MathJax-Darstellung:
⟪sum_(i=1)^n i^3=((n(n+1))/2)^2⟫
| Eing. | TeX-Eing. | Ausg. |
|---|---|---|
| + | ⟪+⟫ | |
| - | ⟪-⟫ | |
| * | cdot | ⟪*⟫ |
| ** | ast | ⟪**⟫ |
| *** | star | ⟪***⟫ |
| // | ⟪//⟫ | |
| \\ | backslash setminus |
⟪\\⟫ |
| xx | times | ⟪xx⟫ |
| -: | div | ⟪-:⟫ |
| |>< | ltimes | ⟪|><⟫ |
| ><| | rtimes | ⟪><|⟫ |
| |><| | bowtie | ⟪|><|⟫ |
| @ | circ | ⟪@⟫ |
| o+ | oplus | ⟪o+⟫ |
| ox | otimes | ⟪ox⟫ |
| o. | odot | ⟪o.⟫ |
| sum | ⟪sum⟫ | |
| prod | ⟪prod⟫ | |
| ^^ | wedge | ⟪^^⟫ |
| ^^^ | bigwedge | ⟪^^^⟫ |
| vv | vee | ⟪vv⟫ |
| vvv | bigvee | ⟪vvv⟫ |
| nn | cap | ⟪nn⟫ |
| nnn | bigcap | ⟪nnn⟫ |
| uu | cup | ⟪uu⟫ |
| uuu | bigcup | ⟪uuu⟫ |
| Eing. | TeX-Eing. | Ausg. |
|---|---|---|
| 2/3 | frac{2}{3} | ⟪2/3⟫ |
| 2^3 | ⟪2^3⟫ | |
| sqrt x | ⟪sqrt x⟫ | |
| root(3)(x) | ⟪root(3)(x)⟫ | |
| int | ⟪int⟫ | |
| oint | ⟪oint⟫ | |
| del | partial | ⟪del⟫ |
| grad | nabla | ⟪grad⟫ |
| +- | pm | ⟪+-⟫ |
| O/ | emptyset | ⟪O/⟫ |
| oo | infty | ⟪oo⟫ |
| aleph | ⟪aleph⟫ | |
| :. | therefore | ⟪:.⟫ |
| :' | because | ⟪:'⟫ |
| |...| | |ldots| | ⟪|...|⟫ |
| |cdots| | ⟪|cdots|⟫ | |
| vdots | ⟪vdots⟫ | |
| ddots | ⟪ddots⟫ | |
| |\ | | ⟪|\ |⟫ | |
| |quad| | ⟪|quad|⟫ | |
| /_ | angle | ⟪/_⟫ |
| frown | ⟪frown⟫ | |
| /_\ | triangle | ⟪/_\\⟫ |
| diamond | ⟪diamond⟫ | |
| square | ⟪square⟫ | |
| "hi" | text(hi) | ⟪"hi"⟫ |
| Eing. | TeX-Eing. | Ausg. |
|---|---|---|
| = | ⟪=⟫ | |
| != | ne | ⟪!=⟫ |
| < | lt | ⟪<⟫ |
| > | gt | ⟪>⟫ |
| <= | le | ⟪<=⟫ |
| >= | ge | ⟪>=⟫ |
| -< | prec | ⟪-<⟫ |
| -<= | preceq | ⟪-<=⟫ |
| >- | succ | ⟪>-⟫ |
| >-= | succeq | ⟪>-=⟫ |
| in | ⟪in⟫ | |
| !in | notin | ⟪!in⟫ |
| sub | subset | ⟪sub⟫ |
| sup | supset | ⟪sup⟫ |
| sube | subseteq | ⟪sube⟫ |
| supe | supseteq | ⟪supe⟫ |
| -= | equiv | ⟪-=⟫ |
| ~= | cong | ⟪~=⟫ |
| ~~ | approx | ⟪~~⟫ |
| prop | propto | ⟪prop⟫ |
| Eing. | TeX-Eing. | Ausg. |
|---|---|---|
| and | ⟪and⟫ | |
| or | ⟪or⟫ | |
| not | neg | ⟪not⟫ |
| => | implies | ⟪=>⟫ |
| if | ⟪if⟫ | |
| <=> | iff | ⟪iff⟫ |
| AA | forall | ⟪AA⟫ |
| EE | exists | ⟪EE⟫ |
| _|_ | bot | ⟪_|_⟫ |
| TT | top | ⟪TT⟫ |
| |-- | vdash | ⟪|--⟫ |
| |== | models | ⟪|==⟫ |
| Eing. | TeX-Eing. | Ausg. |
|---|---|---|
| ( | ⟪(⟫ | |
| ) | ⟪)⟫ | |
| [ | ⟪[⟫ | |
| ] | ⟪]⟫ | |
| { | ⟪{⟫ | |
| } | ⟪}⟫ | |
| (: | langle | ⟪(:⟫ |
| :) | rangle | ⟪:)⟫ |
| << | ⟪<<⟫ | |
| >> | ⟪>>⟫ | |
| {: | ⟪⟫ | |
| :} | ⟪⟫ | |
| {: x ) | ⟪{: x )⟫ | |
| ( x :} | ⟪( x :}⟫ |
| Eing. | TeX-Eing. | Ausg. | |
|---|---|---|---|
| uarr | uparrow | ⟪uarr⟫ | |
| darr | downarrow | ⟪darr⟫ | |
| rarr | -> | rightarrow, to | ⟪rarr⟫ |
| >-> | rightarrowtail | ⟪>->⟫ | |
| ->> | twoheadrightarrow | ⟪->>⟫ | |
| >->> | twoheadrightarrowtail | ⟪>->>⟫ | |
| |-> | mapsto | ⟪|->⟫ | |
| larr | leftarrow | ⟪larr⟫ | |
| harr | leftrightarrow | ⟪harr⟫ | |
| rArr | => | Rightarrow | ⟪rArr⟫ |
| lArr | Leftarrow | ⟪lArr⟫ | |
| hArr | <=> | Leftrightarrow | ⟪hArr⟫ |
| Eing. | TeX-Eing. | Ausg. |
|---|---|---|
| hat x | ⟪hat x⟫ | |
| hat(a*b) | ⟪hat(a*b)⟫ | |
| bar x | overline x | ⟪bar x⟫ |
| ul x | underline x | ⟪ul x⟫ |
| vec x | ⟪vec x⟫ | |
| dot x | ⟪dot x⟫ | |
| ddot x | ⟪ddot x⟫ | |
| overset(x)(=) | overset(x)(=) | ⟪overset(x)(=)⟫ |
| underset(x)(=) | ⟪underset(x)(=)⟫ | |
| ubrace(1+2) | underbrace(1+2) | ⟪ubrace(1+2)⟫ |
| obrace(1+2) | overbrace(1+2) | ⟪obrace(1+2)⟫ |
| color(red)(x) | ⟪color(red)(x)⟫ | |
| cancel(x) | ⟪cancel(x)⟫ | |
| norm(vecx) | ⟪norm(vecx)⟫ | |
| abs(x) | ⟪abs(x)⟫ | |
| floor(x) | ⟪floor(x)⟫ | |
| ceil(x) | ⟪ceil(x)⟫ | |
| |__ | lfloor | ⟪|__⟫ |
| __| | rfloor | ⟪__|⟫ |
| |~ | lceiling | ⟪|~⟫ |
| ~| | rceiling | ⟪~|⟫ |
| Eing. | Ausg. | Eing. | Ausg. |
|---|---|---|---|
| alpha | ⟪alpha⟫ | ||
| beta | ⟪beta⟫ | ||
| gamma | ⟪gamma⟫ | Gamma | ⟪Gamma⟫ |
| delta | ⟪delta⟫ | Delta | ⟪Delta⟫ |
| epsilon | ⟪epsilon⟫ | ||
| varepsilon | ⟪varepsilon⟫ | ||
| zeta | ⟪zeta⟫ | ||
| eta | ⟪eta⟫ | ||
| theta | ⟪theta⟫ | Theta | ⟪Theta⟫ |
| vartheta | ⟪vartheta⟫ | ||
| iota | ⟪iota⟫ | ||
| kappa | ⟪kappa⟫ | ||
| lambda | ⟪lambda⟫ | Lambda | ⟪Lambda⟫ |
| mu | ⟪mu⟫ | ||
| nu | ⟪nu⟫ | ||
| xi | ⟪xi⟫ | Xi | ⟪Xi⟫ |
| pi | ⟪pi⟫ | Pi | ⟪Pi⟫ |
| rho | ⟪rho⟫ | ||
| sigma | ⟪sigma⟫ | Sigma | ⟪Sigma⟫ |
| tau | ⟪tau⟫ | ||
| upsilon | ⟪upsilon⟫ | ||
| phi | ⟪phi⟫ | Phi | ⟪Phi⟫ |
| varphi | ⟪varphi⟫ | ||
| chi | ⟪chi⟫ | ||
| psi | ⟪psi⟫ | Psi | ⟪Psi⟫ |
| omega | ⟪omega⟫ | Omega | ⟪Omega⟫ |
| Eing. | Ausg. |
|---|---|
| sin | ⟪sin⟫ |
| cos | ⟪cos⟫ |
| tan | ⟪tan⟫ |
| sec | ⟪sec⟫ |
| csc | ⟪csc⟫ |
| cot | ⟪cot⟫ |
| arcsin | ⟪arcsin⟫ |
| arccos | ⟪arccos⟫ |
| arctan | ⟪arctan⟫ |
| sinh | ⟪sinh⟫ |
| cosh | ⟪cosh⟫ |
| tanh | ⟪tanh⟫ |
| sech | ⟪sech⟫ |
| csch | ⟪csch⟫ |
| coth | ⟪coth⟫ |
| exp | ⟪exp⟫ |
| log | ⟪log⟫ |
| ln | ⟪ln⟫ |
| det | ⟪det⟫ |
| gcd | ⟪gcd⟫ |
| lcm | ⟪lcm⟫ |
| f | ⟪f⟫ |
| g | ⟪g⟫ |
| dim | ⟪dim⟫ |
| mod | ⟪mod⟫ |
| lub | ⟪lub⟫ |
| glb | ⟪glb⟫ |
| min | ⟪min⟫ |
| max | ⟪max⟫ |
| Eing. | Ausg. |
|---|---|
| NN | ⟪NN⟫ |
| NN_0 | ⟪NN_0⟫ |
| ZZ | ⟪ZZ⟫ |
| ⟪QQ⟫ | |
| RR\\QQ | ⟪RR\\QQ⟫ |
| RR | ⟪RR⟫ |
| CC | ⟪CC⟫ |
| bbb(H) | ⟪bbb(H)⟫ |
| bbb(O) | ⟪bbb(O)⟫ |
| bbb(P) | ⟪bbb(P)⟫ |
| aleph_0 | ⟪aleph_0⟫ |
| bb "AaBbCc" | ⟪bb "AaBbCc"⟫ |
| bbb "AaBbCc" | ⟪bbb "AaBbCc"⟫ |
| cc "AaBbCc" | ⟪cc "AaBbCc"⟫ |
| tt "AaBbCc" | ⟪tt "AaBbCc"⟫ |
| fr "AaBbCc" | ⟪fr "AaBbCc"⟫ |
| sf "AaBbCc" | ⟪sf "AaBbCc"⟫ |
| AsciiMath | Ausgabe |
|---|---|
| [[a,b],[c,d]] * ((x),(y)) | ⟪[[a,b],[c,d]] * ((x),(y))⟫ |
| ((a,b),(c,d)) * [(x),(y)] | ⟪((a,b),(c,d)) * [(x),(y)]⟫ |
| [[a,b,|,c],[d,e,|,f]] | ⟪[[a,b,|,c],[d,e,|,f]]⟫ |
| {(2x,+,17y,=,23), (x,-,y,=,5):} |
⟪{(2x,+,17y,=,23),(x,-,y,=,5):}⟫ |
| lim_(N->oo) sum_(i=0)^N | ⟪lim_(N->oo) sum_(i=0)^N⟫ |
| int_0^1 f(x)dx | ⟪int_0^1 f(x)dx⟫ |
| f'(x) = dy/dx (if var = x,y,z,t) |
⟪f'(x) = dy/dx⟫ |
| f'(x) = (dp)/(dq) (if var ≠ x,y,z,t) |
⟪f'(x) = (dp)/(dq)⟫ |
| ubrace(1+2+3+4)_("4 terms") | ⟪ubrace(1+2+3+4)_("4 terms")⟫ |
| obrace(1+2+3+4)^("4 terms") | ⟪obrace(1+2+3+4)^("4 terms")⟫ |
| "Sinus" != "Si""nus" | ⟪"Sinus" != "Si""nus"⟫ |
| {::}_(\ 92)^238U | ⟪{::}_(\ 92)^238U⟫ |
Grammatik:
v ::= [A-Za-z] | greek letters | numbers | other constant symbols
u ::= sqrt | text | bb | other unary symbols for font commands
b ::= frac | root | stackrel | other binary symbols
l ::= ( | [ | { | (: | {: | other left brackets
r ::= ) | ] | } | :) | :} | other right brackets
S ::= v | lEr | uS | bSS Simple expression
I ::= S_S | S^S | S_S^S | S Intermediate expression
E ::= IE | I/I Expression