Практикалық сабақтар 2 (4)
Практикалық сабақтардың мазмұны:
1.По вкусу мороженое бывают ванильные и шоколадные. По размерам они бывают большие, средние и маленькие. Сколько типов мороженных существуют?
2. На кафедре математики работают 13 преподавателей. Докажите, что найдутся два преподавателя, которые родились в один и тот же месяц.
3. Шахтеры раздобыли 100 брикетов руды, содержащие железо, свинец и олово. Оказалось, что брикеты содержащее железо обязательно содержит и свинец, 60 брикетов содержат олово и 50 брикетов содержат железо и олово. Сколько брикетов содержит железо?
4. Группе из пяти сотрудников выделено три путевки. Сколько существует способов распределения путевок, если:
а) все путевки различны; б) все путевки одинаковы?
5. Сколько различных десятизначных чисел можно написать, используя цифры 0, 1 и 2?
6. Автомобильные номера данного региона состоят из трех цифр (всего 10 цифр) и трех букв алфавита X = {А, В, С, D, Е, Н, К, М, О, Р, Т, X, Y}. Сколько автомобилей может быть занумеровано различными номерами?
7. Докажите, что сумма кубов n последовательных целых чисел является полным квадратом.
8. Число Фиббоначи делится на 3 тогда и только тогда, когда его номер делится на 4.
Практикалық сабақтар 3 (4)
Практикалық сабақтардың мазмұны:
1. Составить таблицу истинности формулы
х → 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) 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/j/Pz8mARcfn5+XFyck5MT/dagcAg4nSHu3paTJ0/u0KGD5MPUadiwYQMGDBCRwtoja1sEHDwOAacbbty4sWPHDhGFch9eeLydp6cnzY61jh8/npaWZm5uTr81KBkCTjeEhISIuN5z8ODBQ4cOlWOeJyHLqPnz59+5c4dm01pkESfuHBrgGAJOB1RVVQUGBooopLx8M/j/pxGuX7+ecl+DmkPMa9eulelqDdBRCDgdsGvXrqysLKFVTz31FJPnwL/zzjsbNmwgoUy57/3790nGeXt7U+4LSoaA0wHi9rzISqp58+aSD9Og7t27v/XWW7t376bfmuylIuDgYQg4pbt48eLBgweFVhkZGcl68Wn9/Pz8mARcWlra8ePHLS0t6bcGZULAKR1ZlVRXVwutGj16NFlJyTCORmxsbHr37n3hwgX6rdVqNQIO/oKAU7Tap6uIKKR/eOERZP343nvv0e8bFxe3YcOG9u3b028NCoSAU7SYmBgRp1w8//zzb7zxhhzzaG7GjBmLFi26f/8+5b6lpaXh4eHz5s2j3BeUCQGnaOIuPvXx8ZF8EqFMTExcXFyYnJgWGBiIgINaCDjlSklJOXXqlNAqY2NjV1dXOeYRiuwmMwm4S5cuHThwYNSoUfRbg9Ig4JRLXDo4Ojq2adNG8mFE6NOnz4gRI5KTk+m3JitfBBwYIOAU6/bt29u2bRNRyPzwwsP8/PyYBNzu3btzcnIkfMQ16CgEnEKFhoaWlJQIrfrPf/4zYMAAOeYRZ9y4cd26dbt69SrlvpWVlUFBQcuXL6fcF5QGAadEtXepFVEox5NPtWFkZOTt7b1w4UL6rck7xNKlSxs1akS/NSgHAk6J9u3bd/nyZaFVnTp1mjRpkhzzaMPd3Z2spEpLSyn3vXbtWmJi4oQJEyj3BUVBwCmRuHtbenh4NG6suF+oqampvb395s2b6bdWqVQIOD2nuL8HyMzMJCs4oVUk2ry8vOSYR3uzZs1iEnDJyckZGRk9e/ak3xoUAgGnOGq1WsS9hsaPH//MM8/IMY/2/v3vfw8ZMuTkyZOU+1ZXV5MfJpOb04FCIOCUpaysLCwsTESh0g4vPMLPz2/69On0+0ZERKxatYrJbaNACRBwyrJ169Zbt24JrerXr99rr70mxzxScXBwmDt3roj/NC3duXOH/EiZZCsoAQJOWcRdvaDw5ZtBzdML3dzc1qxZQ7+1SqVCwOktBJyCnD59+scffxRa1bp1a2dnZznmkZaPj8/nn39O/1bmKSkpqampgwYNotwXlAABpyDizg4hy5OWLVtKPozkunXrNnbs2KSkJPqt1Wq1uBOnQdch4JTi3r17X3/9tdAqQ0NDhrcmF4rsSjMJuJiYmHXr1pmYmNBvDWwh4JQiPDy8uLhYaJW1tXXv3r3lmEcONjY2vXr1+u233yj3LSoqioqKUv4nlSA5BJxSkN0oEVU690dL1puzZ8+m35f8eHXuZwXaQ8ApwsGDB0Wsa7p16zZu3Dg55pFP7a3MyZKKct9z584dPXp02LBhlPsCWwg4RRB3doi3t7eRkZHkw8iqdevWTk5OQUFB9FurVCoEnL5BwLGXnZ29a9cuoVXNmjVzd3eXYx65kV1FJgG3Y8eOmzdvdujQgX5rYAUBx15gYGBlZaXQKnt7e1NTUznmkZu5ubmVldWxY8co9y0rKwsNDV2wYAHlvsAQAo6xioqKkJAQEYU6/ZG5r68v/YAjyMpx/vz5hoaG9FsDEwg4xrZv356Xlye0asiQIRYWFnLMQ8fEiRM7duwo4j9cS7W3oho9ejTlvsAKAo4xcVcv6PTyjWjSpImHh8fKlSvpt1apVAg4/YGAY+mXX34RsafWvn37KVOmyDEPTV5eXqtXrxbx4aOW9u7de/Xq1W7dulHuC0wg4FgSd3aIm5tbs2bNJB+GMjMzs3Hjxu3cuZNy36qqqqCgICaLR6APAcfM/fv3t2zZIrTKyMjIx8dHjnnoIzva9APOoOaBWx9//LECn18BksPvmJmoqCiScUKr3nrrrWeffVaOeeiztrZmcmlqXl7ejh077O3tKfcF+hBwzIjbP1XUg+u1R1ajc+bMod9XpVIh4PQBAo6N77777vz580KrevbsOWrUKDnmYaX20lQRt1HREvn5p6en9+nTh3JfoAwBx4a45ZsO3fpNQ23atJk6dWpoaCj91mq1OiAggH5foAkBx8D169dFfLhubGxM1jvST8MaSW0mARcVFbV69eoWLVrQbw3UIOAYCAoKKi8vF1rl5ORE1jtyzMPWoEGDLCwsUlJSKPe9e/fu119/7erqSrkv0ISAo62ysjI4OFhEIWeHFx5GFnH0A86g5lADAo5vCDjaEhMTc3JyhFZZWVmZm5vLMY8SODg4vP/++7dv36bc99SpUydPnhwyZAjlvkANAo42nB3yuGbNmpGV1Lp16+i3Jos4Jp8AAh0IOKouXLiQnJwstKpTp04TJkyQYx7l8PLyWr9+fXV1NeW+sbGx/v7+XH64CQYIOMrELd88PT25v66oR48eNjY2Bw4coNz3wYMHkZGR7777LuW+QAfnfzaKUlxcHBUVJbSKRBtZ3cgxj9L4+PjQDziDmhPiEHC8QsDREx0dfe/ePaFVdnZ2nTt3lmMepRk3blyXLl2ys7Mp901PTz98+PDw4cMp9wUKEHD04PBC/YyMjMjO+NKlS+m3VqlUCDguIeAoOX78+JkzZ4RW9e/fX6+edOfh4fHJJ59UVFRQ7rtz5868vLyOHTtS7gtyQ8BRIm75puu3JheKRIytre327dsp9y0vLw8JCVm0aBHlviA3BBwNt27dio+PF1rVpk0bZ2dnOeZRMh8fH/oBZ1Bz/dxHH32kcw/Shvoh4Gggq4OysjKhVdOnTzc2NpZjHiUbMWIEk7tgZmVl7dmzZ9y4cZT7gqwQcLKrrq4ODAwUWmVoaKhv+6d/8fT0nDdvHv2+arUaAccZBJzsdu/efeXKFaFVI0eO7NmzpxzzKN/MmTMXL15cUlJCue/+/fszMzO7d+9OuS/IBwEnOxxeEKpdu3aTJk0S8UQeLVVVVZG19urVqyn3Bfkg4OR16dIlEWfnP/vss3q+r+Tt7U0/4IiwsLBPPvmkSZMm9FuDHBBw8lKpVCIuICd/3oaGhnLMoyssLS3Nzc3T0tIo971582Z8fPzUqVMp9wWZIOBkVFJSEhERIbSqWbNm7u7uMoyjY7y8vJhcxUHekxBw3EDAySg2NlbETRwdHBzat28vxzy6xdnZef78+UVFRZT7Hjt27Ny5c/369aPcF+SAgJMRDi9ow8TEhKykQkJC6Lcmi7iNGzfS7wuSQ8DJ5aeffjp58qTQqn/XkGMeXUT2UpkE3JYtW9auXauHZ1nzBwEnFyzftPfSSy8NHjz4559/pty3oKAgOjraw8ODcl+QHAJOFnfu3Nm6davQKlNT0ylTpsgxj+7yqkG/L9lLRcBxAAEni7CwMBEn4ru5uTVt2lSOeXSXo6PjvHnzCgsLKfc9ffr0jz/+OHToUMp9QVoIOFmQ93+hJUZGRj4+PnIMo9NatmxJMk7ExbzaI79EBJyuQ8BJb9++fZcvXxZaNXbs2G7duskxj67z9PRkEnDbtm3bsGFDu3bt6LcGqSDgpIfDC9IaNGjQkCFDRByS1lJJSUl4ePj7779PuS9ICAEnsatXr+7du1doVa9evWxsbOSYhw9kEUc/4AiyckTA6TQEnMTUanVVVZXQKl9fXzmG4cbUqVPnzp1L/1BDRkbGoUOHrK2tKfcFqSDgpFRWVhYaGiq0qmXLljNmzJBhHH6wPdSAgNNdCDgpxcXF3bx5U2jVtGnTWrduLcc8PPHw8GAScElJSbm5uXryaFr+IOCkhMML8hk8ePCgQYNSU1Mp962oqAgODmbytFbQHgJOMmfOnDlx4oTQqldffbV///5yzMMfT09PJqcKkoBbvHgxHrilixBwktm0aZOIKizfNOfo6Dh37tzi4mLKfXNycsiO6vjx4yn3Be0h4KRRUFAQExMjtKpz5852dnZyzMMlExMTBweH8PBw+q1VKhUCThch4KQREREhYmXh5eXVuDF+BQJ4eHgwCbiDBw9eunSpR48e9FuDNvDXJQ0RF582adLE09NTjmE49vLLL/fr1+/cuXOU+9Y+3Hbt2rWU+4KWEHASOHTo0IULF4RWTZgwoVOnTnLMwzd3d/c5c+bQ70tWjitXrsTtXnQLAk4CODuEJmdn5wULFpSWllLum5+fv23btmnTplHuC9pAwGnr2rVru3btElo1YMAAKysrOebh3lNPPWVnZxcbG0u/tUqlQsDpFgSctgIDAysqKoRWYfmmDTc3NyYBd+LEibNnz5I3J/qtQRwEnFZqT3MXWtW2bVsnJyc55tET1tbW3bt3z8zMpN9aVYN+XxAHAaeVHTt2XL9+XWjVjBkz8MQmLbm6ujK5fCo6Ovrzzz9v1aoV/dYgAgJOKyIOLxgaGuLmSNqbOXPmxx9/LOLOVFq6f//+5s2bcXN5XYGAE+/8+fNHjhwRWmVjY/P888/LMY9eMTMzGzVq1L59++i3VqvVCDhdgYATT9zZIbNmzZJ8Ev1E9lKZBFxaWtrx48ctLS3ptwahEHAi1e6qCK3q3r37mDFj5JhHD9na2rZv3z4/P59+a5VKhYDTCQg4kUi6ibiDNtm1MTQ0lGMePdSkSZNp06Z98cUX9FvHx8cHBASQeKXfGgRBwIkk4lyB5s2bu7m5yTGM3po5cyaTgCstLQ0LC/vggw/otwZBEHBiHD169JdffhFa5eDg8NRTT8kxj94aMGAAk9v8GtSc4I2AUz4EnBji7m2JwwtyIIs4JgF3+fLl/fv3v/HGG/Rbg+YQcILl5eUlJCQIrbKwsHjppZfkmEfPOTo6zps3r6ysjH5rlUqFgFM4BJxgwcHB5eXlQquwfJMJ2esfN27c9u3b6bfes2dPTk6OmZkZ/dagIQScMFVVVUFBQUKrTE1N7e3t5ZgHDGoufWMScJWVleTFsHz5cvqtQUMIOGESExOzs7OFVrm7u+NGifJ58803O3bsmJeXR791SEjI0qVLGzVqRL81aAIBJ4yIqxfIqx9X9siK/ISdnJz8/f3pt87Nzd25c+fEiRPptwZNIOAEyMjISE5OFlo1duzYrl27yjEP/MXFxYVJwBnUvOch4BQLAScAeSlXV1cLrcK9LSkYUOPs2bP0W3/77bfp6el9+vSh3xoahIDT1IMHDyIjI4VW9e7de+TIkXLMA49wdnZmdeYteef78ssvmbSG+iHgNBUdHX337l2hVbj1GzVOTk4LFiyorKyk3zoqKmr16tUtW7ak3xrqh4DTlIiLT1u1ajVjxgwZZoE6dOrUydra+sCBA/RbFxQURERE4LMIBULAaeSHH34QcT0QWVOYmJjIMQ/Uadq0aUwCjti4cSMCToEQcBoRd29L7J9SNmHCBB8fn6KiIvqtL1y4QLJ11KhR9FtDPRBwDbt161ZcXJzQKktLS3NzcznmgScxNja2tbWNiYlh0j0gIAABpzQIuIYFBweLeI46Tu5lwtHRkVXA7d+/H+eLKA0CrgFVVVVqtVpoVdu2bSdNmiTHPFA/soZidR/z6upqsogT8WoB+SDgGpCQkJCVlSW0aurUqc2aNZNjHqhf48aN7e3tWT2bOSoqasWKFR06dGDSHR6HgGuAuDtiu7q6Sj4JaMjBwYFVwJWUlGzcuBH3F1EOBFx9UlNTjx07JrSqf//+uLclQ8OGDXvmmWeuXbvGpPtXX321YMGCFi1aMOkOj0DA1Ufc8s3R0VHySUBzhoaGZC81ICCASff8/Pzg4OB3332XSXd4BALuia5fvx4bGyuicMqUKZIPA4JMnjyZVcAR/v7+vr6+jRvjj4s9/A6eaOPGjSLu9P/KK690795dhnFAAPJb6NKli4hbk0ri6tWr0dHR06dPZ9IdHoaAq1txcbG44/04O0QhJkyYwPAOH59++qmzs7ORkRGrAaAWAq5uoaGht2/fFlFoZ2cn+TAgwsSJExkGXEZGxtatW6dOncpqAKiFgKtDZWXlhg0bRBQOHDgQ+6cKYWVlxepBDbVWrFgxZcoUQ0NDVgOAAQKuTl9//XVmZqaIwjFjxkg9C4hEkmXs2LFkJc5qgPT09JiYGCcnJ1YDgAECrk5r1qwRV4jHACuKra0tw4Ajli9fThZxeOYWQwi4R+3cufPcuXMiCk1MTF555RXJ5wHRrK2tmzdvXlJSwmqAixcvkoT19PRkNQAg4B61cuVKcYUk3XDqk6K0aNFixIgRe/fuZTjDJ5984uLiQnKW4Qz6DH+Q/0D+GH7++WdxtZaWltIOA9obPXo024C7du2av7//woULGc6gzxBw/7Bs2TLRtUOHDpVwEpCEjY0N6xH++EjXw8MDtxhhAgH3t6SkpFOnToku79u3r4TDgCR69erVtWtXETe8klBhYeGSJUtwnzgmEHB/qq6uJq9C0eXGxsZ4fL0yDR8+fPPmzWxnCAkJ8fHxGThwINsx9BAC7k8xMTFpaWmiy01NTSUcBiRkaWnJPOCqqqreeecdEbfeAi0h4P5QVla2ePFibbbQunVrqYYBaSnks9Hjx4+Hhoa6ubmxHkS/IOD+EBAQcOXKFW22IOK+I0BH3759GzduXFFRwXoQgw8//HDs2LEdO3ZkPYgeQcAZ3LhxY9WqVVpupLi4WJJhQHJNmzbt1q3b5cuXWQ9icOfOHV9f3+3bt7MeRI8g4Aw++OCDwsJCLTeSl5dXVVWF2+MoE1k0KSHgDGqeYRQdHY0LVKnR94A7cuSIJJ9Al5eXZ2VlPfvss9pvCiRH3ntYj/C3WbNmWVlZ4aVCh14HXFlZmZeXl1Rb++mnn/CqVaZ79+6xHuFvZBgHB4djx47hwj4K9PpHvHjx4gsXLki1te+++w6381WgyspKheyf/iUlJcXPz4/Vsw31iv4GHMkjf39/CTcYHx8fEBCAe+MoTWpqqgKPcQcGBvbr14/srrIehHN6GnA3btxwcnKS9qOZvLy8hIQELOKUhvxSWI9Qt9mzZ3fs2HHy5MmsB+GZPgYceT+fOHGiHA8GXrp0qZ2dHRZxylFUVBQUFMR6irqR91fyLkv2oPGcSfnoXcBVVFRMnTr1+++/l2Pj6enpy5YtE31HOZAc+XXk5+eznuKJyKvR2dm5pKRkxowZrGfhk34FHFm72dvbJyUlydfis88+69u3Lx5urwQ7duwQ9/AgmsgKztXV9dy5c2vWrMF5lJLTo4C7efMm2TOV+4Jnst/h4uJCer333nuyNoL6RUdHu7m5VVdXsx5EI+vXrz9z5kxUVFSnTp1Yz8IVfQm4o0ePTps2jc59wUjGzZkz53//+x951fbr149CR3gYeXeZP39+REQE60GEOXjwIFn7+/v7Y3dVQvwHXEFBwZIlSzZu3Ej5zfzAgQMDBw4cP368t7f3yJEjabbWW7/99ptKpQoLC9P+2jsm7t69S3ZXw8PDV65cOWzYMNbj8IDngCsqKlKr1atXrxb3jHrtkaXcjhqdO3e2tbUdM2YMedXixkrSKi8v/+GHH5KTk3fu3En28liPIwGyt/Haa6/Z2NjMnj37zTffxKOjtcFhwJGVGnnFx8TEREVFKeSdPDc3V13DyMhowIABFhYWg2r06dMHeScUebtKT0//9ddfSZydPHmS/O+DBw9YDyW9b2p06dLFxcWFvDUOHToUhyBE4CHgKioqsrKyMjMzT58+nZKS8u233964cYP1UHUja7rTNf76ytNPP92zZ8/nnnuuaw0zMzPylQ41TExM2E3KTGVlJdlTIyl2586dW7duXf9/5Fd85coV8lsm/8p6Rnqys7M/rdG2bVsrKyvy7ti/f3/ygjE1NW3fvn2rVq1YD6h0PASch4dHZGQk6ylEulGjzvPyUlNT9fAu/pMmTUpMTGQ9heKQWN9d4+EvkvdysjPLaiSdwEPAAQDUCQEHANxCwAEAtxBwAMAtBBwAcIuHgAuvwXoKkIZib98GuoiHgAMAqBMCDgC4hYADAG4h4ACAWwg4AOAWAg4AuIWAAwBuIeAAgFsIOADgFgIOALiFgAMAbiHgAIBbCDgA4BYCDgC4hYADAG4h4ACAWwg4AOAWAg4AuIWAAwBuIeAAgFsIOADgFgIOALiFgAMAbiHgAIBbCDgA4BYCDgC4hYADAG4h4ACAWwg4AOAWAg4AuIWAAwBuIeAAgFsIOADgFgIOALiFgAMAbiHgAIBbCDgA4BYCDgC4hYADAG4h4ACAWwg4AOAWAg4AuIWAAwBuIeAAgFsIOADgFgIOALiFgAMAbiHgAIBbCDgA4BYCDgC4hYADAG4h4ACAWwg4AOAWAg4AuIWAAwBuIeAAgFsIOADgFgIOALiFgAMAbiHgAIBbCDgA4BYCDgC4hYADAG79H4FgrtKpx/PLAAAAAElFTkSuQmCC) .
2. Доказать тождественную истинность формулы
Достарыңызбен бөлісу: |