1)Расчеты, проверка доз
Рибофлавина 0,005х6=0,03
Кислоты аскорбиновой 0,1х6=0,6
Глюкозы 0,3х6=1,8
Масса общая 0.03+0,6+1,8=2,43
Масса 1-го порошка 2,43:6=0,4 №6
Glucosi 1,8
Acidi ascorbinici 0,6
Riboflavini 0,03
Масса общая 2,43
Масса 1-го порошка 0,4 №6
Приготовил:
Проверил:
Глюкоза, аскорбиновая кислота выписаны примерно в равных количествах измельчают одновременно вместе, рибофлавин красящее вещество, помещают между слоями неокрашенных, проверяют на однородность, дозируют в вощаные капсулы. Этикетка «Внутреннее», дополнительная «Хранить в сухом, защищенном от света месте», срок годности-10 суток (НД).
контроль (кислота аскорбиновая).
Качественное определение: выпадение темного осадка при действии раствора нитрата серебра:
![](data:image/png;base64,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)
Количественное определение
Метод - нейтрализация.
![](data:image/png;base64,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)
0,1 г порошка растворить в 1-2 мл воды очищенной, прибавить 2-3 капли фенолфталеина и титровать 0,1М раствором натрия гидроксида до розового окрашивания.
объема титранта, массы навески лекарственного вещества
Тсоот = 0,01761 г/мл
афакт = 0,02
Vпред = 0,02 / 0,01761 = 1,4 мл
Кп=0,98
Сг=0,01761•1,4•0,98•2,43/0,1=0,6
2,43 г ± 3% ± 0,0729
ПДО [2,3571 – 2,5029]
0,6 г ± 5% ± 0,03
ПДО [0,57 –
| 2)Возьми: Димедрола 0,02
Фенобарбитала 0,04
Анальгина 0,2
Смешай, пусть получится порошок.
Дай таких доз №6.
Обозначь. По 1 порошку 3 раза вдень.
| Димедрол л.р.д.0,02 л.с.д.0.06; в.р.д.0,1 в.с.д.0,25
Фенобарбитал л.р.д.0,04 л.с.д.0,12; в.р.д.0,2 в.с.д.0,5
Анальгин л.р.д. 0,2 л.с.д.0,6; в.р.д.1,0 в.с.д.3,0
Димедрола 0,02х6=0,12
Фенобарбитала 0,04х6=0,24
Анальгина 0,2х6=1,2
Масса общая 0,12+0,24+1,2=1,56
Масса 1-го порошка 1,56:6=0,26 №6
Analgini 1.2
Dimedroli 0.12
Phenobarbitali 0.24
Масса общая 1.56
Масса 1-го порошка 0,26 №6
Приготовил:
Проверил:
Алгоритм изготовления лекарственной формы
В ступку помещают 1,2 анальгина, измельчают, затирая поры ступки, отсыпают на капсулу, оставив примерно 0,12. Затем в ступку помещают 0,12 димедрола, у провизора-технолога по рецепту получают 0,24 фенобарбитала и все смешивают до однородности. Дозируют на вощаные капсулы, упаковывают, помещают в бумажный пакет, наклеивают «Внутреннее», дополнительно «Хранить в сухом, защищенном от света месте», срок годности-10 суток (НД). Заполняют сигнатуру, т.к. рецепт остаются в аптеке, фенобарбитал - находится на ПКУ.
(димедрола гидрохлорид).
Качественное определение – появление желтого окрашивания при действии серной кислоты концентрированной, исчезновение окраски при добавлении воды:
Количественное определение![](data:image/png;base64,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)
Метод аргентометрия.
HCl + AgNO3 → AgCl↓ + HNO3
0,1 г порошка растворить в 1мл воды очищенной, добавить 1 мл спирта этилового, нейтрализованного по фенолфталеину, титровать 0,1 М серебра нитрата в присутствии индикатора бромфенолового синего до появления фиолетовой окраски.
Тсоот =0,02918 г/мл
афакт = 0,008
Vпред = 0,008 / 0,02918 = 0,27 мл
Кп=0,98
Сг = 0,02918 • 0,27 • 0,98 • 1,56/0,1 = 0,12
2)1,56г ± 3% ± 0,05
ПДО [1,51 – 1,61]
0,12 г ±10% +0,012
ПДО [0,108 – 0,132]
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