Changeset 155 for docs/trunk/omega-test-slides/omega-test.tex
- Timestamp:
- Jan 15, 2008, 9:21:04 PM (18 years ago)
- Author:
- neil.c.c.brown
- Message:
-
Added a table in the notes explained the five possible cases for a variable divisor with REM
- File:
-
- 1 edited
- docs/trunk/omega-test-slides/omega-test.tex (modified) (1 diff)
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docs/trunk/omega-test-slides/omega-test.tex
r154 r155 779 779 as[(i + 1) REM n] := 42 780 780 \end{lstlisting} 781 (追記) (追記ここまで) 782 (追記) \note{ (追記ここまで) 783 (追記) \begin{tabular}{lll} (追記ここまで) 784 (追記) & $x = 0,ドル & $x \operatorname{REM} y = 0$ \\ (追記ここまで) 785 (追記) \hline (追記ここまで) 786 (追記) $a = 0$:& $x \geq 1,ドル& $x \operatorname{REM} y = x,ドル \\ (追記ここまで) 787 (追記) 1ドル \leq y$ && $y - 1 \geq x \geq 0$ \\ (追記ここまで) 788 (追記) \hline (追記ここまで) 789 (追記) $a = - \operatorname{sign}(x)|y| \lfloor \frac{|x|}{|y|} \rfloor$:& $x \geq 1,ドル& $x \operatorname{REM} y = x + a,ドル \\ (追記ここまで) 790 (追記) 1ドル \leq y$ & $a \leq -y,ドル& $y - 1 \geq x + a \geq 0$ \\ (追記ここまで) 791 (追記) \hline (追記ここまで) 792 (追記) $a = 0$:& $x \leq -1,ドル& $x \operatorname{REM} y = x,ドル \\ (追記ここまで) 793 (追記) $y \leq -1$ & & 1ドル + y \leq x \leq 0$ \\ (追記ここまで) 794 (追記) \hline (追記ここまで) 795 (追記) $a = - \operatorname{sign}(x)|y| \lfloor \frac{|x|}{|y|} \rfloor$: & $x \leq -1,ドル& $x \operatorname{REM} y = x + a ,ドル \\ (追記ここまで) 796 (追記) $y \leq -1$ & $a \geq -y,ドル & 1ドル + y \leq x + a \leq 0$ \\ (追記ここまで) 797 (追記) \hline (追記ここまで) 798 (追記) \end{tabular} (追記ここまで) 799 (追記) (追記ここまで) 800 (追記) } %note (追記ここまで) 801 (追記) (追記ここまで) 781 802 \end{frame} 782 803 %TODO try Adam's problem from the last presentation
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