3. Коэффициент текущей компенсации добываемой нефти закачиваемой водой в зависимости от выработки запасов нефти.
Текущую компенсацию добываемой нефти закачиваемой водой (ТК3) рассчитали по формуле:
,
.
Для остальных значений рассчитано аналогично. Данные занесены в таблицу 5. По расчетам построен график (рисунок 5) и проведен его анализ. Таблица 5
год
| годовая закачка
| добыча жидкости
| добыча нефти
| добыча воды
| ТК3
| выработка запасов ВЗ
| 1987
| 30,766
| 22,642
| 18,168
| 4,474
| 1,190
| 1,188
| 1988
| 221,022
| 66,509
| 54,652
| 11,857
| 3,147
| 4,763
| 1989
| 112,875
| 103,95
| 68,59
| 35,36
| 0,929
| 9,248
| 1990
| 72,898
| 164,969
| 91,949
| 73,02
| -0,002
| 15,262
| 1991
| 81,868
| 219,735
| 86,589
| 133,146
| -0,490
| 20,925
| 1992
| 84,038
| 218,178
| 68,24
| 149,938
| -0,798
| 25,388
| 1993
| 180,879
| 170,762
| 68,626
| 102,136
| 0,941
| 29,877
| 1994
| 209,446
| 190,347
| 60,754
| 129,593
| 1,078
| 33,850
| 1995
| 194,357
| 214,448
| 51,483
| 162,965
| 0,496
| 37,217
| 1996
| 180,893
| 143,488
| 47,093
| 96,395
| 1,472
| 40,297
| 1997
| 174,533
| 130,005
| 46,659
| 83,346
| 1,604
| 43,349
| 1998
| 153,959
| 179,251
| 47,588
| 131,663
| 0,381
| 46,461
| 1999
| 161,606
| 172,147
| 53,451
| 118,696
| 0,657
| 49,957
| 2000
| 218,002
| 212,634
| 51,55
| 161,084
| 0,903
| 53,328
| 2001
| 297,147
| 198,044
| 34,02
| 164,024
| 3,211
| 55,553
| 2002
| 345,198
| 253,571
| 30,323
| 223,248
| 3,296
| 57,536
| 2003
| 299,063
| 274,593
| 26,842
| 247,751
| 1,557
| 59,292
| 2004
| 311,244
| 269,147
| 26,434
| 242,713
| 2,117
| 61,021
| 2005
| 226,009
| 249,051
| 29,384
| 219,667
| 0,165
| 62,943
| 2006
| 304,162
| 329,015
| 19,673
| 309,342
| -0,242
| 64,229
| 2007
| 558,963
| 396,27
| 18,419
| 377,851
| 8,054
| 65,434
| 2008
| 523,359
| 446,635
| 21,41
| 425,225
| 3,737
| 66,834
| 2009
| 443,924
| 537,352
| 18,119
| 519,233
| -3,466
| 68,019
| 2010
| 348,457
| 441,447
| 14,982
| 426,465
| -4,329
| 68,999
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) Рисунок 5 – Коэффициент текущей компенсации добываемой нефти закачиваемой водой, в зависимости от выработки запасов нефти |