too11 发表于 2023-3-8 15:58:33

新手练习一个整数与整数相加的练习题


代码
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iXeQOAWfhRLiDIbgpPkfS/NIZTHx8AADhtoXdM1nz3Z0SMNUa23xprq7HPntPZZsyrXhOnOO+1/m8xvq3u0ymojd3Otyjdkxnzdy73LjqOUeM9l3kDgFl4xwQIOOWNhm6WRG4cNt+WBwAA2AsHE+BC1A5XfJcXAADMNOxHuXJlazG8785G2otqGYOV9kvqR8fojUmNGFvPmLw+5erb+LZeOr70ubAx0zZz7Ym0rEjLe2VUKXZUOq5U7nqpXrSOPhe59nuU+pbj1Sn1V3hlPaWYKS9OrazXv1wdkbZRKtsqNz6bHyljRfP1uUjLpmxZIeVz7ai0jqj1KVW6XqsbFY0T7avV0u80P41X6x8AXIqp75h4/9mLXP4epG2v/Zl9Wqs0z2vHldbX517cXFut+TNoX7bYQKTjPKZxe7z+je5zLp7k19pKr5dipWqxR5v5epL8njmIxsttwkWpDb12LJv1XF9LYyhpnQ8AuCTD/1xwGq43XxS6FtYyBtHTr1qdEeOwWsa0pt/C63vuetqvln609EGvpflrpf1P5dor9Sd3LTe+XH6vUt9yvDqlftXGkms7dz3SVmsfhJfvxUnzetX6qvleuWhdpfnCiyPWxhKt8SJtiEidHmk7NZExCRs30vdceVG6BgCXZso7Jrn/vMXM/5iPtV+9ague5tlyVm3M6XX7vHQt5V0rlZ9hq/60zNMx2PpejX7NtvZt5Fi8vurjUjuRMjlpnVyMUhu1OqJUz5YrybVzLHrmqGZkLAA4R6GDifzH6aW15D9+L23B67+kU+aNR1LKyztWW78OIry5nNmfS7T1a1bjz36tnaKWe2PnWZXmW6+Nvv8Sr5RK9DWSJgDAePxVLkx3zIu93bSwGTkv6b2d9RqsbYwBALgUUw8m+t2qXML5043gMd//Y+pLK+17dMNt78cl0NeaHe/Iw4k3j7m5te3mypwLHZ9+HTnno0kfSwkAMA7vmAABugE55g1UTa3vvWM75TmxttxkyhxF5ulc5tKy/3ZK49Nrl7bZP8d7DgC9phxMapu8Wf9Rl/p1iotHbUOgece4ETjm+c71Lc0/ljHY+xvpe+n1UBrTiNfRXq/Z0jgugZ3nVG5u9ro3x6I0RyKXX1Kqcy7zBgBrTH/HRP6jTtMWvHY0eSJlokbFWcv2Q/tyLIth2rdIv2z5PeT6ZPNtn45po5HroybVOu+2bk5L2ZStq/VHzWsae3R8ZePlYkfKbMWbgwivXqTvaZm9x9sjHauOt8eoOABwjqYdTGQxyi1IMxeqkX2aOQ4lfRg5ptG8PtT6NbPf2na6oUj7NLOPOdKnXL9K1yyvTK5uJJ4nF0/0xkxtHf8U9MyBXOutFxEtt5fe8eZ4dUptAMClKX7AIgAIPYjx3wXQjn8/ABDjHkxa3l4+1v9oW98iP7cFo3X84lIXzZ65Esc+X73jsnSMGutSXyMtRsx7inlvs/YejJ5v/v0AQAzvmACoYmMF9OPfDwDE8OeCAQAAAEzHwQQAAADAdPwoFwAAAIDpeMcEAAAAwHQcTAAAAABMd+3222/nR7kAAAAATHXttttu42ACAAAAYKprr371qzmYAAAAAJiKv8oFAAAAYDp++R0AAADAdBxMAAAAAEzHwQQAAADAdBxMAAAh77t27eoRemw5f9HYI/oQicFrBUAPDiYAcKFk86ipRsuM2nBG2z0WI8e9lTR27vmIPkiMWpwR7QC4LPxVLgC4ULpxfHxgGbCbzEj5iNEx99gI9/Zzi7HaOBq/lOeV6ZG27YmUAYAUB5OCm6/dfPh609duOnxFzLU7F6TIyypabivc3z6ncn9RF908ehvckZvONP6Wcn3fug82/oj5S/tbey68vFbRGFIuV6Z0DcBly/4ol2wqNF0i3bQK+xhl+nqpvW6i5bbC/e1zKvcXp0U2qZJ003tuRhwIUhqrNGdeeyP7IG3nUum6XgOAFL9jgsPGXNMadhNa+065vc7mdVvc3/NmN3tK80r5ei3N03ylz+2GVh6n5UbZKu4se8+fkNjpAWRkexpbvuZS7bokAEhxMMmwP97Dj/rUtWxa1czNK/e3zandX/jSTaF9bpPyNtVK8uT6lhvsc6bzt1Z6bySm5rXEj5SNxhsxLgCXiYNJgWxY2bS2iW5a1ezDCfe3zSndX4zhHUpEugFmM/qNdE5ycyha503nWuvZxyq9bum1NOm1mtJYAGCt7C+/93yHFKfJ/ohPz0Z97WuF19q2uL/nTTeTdsNoN5jeRtLWkcdpmfS6x9ZNy6TxIkbEsHL9XqOlT9q+raPzZXnlWtmxenFKbUTbt20IWz69VrNmrADOW9PBxOaJrTcZaXtqi3ZrP39f2tB5Gz8vnhcjUjfXtlc3Fe1bSS62GLXp3HrzWhtzaYzROfRiROrm2vbqpqJ9K8nFFqdyfy+Zt7G0G8XcZlTz0/r2Woveesr2Y20skYtRyhfptVx+SWsszRct7Qhb17JxpIw816+Wl+cp9VGv1eJE2wJwucI/yuUdEiTPy1+rFnerdkfJbQwjG0avjOS1bjaxHe4vZpMNnibl5QkvL0fK9Wwce+ulzmHTqnPdMhZbtvV+CVtfH0djRIyMBQAloXdMlC1qr4/+DqjEzsVM+zW6bctuFkvfVfY2lbZ8er10TeSup32I9G9UmZxRr4MtX0850XHbcsqWT6+Xronc9bQPkf6NKpNzyvf3nPVsFNMNq/dcHuvXHK1npTFblfrUS8eS6skXkb7kYqhaLL2eivTLey6P9avNs7y8lI0lvBgiGgcAcsLvmKSbCfs8PSysVdq4lK5JP1rSVtLNX8tmsFTX2+TOZOdw7WZzy9fTaNzfdqd0f0+BbO7SDV4pL80XsknUDaXQxzavpf5IXnsjbNVfnYu1/U7nOn2utC3vmipda9EyLp2HXAKAmtDBZO2m5JK0bFJTa+piH9xfnAPd1NoNp5dX01I2RzesXqytNrO5jXJPe1Kndd5qcvG037m20vxSWdEz3hLtdy4BQM1Z/blgOUC1JAA4By2bvkvfINpNsm7M9avky+OWDfue82n7bnn9lby1fRsRAwBaHPXBRH7kw0sAgO3pJt3b+I6gcb3Nr+aNarsWR9sb3e5o0q80qTTPXhMyNi8vp3QNALZwlAcTDiAA4Es3n8LLE15eC9mYatpKJPaaMVi2LR3XqNh70X5rUl6+vb4Hfb3lEgDUHN3BJD2QtPwIlh5oogkAcJe9N5CRdkZtrKWtUqz02t4b+rXS/kbmdov7LP0oJQCoOeof5SodQgDgEnkbPS9PeHmyIbVJeTG8ciNovLRvHi0zug9CYub6EOnbbKU5KY2rZf4BYE/dBxP7jkPkALHHOxX2XZVIOgVrPoNi6z8/a+dw7X1tfT2pPV5XW+L+ope3KbV5tU2nXI+WqZVrsWZTXNqI50gdr61c/inReyNjsQkATlXXwaR1k5KWj9b36rW2fcpaNp5p2d5N69ab3ZF6X1fHgvuLGXQzO4Numlvbt+VbN95eWxJj1hxsQcaSjic3T1seXCR2KQFATdMnv3si3/30YpXqtWwwR333tWXDln5n29bNfdc7VybabiRuSupE+iZqcXLsvVpzL3ritLyuovMs0vFG5jBXJtpuJG5K6kT6JmpxcmbeX5TZjZ5uSr28Gq1jy0fzVOmaipSp0Riq1t6attSIfquRsVJpbK8tm9fTl1ydaCwp19IegMuTfcektnmQ69ENRutGJFe+pc1zIZvG0sYxd61Ux9NaXtn74R0UIno3refwWuD+4hL0bII93oZYY18qnQOZGzs/3lwJzdevzCGAY5J9x2S0dFPDBuUu0e94H7O1G0+tv6auOrbXFfd33f3F9tINq4jk2edeeSXXvPw1IjF729WxpEaMoTRPrVpilcqm4y3Fy8WJ9kXKaRn7GADUUf9VLpwGu+FMDwo1reWxP+7vZZMNpLfxlMeS9Jpnq83nlhtaHZdtY8v2Wui90Hmt9StS1ubX4inbD0kqzU+TLaOPAcDa5WCSbk74zun56dm82nI9rwleV/uZcX8xl25SS5taYculSvVOxegxrIkndTWV6OY/UlZEyyktPyIBgLXpwUQ2JmweL0fL5nXNppXX1Rx73V/sy9sgehvG0ibyGDeYI/o0elx7zZO0s0VbW8UFALXbj3LJ5oQNyvnTe1y719FyNVJ/bQzERe9btBwAAIDa7ZffAQAAACCHX34HAAAAMB0HEwAAAADTcTABAAAAMB0HEwAAAADTcTABABTt8UF4l/Bhe8c2xtb+bNn/2bGP7d60iPZ9xhjXtnmM927GPF4SDiYAcOFkoa0ttpEya8jnY2wRX/sdid1StteWsXu09mfL+dk6ds2W7atS/N629d9OpH603Ehr24v0ecSYWmKMaA8+DiYAgKq9PlxvqwW/pe9bjnOPOWzR05/eMUTu7V7zk+tLS/sSozVpvRxbroX2u1ZXyu01x6mecYlIn9eOSftW62PvGBB3EgeTm6/dfEinqvYp2SPs0QaAy7PnQhzdXLT2KRfXi9NSdrQ957q3rVEbwC1IbC+pNC+93nrvpbxNysv38ixtI3d9LYnfGlfnJ5daSfst9XraSLXGiM5R61gQd/QfsJgeSG762k1Xj06DPTBsNdV7tAHgfOkCmy7KLQtvZEEfvZDX2oy217LJKLU5anyRuVxL+2rbkrza+NLrtTopr12Ryx+hFluv19T6Vhpbqe6osZfi1PrgicbTciVp2UhfbNlIGyW19ux4Smy5aB204WDisG2uaW/PAwOHE+Ay2cVb2UU8utiKtGxk4c3VTUViRUVjpeVK9VrK5kgdEW0j1dNmlPYtQvrQUl609NubJy9vlFpsue5dy+Xn5NqpxWltp1Upfu2a8K5H++zFaKk7slyO10fPmrEg7uh/lMseDE7p3ZK9Dwq2Dds2AFi6uNZEykUX9JGiGwGvnDyX/HRsLWVPlYzHJi9Pk3dNpfmaWvXUidL7lt6/XL5In+9F2m2dCzuGSCrV0Ws1tvxakfFG29qqT7nxen0f1Qfc5SR+x0QOJKd0KLH2fPeCwwmAGllYc4uu0mulsrZMTamtCK0vX6PtRcqJtX07Rb1jjs5pzdo4kf5LG5qUfa5fc6+VPV4XubZrdBxpql0T3jVJx2iPfkXvQe71oHX3eL1cCv4q1wY4FAA4daXFWhfh6MZBytkFvDVpvUh7pXIaK72eKy/5kTZPmZ3jLWj8WlLetTTZcmtIfb2/8nVtvBa2bWvPPqwlfa0lVbqW0mteOc1Lr6X5mnpovfT+5P4v0Pze9nB34d8xyW22R78jUPvrW6V3TrzfDfHipTFqbaZKfVjzI1yj5nhNHwCcFm8RtQtkbjGVMumCKs9tvsqV3YO2J9a06cXxxqpK13JsG71GtVmKY8em9WvlRa6Mjdcj0gcr0p8oG0PH0doflauncSN62xaldnri2jpp/VxbXn6ubI62JbxYohYv0mauTJofiSW0byLStifSzrmrvmMim9zchlmUrs2WO3C0HkS2FpnjY55nAPuSRU2T8vKEl1fiLYyap3H2WjxteyPaTOPUYrbMm6XtpKl0TVKL2n3NXYuMSWNrUmm+Jr12TLw5tXm561uPoxT/2Oaw15px7D0H0l6aLHmevk5SWseW82KJXL6qXb8ExXdM0s2wV1TKbP1dee+dEE/t3ZH0ei5WtD2PnbPovJTmMHIPUj19AHA6ehau0uKq8VrLSF5t0e41MnZkfKktxjYqpo5HeTFzbaVz4T1P6+VijZL2oSbaH42bKtVt6UsufkQav3UOPKV56Ylv66T1c2157eTKerSsF0fk8lORNtMyaWx7Xa+VePVStWtWrty5C/+OSW6D6+XLxrglbSU9VLQeMlrZsbQcCEplew4Wts6W8wtgDlmw0kWrlJfmt5DFUhfTNXEidGEuLd6tNKbG0/HUUq7s1lrbyM2Tl29jp+NJn+9t9GtLx2Lj2teAJ52PGolnk/LyvTzl9fUSyTxE50DKllKE15bmSQx7XR7XkrKPU73XLkn2YHLqG9qtDyEAcM50gU8X3a2lG4LRdDy1lCubo/NVSpFyWiandK1G+++Nx8sTa9qLSOPL87Vtav10LMLL0zbTORjRlyivX3sYMcY950nZe+WlVtJ/W68nBsYIvWPS+l17Kd+SAAD91iyi6YZCNxmtC/zeG5NIe6UyW/RX5yyXWspERMtZPXX2pP2T++Pdo9p9k+sSozROey1SXvtSa7uHth9h++GlUhlVyl8jHUMav0bKRudhtJlt4xvx54KPiP5oW5oAYAvpgmw3EvK4lmw5fWzptWhS3rU0abkcuVbabMi1Un3cfX7lcS710rrpfcq9Jku0L3pfbVJpvl7L5VsSN+3nGtpOS0ztQy6VyijvmqaRNKbOpTen1uj2o1rvwSh6/9MEDiZHgQMIgChvEfPyhJenJD9dkHUzEU1eHSu9VkvKu5ZLHm9sObn5uVT2NaNzaOfbpi3Z+JF7ZPukj0tJede8FBUpq6/PXNlzek22zF0LfZ3mUoSWS+tqUt61XKqJlrtkmxxM7Hf7I+mSpePnR90AbEkXxugG6tRExya0HBuFu78u7Pzl5lLnLDrXqUj93tjHLjKu1tdka/kett8t92aL+ygxSynClkvr22vKK6MpIr1HvXHOHe+YHBEOIQBqvEXMyxNpXuvmReruseEZKZ2DPclclVK0zJZy7aWvlRKtN3OuW9hxRrSWFz11PMc2t7Yfo8Z4TFpe9yOdyr+dGbIHE7tJbn1Xw363P5LOhR3LzHeCbNvnNL8ArvM2CTbPW/g0r3VRPMcNiTVqkyBxSilapsSWab0v6esj0l7Omrraj+h417RVI31Jk+a3WttPbbM3zuh5SuPJ8555UWvq4nKE3zHJbbRnbsD3sOenxKdzKc/PfX4B7Gv05uXUjZqPWXFym71cvsRvaSONI8/XjFXjjZqvtXQ+vLSnNfOSu9ej2PjSP3keadOWS8cVqV+isXPp2KV9PJV+76H4ye8isjEe+V35loNA+lklkU9sj36qe6kfpXp2vqLz0nL4iMTs6QOA02IXMV30vbwIrde6KZJ6rXVKevtRcixjEyNj6rhKIm1F5idtq3cMkbZqeubQqzOiL6rWp8h10dOXaN21bdh6aSx7Xa+JtC1bL42ZSttQufxULX6JtiG0r/o4p6VfUb39P3XVd0xkY1va3J7rxrf3AxrtfEQPHLk5rM29h0MJAJw/2bSUNi4jNzVpWy2bKxXduJX0tLuWtLlVuxo7nd9Wa+r28Nqz85Qbz979jNB+26T9T/vrldUUlZsDr71LVX3HBO1mHg60bW4rgChdWEsLo118pVykTk1uQR+5QLeMzZaRvJH9EFvEXCsyP5aWF611WsZu20nl4pTqjOC1K23WxuWV6ZkTq7V+b3ul8WlMFYlt65TK5/obHYftt31sre2LFe0X6jiYbGTG4YR3SwD0aFlU7WIuRizEW8RUs8dmSfzRMddqmR/VOqdrxrz1PVkjOjZbrmXucnpi9NaplY+USUX6omVGau2naulvbxu4joPJhvY8KHAoAdCrd3MxchHeamE/hrGpreKu0dunSL1R45U44pjmrmdsa+djzTy0tr22r2utGetokbmYPV/nhIPJxvY4MHAoAQAAwKnjAxY3pgeFLQ8Me7QBAAAAbIl3TAAAAABMxzsmAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAIAi/UyBLe3RxmzHNsbW/mzZ/9mxj+3etIj2fcYY17Z5jPduxjxeEg4mAHDhZKGtLbaRMmvIh5NtEV/7HYndUrbXlrF7tPZny/nZOnbNlu2rUvzetvXfTqR+tNxIa9uL9HnEmFpijGgPPg4mAIAq2fzs8cnGWy34LX3fcpx7zGGLnv70jiFyb/ean1xfWtqXGK1J6+XYci2037W6Um6vOU71jEtE+rx2TNq3Wh97x4C4kziY3Hzt5kM6VfaT2beyRxsALs+eC3F0c9Hap1xcL05L2dH2nOvetkZtALcgsb2k0rz0euu9l/I2KS/fy7O0jdz1tSR+a1ydn1xqJe231OtpI9UaIzpHrWNBXPcHLNqN8Jaf0ZgeSG762k1Xj05DbZ5GzONe9wLAedIFNl2UWxbeyII+eiGvtRltr2WTUWpz1PiibUTmPEfj2BiSV2s7vV6rk/LaFbn8EWqx9XpNrW+lsZXqjhp7KU6tD55oPC1XkpaN9MWWjbRRUmvPjqfElovWibJjHBn31HAwcdg217QXmaNR88jhBLhMupjZhax1gfNiiMjCm6ubisSKisZKy5XqtZTNkToi2kYq0qa2IVr6Z+vVSNyW8qKnL7aOlzdKLbZc967l8nNy7dTitLbTqhS/dk1416N99mK01B1ZLsfro2fNWCI0vhgV8xQd/Y9y2YPBKb1bsvdBwbZh2wYAyy5+JZFy3kK9tehGwCsnzyU/HVtL2VMl47HJy9PkXVNpvqZWPXWi9L6l9y+XL9Lne5F2W+fCjiGSSnX0Wo0tv1ZkvNG2tupTbrxe30f1AXc5id8xkQPJKR1KrD3fveBwAqBGFtbcoqv0WqmsLVNTaitC68vXaHuRcmJt305R75ijc1qzNk6k/9KGJmWf69fca2WP10Wu7RodR5pq14R3TdIx2qNf0XuQez1o3T1eL5eCv8q1AQ4FAE5dabHWRTi6cZBydgFvTVov0l6pnMZKr+fKS36kzVNm53gLGr+WlHctTbbcGlJf7698XRuvhW3b2rMPa0lfa0mVrqX0mldO89Jrab6mHlovvT+5/ws0v7c93F3od0xqG+2R7wrU/vpW6Z0T73dDvHhpjFqbqVIfWn+Eyyufznfr/Lb2AcDp8hZRu0DmFlMpky6o8tzmq1zZPWh7Yk2bXhxvrKp0Lce20avWZm4cViRGWrdUp1bGxusR6YMV6U+UjaHjaO2PytXTuBG9bYtSOz1xbZ20fq4tLz9XNkfbEl4sUYsXaTNXJs2PxBLaNxFpuyTS3rkqvmMiG9x0k3xKcgeO1oPInrz5PvX7AGAsWdQ0KS9PeHkl3oKoeRpnr0XTtjeizTROLWbLvFnaTppK1yT18Pooebm+R8ak9dM4ab4mvXZMvDm1ebnrW4+jFP/Y5rDXmnHsPQfSXposeZ6+TlJax5bzYolcPq7LvmOSboTTYvb61t+V994J8dTeHUmv52JF2/O0zot34LD1euZ5z3sDYH89C1tpcdV4rWUkr7Zo9xoZOzK+1BZjGxFTx2LZmPa611Y6F97ztJ6XN1Lah5pofzRuqlS3pS+5+BFp/NY58JTmpSe+rZPWz7XltZMr69GyXhyRy09F2kzLpLHtdb1W4tWz0hhpGXvdq38pQr9j0rq5lY1xS9pKeqhoPWS0smPpPRCk9ezz6Fz11AFwOmTRSheuUl6a30IWS11o18SJ0IVZ2xtBY2o8HU8t5cpurbWNdJ7s8zSWfZ6OJ32+t9GvLR2LjWtfA550Pmoknk3Ky/fylNfXSyTzEJ0DKVtKEV5bmicx7HV5XEvKPs6JlLlU7sFkxAZ7tq0PIVs41bkGcH50gU8X3a2lG4LRdDy1lCubo/NVSpFyWiai1B+PlvfG4+WJaF96pfHtPPTS+ulYhJenbaZzMKIvUV6/9jBijHvOk7L3ykutpP+2Xk+MEjs/o2Ofm03+KpdssFsSAKDfmoUu3VDoJkNitsRN42wt0l6pzBb91TnLpZYyW9ky9gjaP7k/3j2q3Te5bufSY69Fymtfam330PYjbD+8VCqjSvlrpGNI49dI2eg8jDazbXwj/lwwAFyodEG2Gwl5XEu2nD629Fo0Ke9amrRcjlwrbTbkWqk+7j6/8jiXemnd9D7lXpMl2he9rzapNF+v5fItiZv2cw1tpyWm9iGXSmWUd03TSBpT59KbU2t0+1Gt9wDb42ACACdENzR2offyhJenJD9dkHUzEU1eHSu9VkvKu5ZLHm9sObn5uVT2NaNzaOfbpi3Z+JF7ZPukj0tJede8FBUpq6/PXNlzek22zF0LfZ3mUoSWS+tqUt61XMJ6mxxM5HdUWhIAYB+6gEY3UKcmOjah5dhQ3P11YecvN5c6Z9G5TkXq98Y+dpFxtb4mW8v3sP1uuTdb3EeJWUoRtlxa315TXhlNGId3TADghHiLoZcn0rzWzYvU3WPDM1I6B3uSuSqlaJkt5dpLXyslWm/mXLew44xoLS966niObW5tP0aN8Zi0vO6xj+rBxHtHo/Yuh/cL7qV0LuxYRr0TZONE56qnDoDT4m0SbJ632Gpe60J8jhsSa9TGROKUUrTMGqXXQHptTXtr6mo/IjHW9rNG+pImzW+1tp/aZm+c0fOUxpPnPfOi1tQ9J948MDfXuQeT0mZ21Ib7VMz8lPhLm2sA2xu9eTl1o+bjGOJENjcSv6WNNKY8H9HHUfO1ls6Hl/a0Zl4i930NG1/6J88jbdpy6bgi9Us0di4dm9J9Pcb+zhT+5HdLqmz1XfmWg0D6WSWRT2yPfqp7qR+leq3zEj18tMzxVvcGwPGwi5kuel5ehNZrqSOkXmudkt5+lBzL2MSImDqemmg7kflJ2+wdQ6Stmp459OqM6Iuq9SlyXfT0JVp3bRu2XhrLXtdrIm3L1ktjptI2VC4/VYtfom0I7as+zmkp47HtiN6+n4Psj3LJhtbb1F7KRrf3Axrt/EQOHbX5zN2HHA4lAHC+ahsWuT56U5PGLG2wciIbt5qedteSNrdqV2OvvWdr6vbw2rPzlBvP3v2M0H7bpP1P++uV1RThxRRe3iXLvmOCfjMPB9o2txVAlC6spQXSLr5SLlKnJregj1yoW8Zmy0jeyH6ILWKuFZkfS8uL1jotY7ftpHJxSnVG8NqVNmvj8sr0zInVWr+3vdL4NKaKxLZ1SuVz/Y2Ow/bbPrbW9sWK9gt1HEw2MuNwwrslAHq0LKp2MRcjFuItYqrZY7Mk/uiYa7XMj2qd0zVj3vqerBEdmy3XMnc5PTF669TKR8qkIn3RMiO19lO19Le3DVzHwWRDex4UOJQA6NW7uRi5CG+1sB/D2NRWcdfo7VOk3qjxShxxTHPXM7a187FmHlrbXtvXtdaMdbTIXMyer3PCwWRjexwYOJQAAADg1PEBixvTg8KWB4Y92gAAAAC2xDsmAAAAAKbjHRMAAAAA03EwAQAAADAdBxMAAAAA03EwAQAAADAdBxMAQJF+psBIkZhbtLuXaN9HjPHc53KWPedM2ppxj6JtHnPfciL19x7XjHk8NRxMAODCyWJZWzAjZVpF4m3RbqoUf03bad3c8zVtKIlRizOinS0ca7/EXn3TD+fbey6kXWkz0m603Ehr24v0ecSYWmKMaO+ccTABAFTJBmbrTzbOLdgt7UqM1qT1cmy5nNp15ZUbMa+R+7P1/Wuhc6rzEZ2/czfjHmmbtXsQeY1tpff1Eenz2jFFX8O8xmP4HBMAuHC6YHoLdOlaRO9iLO1J3Vy7pWtWrv+R+rm6nrRs7bloiZ8TjSHlcmVK10bQPqa2bHOE2tzmxpWKjnPr+1BSGmtPv2pzE4mX9qmlH6XxWKWY0fZa2hJSLhr7EnEwCbp29YISTBmAc5JbWDU/onWRrS3m0bZr7ZbGVqpb65/H1knre+3V+hDhtdlrbV+i0rlJRcbR01cbN1I/0s9SnFr9VC2eiLQZbc8q9bUnZjSelitJy0b6YstG2iiptWfHU2LLRetcIg4mQRxMABwjuwAruxBHF0yRlo0snrm6NbV6ubYjfbJy7dTitLYjbFvpY6990dpGKtrPaLk91MZeur5m3rSuiM6ZKPWzFKe1r7V4wo6hJNpmTalPtWvCux4Zp/BitNQdWS7H66NnzVguDb9jAgAXRBfImki56KIspKxNKpcv0ud7kXZ7NwxpPRurZTyRstF4Le2ibNRcSpw05fIlpeQ15SW9luPFLqVSHb1WY8uvVRqbira1VZ9y4/X6PqoP54SDCQBcEFkccwun0mulsrZMlJTVpOxz/SqxbRnl9WO0XNs5Ul6TfW6l1y29lia9VtPS12MWGeuW7NxrUmmevdZL7luavPzR0viaateEd03SMdqjX/I6iLSTe71o3RGvp3PCj3IF8aNcAI6RLmp2gbQLnbdwpnW857lrwsursTFFrk2vnC0j7PWaXJ20HeHliVx+jrYpcvFE6zXLtiFs+fRaTcvYWrT2Q0hfRsyPx/YnUr/WllwvxWntqxcvjbG2TzmlerU2PbZOWl+fr1Hrq7LlWtutjVfipWXSsQqvnOXVuWShg4ndlFt7bNDXtN17mMi1qfYYNwBE5BZClVvs7GJpY9h8lSvbQutF2Nja9tp203oaN6KlbS2bsnW1ba8P0X7ZdrwYohYn2pZl27Va4tT6V7reMraSSH+j/ayJtCUkXlo27UOkT9H2rFK9WpseWyetn2vLy8+VzdG2hBdL1OJF2syVSfMjsYT2TUTa9kTaOQXFH+WSDXppk17bwK8xo+1amwBwDGRh0qS8POHllXiLm+ZpnN4FUOqldW1e7npL/3uU4re07c2PPh45hq3nwyNtltqN9mnrvtf6GRWNoa9ZL7Uotdca65StuXcj7nsLaS9Nljyv3TutY8t5sUQuX5WunZLswSTdoMu7BGnayoy2a20CwDnp3TilC2iU1kvryHNJkf5Eymg8TcrLTx+nNE/arbVty6ZsnpSLjKNmRIyodG6k7TQdg1o/e0ncNDaO056vRe+1pY/tv3N9/XhJrwstn8YUWkZpGZvOReiX33Mb81y+vvMQTSWtbY/AQQTAMfMWolJemt9CF9C1cUS6AAt9nC68yubnyljaT03Ky/fylNfXHCnrxbAicSK0rQgpW0o9cm1H+pS2ubYvJaPmW2isLfqJMeTe7PnvwmvLvk7sdXlcS8o+zsmVidQ9BUf3V7lqB5Ut2DY5lADA9cU7XTh76YLvxfLy0va1jObvweuXZfvoSfNLZcXocUlbpRSxRZ+U7cfadmz96NhyvL6sjXmOZJ5G3Le1MVrp6y6XWkn/bb2eGLgudDCJvLNhyea+JeWUrgEA7rJmIUw3BbpRaF2kS5uLSDx7LVJe+1lqt5e2X5Pro9enaMySETHWWNN26T5p3FKZvc2c5y3I3JZSqYwq5a+RznUav0bKzrpfM9punZ9TU/yrXKXDyFaHht53L1oOTkrjR9rs7RcAbEUXJ7sw2gWrtmDqojpykfP6MroNVRufsH2wdOxWrmxJ67hK/fD6VJLrb3QckfY0lmjpW8q25fXP5nnXVe6a5guvnmgpU+uHsPFKcvUtieWVS/MjfYq0lyrVq7XpsXXS+rat9LFInwvNi0jjqFx+yvapJFpuFDsfqT37sbVVfy5YjN6kczABgLzS4pTjLVp2UdWYrYvb6IW5tx8luT6m+bWxRMeaG0OkH9E2VKmtqFp7NlZL36x0XLl+q9L13LVIP6Nl9FqpH8KW9dTqW7lYaf7aPuWU6tXa9Ng6aX3bVvpY2Ha8vJpcHc2PqLVXi5WOKSI6xlLMlnk6VuFffteU8g4EkteSRrB99Ppauw4Al0AWNUmRBaxlUT11I+cjjRWpt8VcSz9KaQ/R19oxmPV6n9Wu2qN9+xpoeT1s8dqRmKUUYcul9e015ZXR1KpUd/ZraYTmX35nUw8A83iLkpcn0rzWRUvqbrXQtcbt6ceovmucdH5TpfZyde0c1+KfGhnXmjFJ/TRtbdY9OLd7L+yY9rh3e5Pxzb5vx9CH0Tb5q1z2XYlIsuzzUe+mtPDanNEPACjxFnqb5y1Wmte6kO29qZD20qT5rdYu2tpmJI6UkWT73dPnY2LH3TIWKbt27nU+bYrw+lnr+4j+jtYy32uNHnsaT56vGc+ec4G5sgeT0mZ8z416rq2RfUgPRxaHEgDn5Ng2Xx7pYy7tSTdDre16fc1trLbccEnsUuqRq5fm732vSu31jnUP0reeuZJ6XmrVU6eFjS/jjPbTlov+W4rS2Ll0jEr9OtY+9yq+YyKbci9ZpU19rzRmrQ+jpe1sMUYAOAWyKejZOM0mi/Wafuti3xvD1tcY6QYibSO9vpa2nUtRaVnpZ5r2Eu172rdSHSnTMh+j2HmzjyN0HtLUIjI3I/T0yxtP6xzlaOxcWkP6qGk0G9sma23/j0H2YFLbjMv1LTfstfij2861N7odAMA63oI8isbu3aTk6qextP+ar1+1/rFJx5MqXWtVaysnV68Wq6ctpffLSxHatnz16q/pW8TW8VNee+l4vTJ79zPC3itN2v+0v15ZTRG18XttnqrQnwsGAJwvXRxLC5tdQKVcpI6ILry9vPalzUi/0jLRMXla6pbK6jVVipeLE+2LlNMy9vHWov2brdbP2pyV6pfq1uqJ3j6JWoxUa3lV6ovGVJHYtk6pfK6/0XHYftvH1tq+WNF+XQoOJgBw4VoWRrsgi2NbTKV/0XFoud6NgZ2LlrmrlW0tN1LrHPSQfu/Rzlq1+1AbR67+mvGvnbvamDy9dWrle8YS6YuWGam1n6qlv71tnBsOJgBw4Xo3CMe2kB7rOLbaeGwVF3c5xtd4rzWvldZ5mD1vx/TvIjIXs+fr2HAwAQAAADDdJp9jAgAAAAAtOJgAAAAAmI6DCQAAAIDpOJgAAIAh9vgQZADni4MJAAAAgOk4mAAAAACYjoMJAFw4/bv/Mx1DHzzRfm3d/z3n51jvBYDzx8EEADBtMyrtatvHuiGO9suOZQtbx1fyYW97tQUAFgcTAMDqTx5u3cTaja+0rSli7w1zy9ysnceareMDwEwn8cnvN1+7+fD1pq/ddPh6auQvlGw9zXu0AeA8yUY/3fD2bv5zG+c0XmmDHW17j026NzeeaLleOicj2thyTPoXuViPAPQ4+oOJHkrUqR1O7J9N3Gqq92gDwPlq3YD2bFhb6khZkStfu76G7afX51ye2KI/amQbGmsk7RcHEwBr8KNcDjkMaVpjrwODjW3bBHD+ZJOZbjQ1r3cD2lvvXNi508dpXqp0YPDKW7XrUS1xpL8jEgCMxI9yOeyBpLfNGe9i8M4JcHl0M2o3iXaDmm4eWzevHonRuiltqeONyapdXyPStr2m5SNK/W2JUxNpJy2TjivCi8U7JgDWOImDyd5GHkz2nl4OJ8Bl8TaHdpMb2Wy2bkp7N7HROt6YrNr1NSJt22uj+prGTUXi1GIIL47miVz9SPuCgwmANfhRrg3YwwEA4LzVNuujjGhHYuTi2Hx7WBF6TfLTawAwSvYdE+9dg/R3LkrvJkTqizSGV8aa0Waq1Ic171jkDjRr4vBdK+C8ed/JthvH3CbUkvKRcqq1vCjVSa9p/0vlRa0PWi5VqhdpW6/Zxzktfa31a20MT65/tXyVXucdEwBrhN8x8Tbvkhfd1OfKtR4KWsxos4f8R547lIjSNQCXRzaHmpSXJ7y8iJ46NdqXNOm1UWxcz4i2JEbrIaDXyLmxdAzRQ4nwygPAKKF3TJR9p8Be995BaKkvSu9C1NpSo9qMtudpfbciPXR4daRMy3efWvsA4LT0bFRLm0m7yS5tSpUtH9VSp9aH0nW9pnJlemILrZt+zanFU6U4GkPU2qq1o7ZqT9cf1h4APcLvmKQb9NKG31Oqv5W921x7IMjVaY1ly6cHHwCnTzaD6YawlJfme2STqRvNSPlTkBvH2vHZDbl8tRv5rUg7I9qy99mj8Ue1BwAtQgeTtRv6PQ4hqRltAsAp0U2q0I0o7qJzkyaRztOWG/g0rrbV217pPnvjK7WXiwMAvab+VS45PGjCXe9u8A4HgFYtG0TdZHqb0HOT21BHyLx4qaS3rZq0XX0+sr3S62GL9gDAw58Lnsz7MS09oHBIAbAV2Wx6m9BT541JNtSaTon0t3aPRoxJY5Ta0munOI8ATgcHkyMgh5Pc75FwQAFg6cbQbg69POHlyQazttmdwetrr9IYR7ZjjZ5X6WMp3qi2dC4i8WwZncct5hLA5eJgckT0gJJ7FwUAzond3MqmN7c57t0Aa0wvbk+8veh81ETK5Oicagx9Xkue0jUAaMHB5EiV3kUBcLl0o203pV6e8PJmshtcSbl+p7SM1tO8FpF2ZrPzshXbRtqO5uWS8vLtdQDo1X0wWfNZH+fKHiRmvsNh2+ZwA5wn3aBbNu+YN4p2Q9viVDfB0f72zEtL+dyBZK3R8QBcrq6DSeRzS87F1mMtHWD48S0A52TEprhW3zuwqdK1S8ABAsCxa/rkd0/u3ZLed1RaDgJp3Eib0X6V+lGq1/puRfTw0fLOB++YAOfPe3ek9x0T/U56VGv5VjqOnjbsHJTkYkfqR/vVMo4Rc9obI9rPSDldf1h7APTo/lEu2ZyXNuinrnds9j/jyKGj9p+3XG/5D55DCYBLVttcy/XI5l3LpSlHNu1p2tPe7QHAFkLvmJzzAWQLMw8HfLcKQI23ia1tulOl8mtpe1u2kVNrW67X+mXnKzqGSNyUbUf1zJkXp6TUBmsQgDX4q1wbsP8hR941GWXPtgCcLtlYtmxgW8ufutJYI/OgZbaeM4k/sg2Nl0sAsDUOJhvZ+3Bi2+A7VQAidLMZ3XS2ll9j1kZ4VLstcXreLbGkrqZe0bpr2gCAGg4mG9rrcMKhBECv1o3mHhvTS9v8zh5vtP1Luy8A9sfBZGN6UNjywLBHGwAAAMCWsr/8DgAA0ELfwWdrAaAH75gAAAAAmI53TAAAAABMxzsmAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgOg4mAAAAAKbjYAIAAABgsmX5/xYscew1ck7SAAAAAElFTkSuQmCC
输出

data:image/png;base64,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


本人刚接触python几天的小白,有什么错误可以帮忙指出


KeyError 发表于 2023-3-8 18:58:54

?

too11 发表于 2023-3-9 08:45:57

图片呢,我那么大个图片呢{:10_247:}{:10_247:}
页: [1]
查看完整版本: 新手练习一个整数与整数相加的练习题