Phép trừ các số tự nhiên: 4 023 572 - 2 833 634 =
\[\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{{\rm{ }}4{\rm{ }}023{\rm{ }}572{\rm{ }}}\\{2{\rm{ }}833{\rm{ }}634}\end{array}} \\{\rm{ }}1{\rm{ }}189{\rm{ }}938\end{array}\] | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{8{\rm{ }}593{\rm{ }}919}\\{7{\rm{ }}615{\rm{ }}235}\end{array}} \\{\rm{ }}978{\rm{ }}684\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{5{\rm{ }}562{\rm{ }}431}\\{4{\rm{ }}086{\rm{ }}126}\end{array}} \\{\rm{ }}1{\rm{ }}476{\rm{ }}305\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{7{\rm{ }}344{\rm{ }}407}\\{7{\rm{ }}120{\rm{ }}278}\end{array}} \\{\rm{ }}224{\rm{ }}129\end{array}\) |
\(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{6{\rm{ }}759{\rm{ }}619}\\{2{\rm{ }}389{\rm{ }}270}\end{array}} \\{\rm{ }}4{\rm{ }}370{\rm{ }}349\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{9{\rm{ }}902{\rm{ }}783}\\{1{\rm{ }}207{\rm{ }}859}\end{array}} \\{\rm{ }}8{\rm{ }}694{\rm{ }}924\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{5{\rm{ }}140{\rm{ }}173}\\{4{\rm{ }}077{\rm{ }}154}\end{array}} \\{\rm{ }}1{\rm{ }}063{\rm{ }}019\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{7{\rm{ }}271{\rm{ }}435}\\{4{\rm{ }}541{\rm{ }}455}\end{array}} \\{\rm{ }}2{\rm{ }}729{\rm{ }}980\end{array}\) |
\(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{5{\rm{ }}701{\rm{ }}271}\\{2{\rm{ }}066{\rm{ }}363}\end{array}} \\{\rm{ }}3{\rm{ }}634{\rm{ }}908\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{1{\rm{ }}524{\rm{ }}456}\\{{\rm{ }}1{\rm{ }}427{\rm{ }}853{\rm{ }}}\end{array}} \\{\rm{ }}96{\rm{ }}603\end{array}\) | \[\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{8{\rm{ }}178{\rm{ }}955}\\{6{\rm{ }}219{\rm{ }}324}\end{array}} \\{\rm{ }}1{\rm{ }}959{\rm{ }}631\end{array}\] | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{4{\rm{ }}286{\rm{ }}369}\\{3{\rm{ }}623{\rm{ }}226}\end{array}} \\{\rm{ }}663{\rm{ }}143\end{array}\) |
\(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{{\rm{ }}4{\rm{ }}971{\rm{ }}268{\rm{ }}}\\{1{\rm{ }}546{\rm{ }}491}\end{array}} \\{\rm{ }}3{\rm{ }}424{\rm{ }}777\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{6{\rm{ }}707{\rm{ }}203}\\{4{\rm{ }}332{\rm{ }}962}\end{array}} \\{\rm{ }}2{\rm{ }}374{\rm{ }}241\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{5{\rm{ }}498{\rm{ }}009}\\{2{\rm{ }}512{\rm{ }}547}\end{array}} \\{\rm{ }}2{\rm{ }}985{\rm{ }}462\end{array}\) | \[\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{5{\rm{ }}226{\rm{ }}048}\\{{\rm{ }}1{\rm{ }}500{\rm{ }}703{\rm{ }}}\end{array}} \\{\rm{ }}3{\rm{ }}725{\rm{ }}345\end{array}\] |
\(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{3{\rm{ }}408{\rm{ }}365}\\{2{\rm{ }}858{\rm{ }}740}\end{array}} \\{\rm{ }}549{\rm{ }}625{\rm{ }}\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{5{\rm{ }}383{\rm{ }}746}\\{1{\rm{ }}433{\rm{ }}794}\end{array}} \\{\rm{ }}3{\rm{ }}949{\rm{ }}952\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{9{\rm{ }}620{\rm{ }}946}\\{9{\rm{ }}418{\rm{ }}558}\end{array}} \\{\rm{ }}202{\rm{ }}388\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{{\rm{ }}5{\rm{ }}975{\rm{ }}975{\rm{ }}}\\{4{\rm{ }}423{\rm{ }}225}\end{array}} \\{\rm{ }}1{\rm{ }}552{\rm{ }}750\end{array}\) |
\(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{5{\rm{ }}824{\rm{ }}360}\\{1{\rm{ }}389{\rm{ }}319}\end{array}} \\{\rm{ }}4{\rm{ }}435{\rm{ }}041\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{{\rm{ }}1{\rm{ }}668{\rm{ }}225{\rm{ }}}\\{1{\rm{ }}505{\rm{ }}880}\end{array}} \\{\rm{ }}162{\rm{ }}345\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{6{\rm{ }}391{\rm{ }}057}\\{5{\rm{ }}993{\rm{ }}743}\end{array}} \\{\rm{ }}397{\rm{ }}314\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{5{\rm{ }}457{\rm{ }}427}\\{{\rm{ }}2{\rm{ }}256{\rm{ }}707{\rm{ }}}\end{array}} \\{\rm{ }}3{\rm{ }}200{\rm{ }}720\end{array}\) |
\(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{6{\rm{ }}628{\rm{ }}248}\\{4{\rm{ }}741{\rm{ }}633}\end{array}} \\{\rm{ }}1{\rm{ }}886{\rm{ }}615\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{4{\rm{ }}985{\rm{ }}679}\\{2{\rm{ }}709{\rm{ }}404}\end{array}} \\{\rm{ }}2{\rm{ }}276{\rm{ }}275\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{7{\rm{ }}184{\rm{ }}092}\\{2{\rm{ }}747{\rm{ }}331}\end{array}} \\{\rm{ }}4{\rm{ }}436{\rm{ }}761\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{7{\rm{ }}608{\rm{ }}039}\\{4{\rm{ }}258{\rm{ }}616}\end{array}} \\{\rm{ }}3{\rm{ }}349{\rm{ }}423\end{array}\) |
\(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{2{\rm{ }}498{\rm{ }}521}\\{1{\rm{ }}097{\rm{ }}734}\end{array}} \\{\rm{ }}1{\rm{ }}400{\rm{ }}787\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{9{\rm{ }}412{\rm{ }}507}\\{4{\rm{ }}099{\rm{ }}783}\end{array}} \\{\rm{ }}5{\rm{ }}312{\rm{ }}724\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{{\rm{ }}6{\rm{ }}389{\rm{ }}742{\rm{ }}}\\{3{\rm{ }}605{\rm{ }}229}\end{array}} \\{\rm{ }}2{\rm{ }}784{\rm{ }}513\end{array}\) | \(\begin{array}{l}\underline { - \begin{array}{*{20}{c}}{{\rm{ }}5{\rm{ }}729{\rm{ }}793{\rm{ }}}\\{3{\rm{ }}710{\rm{ }}452}\end{array}} \\{\rm{ }}2{\rm{ }}019{\rm{ }}341\end{array}\) |