, (6.13)
Зная по геофизическим данным или по результатам глубинной дебитометрии h, а по лабораторным данным m, можно определить проницаемость k в районе данной скважины. Обычно вместо Rк берут половину среднего или средневзвешенного по углу расстояния до соседних скважин. Для одиночно работающих скважин Rк принимают равным 250 - 400 м, исходя из физических представлений о процессах фильтрации.
Если имеется ряд фактических замеров дебитов Qi и соответствующих этим дебитам замеров забойного давления Pi, то по этим данным можно определить все постоянные коэффициенты общего уравнения притока. Поскольку их три (К, Pк, n), то нужно иметь по крайней мере замеры дебитов и давлений при трех режимах эксплуатации. Полагая, что индикаторная линия описывается уравнением вида (6.11), то для каждого режима будем иметь
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)
(6.14)
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