• tile-compare Formeln
  • tilecompare
  • 13.01.2021
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  • Gleichungen

    y=mx+b\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} y=m \cdot x + b
    x2=y2+z2\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} x^2=y^2+z^2
    E=mc2\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} E=m \cdot c ^2
    y=mx+b\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} y=m \cdot x + b
    E=mc2\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} E=m \cdot c ^2
    x2=y2+z2\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} x^2=y^2+z^2
    y=mx+b\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} y=m \cdot x + b
    E=mc2\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} E=m \cdot c ^2
    x2=y2+z2\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} x^2=y^2+z^2
    y=mx+b\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} y=m \cdot x + b
    E=mc2\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} E=m \cdot c ^2
    x2=y2+z2\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} x^2=y^2+z^2
    3w=12z\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 3w=\frac{1}{2}z
    3x+9y=12\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 3x + 9y = -12
    eπi+1=0\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} e^{\pi i} + 1 = 0
    3w=12z\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 3w=\frac{1}{2}z
    eπi+1=0\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} e^{\pi i} + 1 = 0
    3x+9y=12\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 3x + 9y = -12
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \prod_{i=1}^n
    3w=12z\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 3w=\frac{1}{2}z
    eπi+1=0\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} e^{\pi i} + 1 = 0
    3x+9y=12\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 3x + 9y = -12
    3w=12z\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 3w=\frac{1}{2}z
    eπi+1=0\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} e^{\pi i} + 1 = 0
    3x+9y=12\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 3x + 9y = -12
    p(x)=3x6+14x5y+590x4y2+19x3y312x2y412xy5+2y6a3b3\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} p(x) = 3x^6 + 14x^5y + 590x^4y^2 + 19x^3y^3 - 12x^2y^4 - 12xy^5 + 2y^6 - a^3b^3
    p(x)=3x6+14x5y+590x4y2+19x3y312x2y412xy5+2y6a3b3\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} p(x) = 3x^6 + 14x^5y + 590x^4y^2 + 19x^3y^3 - 12x^2y^4 - 12xy^5 + 2y^6 - a^3b^3
    p(x)=3x6+14x5y+590x4y2+19x3y312x2y412xy5+2y6a3b3\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} p(x) = 3x^6 + 14x^5y + 590x^4y^2 + 19x^3y^3 - 12x^2y^4 - 12xy^5 + 2y^6 - a^3b^3
    p(x)=3x6+14x5y+590x4y2+19x3y312x2y412xy5+2y6a3b3\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} p(x) = 3x^6 + 14x^5y + 590x^4y^2 + 19x^3y^3 - 12x^2y^4 - 12xy^5 + 2y^6 - a^3b^3
    i=11ns=p11ps\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \sum_{i=1}^{\infty} \frac{1}{n^s} = \prod_p \frac{1}{1 - p^{-s}}
     (an)r+s=anr+ns\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ (a^n)^{r+s} = a^{nr+ns}
    3x2+9y=3a+c\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 3x^2 + 9y = 3a + c
    A=πr22=12πr2\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} A = \frac{\pi r^2}{2}= \frac{1}{2} \pi r^2
    2x5y=8\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 2x - 5y = 8
    A=πr22=12πr2\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} A = \frac{\pi r^2}{2}= \frac{1}{2} \pi r^2
    3x2+9y=3a+c\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 3x^2 + 9y = 3a + c
    2x5y=8\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 2x - 5y = 8
    A=πr22=12πr2\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} A = \frac{\pi r^2}{2}= \frac{1}{2} \pi r^2
    2x5y=8\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 2x - 5y = 8
    3x2+9y=3a+c\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 3x^2 + 9y = 3a + c
    A=πr22=12πr2\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} A = \frac{\pi r^2}{2}= \frac{1}{2} \pi r^2
    2x5y=8\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 2x - 5y = 8
    3x2+9y=3a+c\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 3x^2 + 9y = 3a + c
  • Matrices

    123abc\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{vmatrix} 1 & 2 & 3\\ a & b & c \end{vmatrix}
    123abc\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{vmatrix} 1 & 2 & 3\\ a & b & c \end{vmatrix}
    123abc\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{vmatrix} 1 & 2 & 3\\ a & b & c \end{vmatrix}
    123abc\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{vmatrix} 1 & 2 & 3\\ a & b & c \end{vmatrix}
    {123abc}\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{Bmatrix} 1 & 2 & 3\\ a & b & c \end{Bmatrix}
    {123abc}\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{Bmatrix} 1 & 2 & 3\\ a & b & c \end{Bmatrix}
    {123abc}\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{Bmatrix} 1 & 2 & 3\\ a & b & c \end{Bmatrix}
    {123abc}\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{Bmatrix} 1 & 2 & 3\\ a & b & c \end{Bmatrix}
    123abc\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{Vmatrix} 1 & 2 & 3\\ a & b & c \end{Vmatrix}
    123abc\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{Vmatrix} 1 & 2 & 3\\ a & b & c \end{Vmatrix}
    123abc\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{Vmatrix} 1 & 2 & 3\\ a & b & c \end{Vmatrix}
    123abc\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{Vmatrix} 1 & 2 & 3\\ a & b & c \end{Vmatrix}
    [123abc]\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{bmatrix} 1 & 2 & 3\\ a & b & c \end{bmatrix}
    [123abc]\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{bmatrix} 1 & 2 & 3\\ a & b & c \end{bmatrix}
    [123abc]\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{bmatrix} 1 & 2 & 3\\ a & b & c \end{bmatrix}
    [123abc]\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{bmatrix} 1 & 2 & 3\\ a & b & c \end{bmatrix}
    (123abc)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{pmatrix} 1 & 2 & 3\\ a & b & c \end{pmatrix}
    (123abc)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{pmatrix} 1 & 2 & 3\\ a & b & c \end{pmatrix}
    (123abc)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{pmatrix} 1 & 2 & 3\\ a & b & c \end{pmatrix}
    (123abc)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{pmatrix} 1 & 2 & 3\\ a & b & c \end{pmatrix}
    123abc\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{matrix} 1 & 2 & 3\\ a & b & c \end{matrix}
    123abc\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{matrix} 1 & 2 & 3\\ a & b & c \end{matrix}
    123abc\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{matrix} 1 & 2 & 3\\ a & b & c \end{matrix}
    123abc\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \begin{matrix} 1 & 2 & 3\\ a & b & c \end{matrix}

    Brackets and parentheses

    a+cn+b+dm\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \overline{\underbrace{a+c}_n + \underbrace{b+d}_m}
    a+cn+b+dm\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \overline{\underbrace{a+c}_n + \underbrace{b+d}_m}
    a+cn+b+dm\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \overline{\underbrace{a+c}_n + \underbrace{b+d}_m}
    a+cn+b+dm\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \overline{\underbrace{a+c}_n + \underbrace{b+d}_m}
    a+c+b+dnm\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \overbrace{\underline{a+c} + \underline{b+d}}^{n \vee m}
    a+c+b+dnm\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \overbrace{\underline{a+c} + \underline{b+d}}^{n \vee m}
    a+c+b+dnm\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \overbrace{\underline{a+c} + \underline{b+d}}^{n \vee m}
    a+c+b+dnm\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \overbrace{\underline{a+c} + \underline{b+d}}^{n \vee m}
    (x+y)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} (x+y)
    {x+y}\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \{ x+y \}
    x+y\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \|x+y\|
    x+y\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} |x+y|
    [x+y]\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} [x+y]
    x+y\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \langle x+y \rangle
    (x+y)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} (x+y)
    {x+y}\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \{ x+y \}
    x+y\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \|x+y\|
    x+y\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} |x+y|
    [x+y]\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} [x+y]
    x+y\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \langle x+y \rangle
    (x+y)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} (x+y)
    {x+y}\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \{ x+y \}
    x+y\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \|x+y\|
    x+y\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} |x+y|
    [x+y]\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} [x+y]
    x+y\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \langle x+y \rangle
    (x+y)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} (x+y)
    {x+y}\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \{ x+y \}
    x+y\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \|x+y\|
    x+y\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} |x+y|
    [x+y]\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} [x+y]
    x+y\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \langle x+y \rangle
  • Brüche und Binomiale

    (nk)=n!k!(nk)!\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \binom{n}{k} = \frac{n!}{k!(n-k)!}
    f(x)=12+13+14+15+16\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} f(x)=\frac{1}{2} +\frac{1}{3}+\frac{1}{4}+\frac{1}{5}+\frac{1}{6}
    (nk)=n!k!(nk)!\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \binom{n}{k} = \frac{n!}{k!(n-k)!}
    f(x)=12+13+14+15+16\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} f(x)=\frac{1}{2} +\frac{1}{3}+\frac{1}{4}+\frac{1}{5}+\frac{1}{6}
    (nk)=n!k!(nk)!\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \binom{n}{k} = \frac{n!}{k!(n-k)!}
    f(x)=12+13+14+15+16\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} f(x)=\frac{1}{2} +\frac{1}{3}+\frac{1}{4}+\frac{1}{5}+\frac{1}{6}
    (nk)=n!k!(nk)!\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \binom{n}{k} = \frac{n!}{k!(n-k)!}

    f(x)=12+13+14+15+16\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} f(x)=\frac{1}{2} +\frac{1}{3}+\frac{1}{4}+\frac{1}{5}+\frac{1}{6}

    Hochgestellte Zahlen und Indizes

     a12+a22=a32\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ a_1^2 + a_2^2 = a_3^2
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \cap_{i=1}^n
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \cup_{i=1}^n
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \coprod_{i=1}^n
     a12+a22=a32\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ a_1^2 + a_2^2 = a_3^2
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \cap_{i=1}^n
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \cup_{i=1}^n
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \coprod_{i=1}^n
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \prod_{i=1}^n
     a12+a22=a32\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ a_1^2 + a_2^2 = a_3^2
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \cap_{i=1}^n
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \cup_{i=1}^n
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \coprod_{i=1}^n
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \prod_{i=1}^n
     a12+a22=a32\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ a_1^2 + a_2^2 = a_3^2
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \cap_{i=1}^n
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \cup_{i=1}^n
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \coprod_{i=1}^n
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \prod_{i=1}^n
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \oint_{i=1}^n
    01x2+y2 dx\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \int\limits_0^1 x^2 + y^2 \ dx
     (an)r+s=anr+ns\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ (a^n)^{r+s} = a^{nr+ns}
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \oint_{i=1}^n
    01x2+y2 dx\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \int\limits_0^1 x^2 + y^2 \ dx
     (an)r+s=anr+ns\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ (a^n)^{r+s} = a^{nr+ns}
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \oint_{i=1}^n
    01x2+y2 dx\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \int\limits_0^1 x^2 + y^2 \ dx
     (an)r+s=anr+ns\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ (a^n)^{r+s} = a^{nr+ns}
    i=1n\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \oint_{i=1}^n
    01x2+y2 dx\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \int\limits_0^1 x^2 + y^2 \ dx
    i=11ns=p11ps\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \sum_{i=1}^{\infty} \frac{1}{n^s} = \prod_p \frac{1}{1 - p^{-s}}
     x2α1=yij+yij\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ x^{2 \alpha} - 1 = y_{ij} + y_{ij}
     x2α1=yij+yij\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ x^{2 \alpha} - 1 = y_{ij} + y_{ij}
    i=11ns=p11ps\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \sum_{i=1}^{\infty} \frac{1}{n^s} = \prod_p \frac{1}{1 - p^{-s}}
     x2α1=yij+yij\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ x^{2 \alpha} - 1 = y_{ij} + y_{ij}
    i=11ns=p11ps\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \sum_{i=1}^{\infty} \frac{1}{n^s} = \prod_p \frac{1}{1 - p^{-s}}
     x2α1=yij+yij\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ x^{2 \alpha} - 1 = y_{ij} + y_{ij}
  • Symbole

    ±×÷⨿\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\pm{} {}\mp{} {}\times{} {}\div{} {}\cdot{} {}\ast{} {}\star{} {}\dagger{} {}\ddagger{} {}\amalg{} {}\cap{} {}\cup{} {}\uplus{} {}\sqcap{} {}\sqcup{} {}\vee{} {}\wedge{} {}\setminus{} {}\wr{} {}\circ{} {}\bullet{} {}\diamond{} {}\lhd{} {}\rhd{} {}\unlhd
    ±×÷⨿\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\pm{} {}\mp{} {}\times{} {}\div{} {}\cdot{} {}\ast{} {}\star{} {}\dagger{} {}\ddagger{} {}\amalg{} {}\cap{} {}\cup{} {}\uplus{} {}\sqcap{} {}\sqcup{} {}\vee{} {}\wedge{} {}\setminus{} {}\wr{} {}\circ{} {}\bullet{} {}\diamond{} {}\lhd{} {}\rhd{} {}\unlhd
    ±×÷⨿\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\pm{} {}\mp{} {}\times{} {}\div{} {}\cdot{} {}\ast{} {}\star{} {}\dagger{} {}\ddagger{} {}\amalg{} {}\cap{} {}\cup{} {}\uplus{} {}\sqcap{} {}\sqcup{} {}\vee{} {}\wedge{} {}\setminus{} {}\wr{} {}\circ{} {}\bullet{} {}\diamond{} {}\lhd{} {}\rhd{} {}\unlhd
    ±×÷⨿\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\pm{} {}\mp{} {}\times{} {}\div{} {}\cdot{} {}\ast{} {}\star{} {}\dagger{} {}\ddagger{} {}\amalg{} {}\cap{} {}\cup{} {}\uplus{} {}\sqcap{} {}\sqcup{} {}\vee{} {}\wedge{} {}\setminus{} {}\wr{} {}\circ{} {}\bullet{} {}\diamond{} {}\lhd{} {}\rhd{} {}\unlhd
    \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\oslash{} {}\odot{} {}\bigcirc{} {}\Box{} {}\Diamond{} {}\bigtriangleup{} {}\bigtriangledown{} {}\triangleleft{} {}\triangleright{} {}\oplus{} {}\ominus{} {}\otimes{}
    \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\oslash{} {}\odot{} {}\bigcirc{} {}\Box{} {}\Diamond{} {}\bigtriangleup{} {}\bigtriangledown{} {}\triangleleft{} {}\triangleright{} {}\oplus{} {}\ominus{} {}\otimes{}
    \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\oslash{} {}\odot{} {}\bigcirc{} {}\Box{} {}\Diamond{} {}\bigtriangleup{} {}\bigtriangledown{} {}\triangleleft{} {}\triangleright{} {}\oplus{} {}\ominus{} {}\otimes{}
    \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\oslash{} {}\odot{} {}\bigcirc{} {}\Box{} {}\Diamond{} {}\bigtriangleup{} {}\bigtriangledown{} {}\triangleleft{} {}\triangleright{} {}\oplus{} {}\ominus{} {}\otimes{}
    x\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\cong{} {}\equiv{} {}\propto{} {}\prec{} {}\preceq{} {}\parallel{} {}\sim{} {}\simeq{} {}\asymp{} {}\smile{} {}\frown{} {}\bowtie{} {}\succ{} {}\succeq{} {}\mid{} {}|{} {}\stackrel{x}{\rightarrow}{}
    x\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\cong{} {}\equiv{} {}\propto{} {}\prec{} {}\preceq{} {}\parallel{} {}\sim{} {}\simeq{} {}\asymp{} {}\smile{} {}\frown{} {}\bowtie{} {}\succ{} {}\succeq{} {}\mid{} {}|{} {}\stackrel{x}{\rightarrow}{}
    x\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\cong{} {}\equiv{} {}\propto{} {}\prec{} {}\preceq{} {}\parallel{} {}\sim{} {}\simeq{} {}\asymp{} {}\smile{} {}\frown{} {}\bowtie{} {}\succ{} {}\succeq{} {}\mid{} {}|{} {}\stackrel{x}{\rightarrow}{}
    x\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\cong{} {}\equiv{} {}\propto{} {}\prec{} {}\preceq{} {}\parallel{} {}\sim{} {}\simeq{} {}\asymp{} {}\smile{} {}\frown{} {}\bowtie{} {}\succ{} {}\succeq{} {}\mid{} {}|{} {}\stackrel{x}{\rightarrow}{}
    \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\le{} {}\leq{} {}\ll{} {}\subset{} {}\subseteq{} {}\sqsubset{} {}\sqsubseteq{} {}\in{} {}\vdash{} {}\models{} {}\ge{} {}\geq{} {}\gg{} {}\supset{} {}\supseteq{} {}\sqsupset{} {}\sqsubseteq{} {}\ni{} {}\dashv{} {}\perp{} {}\neq{} {}\doteq{} {}\approx{}
    \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\le{} {}\leq{} {}\ll{} {}\subset{} {}\subseteq{} {}\sqsubset{} {}\sqsubseteq{} {}\in{} {}\vdash{} {}\models{} {}\ge{} {}\geq{} {}\gg{} {}\supset{} {}\supseteq{} {}\sqsupset{} {}\sqsubseteq{} {}\ni{} {}\dashv{} {}\perp{} {}\neq{} {}\doteq{} {}\approx{}
    \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\le{} {}\leq{} {}\ll{} {}\subset{} {}\subseteq{} {}\sqsubset{} {}\sqsubseteq{} {}\in{} {}\vdash{} {}\models{} {}\ge{} {}\geq{} {}\gg{} {}\supset{} {}\supseteq{} {}\sqsupset{} {}\sqsubseteq{} {}\ni{} {}\dashv{} {}\perp{} {}\neq{} {}\doteq{} {}\approx{}
    \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\le{} {}\leq{} {}\ll{} {}\subset{} {}\subseteq{} {}\sqsubset{} {}\sqsubseteq{} {}\in{} {}\vdash{} {}\models{} {}\ge{} {}\geq{} {}\gg{} {}\supset{} {}\supseteq{} {}\sqsupset{} {}\sqsubseteq{} {}\ni{} {}\dashv{} {}\perp{} {}\neq{} {}\doteq{} {}\approx{}
  • ≰≰≪̸⊄⊈⊏̸⋢∉⊬⊭≱≱≫̸⊅⊉\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\not<{} {}\not\le{} {}\not\leq{} {}\not\ll{} {}\not\subset{} {}\not\subseteq{} {}\not\sqsubset{} {}\not\sqsubseteq{} {}\not\in{} {}\notin{} {}\not\vdash{} {}\not\models{}{}\not\ge{} {}\not\geq{} {}\not\gg{} {}\not\supset{} {}\not\supseteq{}
    ≰≰≪̸⊄⊈⊏̸⋢∉⊬⊭≱≱≫̸⊅⊉\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\not<{} {}\not\le{} {}\not\leq{} {}\not\ll{} {}\not\subset{} {}\not\subseteq{} {}\not\sqsubset{} {}\not\sqsubseteq{} {}\not\in{} {}\notin{} {}\not\vdash{} {}\not\models{}{}\not\ge{} {}\not\geq{} {}\not\gg{} {}\not\supset{} {}\not\supseteq{}
    ≰≰≪̸⊄⊈⊏̸⋢∉⊬⊭≱≱≫̸⊅⊉\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\not<{} {}\not\le{} {}\not\leq{} {}\not\ll{} {}\not\subset{} {}\not\subseteq{} {}\not\sqsubset{} {}\not\sqsubseteq{} {}\not\in{} {}\notin{} {}\not\vdash{} {}\not\models{}{}\not\ge{} {}\not\geq{} {}\not\gg{} {}\not\supset{} {}\not\supseteq{}
    ≰≰≪̸⊄⊈⊏̸⋢∉⊬⊭≱≱≫̸⊅⊉\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\not<{} {}\not\le{} {}\not\leq{} {}\not\ll{} {}\not\subset{} {}\not\subseteq{} {}\not\sqsubset{} {}\not\sqsubseteq{} {}\not\in{} {}\notin{} {}\not\vdash{} {}\not\models{}{}\not\ge{} {}\not\geq{} {}\not\gg{} {}\not\supset{} {}\not\supseteq{}
    ⊐̸⋢∌⊣̸⊥̸≠̸≐̸≉≇≢∝̸⊀⪯̸∦≁≄\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\not\sqsupset{} {}\not\sqsubseteq{} {}\not\ni{} {}\not\dashv{} {}\not\perp{} {}\not\neq{} {}\not\doteq{} {}\not\approx{} {}\not\cong{} {}\not\equiv{} {}\not\propto{} {}\not\prec{} {}\not\preceq{} {}\not\parallel{} {}\not\sim{} {}\not\simeq{}
    ⊐̸⋢∌⊣̸⊥̸≠̸≐̸≉≇≢∝̸⊀⪯̸∦≁≄\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\not\sqsupset{} {}\not\sqsubseteq{} {}\not\ni{} {}\not\dashv{} {}\not\perp{} {}\not\neq{} {}\not\doteq{} {}\not\approx{} {}\not\cong{} {}\not\equiv{} {}\not\propto{} {}\not\prec{} {}\not\preceq{} {}\not\parallel{} {}\not\sim{} {}\not\simeq{}
    ⊐̸⋢∌⊣̸⊥̸≠̸≐̸≉≇≢∝̸⊀⪯̸∦≁≄\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\not\sqsupset{} {}\not\sqsubseteq{} {}\not\ni{} {}\not\dashv{} {}\not\perp{} {}\not\neq{} {}\not\doteq{} {}\not\approx{} {}\not\cong{} {}\not\equiv{} {}\not\propto{} {}\not\prec{} {}\not\preceq{} {}\not\parallel{} {}\not\sim{} {}\not\simeq{}
    ⊐̸⋢∌⊣̸⊥̸≠̸≐̸≉≇≢∝̸⊀⪯̸∦≁≄\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\not\sqsupset{} {}\not\sqsubseteq{} {}\not\ni{} {}\not\dashv{} {}\not\perp{} {}\not\neq{} {}\not\doteq{} {}\not\approx{} {}\not\cong{} {}\not\equiv{} {}\not\propto{} {}\not\prec{} {}\not\preceq{} {}\not\parallel{} {}\not\sim{} {}\not\simeq{}
    ¬\\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \forall \exists \neg \flat \natural \sharp \| \angle \backslash \clubsuit \diamondsuit \heartsuit \spadesuit \Join \infty
    αβγδϵεζηθϑικλμνξ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \alpha \beta \gamma \delta \epsilon \varepsilon \zeta \eta \theta \vartheta \iota \kappa \lambda \mu \nu \xi
    ¬\\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \forall \exists \neg \flat \natural \sharp \| \angle \backslash \clubsuit \diamondsuit \heartsuit \spadesuit \Join \infty
    αβγδϵεζηθϑικλμνξ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \alpha \beta \gamma \delta \epsilon \varepsilon \zeta \eta \theta \vartheta \iota \kappa \lambda \mu \nu \xi
    ¬\\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \forall \exists \neg \flat \natural \sharp \| \angle \backslash \clubsuit \diamondsuit \heartsuit \spadesuit \Join \infty
    αβγδϵεζηθϑικλμνξ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \alpha \beta \gamma \delta \epsilon \varepsilon \zeta \eta \theta \vartheta \iota \kappa \lambda \mu \nu \xi
    ¬\\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \forall \exists \neg \flat \natural \sharp \| \angle \backslash \clubsuit \diamondsuit \heartsuit \spadesuit \Join \infty
    αβγδϵεζηθϑικλμνξ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \alpha \beta \gamma \delta \epsilon \varepsilon \zeta \eta \theta \vartheta \iota \kappa \lambda \mu \nu \xi
    ıȷ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \aleph \hbar \imath \jmath \ell \wp \Re \Im \mho \prime \emptyset \nabla \surd \partial \top \bot
    oπϖρϱσςτυϕφχψω\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} o \pi \varpi \rho \varrho \sigma \varsigma \tau \upsilon \phi \varphi \chi \psi \omega
    ıȷ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \aleph \hbar \imath \jmath \ell \wp \Re \Im \mho \prime \emptyset \nabla \surd \partial \top \bot
    oπϖρϱσςτυϕφχψω\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} o \pi \varpi \rho \varrho \sigma \varsigma \tau \upsilon \phi \varphi \chi \psi \omega
    ıȷ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \aleph \hbar \imath \jmath \ell \wp \Re \Im \mho \prime \emptyset \nabla \surd \partial \top \bot
    oπϖρϱσςτυϕφχψω\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} o \pi \varpi \rho \varrho \sigma \varsigma \tau \upsilon \phi \varphi \chi \psi \omega
    ıȷ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \aleph \hbar \imath \jmath \ell \wp \Re \Im \mho \prime \emptyset \nabla \surd \partial \top \bot
    oπϖρϱσςτυϕφχψω\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} o \pi \varpi \rho \varrho \sigma \varsigma \tau \upsilon \phi \varphi \chi \psi \omega
    a^aˇa˘aˊaˋa~aˉaa˙a¨xyz^xyz~\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \hat{a} \check{a} \breve{a} \acute{a} \grave{a} \tilde{a} \bar{a} \vec{a} \dot{a} \ddot{a} \widehat{xyz} \widetilde{xyz}
    ΓΔΘΛΞΠΣΥΦΨΩ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \Gamma \Delta \Theta \Lambda \Xi \Pi \Sigma \Upsilon \Phi \Psi \Omega
    a^aˇa˘aˊaˋa~aˉaa˙a¨xyz^xyz~\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \hat{a} \check{a} \breve{a} \acute{a} \grave{a} \tilde{a} \bar{a} \vec{a} \dot{a} \ddot{a} \widehat{xyz} \widetilde{xyz}
    ΓΔΘΛΞΠΣΥΦΨΩ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \Gamma \Delta \Theta \Lambda \Xi \Pi \Sigma \Upsilon \Phi \Psi \Omega
    a^aˇa˘aˊaˋa~aˉaa˙a¨xyz^xyz~\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \hat{a} \check{a} \breve{a} \acute{a} \grave{a} \tilde{a} \bar{a} \vec{a} \dot{a} \ddot{a} \widehat{xyz} \widetilde{xyz}
    ΓΔΘΛΞΠΣΥΦΨΩ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \Gamma \Delta \Theta \Lambda \Xi \Pi \Sigma \Upsilon \Phi \Psi \Omega
    a^aˇa˘aˊaˋa~aˉaa˙a¨xyz^xyz~\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \hat{a} \check{a} \breve{a} \acute{a} \grave{a} \tilde{a} \bar{a} \vec{a} \dot{a} \ddot{a} \widehat{xyz} \widetilde{xyz}
    ΓΔΘΛΞΠΣΥΦΨΩ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \Gamma \Delta \Theta \Lambda \Xi \Pi \Sigma \Upsilon \Phi \Psi \Omega
  • \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\rightharpoondown{} {}\leadsto{} {}\longleftarrow{} {}\longrightarrow{} {}\longleftrightarrow{} {}\Longleftarrow{} {}\Longrightarrow{} {}\Longleftrightarrow{} {}\longmapsto{} {}\uparrow{} {}\downarrow{} {}\updownarrow{}
    \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\rightharpoondown{} {}\leadsto{} {}\longleftarrow{} {}\longrightarrow{} {}\longleftrightarrow{} {}\Longleftarrow{} {}\Longrightarrow{} {}\Longleftrightarrow{} {}\longmapsto{} {}\uparrow{} {}\downarrow{} {}\updownarrow{}
    \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\rightharpoondown{} {}\leadsto{} {}\longleftarrow{} {}\longrightarrow{} {}\longleftrightarrow{} {}\Longleftarrow{} {}\Longrightarrow{} {}\Longleftrightarrow{} {}\longmapsto{} {}\uparrow{} {}\downarrow{} {}\updownarrow{}
    \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\rightharpoondown{} {}\leadsto{} {}\longleftarrow{} {}\longrightarrow{} {}\longleftrightarrow{} {}\Longleftarrow{} {}\Longrightarrow{} {}\Longleftrightarrow{} {}\longmapsto{} {}\uparrow{} {}\downarrow{} {}\updownarrow{}
    \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\leftarrow{} {}\gets{} {}\rightarrow{} {}\to{} {}\leftrightarrow{} {}\Leftarrow{} {}\Rightarrow{} {}\Leftrightarrow{} {}\mapsto{} {}\hookleftarrow{} {}\hookrightarrow{} {}\leftharpoonup{} {}\leftharpoondown{} {}\rightleftharpoons{} {}\rightharpoonup{}
    \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\leftarrow{} {}\gets{} {}\rightarrow{} {}\to{} {}\leftrightarrow{} {}\Leftarrow{} {}\Rightarrow{} {}\Leftrightarrow{} {}\mapsto{} {}\hookleftarrow{} {}\hookrightarrow{} {}\leftharpoonup{} {}\leftharpoondown{} {}\rightleftharpoons{} {}\rightharpoonup{}
    \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\leftarrow{} {}\gets{} {}\rightarrow{} {}\to{} {}\leftrightarrow{} {}\Leftarrow{} {}\Rightarrow{} {}\Leftrightarrow{} {}\mapsto{} {}\hookleftarrow{} {}\hookrightarrow{} {}\leftharpoonup{} {}\leftharpoondown{} {}\rightleftharpoons{} {}\rightharpoonup{}
    \gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} {}\leftarrow{} {}\gets{} {}\rightarrow{} {}\to{} {}\leftrightarrow{} {}\Leftarrow{} {}\Rightarrow{} {}\Leftrightarrow{} {}\mapsto{} {}\hookleftarrow{} {}\hookrightarrow{} {}\leftharpoonup{} {}\leftharpoondown{} {}\rightleftharpoons{} {}\rightharpoonup{}

    Mathematische Operatoren

    S={zCz<1}andS2=S\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} S = \{ z \in \mathbb{C}\, |\, |z| < 1 \} \quad \textrm{and} \quad S_2=\partial{S}
    S={zCz<1}andS2=S\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} S = \{ z \in \mathbb{C}\, |\, |z| < 1 \} \quad \textrm{and} \quad S_2=\partial{S}
    S={zCz<1}andS2=S\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} S = \{ z \in \mathbb{C}\, |\, |z| < 1 \} \quad \textrm{and} \quad S_2=\partial{S}
    S={zCz<1}andS2=S\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} S = \{ z \in \mathbb{C}\, |\, |z| < 1 \} \quad \textrm{and} \quad S_2=\partial{S}
    limh0f(x+h)f(x)h\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} lim_{h \rightarrow 0 } \frac{f(x+h)-f(x)}{h}
    limh0f(x+h)f(x)h\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} lim_{h \rightarrow 0 } \frac{f(x+h)-f(x)}{h}
    limh0f(x+h)f(x)h\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} lim_{h \rightarrow 0 } \frac{f(x+h)-f(x)}{h}
    limh0f(x+h)f(x)h\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} lim_{h \rightarrow 0 } \frac{f(x+h)-f(x)}{h}
  • sin(a+b)=sin(a)cos(b)+cos(a)sin(b)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} sin(a + b ) = \sin(a)\cos(b) + \cos(a)\sin(b)
    xMR\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} x \in M_{R}
    sin(a+b)=sin(a)cos(b)+cos(a)sin(b)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} sin(a + b ) = \sin(a)\cos(b) + \cos(a)\sin(b)
    sin(a+b)=sin(a)cos(b)+cos(a)sin(b)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} sin(a + b ) = \sin(a)\cos(b) + \cos(a)\sin(b)
    xMR\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} x \in M_{R}
    sin(a+b)=sin(a)cos(b)+cos(a)sin(b)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} sin(a + b ) = \sin(a)\cos(b) + \cos(a)\sin(b)
    xMR\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} x \in M_{R}

    Chemische Formeln

    xMR\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} x \in M_{R}
    COX2+Cbelowabove2CO\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{CO2 + C ->T[above][below] 2CO}
    COX2+C2CO\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{CO2 + C <=>> 2CO}
    COX2+Cbelowabove2CO\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{CO2 + C ->T[above][below] 2CO}
    COX2+C2CO\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{CO2 + C <=>> 2CO}
    COX2+Cbelowabove2CO\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{CO2 + C ->T[above][below] 2CO}
    COX2+C2CO\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{CO2 + C <=>> 2CO}
    COX2+Cbelowabove2CO\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{CO2 + C ->T[above][below] 2CO}
    COX2+C2CO\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{CO2 + C <=>> 2CO}
    ABC\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{A\bond{...}B\bond{....}C}
    ABC\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{A\bond{...}B\bond{....}C}
    ABC\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{A\bond{...}B\bond{....}C}
    ABC\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{A\bond{...}B\bond{....}C}
    2Cu2S(s)+3O2(g)2SO2(g)+2Cu2O(s)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 2 Cu_2S_{(s)} + 3 O_{2(g)} → 2 SO_{2(g)}+ 2 Cu_2O_{(s)}
    2Cu2S(s)+3O2(g)2SO2(g)+2Cu2O(s)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 2 Cu_2S_{(s)} + 3 O_{2(g)} → 2 SO_{2(g)}+ 2 Cu_2O_{(s)}
    2Cu2S(s)+3O2(g)2SO2(g)+2Cu2O(s)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 2 Cu_2S_{(s)} + 3 O_{2(g)} → 2 SO_{2(g)}+ 2 Cu_2O_{(s)}
    2Cu2S(s)+3O2(g)2SO2(g)+2Cu2O(s)\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} 2 Cu_2S_{(s)} + 3 O_{2(g)} → 2 SO_{2(g)}+ 2 Cu_2O_{(s)}
    [Cu(NHX3)X4]SOX42HX2O\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{[Cu(NH3)4]SO4.2H2O}
    ABC\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{A\bond{->}B\bond{<-}C}
    X=YZ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{X=Y#Z}
    [Cu(NHX3)X4]SOX42HX2O\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{[Cu(NH3)4]SO4.2H2O}
    X=YZ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{X=Y#Z}
    ABC\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{A\bond{->}B\bond{<-}C}
    [Cu(NHX3)X4]SOX42HX2O\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{[Cu(NH3)4]SO4.2H2O}
    X=YZ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{X=Y#Z}
    ABC\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{A\bond{->}B\bond{<-}C}
    [Cu(NHX3)X4]SOX42HX2O\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{[Cu(NH3)4]SO4.2H2O}
    X=YZ\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{X=Y#Z}
    ABC\gdef\cloze#1{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}} \ce{A\bond{->}B\bond{<-}C}