Тема: « Аналитические методы решения логарифмических уравнений »
Тип урока: Урок обобщения и систематизации знаний, умений и навыков
Вид урока: Урок-практикум
Метод: деятельностный, проблемный, частично-поисковый.
Цели урока: - Обобщение и систематизация изученных способов
решения логарифмических уравнений;
- Развитие умения осуществлять самооценку;
- Воспитание у учащихся трудолюбия, мотивов
обучения, положительного отношения к знаниям;
Оборудование: проектор, интерактивная доска, компьютер для учителя, нетбуки для учащихся, компьютерная презентация,
План урока
1. Организационный момент. Определение целей урока.
2. Устный опрос в виде блиц-турнира
3. Актуализация знаний по изученному материалу.
4. Решение заданий у доски. Повторение теоретических сведений.
5. Изучение нового материала:
6. Онлайн-тест
8. Итог, домашнее задание.
Ход урока
1. Последние несколько уроков мы занимались аналитическими методами решения логарифмических уравнений.(Слайд 1) Сегодня нам необходимо подвести итог этой темы. Давайте сформулируем, какие же цели мы ставим перед собой? (Слайд 2)
Цели урока:
От себя я добавлю такую цель:
2. А сейчас Блиц-турнир (Слайды 3-14)
![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_1.png)
![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_2.png)
![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_3.png)
![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_4.png)
![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_5.png)
![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_6.png)
![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_7.png)
![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_8.png)
![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_9.png)
![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_10.png)
![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_11.png)
![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_12.png)
Молодцы!
3. Какие уравнения вы сейчас решали? Простейшие.
Как решаются простейшие логарифмические уравнения? По определению.
Какие еще методы решения логарифмических уравнений вы знаете? (Слайд 16)
Метод потенцирования
Метод замены переменной
Метод логарифмирования
Итак, первое задание: (Слайд 17)
Разбить уравнения на группы по методу их решения и записать номера соответствующих уравнений в таблицу:
1. ![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_13.png)
2.
;
3.
;
4. ![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_16.png)
5. ![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_17.png)
6. ![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_18.png)
7. ![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_19.png)
8. ![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_20.png)
9. ![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_21.png)
10.
11. ![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_23.png)
12. ![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_24.png)
Давайте проверим, что у вас получилось (Слайд 18)
Метод решения | Номера уравнений |
По определению | 2, 4, 9 |
Метод потенцирования (ПТ) | 1, 7, 11 |
Метод замены переменной (ЗП) | 3, 5, 10 |
Метод логарифмирования (ЛГ) | 6, 8, 12 |
Отлично!
4. Итак, сейчас трое из вас выберут по одному уравнению из каждой группы и решат его у доски. (Выбор уравнения со слайда)
1. ![](https://fsd.multiurok.ru/html/2019/05/05/s_5ccf28c1a626f/1152416_25.png)
ОДЗ
![](data:image/png;base64,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)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAFIAAAASCAIAAABHFh6gAAAChUlEQVR4nO1XT2i5YRwfkwvlNBeltut2csDBxX9pzQ470EJObr/aQU3LRcmJkz8ZsZU/Kw6UphQOSpY4uNhBmQNpF6VEEb9v1NLjfe0VbQf7nL7v83x9ns/ned7v831R5vP50eGB8tsCfgd/thcgk8mrj3Q6fTAY/KCevSEWiyWTyel0ajQaZTIZMovahiSv17uMM5lMIpH4CY37hsfj8fl8FotlPB7r9Xrwz+PxVhNQ21+eAYFA4O7u7idk7hsulyscDnM4HIhHo5Hb7f7G9hc+Pz/f398FAgEyXi6X5XK5Wq2G7YTHUql0c3PT7XaJa9qd4Vt8fHycn58vY4lE4nA4kARc28/Pz7e3t+vjfD4f3hmVSuV0Omk0WjqdDoVCW2nCY8jlclKpFPMnx8fHk8mE+BKnp6edTufs7AxiFosFMZKAa/vp6SmbzWJOCYXCi4sLKIF6vQ5bIxKJiAvawCAWi2ez2bZUmLi/v9fpdCaTCW7oSqUCFY4kYNsuFotsNhv2CY/34eHh+vr67e1tWT9H25/VOgMREFxFq9X2+/1gMEihUGB/GQwGkoxtG87BYDDgrT0cDl9eXphMZq/X+xrc6qwwGYiA+Cr/FoCg2WxCHSGzGLahUefzeb/fj0nXbrftdrvVauVyuTabTalUbqV7A8Mea3sVqVRKoVAggxi2I5EI3DdUKnV9qlarQTOHrgg1A8VjNpsLhQIUKnERGxj2WNuwldFoFCzAOUP3glJCEjBswxv++PiISXd5eQkql19yUDAajebq6ioej69vJx52ZyCCVqsFFxOJRIIG/Pr6enJygiRg2K5Wq3h0SHf1L7CVoN0ZiKDRaGxO+Psrckg4UNv/AfFMTCMlWjSeAAAAAElFTkSuQmCC)
![](data:image/png;base64,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)
- не входит в ОДЗ
Ответ: нет корней.
2. ![](data:image/png;base64,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)
ОДЗ
,
, ![](data:image/png;base64,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)
![](data:image/png;base64,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)
–входит в ОДЗ
Ответ: 7.
3.
, ОДЗ ![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJYAAAAUCAIAAADgG1NmAAAEOUlEQVR4nO1YWyg1URT2o+QayeW4PSgvoqjj/iKXKKTkQck1OqHklINyiw7heFDK5UG55AUpSijKrZQHHhQlESkvhCLK9cuu+ac5l9l75hip8z1Ma2bOWvPt9e299trH8fPz086GvwzH3yZgg1zYJFQCERERZ2dnPj4+HR0dpaWl1g1uk1AJuLu739/fHx8fJycn2yT8k9jd3cVVpVL5+vpaPbhNQuUwPT09MDBg9bCmJVxYWNDpdCcnJ/yHs7OzWq327e1Nr9dXVFRYnQolMKNB7+PjIzc3NykpidU9Jibm/Pz88fExICAgLy8Pm5Orq+tP8BRgbm4uISEhPj5egq/lzAslfHp66u7uxpI/PT3lPz86OhoaGtrf339+fs7JyYmKilKr1RLYyMTKykpZWVltba2Li0t1dXVvb29mZiZThPf3d4wC+t3c3LS2tiLU2NjYD7HlMDk5GRQUJE0/0cwLJcSU7OrqgoGx8Z8PDg42NDSQUt7S0jI8PKzAyI0xMTEB2YqLi2FnZ2eDCauEyAUx/P39DQZDWFiY9Vkagd/CoH4w+YpmnnYv3Nraam9vJ3ZsbCxn0wN17+Dg4PLyktyiOKAmPDw8MAVBkfDz8yM2VpLM/yX+fUMCSXt7e5NKmHNnlY0P0czTSghanp6exPb29r66umKlgg0sNDQUxyNccYvVEx4ezhokPz9/ZGQkOjra2dm5v7+/qKiINQIf6PKxP1mRJL37+vp6enq6yVcODg6vr6/crWjmaSVEIXZyciI29iHcUjrykZqaurGxQYaHyYXNjDUCSij6OtRA2DU1NVlZWRJocEBFamxstC5JSnf8jHJpimaeVkLM+peXF1xho50jhh3LbCK8l5eXy8vLYS8tLaHKc68o46AvcHNzu729RXuGDQZyFhYWstIgWFxcDAkJSUxMFDy3QBL109gWKGHBXRrMZZ4DrYTBwcF3d3fEH71cYGAgx5i+0KekpDQ1NcHY3t5Ge4bkcq8o48zPz2s0Gi8vL9iY4FhGREImGsDa2trOzk5fXx8TSe4T5vZCy+7SYC7zHGglxJ5BenHYe3t72FclsEFb5eHhgWMZFhO2NAkRkBGukqC14S8LemAeYAgm9ZNPktKdvmyIZp5WQsz9uro6nIuRQZw6JJ8osFza2tpwlTY9MzIyOjs70UaikKI30+l0rBFGR0cvLi56enp+jiSNO33ZEM28UMLr6+uCggK0anbfEwoN1czMDAyIX1JSEhkZiYmv1+vj4uIYx/WfularHR8fl+ZeWVmJg8TU1BRo1NfXky2HCVVVVbjyJTROpShJy9mXOUYBRDMvlFClUm1ubpqMpfmGHDYYOYoYDqeSdwisP5k0ROe+TJLyx2gMy0NW4m9ulDtMn8PDw+bmZpwK0tLSFPgoK2SS/MUxKiGhwWDAVa1Wr66uKvA5aZBJ8hfH+AVAJJThO49ASAAAAABJRU5ErkJggg==)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
Ответ: 10, 100.
4.
ОДЗ
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,
,
, ![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
Ответ: 3.
5.
ОДЗ , ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACQAAAASCAIAAAC8Qet/AAACRUlEQVR4nGP5//8/A70AC91sGuKWrV69urCw8M+fPy0tLSkpKTS07Nq1a9OmTTt37tz37999fX0NDAxMTEzIsezTp0+HDh3y9vZmZGTEpWby5MllZWViYmJAdk1NzfTp0+fOnUvAshMnTri7u0dERMycORPIPXbsWEhIyIULF4KCgmRlZTMzM5OTkwUFBTE1Al1TX18PYZuZmcHZ+CyzsLDYsGGDv79/X18fNzf3li1b5s+fD3Tvo0ePZs+ePWnSJKApkZGROTk5wIBC1ghUICAgAGELCws/efKEsGVA4OjoqKOjM2fOnEuXLkVHRzs5OQEFJSQkamtrq6urN2/eDIwbY2NjKysroINMTU0huoBRxc7ODmFzcXEBuURZBgRAQwMCAk6ePGlkZIQszsTEBPS0np5eaWnpunXr9u/fD7eMk5Pzx48fQBLI/vLlC4RB2LKvX7+uWLECGHQvXrxAFgcWN9u2bQN6a+fOnYaGhgsWLABGLVwWGKPv37+H2PHmzRtpaWnClj18+LC9vb2pqQkYya2trV5eXkDB379/A0MMmGSePn0KTCmHDx+2tLRE0wgUAaZ7KSkpIPvUqVNA7QQsA6revn070O3A4IqLi6usrAQGFDAKX716BbQsLS0tKytLUlISa3ikp6cXFBQAQxUYW0BXoqV7LJb5+PgATQfaBGTz8/MDU52fnx+wXHBxcXn8+DEbGxtWayAA6JX4+HhdXV2gdmAJYm5uTsCyZ8+eIXNngwEeCzA9BwS4ZIdyQTyILAMAe8zsSt+u8/kAAAAASUVORK5CYII=)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
Ответ: 0,04; 125.
6.
ОДЗ ![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
или ![](data:image/png;base64,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)
, ![](data:image/png;base64,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)
![](data:image/png;base64,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)
Ответ: 0,1; 10
7.
ОДЗ
,
, ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAFIAAAAWCAIAAADch1y2AAAEJklEQVR4nMVYWSi0URie3xqyR/YLy42IZFeyJJItV6RwoSY34gIJiWxRUor0k1JKSLZyQ7IvRbiwZcmSpWxlzfo/zamv7z8z8znfzFeei+mcOW/v+z7nvNuM3vf3t4wZz8/PxsbG7PJS4eXlxcjISEKFeqKkR0ZG0tLSJDTPiOHhYWntiqO9u7sroW127OzsSKtQBO3V1VUrKythGS8vr8PDQxsbm8rKyuzsbK1c4wF219fXfX19pVIogvbs7KyHh4ewjKmp6f39/fb2dkREhIS0XV1d5+fnf4f25uZmeHi4sMzi4iI+7e3tbW1ttfLrf0Dh6OiohApF0D44OLC2tmaR7OnpaW5u1tQlFYDdk5MTCRXStAMCAo6Ojh4fHx0cHFJTU5GiJiYm5Oj8/NzMzOxHjQMDAyEhIcHBwZo5hKJdWFi4t7fH/xJ2T09PRenp7+8vKCj4+Piorq7OycmhTmnan5+fa2tr4Hx9fV1eXp6Xl9fZ2UmO7u7ufmye3d3dTk5OmnF+enqqra1FPO/v71NHsAt/2FVtbW21traCCBp+YmIiioK/vz9fgKYNUbKws7NrbGzk1zCEgIGBgbA9fhn7+vpidxRAWNXU1GCBu6aOYBcE2FW1tLQUFRWR+lJWVtbW1sY9HoFQbv9RgNu+v7/r6OjwBZaWlmJjYzFItLe3Y7uwsIDLQi6w+8cI2H19fWWXn5mZqaioIOvAwEBuzUGINvoQslRAAME8NDSUnJzc1NSEtxobG+vq6mJ3jh24fWQfFpOTkzExMSpldHV18TBkjfpnYWFB1iiHZ2dnlLAQbQRGcXExt9XX10fcUg8eGRmJEaWjowPtLSMjIyoqSiQjJsAurGMRHR3NkjvICENDQ7LGjwjlBFFLG+O3i4tLaGgo9w3eE9fJqeNQWlqakpKyvLzs5+enUhXjEwng7e2NaygsQAlEUpACjJKkXIlV056YmJibm2toaOB/aWlpyb9FApTf3t5eFI/Ly0t1TjA+kQDAgQtaFjg7O3N9By3A0dGRElBBe3BwcGVlheIsU4xKDw8PfPPHx8d1dXVVVVUoGyjC8fHx7J6JAuzCuow5cFCSSBvGGlzgHiVM00ZNBpn6+nplvW5ubre3t7hIsoXe8fFxtEdke2ZmZklJydTUFFJdC3ZqcXNzg7Fcxhw4crk8Pz8foxfCE+9BdS+ZMu3c3Fx88mlzZry9vRHJPj4+ZJuQkACepMKZm5unp6cnJSVhNoqLi9OM28XFBXoh2gfWyBpPT8++vj7Se6+urlA42VXhebOysuAw3MOUFhQURAnQtAXuMiwsbGNjg9tS/fmvAuyeKQNhPD09rfII8zKsi9ImV0DdqYifIrgzlDpRtqUCXlvjIV8lRNDGzODu7i6hbXbALjUvaAlxfyr9yh9pAAYhaRX+A+sfsYKw3L+YAAAAAElFTkSuQmCC)
![](data:image/png;base64,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)
- не входит в ОДЗ
![](data:image/png;base64,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)
Ответ: 1.
8.
ОДЗ ![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAHwAAAAXCAIAAABGT7xwAAAFcElEQVR4nO1ZaSycXRRWWyxB7Kkllh8SSzURUUskaC0RQZXYlxQlVJtQ+4fWWmMnoSgSe5SoJVRSxB9aEolGkdYSSxCJxFZpS/iezCTjzcx8LzN9zUT6PT/kvPfe977nnHvuc84Zoufn50L/g78QFbQCfyME6fSAgIDW1tazszMB6iAQCNLpzc3NcDrHqd3d3YODAx0dHT6rxB8Inl76+voiIyMR72/evHFzc6PRaBkZGbdv38ZgQkICcWVlZeWrV69WV1eXl5eDg4OnpqYEpfMfQvBOf/HiRXt7+8+fP6Ojo+H08vLyiYkJKysrFo8DUVFR4+PjOTk5h4eHQ0NDAtGWElw4/evXr7AZQcRnkl1bW7O0tMRH19fX8YgAf/DgQW5uLsfFSUlJFhYWKysrCgoKV9z/Wu3q6emJj4//9u0bcXBpaen58+ejo6MiIiJgyJmZGZa3LpxuaGi4uLgoLCxMuWbk0NLSQmj/+vVLW1sbj5BxDFJSUozZ/v7+k5MTzPr4+OBU6urqwDDPnj37r2TAjmuy68ePH4gM0CA2J47v7e09fPgQSr57925/f9/b25v9XQroZXJyEhrY2tpy+2JgYCD+Qm8vL69bt25VV1fj0c/PT15e/vT0NCsrKyUlxcXF5fj4GJyDKScnpw8fPigpKeGc8vPzExMT/1x5EpDbJS0tDaKDgAggjkPV0NBQ+B2ypKTk2NgY+7uXOL2+vj4tLU1cXPzly5fIXczx6enpiIiI2dlZZWVlkO/Tp0/J9/n06ZOjoyOileFZULOnp+fm5mZTUxPLSizAtrDWwcEBTsdId3c3wzAQBWPNzs4O+ecuBVV2sQN1QVtbG/kaMqcjWQ0MDECP379/4/QUFRURd4yp8PDw2NhYOK6rq6ukpORS5czNzd+/fw9uLS4uRoyANBoaGjiutLa2NjY2RjgXFBTgMTMzU1RUdGRkhPlpFgwPD9vb23OcAqWCmq7VLnaA3588eYJjw+YVFRWM28wCMqdnZ2fX1taqqqpCfv36NcKNqdzc3Bw4AZHy6NGjsLCwq2iDe2pkZPT27dsvX774+/vb2dlxXJZDB/MxPT2dfNv79+9zmyGptYsFuKPgPVNTUwkJCXwIzI4NWdaQOR0a6OrqMmR9ff2FhQXmFJJeR0cHtsOmBgYGV1QoNTXV3d398+fPJiYm3BhCMSi3iwjcYzMzM6QlyHFxcffu3ePO6UhuzJ/DEE14ZE6VlZV5eHggFhC8NTU1V9EGIYB6XEVFZXt7mzs7qAa1drEANeLGxgbD6bKyshzTD5nTcdQobxELkOfn54knD0b++PEjmJq4HopiPVIQCqaQkBDiFNrIvLw8EDSiAOzh7OzMgz0cwQOnU2gXO9Bk9Pb23rlzB/L379+ZV4oIMqf/Qweab6iOrgQycwpXBqYieCGrqamVlpYi+cjIyKBKhRk2NjZE5ZCyBgcHsQ+K5aCgoOTkZDQOPJSYHMEDp1NlF0egLcKZoXdTV1en0WhIquxrLpwOpgPhQtDT00OlgfNH0YZ+5O7duwgZVM3EgML1rKqqCggIEKLXsyhLoRz6GiF63Q0OIX4DaQpeZrQncnJyvr6+rq6uIE3U3Vw5izdck11bW1uogHESkDGObZEMIGhqaiLCCgsLj46OHtPBrtKF0/EaSzsLhNLB/lpMTAxuHEMGi6FjZE61tLQgQIiLUY8TH2vpIHUUlbgmu3AGHBsfACVvY2MjiUo8dqRiYmKoZHEZ0eminUE4MMY7OzstLCxYOPEGgT928eh0dHRoIpDlQRcoaYuKijCI49XQ0Li5Hhfil108Oh3pi/3HM2KSuaH/D+KPXVT+nn5DHX0pKLdL8P/E+AvxL+32HyA2RQ9fAAAAAElFTkSuQmCC)
![](data:image/png;base64,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)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAHAAAAAYCAIAAACtJe4rAAAFFUlEQVR4nO1ZWSh9Wxx2+SNkzhgyHMoUKXPJkCHJrIhQSAoPHgz53zJGZHohcyklU2Yp8mBWhMxjKFHGzIT7dXbtq72PYzt3H263+z2c1l5r7fX7fGv9hrX9ent7E/kf7OHXTxP4r4GHoHd3d9LS0t9PBbi/v5eSkjIzM9vd3VVRUcnOzo6Ojv4RJp/i4uKCw+GcnZ1R+nkI2tPTExoa+i2sqOju7oZpWVnZy8vLtbU1Z2fnf62g/f390JTez0PQjY0N4fPhjfX1dfxOTU3hV0NDQ1VV9aeY8MfW1tZH3KiCzs3NKSkpCZ8Sb8D0wsKCpaUl2s3NzeXl5T/FhD9aW1szMzN5DlEFHRsbMzQ0XFlZ8fPzQyB7fX0VPr2/oa+vPzExAUHb29vt7e3t7OwYvig8wtbW1nt7ezc3N5qamoGBgQjrMjIyf3KBUVFRUYpFqqBLS0tOTk6mpqbb29uYzS65TwE37+3tbWpq0tLSYq4mIDzCLy8v8/PzUPP09BQiJicn19fXEyLS1RShC7qzs6OsrCyw+dnZ2dvbWxcXF8Feh+mDg4Pa2lqyR9gu8ilhqEk01NXVi4uL4b78F6QKenR0JCcnx3NqQ0MDtkhCQiIrKysqKuq9yfj4+OXlZRQ6qampiYmJ/E1OT097enoim1dXV+NxcnIyODgYdtGG6cPDQ7ZEZIswiT+4IB958qQKilIAlSB93tDQ0MDAAKg8PT3FxMTgKPn4+BBDcXFxKSkpEKWjo6OsrOxTfvDlrq4uhLzS0lLEo76+vsbGRmIIpuFZ9FdGRkbc3d15riYmJvb8/CxUwiRQySGy859DFRTRF1tKn5eXlwdPVFNTQ7uwsBChhOS3uroaEhKCt4KCgmJjY5kwg4uheq+rq0PIDg8Pd3V1JfqxCGp7+nw3N7evHlt2CRNA9ExLS+M/hyoodptnaAcJpGCibWxsTBSMBHR1dVFGgGJbW5uJiQlDcig7/P39Z2ZmrKysyE6Yfnh4YLgCf7BOGPcdHR0dBwcH/tOY3uURO8jPKDgs70NJRUUF6glsNQ5dTU0Nk9WQB1paWlAbHx8fU6wgqzKk9J2Eh4eHx8fHi4qKPp1JFVRcXBzm6YcUO4kqD1stwg0l7zcWERD2KFUOn/v4/v5+QUFBTk6OjY1Nfn6+t7c3OQTTIEBnKUAMZZFwZ2cnigEmaorQBUWWAD9JSUlK/28uKisrMZqeno42OQTfwV+LQ4c26jVcbxDvP7qPI0sMDg5iHexZZGRkRkbG6OgoWbUggYAAnaUAMZQtwihFcAIQhRnapQqqqKiItIBqFAEOj0ZGRsjI2F4PDw8UNBYWFjgRubm5788LPKuqqioiIkKEW9YFBASA30f3cWQGKEh4gLy8fFhYmK+vL2KZl5cXehBAFRQUmKtGAhFTSIQTEhJEuGmN7OG/tVRBseL19TUIbW5uUoZiuKAvkZSUBGch2np6eo+Pj+QQ/T5O1JskarkgH2EaBPjQ/QjCI/xVz6AKamBgcH5+rq2tzXwJRD0UdPCjq6srOAh2m+j/6n0cODs7I1Oz8MAiYTqogpqbmyPzwlOYL4ELCepkJE24MCq7kpISdApwHwdOTk6QHL70igBgkTAdVEEdHR0XFxe/tAQyBv2V93Gdudfs7e2BwJesCwAWCdNBFdTW1hYlhcDLkRCME07oPz8jgoGtDwhUQVEAczgcVpYWADD9/d8M2QWPm9JP/UMJwL3+p0yzhb8A8Lv9rO72IMkAAAAASUVORK5CYII=)
или ![](data:image/png;base64,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)
![](data:image/png;base64,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)
Ответ:
4
9.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAADUAAAASCAYAAAD7T5b+AAAACXBIWXMAAA6/AAAPBgEMwCziAAAAkElEQVR4nN3Vyw6AIAxEUZvw/7+MjgmGKI8WJHa8e7DHLggxxs1DIlId5JhRLHeF+XF0tYZGrcGtZ5egSkNY/7bl7P17r6LS5TOAkZZs6itMrSmUN0xqGAWQN0zKjPK6nTwTyvN28tQoFhBSoZhAqItiA6EmihGEqihWECqimEHogWIHoQvF8KhqO1F/2E7eDg9PVkSnuhfjAAAAAElFTkSuQmCC)
ОДЗ
, D=5,
, ![](data:image/png;base64,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)
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![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAQAAAAGCAYAAADkOT91AAAACXBIWXMAAA21AAAOSwHYpk5mAAAALUlEQVR4nGP5//8/AyMj438GKGABcUCCIABkM7AwIAGQBIoAWAuGAFAZI7I5ALqOEhRdo/I4AAAAAElFTkSuQmCC)
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![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAEAAAAHCAYAAADJTCeUAAAACXBIWXMAABoLAAAPcwFMQkjvAAAAGElEQVR4nGNhYGD4zwIkGJCI////MyK4AEgYBBqUFcJqAAAAAElFTkSuQmCC)
+ - +
x
![](data:image/png;base64,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)
,
,
оба корня входят в ОДЗ
Ответ: -5; 2.
10. ОДЗ ![](data:image/png;base64,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)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAEQAAAAUCAIAAAC7/wwSAAADk0lEQVR4nN1XWyi7YRgfMzfChZC1C1worJQLcWXmmOQ4NREyUmJFETnEHG+cIsaElJIhyiFFRGEuyGFIYqi1Sy5coOz/a18+3/8bn2+2Wu25WM/7Ps/77vk9x/dzMRqNHEchF3sbYEtyUDBarTYtLe329vbj48OOBllDX2BCQ0Nvbm6cnZ3taI2VZIM0Ozw8fHl5iYmJsf4qK+kXMOPj442Nja6urs3NzQUFBeT+0dFRaWnp+fm5t7d3TU1NeXk58z0HBweJiYlSqXRkZATLvb09iUSi1+vZG4oSOD4+fnh4IJZqtbq4uPj5+ZktmPX19dXVVdj99vYmk8m8vLxSUlIIUUlJSVVVFQyan5/v7e39FUxkZOTi4iIM6unpcXNzW15enpiYwP7m5mZ8fPy3R7hc7vv7O7lcWloKDAxESeMXy6SkpJCQENoRJjBtbW0qlcrX1xd8V1eXXC4nwVxcXGRnZyNiWVlZ8BAzEoKQh0KhcGxs7PT0NDc3VywWYzM2NpZ9v4Hy9vY2AWZnZ6esrMwCMLCYOAkKDg6+uroiRf7+/rOzs8CDcJt76Ceqr69PT0/XaDTh4eEsj1AJYNbW1oqKisCvrKwMDAzQFJjAODk5ke8D+A9LUtTf35+ZmYmYwNmjo6NsTEGTmJmZ8fHxMRgMloH4JASztrYWzO7uLvIWeUhTYAIDlyNHERPwl5eX1Agg4zc2NnAjVR/AoI+W0NLSUlhYSBXd3993dnYqFIqIiIj29vbk5GRin33NgOAIDw+Pu7u7qakppVJpfoQJTIOJhoaGcClcAp4UIcFgBJwNns/n9/X1oRm4u7s/PT0BtkgkooJBC0F64B4Msfz8/Lq6uq2tLaKVW1QzhH5TUxN+zcPyHxhUCBIaTFBQEDoP4pCQkPD4+BgWFoaTra2tVBci/YaHh/Py8jimOZORkQEw+/v7WPr5+cGF1P9A24D1xDj29PTMyclJTU1FsaEjsYdBgqmsrJycnPxW+gUG1l9fX9PEMhOZH6uoqEBGEXxAQMDr6yspmp6eRqCoyrR5ojKRBQg+CTFcWFiAE78NC+fPLwAej4cJg2TD2MIcRFiI/bm5uaioKFotWUnV1dUYEmdnZ2iGyNK4uLifNP8IBi8DDE10M6QNRk13dzc2UZcCgcC2SDimYT84OIhu3tHRER0dzaD5RzDI3ZOTE9omteht+PTW6XQsNW35PWP3bweH+jj7B9jhgSMgTm+MAAAAAElFTkSuQmCC)
![](data:image/png;base64,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)
оба корня входят в ОДЗ
Ответ: ![](data:image/png;base64,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)
11.
ОДЗ
![](data:image/png;base64,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)
, ![](data:image/png;base64,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)
- не входит в ОДЗ
Ответ: -10.
12.
ОДЗ ![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
– входит в ОДЗ
Ответ: 3.
А мы с вами давайте повторим, в чем заключается каждый метод, по какому признаку мы определяем, что нужно использовать именно его, и каков его алгоритм.
Итак, (Слайд19)
Метод потенцирования
Признак: уравнение может быть представлено в виде равенства двух логарифмов по одному основанию (
).
Алгоритм метода потенцирования:
1. Определить ОДЗ уравнения (подлогарифмические выражения положительнынеотрицательны);
2. Пропотенцировать обе части уравнения по основанию равному основанию логарифма;
3. Перейти к равенству подлогарифмических выражений, применив свойство логарифма;
4. Решить уравнение и проверить полученные корни по ОДЗ;
5. Записать удовлетворяющие ОДЗ корни в ответ.
(Слайд 20)
Метод замены переменной
Признак: Все логарифмы в уравнении могут быть сведены к одному и тому же логарифму, содержащему переменную.
Алгоритм метода замены переменной:
1. Определить ОДЗ уравнения (подлогарифмические выражения положительны);
2. Произвести замену переменной;
3. Решить полученное уравнение;
4. Составить простейшие логарифмические уравнения, возвращаясь к предыдущей переменной;
5. Проверить полученные корни по ОДЗ;
6. Записать удовлетворяющие ОДЗ корни в ответ.
(Слайд 21)
Метод логарифмирования
Признак: переменная содержится и в основании степени, и впоказателе степени под знаком логарифма.
Алгоритм метода логарифмирования:
Определить ОДЗ уравнения (подлогарифмические выражения положительны);
Прологарифмировать обе части уравнения по основанию, равному основанию логарифма в показателе степени;
Вынести показатель степени за знак логарифма, пользуясь свойством;
Решить полученное уравнение, пользуясь методом замены переменной.
Проверка решения уравнений на доске: ребята комментируют решение.
Спасибо!
5. Давайте проанализируем следующее уравнение: ( Слайд 22)
- 3
= 10.
Какой метод решения этого уравнения можно определить по внешним признакам? Метод замены переменной.
Давайте произведем эту замену и посмотрим, что получится. (Решение уравнения у доски)
ОДЗ ![](data:image/png;base64,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)
Преобразуем выражение
=
=
=
.
Сделав теперь в исходном уравнении замену переменной t =
, придем к системе: t = 5.
Итак,
= 5.
Прологарифмируем это уравнение по основанию 5:
= log 55, (log 5 x)2 = 1.
log 5 x = 1 или log 5 x = - 1.
1) log 5 x = 1, x = 5.
2) log 5 x = -1, x =
.
Ответ.![](data:image/png;base64,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)
Получается, что мы использовали не только метод замены переменной. Но и метод логарифмирования!
Как же можно назвать это уравнение? Комбинированным. (Слайд 23)
Рассмотрим еще несколько таких уравнений:
1.
- 3
= 10.
![](data:image/png;base64,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)
+ 3∙
= 10.
Фронтальное решение уравнений у доски и в тетрадях.
![](data:image/png;base64,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)
ОДЗ ![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
/ общий знаменатель t
,
, ![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
![](data:image/png;base64,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)
нет корней
Ответ: 1
+ 3∙
= 10.
Преобразуем выражение
=
=
=
.
Сделав теперь в исходном уравнении замену переменной t =
, придем к системе: t = 2.
Итак,
= 2.
Прологарифмируем это уравнение по основанию 2:
= log 22, (log 2 4x)2 = 1.
log 2 4x = 1 или log 2 4x = - 1.
1) log 2 4x = 1, 4x = 2, x1=
.
2) log 2 4x = -1, 4x =
, x2=
.
Ответ.
=
,
=
.
Проанализируйте решение каждого уравнения и запишите в таблицу, какие методы вы использовали при решении этих уравнений, с помощью кода указанного в задании. Например, для первого уравнения мы выяснили, что это комбинация метода замены переменной и метода логарифмирования.
Закодируем и получим (Слайд 23)
№ | Уравнение | Методы |
1. | - 3 = 10 | ЗП, ЛГ |
2. | ![](data:image/png;base64,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) | ЗП, ЛГ |
3. | + 3∙ = 10 | ЗП, ЛГ |
6. Все вы помните, что в конце года вам предстоит важное испытание – ЕГЭ. Логарифмические уравнения составляют его часть. Они встречаются в 7 задании базового уровня и 13 задании профильного уровня, где нужно развернутое решение. Мы сейчас с вами потренеруемся в выполнении подобных заданий. Все включите нэтбуки. На рабочем столе есть файл "Он-лайн тест", откройте его пройдите по ссылке. Пройдите тест по теме "Логарифмы"
http://moeobrazovanie.ru/online_test/matematika
7. Итог, домашнее задание: (Слайд 25)
1. Из предложенных уравнений решить те, которые Вы можете решить:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAFYAAAAQCAIAAAADNR/RAAADdklEQVR4nOVXTSh0URieYVD+GkMMCfmZmpApUogsJDs2pFlYWCk/m5kslCh9ktlNfpcosZ3ZiFJs/MzIDKkxM0zNJBSy8DcSnpnzdb/bve5xL76P+p6FzrnOfd7nPOd933tG8fLyIvu/ofhuAd+P9y2Qy+WfD/NVufb4+BgdHf2ZBXyIyoIfUiw7OzsFBQX0HW5tbVVXV0uiDVmg1WqPj48zMzMXFxfLysr4iyIiIp6fnyXxikFXV9fExIR4Zp/PV1paSlcbDAbv7u5iY2OFSM7PzxsbGzc3N5knIQtA53A4dnd329vb9/b22C+gCpACsOBNuqurq4eHh4yMDJF74GBsbAwWiGd2u910tUB+fv729nZtbe2btJeXl729vVjAfhiyYGVl5enp6fb2NiYmRkiu1Wrt6OjAiU1NTcHF0dHRgYGBtLQ0g8HQ3d3NXjk7Ozs4OOjxeKC4ra3NZrMJcUplJmCr5cdSKpWnp6dCsZKTk2dmZubm5si0pqZmfX39dy9AganVaovFIvSy0WhcWFjAyXR2dkKo2Wze2Nioqqriq4SU1dXVkZGRi4uL5eVl+v4lMUdFRXHUohA4seLj43HUZFl6ejrSnowLCwv39/c5hNi/jGmHULC2tqbX60my8eH3+ysrK3FWgUAAU5xbXV3d8PDwm4v7+/vLy8u9Xm9SUhLzkC2opKQEmSyVmbGArZYTC42AWUZJBzZCFrS0tMzPz8Pa6+tr8pS0APa67OxsHA6aTU5ODqYYQzrTdQ4PD+/v73U6HcYnJyfj4+PYQ09PD5NyFEHimcm3gK2WH+vs7CwlJYW8+24W/LEAYeLi4pBaSEIZ7yIAdvzNy8trbm7Gv6anpzHFODExETYNDQ319fWpVCrkoTqM+vp6lGtqaiqqGvqQ3kL2S2VOSEjgqOXHggVZWVlCpuNT0tDQgIFGo1laWmpqakJDDVngdDrZ68j5EyPImFjDxuTkpMvlurm5gQgIRQXiTBSKENvBwQFZc3R0JLR5AnMY4pnRzDhqW1tbObGQMugjQhFzc3OZSscNAlUj+/AFGeVaXFyMlDOZTJjiM4sezk7CD4PCXFRUhFZHjBACMigyMlJMIKQM2rCMYgHOn3I1/hUGM8V3mHJ9kAQKM5PhFFRUVIgMZLfbyeBrfibJw/gSqn/GzIBmwQ/5afC38QozjDxs+FslGwAAAABJRU5ErkJggg==)
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