \end{pmatrix} }[/math]
	\bigl( \begin{smallmatrix} a&b\\ c&d \end{smallmatrix} \bigr)	[math]\displaystyle{ \bigl( \begin{smallmatrix} a&b\\ c&d \end{smallmatrix} \bigr) }[/math]
Slučajevi	f(n) = \begin{cases} n/2, & \mbox{if }n\mbox{ is even} \\ 3n+1, & \mbox{if }n\mbox{ is odd} \end{cases}	[math]\displaystyle{ f(n) = \begin{cases} n/2, & \mbox{if }n\mbox{ is even} \\ 3n+1, & \mbox{if }n\mbox{ is odd} \end{cases} }[/math]
Jednadžbe u više redova	\begin{align} f(x) & = (a+b)^2 \\ & = a^2+2ab+b^2 \\ \end{align}	[math]\displaystyle{ \begin{align} f(x) & = (a+b)^2 \\ & = a^2+2ab+b^2 \\ \end{align} }[/math]
Jednadžbe u više redova	\begin{alignat}{2} f(x) & = (a-b)^2 \\ & = a^2-2ab+b^2 \\ \end{alignat}	[math]\displaystyle{ \begin{alignat}{2} f(x) & = (a-b)^2 \\ & = a^2-2ab+b^2 \\ \end{alignat} }[/math]
Jednadžbe u više redova (`{lcr}` definira broj i poravnanje stupaca - l=lijevo(left), c=sredina(center), r=desno(right). Dakle, prvi stupac će biti poravnat lijevo, drugi u sredinu, treći desno. (ne koristiti ako nije prijeko potrebno))	\begin{array}{lcl} z & = & a \\ f(x,y,z) & = & x + y + z \end{array}	[math]\displaystyle{ \begin{array}{lcl} z & = & a \\ f(x,y,z) & = & x + y + z \end{array} }[/math]
Jednadžbe u više redova (dodatno objašnjenje)	\begin{array}{lcr} z & = & a \\ f(x,y,z) & = & x + y + z \end{array}	[math]\displaystyle{ \begin{array}{lcr} z & = & a \\ f(x,y,z) & = & x + y + z \end{array} }[/math]
Lomljenje dugačke formule da prijeđe u novi red ako je potrebno	<math>f(x) \,\!</math> <math>= \sum_{n=0}^\infty a_n x^n </math> <math>= a_0+a_1x+a_2x^2+\cdots</math>	[math]\displaystyle{ f(x) \,\! }[/math][math]\displaystyle{ = \sum_{n=0}^\infty a_n x^n }[/math][math]\displaystyle{ = a_0 +a_1x+a_2x^2+\cdots }[/math]
Slučajevi	\begin{cases} 3x + 5y + z \\ 7x - 2y + 4z \\ -6x + 3y + 2z \end{cases}	[math]\displaystyle{ \begin{cases} 3x + 5y + z \\ 7x - 2y + 4z \\ -6x + 3y + 2z \end{cases} }[/math]

Grčki alfabet
`\Alpha \Beta \Gamma \Delta \Epsilon \Zeta`	[math]\displaystyle{ \Alpha \Beta \Gamma \Delta \Epsilon \Zeta \,\! }[/math]
`\Eta \Theta \Iota \Kappa \Lambda \Mu`	[math]\displaystyle{ \Eta \Theta \Iota \Kappa \Lambda \Mu \,\! }[/math]
`\Nu \Xi \Pi \Rho \Sigma \Tau`	[math]\displaystyle{ \Nu \Xi \Pi \Rho \Sigma \Tau\,\! }[/math]
`\Upsilon \Phi \Chi \Psi \Omega`	[math]\displaystyle{ \Upsilon \Phi \Chi \Psi \Omega \,\! }[/math]
`\alpha \beta \gamma \delta \epsilon \zeta`	[math]\displaystyle{ \alpha \beta \gamma \delta \epsilon \zeta \,\! }[/math]
`\eta \theta \iota \kappa \lambda \mu`	[math]\displaystyle{ \eta \theta \iota \kappa \lambda \mu \,\! }[/math]
`\nu \xi \pi \rho \sigma \tau`	[math]\displaystyle{ \nu \xi \pi \rho \sigma \tau \,\! }[/math]
`\upsilon \phi \chi \psi \omega`	[math]\displaystyle{ \upsilon \phi \chi \psi \omega \,\! }[/math]
`\varepsilon \digamma \vartheta \varkappa`	[math]\displaystyle{ \varepsilon \digamma \vartheta \varkappa \,\! }[/math]
`\varpi \varrho \varsigma \varphi`	[math]\displaystyle{ \varpi \varrho \varsigma \varphi\,\! }[/math]
Skupovi
`\mathbb{A} \mathbb{B} \mathbb{C} \mathbb{D} \mathbb{E} \mathbb{F} \mathbb{G}`	[math]\displaystyle{ \mathbb{A} \mathbb{B} \mathbb{C} \mathbb{D} \mathbb{E} \mathbb{F} \mathbb{G} \,\! }[/math]
`\mathbb{H} \mathbb{I} \mathbb{J} \mathbb{K} \mathbb{L} \mathbb{M}`	[math]\displaystyle{ \mathbb{H} \mathbb{I} \mathbb{J} \mathbb{K} \mathbb{L} \mathbb{M} \,\! }[/math]
`\mathbb{N} \mathbb{O} \mathbb{P} \mathbb{Q} \mathbb{R} \mathbb{S} \mathbb{T}`	[math]\displaystyle{ \mathbb{N} \mathbb{O} \mathbb{P} \mathbb{Q} \mathbb{R} \mathbb{S} \mathbb{T} \,\! }[/math]
`\mathbb{U} \mathbb{V} \mathbb{W} \mathbb{X} \mathbb{Y} \mathbb{Z}`	[math]\displaystyle{ \mathbb{U} \mathbb{V} \mathbb{W} \mathbb{X} \mathbb{Y} \mathbb{Z}\,\! }[/math]
Podebljano (abeceda)
`\mathbf{A} \mathbf{B} \mathbf{C} \mathbf{D} \mathbf{E} \mathbf{F} \mathbf{G}`	[math]\displaystyle{ \mathbf{A} \mathbf{B} \mathbf{C} \mathbf{D} \mathbf{E} \mathbf{F} \mathbf{G} \,\! }[/math]
`\mathbf{H} \mathbf{I} \mathbf{J} \mathbf{K} \mathbf{L} \mathbf{M}`	[math]\displaystyle{ \mathbf{H} \mathbf{I} \mathbf{J} \mathbf{K} \mathbf{L} \mathbf{M} \,\! }[/math]
`\mathbf{N} \mathbf{O} \mathbf{P} \mathbf{Q} \mathbf{R} \mathbf{S} \mathbf{T}`	[math]\displaystyle{ \mathbf{N} \mathbf{O} \mathbf{P} \mathbf{Q} \mathbf{R} \mathbf{S} \mathbf{T} \,\! }[/math]
`\mathbf{U} \mathbf{V} \mathbf{W} \mathbf{X} \mathbf{Y} \mathbf{Z}`	[math]\displaystyle{ \mathbf{U} \mathbf{V} \mathbf{W} \mathbf{X} \mathbf{Y} \mathbf{Z} \,\! }[/math]
`\mathbf{a} \mathbf{b} \mathbf{c} \mathbf{d} \mathbf{e} \mathbf{f} \mathbf{g}`	[math]\displaystyle{ \mathbf{a} \mathbf{b} \mathbf{c} \mathbf{d} \mathbf{e} \mathbf{f} \mathbf{g} \,\! }[/math]
`\mathbf{h} \mathbf{i} \mathbf{j} \mathbf{k} \mathbf{l} \mathbf{m}`	[math]\displaystyle{ \mathbf{h} \mathbf{i} \mathbf{j} \mathbf{k} \mathbf{l} \mathbf{m} \,\! }[/math]
`\mathbf{n} \mathbf{o} \mathbf{p} \mathbf{q} \mathbf{r} \mathbf{s} \mathbf{t}`	[math]\displaystyle{ \mathbf{n} \mathbf{o} \mathbf{p} \mathbf{q} \mathbf{r} \mathbf{s} \mathbf{t} \,\! }[/math]
`\mathbf{u} \mathbf{v} \mathbf{w} \mathbf{x} \mathbf{y} \mathbf{z}`	[math]\displaystyle{ \mathbf{u} \mathbf{v} \mathbf{w} \mathbf{x} \mathbf{y} \mathbf{z} \,\! }[/math]
`\mathbf{0} \mathbf{1} \mathbf{2} \mathbf{3} \mathbf{4}`	[math]\displaystyle{ \mathbf{0} \mathbf{1} \mathbf{2} \mathbf{3} \mathbf{4} \,\! }[/math]
`\mathbf{5} \mathbf{6} \mathbf{7} \mathbf{8} \mathbf{9}`	[math]\displaystyle{ \mathbf{5} \mathbf{6} \mathbf{7} \mathbf{8} \mathbf{9}\,\! }[/math]
Podebljano (alfabet)
`\boldsymbol{\Alpha} \boldsymbol{\Beta} \boldsymbol{\Gamma} \boldsymbol{\Delta} \boldsymbol{\Epsilon} \boldsymbol{\Zeta}`	[math]\displaystyle{ \boldsymbol{\Alpha} \boldsymbol{\Beta} \boldsymbol{\Gamma} \boldsymbol{\Delta} \boldsymbol{\Epsilon} \boldsymbol{\Zeta} \,\! }[/math]
`\boldsymbol{\Eta} \boldsymbol{\Theta} \boldsymbol{\Iota} \boldsymbol{\Kappa} \boldsymbol{\Lambda} \boldsymbol{\Mu}`	[math]\displaystyle{ \boldsymbol{\Eta} \boldsymbol{\Theta} \boldsymbol{\Iota} \boldsymbol{\Kappa} \boldsymbol{\Lambda} \boldsymbol{\Mu}\,\! }[/math]
`\boldsymbol{\Nu} \boldsymbol{\Xi} \boldsymbol{\Pi} \boldsymbol{\Rho} \boldsymbol{\Sigma} \boldsymbol{\Tau}`	[math]\displaystyle{ \boldsymbol{\Nu} \boldsymbol{\Xi} \boldsymbol{\Pi} \boldsymbol{\Rho} \boldsymbol{\Sigma} \boldsymbol{\Tau}\,\! }[/math]
`\boldsymbol{\Upsilon} \boldsymbol{\Phi} \boldsymbol{\Chi} \boldsymbol{\Psi} \boldsymbol{\Omega}`	[math]\displaystyle{ \boldsymbol{\Upsilon} \boldsymbol{\Phi} \boldsymbol{\Chi} \boldsymbol{\Psi} \boldsymbol{\Omega}\,\! }[/math]
`\boldsymbol{\alpha} \boldsymbol{\beta} \boldsymbol{\gamma} \boldsymbol{\delta} \boldsymbol{\epsilon} \boldsymbol{\zeta}`	[math]\displaystyle{ \boldsymbol{\alpha} \boldsymbol{\beta} \boldsymbol{\gamma} \boldsymbol{\delta} \boldsymbol{\epsilon} \boldsymbol{\zeta}\,\! }[/math]
`\boldsymbol{\eta} \boldsymbol{\theta} \boldsymbol{\iota} \boldsymbol{\kappa} \boldsymbol{\lambda} \boldsymbol{\mu}`	[math]\displaystyle{ \boldsymbol{\eta} \boldsymbol{\theta} \boldsymbol{\iota} \boldsymbol{\kappa} \boldsymbol{\lambda} \boldsymbol{\mu}\,\! }[/math]
`\boldsymbol{\nu} \boldsymbol{\xi} \boldsymbol{\pi} \boldsymbol{\rho} \boldsymbol{\sigma} \boldsymbol{\tau}`	[math]\displaystyle{ \boldsymbol{\nu} \boldsymbol{\xi} \boldsymbol{\pi} \boldsymbol{\rho} \boldsymbol{\sigma} \boldsymbol{\tau}\,\! }[/math]
`\boldsymbol{\upsilon} \boldsymbol{\phi} \boldsymbol{\chi} \boldsymbol{\psi} \boldsymbol{\omega}`	[math]\displaystyle{ \boldsymbol{\upsilon} \boldsymbol{\phi} \boldsymbol{\chi} \boldsymbol{\psi} \boldsymbol{\omega}\,\! }[/math]
`\boldsymbol{\varepsilon} \boldsymbol{\digamma} \boldsymbol{\vartheta} \boldsymbol{\varkappa}`	[math]\displaystyle{ \boldsymbol{\varepsilon} \boldsymbol{\digamma} \boldsymbol{\vartheta} \boldsymbol{\varkappa} \,\! }[/math]
`\boldsymbol{\varpi} \boldsymbol{\varrho} \boldsymbol{\varsigma} \boldsymbol{\varphi}`	[math]\displaystyle{ \boldsymbol{\varpi} \boldsymbol{\varrho} \boldsymbol{\varsigma} \boldsymbol{\varphi}\,\! }[/math]
Kurziv
`\mathit{A} \mathit{B} \mathit{C} \mathit{D} \mathit{E} \mathit{F} \mathit{G}`	[math]\displaystyle{ \mathit{A} \mathit{B} \mathit{C} \mathit{D} \mathit{E} \mathit{F} \mathit{G} \,\! }[/math]
`\mathit{H} \mathit{I} \mathit{J} \mathit{K} \mathit{L} \mathit{M}`	[math]\displaystyle{ \mathit{H} \mathit{I} \mathit{J} \mathit{K} \mathit{L} \mathit{M} \,\! }[/math]
`\mathit{N} \mathit{O} \mathit{P} \mathit{Q} \mathit{R} \mathit{S} \mathit{T}`	[math]\displaystyle{ \mathit{N} \mathit{O} \mathit{P} \mathit{Q} \mathit{R} \mathit{S} \mathit{T} \,\! }[/math]
`\mathit{U} \mathit{V} \mathit{W} \mathit{X} \mathit{Y} \mathit{Z}`	[math]\displaystyle{ \mathit{U} \mathit{V} \mathit{W} \mathit{X} \mathit{Y} \mathit{Z} \,\! }[/math]
`\mathit{a} \mathit{b} \mathit{c} \mathit{d} \mathit{e} \mathit{f} \mathit{g}`	[math]\displaystyle{ \mathit{a} \mathit{b} \mathit{c} \mathit{d} \mathit{e} \mathit{f} \mathit{g} \,\! }[/math]
`\mathit{h} \mathit{i} \mathit{j} \mathit{k} \mathit{l} \mathit{m}`	[math]\displaystyle{ \mathit{h} \mathit{i} \mathit{j} \mathit{k} \mathit{l} \mathit{m} \,\! }[/math]
`\mathit{n} \mathit{o} \mathit{p} \mathit{q} \mathit{r} \mathit{s} \mathit{t}`	[math]\displaystyle{ \mathit{n} \mathit{o} \mathit{p} \mathit{q} \mathit{r} \mathit{s} \mathit{t} \,\! }[/math]
`\mathit{u} \mathit{v} \mathit{w} \mathit{x} \mathit{y} \mathit{z}`	[math]\displaystyle{ \mathit{u} \mathit{v} \mathit{w} \mathit{x} \mathit{y} \mathit{z} \,\! }[/math]
`\mathit{0} \mathit{1} \mathit{2} \mathit{3} \mathit{4}`	[math]\displaystyle{ \mathit{0} \mathit{1} \mathit{2} \mathit{3} \mathit{4} \,\! }[/math]
`\mathit{5} \mathit{6} \mathit{7} \mathit{8} \mathit{9}`	[math]\displaystyle{ \mathit{5} \mathit{6} \mathit{7} \mathit{8} \mathit{9}\,\! }[/math]
Roman font
`\mathrm{A} \mathrm{B} \mathrm{C} \mathrm{D} \mathrm{E} \mathrm{F} \mathrm{G}`	[math]\displaystyle{ \mathrm{A} \mathrm{B} \mathrm{C} \mathrm{D} \mathrm{E} \mathrm{F} \mathrm{G} \,\! }[/math]
`\mathrm{H} \mathrm{I} \mathrm{J} \mathrm{K} \mathrm{L} \mathrm{M}`	[math]\displaystyle{ \mathrm{H} \mathrm{I} \mathrm{J} \mathrm{K} \mathrm{L} \mathrm{M} \,\! }[/math]
`\mathrm{N} \mathrm{O} \mathrm{P} \mathrm{Q} \mathrm{R} \mathrm{S} \mathrm{T}`	[math]\displaystyle{ \mathrm{N} \mathrm{O} \mathrm{P} \mathrm{Q} \mathrm{R} \mathrm{S} \mathrm{T} \,\! }[/math]
`\mathrm{U} \mathrm{V} \mathrm{W} \mathrm{X} \mathrm{Y} \mathrm{Z}`	[math]\displaystyle{ \mathrm{U} \mathrm{V} \mathrm{W} \mathrm{X} \mathrm{Y} \mathrm{Z} \,\! }[/math]
`\mathrm{a} \mathrm{b} \mathrm{c} \mathrm{d} \mathrm{e} \mathrm{f} \mathrm{g}`	[math]\displaystyle{ \mathrm{a} \mathrm{b} \mathrm{c} \mathrm{d} \mathrm{e} \mathrm{f} \mathrm{g}\,\! }[/math]
`\mathrm{h} \mathrm{i} \mathrm{j} \mathrm{k} \mathrm{l} \mathrm{m}`	[math]\displaystyle{ \mathrm{h} \mathrm{i} \mathrm{j} \mathrm{k} \mathrm{l} \mathrm{m} \,\! }[/math]
`\mathrm{n} \mathrm{o} \mathrm{p} \mathrm{q} \mathrm{r} \mathrm{s} \mathrm{t}`	[math]\displaystyle{ \mathrm{n} \mathrm{o} \mathrm{p} \mathrm{q} \mathrm{r} \mathrm{s} \mathrm{t} \,\! }[/math]
`\mathrm{u} \mathrm{v} \mathrm{w} \mathrm{x} \mathrm{y} \mathrm{z}`	[math]\displaystyle{ \mathrm{u} \mathrm{v} \mathrm{w} \mathrm{x} \mathrm{y} \mathrm{z} \,\! }[/math]
`\mathrm{0} \mathrm{1} \mathrm{2} \mathrm{3} \mathrm{4}`	[math]\displaystyle{ \mathrm{0} \mathrm{1} \mathrm{2} \mathrm{3} \mathrm{4} \,\! }[/math]
`\mathrm{5} \mathrm{6} \mathrm{7} \mathrm{8} \mathrm{9}`	[math]\displaystyle{ \mathrm{5} \mathrm{6} \mathrm{7} \mathrm{8} \mathrm{9}\,\! }[/math]
Fraktur font
`\mathfrak{A} \mathfrak{B} \mathfrak{C} \mathfrak{D} \mathfrak{E} \mathfrak{F} \mathfrak{G}`	[math]\displaystyle{ \mathfrak{A} \mathfrak{B} \mathfrak{C} \mathfrak{D} \mathfrak{E} \mathfrak{F} \mathfrak{G} \,\! }[/math]
`\mathfrak{H} \mathfrak{I} \mathfrak{J} \mathfrak{K} \mathfrak{L} \mathfrak{M}`	[math]\displaystyle{ \mathfrak{H} \mathfrak{I} \mathfrak{J} \mathfrak{K} \mathfrak{L} \mathfrak{M} \,\! }[/math]
`\mathfrak{N} \mathfrak{O} \mathfrak{P} \mathfrak{Q} \mathfrak{R} \mathfrak{S} \mathfrak{T}`	[math]\displaystyle{ \mathfrak{N} \mathfrak{O} \mathfrak{P} \mathfrak{Q} \mathfrak{R} \mathfrak{S} \mathfrak{T} \,\! }[/math]
`\mathfrak{U} \mathfrak{V} \mathfrak{W} \mathfrak{X} \mathfrak{Y} \mathfrak{Z}`	[math]\displaystyle{ \mathfrak{U} \mathfrak{V} \mathfrak{W} \mathfrak{X} \mathfrak{Y} \mathfrak{Z} \,\! }[/math]
`\mathfrak{a} \mathfrak{b} \mathfrak{c} \mathfrak{d} \mathfrak{e} \mathfrak{f} \mathfrak{g}`	[math]\displaystyle{ \mathfrak{a} \mathfrak{b} \mathfrak{c} \mathfrak{d} \mathfrak{e} \mathfrak{f} \mathfrak{g} \,\! }[/math]
`\mathfrak{h} \mathfrak{i} \mathfrak{j} \mathfrak{k} \mathfrak{l} \mathfrak{m}`	[math]\displaystyle{ \mathfrak{h} \mathfrak{i} \mathfrak{j} \mathfrak{k} \mathfrak{l} \mathfrak{m} \,\! }[/math]
`\mathfrak{n} \mathfrak{o} \mathfrak{p} \mathfrak{q} \mathfrak{r} \mathfrak{s} \mathfrak{t}`	[math]\displaystyle{ \mathfrak{n} \mathfrak{o} \mathfrak{p} \mathfrak{q} \mathfrak{r} \mathfrak{s} \mathfrak{t} \,\! }[/math]
`\mathfrak{u} \mathfrak{v} \mathfrak{w} \mathfrak{x} \mathfrak{y} \mathfrak{z}`	[math]\displaystyle{ \mathfrak{u} \mathfrak{v} \mathfrak{w} \mathfrak{x} \mathfrak{y} \mathfrak{z} \,\! }[/math]
`\mathfrak{0} \mathfrak{1} \mathfrak{2} \mathfrak{3} \mathfrak{4}`	[math]\displaystyle{ \mathfrak{0} \mathfrak{1} \mathfrak{2} \mathfrak{3} \mathfrak{4} \,\! }[/math]
`\mathfrak{5} \mathfrak{6} \mathfrak{7} \mathfrak{8} \mathfrak{9}`	[math]\displaystyle{ \mathfrak{5} \mathfrak{6} \mathfrak{7} \mathfrak{8} \mathfrak{9}\,\! }[/math]
"Rukopis"
`\mathcal{A} \mathcal{B} \mathcal{C} \mathcal{D} \mathcal{E} \mathcal{F} \mathcal{G}`	[math]\displaystyle{ \mathcal{A} \mathcal{B} \mathcal{C} \mathcal{D} \mathcal{E} \mathcal{F} \mathcal{G} \,\! }[/math]
`\mathcal{H} \mathcal{I} \mathcal{J} \mathcal{K} \mathcal{L} \mathcal{M}`	[math]\displaystyle{ \mathcal{H} \mathcal{I} \mathcal{J} \mathcal{K} \mathcal{L} \mathcal{M} \,\! }[/math]
`\mathcal{N} \mathcal{O} \mathcal{P} \mathcal{Q} \mathcal{R} \mathcal{S} \mathcal{T}`	[math]\displaystyle{ \mathcal{N} \mathcal{O} \mathcal{P} \mathcal{Q} \mathcal{R} \mathcal{S} \mathcal{T} \,\! }[/math]
`\mathcal{U} \mathcal{V} \mathcal{W} \mathcal{X} \mathcal{Y} \mathcal{Z}`	[math]\displaystyle{ \mathcal{U} \mathcal{V} \mathcal{W} \mathcal{X} \mathcal{Y} \mathcal{Z}\,\! }[/math]
Hebrejski
`\aleph \beth \gimel \daleth`	[math]\displaystyle{ \aleph \beth \gimel \daleth\,\! }[/math]

Funkcija	Kôd	Izgled
Oble zagrade	\left ( \frac{a}{b} \right )	[math]\displaystyle{ \left ( \frac{a}{b} \right ) }[/math]
Uglate zagrade	\left [ \frac{a}{b} \right ] \quad \left \lbrack \frac{a}{b} \right \rbrack	[math]\displaystyle{ \left [ \frac{a}{b} \right ] \quad \left \lbrack \frac{a}{b} \right \rbrack }[/math]
Vitičaste zagrade	\left \{ \frac{a}{b} \right \} \quad \left \lbrace \frac{a}{b} \right \rbrace	[math]\displaystyle{ \left \{ \frac{a}{b} \right \} \quad \left \lbrace \frac{a}{b} \right \rbrace }[/math]
"Špičaste" zagrade	\left \langle \frac{a}{b} \right \rangle	[math]\displaystyle{ \left \langle \frac{a}{b} \right \rangle }[/math]
Apsolutna vrijednost i dvostruke okomite crte	\left \| \frac{a}{b} \right \vert \left \Vert \frac{c}{d} \right \\|	[math]\displaystyle{ \left \| \frac{a}{b} \right \vert \left \Vert \frac{c}{d} \right \\| }[/math]
Funkcije zaokruživanja	\left \lfloor \frac{a}{b} \right \rfloor \left \lceil \frac{c}{d} \right \rceil	[math]\displaystyle{ \left \lfloor \frac{a}{b} \right \rfloor \left \lceil \frac{c}{d} \right \rceil }[/math]
Kose crte	\left / \frac{a}{b} \right \backslash	[math]\displaystyle{ \left / \frac{a}{b} \right \backslash }[/math]
Strelice	\left \uparrow \frac{a}{b} \right \downarrow \quad \left \Uparrow \frac{a}{b} \right \Downarrow \quad \left \updownarrow \frac{a}{b} \right \Updownarrow	[math]\displaystyle{ \left \uparrow \frac{a}{b} \right \downarrow \quad \left \Uparrow \frac{a}{b} \right \Downarrow \quad \left \updownarrow \frac{a}{b} \right \Updownarrow }[/math]
Različite se vrste zagrada mogu miješati dok je god broj oznaka `\left` i `\right` jednak.	\left [ 0,1 \right ) \left \langle \psi \right \|	[math]\displaystyle{ \left [ 0,1 \right ) }[/math] [math]\displaystyle{ \left \langle \psi \right \| }[/math]
Ako ne želite zagradu, poslije `\left` ili `\right` dodajte točku.	\left . \frac{A}{B} \right \} \to X	[math]\displaystyle{ \left . \frac{A}{B} \right \} \to X }[/math]
Veličina zagrada	\big( \Big( \bigg( \Bigg( ... \Bigg] \bigg] \Big] \big]	[math]\displaystyle{ \big( \Big( \bigg( \Bigg( ... \Bigg] \bigg] \Big] \big] }[/math]
	\big\{ \Big\{ \bigg\{ \Bigg\{ ... \Bigg\rangle \bigg\rangle \Big\rangle \big\rangle	[math]\displaystyle{ \big\{ \Big\{ \bigg\{ \Bigg\{ ... \Bigg\rangle \bigg\rangle \Big\rangle \big\rangle }[/math]
	\big\\| \Big\\| \bigg\\| \Bigg\\| ... \Bigg\| \bigg\| \Big\| \big\|	[math]\displaystyle{ \big\\| \Big\\| \bigg\\| \Bigg\\| ... \Bigg\| \bigg\| \Big\| \big\| }[/math]
	\big\lfloor \Big\lfloor \bigg\lfloor \Bigg\lfloor ... \Bigg\rceil \bigg\rceil \Big\rceil \big\rceil	[math]\displaystyle{ \big\lfloor \Big\lfloor \bigg\lfloor \Bigg\lfloor ... \Bigg\rceil \bigg\rceil \Big\rceil \big\rceil }[/math]
	\big\uparrow \Big\uparrow \bigg\uparrow \Bigg\uparrow ... \Bigg\Downarrow \bigg\Downarrow \Big\Downarrow \big\Downarrow	[math]\displaystyle{ \big\uparrow \Big\uparrow \bigg\uparrow \Bigg\uparrow ... \Bigg\Downarrow \bigg\Downarrow \Big\Downarrow \big\Downarrow }[/math]
	\big\updownarrow \Big\updownarrow \bigg\updownarrow \Bigg\updownarrow ... \Bigg\Updownarrow \bigg\Updownarrow \Big\Updownarrow \big\Updownarrow	[math]\displaystyle{ \big\updownarrow \Big\updownarrow \bigg\updownarrow \Bigg\updownarrow ... \Bigg\Updownarrow \bigg\Updownarrow \Big\Updownarrow \big\Updownarrow }[/math]
	\big / \Big / \bigg / \Bigg / ... \Bigg\backslash \bigg\backslash \Big\backslash \big\backslash	[math]\displaystyle{ \big / \Big / \bigg / \Bigg / ... \Bigg\backslash \bigg\backslash \Big\backslash \big\backslash }[/math]