$ [ $ | $ ] $ | $[ xyz ]$ | |||
$\lbrack$ | $\rbrack$ | $\lbrack xyz \rbrack$ | |||
$ \{ $ | $ \} $ | $\{ xyz \}$ | |||
$\lbrace$ | $\rbrace$ | $\lbrace xyz \rbrace$ | |||
$ ( $ | $ ) $ | $( xyz )$ | |||
$\langle$ | $\rangle$ | $\langle xyz \rangle$ | |||
$ < $ | $ > $ | $< xyz >$ | |||
$\lgroup$ | $\rgroup$ | $\lgroup xyz \rgroup$ |
$\lgroup$ | $\rgroup$ | $\lgroup xyz \rgroup$ | |||
$\lsem$ | $\rsem$ | $\lsem xyz \rsem$ | |||
$\llangle$ | $\rrangle$ | $\llangle xyz \rrangle$ | |||
$\ullcorner$ | $\ulrcorner$ | $\ullcorner xyz \ulrcorner$ |
$[ xyz ]$ | |
$\bigl[ xyz \bigr]$ | |
$\Bigl[ xyz \Bigr]$ | |
$\biggl[ xyz \biggr]$ | |
$\Biggl[ xyz \Biggr]$ |
$\lbrack xyz \rbrack$ | |
$\bigl\lbrack xyz \bigr\rbrack$ | |
$\Bigl\lbrack xyz \Bigr\rbrack$ | |
$\biggl\lbrack xyz \biggr\rbrack$ | |
$\Biggl\lbrack xyz \Biggr\rbrack$ |
$\{ xyz \}$ | |
$\bigl\{ xyz \bigr\}$ | |
$\Bigl\{ xyz \Bigr\}$ | |
$\biggl\{ xyz \biggr\}$ | |
$\Biggl\{ xyz \Biggr\}$ |
$\lbrace xyz \rbrace$ | |
$\bigl\lbrace xyz \bigr\rbrace$ | |
$\Bigl\lbrace xyz \Bigr\rbrace$ | |
$\biggl\lbrace xyz \biggr\rbrace$ | |
$\Biggl\lbrace xyz \Biggr\rbrace$ |
$( xyz )$ | |
$\bigl( xyz \bigr)$ | |
$\Bigl( xyz \Bigr)$ | |
$\biggl( xyz \biggr)$ | |
$\Biggl( xyz \Biggr)$ |
$\langle xyz \rangle$ | |
$\bigl\langle xyz \bigr\rangle$ | |
$\Bigl\langle xyz \Bigr\rangle$ | |
$\biggl\langle xyz \biggr\rangle$ | |
$\Biggl\langle xyz \Biggr\rangle$ |
$< xyz >$ | |
$\bigl< xyz \bigr>$ | |
$\Bigl< xyz \Bigr>$ | |
$\biggl< xyz \biggr>$ | |
$\Biggl< xyz \Biggr>$ |
$\lgroup xyz \rgroup$ | |
$\bigl\lgroup xyz \bigr\rgroup$ | |
$\Bigl\lgroup xyz \Bigr\rgroup$ | |
$\biggl\lgroup xyz \biggr\rgroup$ | |
$\Biggl\lgroup xyz \Biggr\rgroup$ |
$\lgroup xyz \rgroup$ | |
$\bigl\lgroup xyz \bigr\rgroup$ | |
$\Bigl\lgroup xyz \Bigr\rgroup$ | |
$\biggl\lgroup xyz \biggr\rgroup$ | |
$\Biggl\lgroup xyz \Biggr\rgroup$ |
$\lsem xyz \rsem$ | |
$\bigl\lsem xyz \bigr\rsem$ | |
$\Bigl\lsem xyz \Bigr\rsem$ | |
$\biggl\lsem xyz \biggr\rsem$ | |
$\Biggl\lsem xyz \Biggr\rsem$ |
$\llangle xyz \rrangle$ | |
$\bigl\llangle xyz \bigr\rrangle$ | |
$\Bigl\llangle xyz \Bigr\rrangle$ | |
$\biggl\llangle xyz \biggr\rrangle$ | |
$\Biggl\llangle xyz \Biggr\rrangle$ |
$\ullcorner xyz \ulrcorner$ | |
$\bigl\ullcorner xyz \bigr\ulrcorner$ | |
$\Bigl\ullcorner xyz \Bigr\ulrcorner$ | |
$\biggl\ullcorner xyz \biggr\ulrcorner$ | |
$\Biggl\ullcorner xyz \Biggr\ulrcorner$ |
$\left[ X^{X^{X^{X^{X}}}} \right]$ | |
$\left\lbrack X^{X^{X^{X^{X}}}} \right\rbrack$ | |
$\left\{ X^{X^{X^{X^{X}}}} \right\}$ | |
$\left\lbrace X^{X^{X^{X^{X}}}} \right\rbrace$ | |
$\left( X^{X^{X^{X^{X}}}} \right)$ | |
$\left\langle X^{X^{X^{X^{X}}}} \right\rangle$ | |
$\left< X^{X^{X^{X^{X}}}} \right>$ |
$\left\lgroup X^{X^{X^{X^{X}}}} \right\rgroup$ | |
$\left\lsem X^{X^{X^{X^{X}}}} \right\rsem$ | |
$\left\llangle X^{X^{X^{X^{X}}}} \right\rrangle$ | |
$\left\ullcorner X^{X^{X^{X^{X}}}} \right\ulrcorner$ |