, где из уравнения неразрывности , ![](data:image/png;base64,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)
или .
Следовательно имеем:
Q
| d
| скорость v
| вязкость v
| Шероховатость
| Число Рейнольдса
| Коэффициент гидравлического трения
| 0,001
| 0,1
| 0,12738854
| 0,0000013
| 0,0002
| 9799,118079
| 0,033823596
| 0,003
| 0,1
| 0,38216561
| 0,0000013
| 0,0002
| 29397,35424
| 0,028189729
| 0,006
| 0,1
| 0,76433121
| 0,0000013
| 0,0002
| 58794,70848
| 0,026073326
| 0,009
| 0,1
| 1,14649682
| 0,0000013
| 0,0002
| 88192,06271
| 0,02523792
| 0,012
| 0,1
| 1,52866242
| 0,0000013
| 0,0002
| 117589,417
| 0,024787079
| 0,015
| 0,1
| 1,91082803
| 0,0000013
| 0,0002
| 146986,7712
| 0,024504302
| 0,018
| 0,1
| 2,29299363
| 0,0000013
| 0,0002
| 176384,1254
| 0,024310201
| 0,021
| 0,1
| 2,67515924
| 0,0000013
| 0,0002
| 205781,4797
| 0,024168657
| 0,024
| 0,1
| 3,05732484
| 0,0000013
| 0,0002
| 235178,8339
| 0,024060844
| 0,027
| 0,1
| 3,43949045
| 0,0000013
| 0,0002
| 264576,1881
| 0,023975976
| 0,03
| 0,1
| 3,82165605
| 0,0000013
| 0,0002
| 293973,5424
| 0,023907426
|
|
|
|
|
|
|
| Q
| d
| скорость v
| вязкость v
| Шероховатость
| Число Рейнольдса
| Коэффициент гидравлического трения
| 0,001
| 0,2
| 0,03184713
| 0,0000013
| 0,0002
| 4899,55904
| 0,038417992
| 0,003
| 0,2
| 0,0955414
| 0,0000013
| 0,0002
| 14698,67712
| 0,030126436
| 0,006
| 0,2
| 0,1910828
| 0,0000013
| 0,0002
| 29397,35424
| 0,026390791
| 0,009
| 0,2
| 0,2866242
| 0,0000013
| 0,0002
| 44096,03136
| 0,024699625
| 0,012
| 0,2
| 0,38216561
| 0,0000013
| 0,0002
| 58794,70848
| 0,023704642
| 0,015
| 0,2
| 0,47770701
| 0,0000013
| 0,0002
| 73493,3856
| 0,023041707
| 0,018
| 0,2
| 0,57324841
| 0,0000013
| 0,0002
| 88192,06271
| 0,022565764
| 0,021
| 0,2
| 0,66878981
| 0,0000013
| 0,0002
| 102890,7398
| 0,022206404
| 0,024
| 0,2
| 0,76433121
| 0,0000013
| 0,0002
| 117589,417
| 0,021924966
| 0,027
| 0,2
| 0,85987261
| 0,0000013
| 0,0002
| 132288,0941
| 0,021698328
| 0,03
| 0,2
| 0,95541401
| 0,0000013
| 0,0002
| 146986,7712
| 0,021511766
|
|
|
|
|
|
|
| Q
| d
| скорость v
| вязкость v
| Шероховатость
| Число Рейнольдса
| Коэффициент гидравлического трения
| 0,001
| 0,3
| 0,01415428
| 0,0000013
| 0,0002
| 3266,372693
| 0,042113938
| 0,003
| 0,3
| 0,04246285
| 0,0000013
| 0,0002
| 9799,118079
| 0,032484988
| 0,006
| 0,3
| 0,08492569
| 0,0000013
| 0,0002
| 19598,23616
| 0,027896354
| 0,009
| 0,3
| 0,12738854
| 0,0000013
| 0,0002
| 29397,35424
| 0,025700375
| 0,012
| 0,3
| 0,16985138
| 0,0000013
| 0,0002
| 39196,47232
| 0,024350848
| 0,015
| 0,3
| 0,21231423
| 0,0000013
| 0,0002
| 48995,5904
| 0,02341918
| 0,018
| 0,3
| 0,25477707
| 0,0000013
| 0,0002
| 58794,70848
| 0,0227302
| 0,021
| 0,3
| 0,29723992
| 0,0000013
| 0,0002
| 68593,82656
| 0,022196753
| 0,024
| 0,3
| 0,33970276
| 0,0000013
| 0,0002
| 78392,94463
| 0,021769854
| 0,027
| 0,3
| 0,38216561
| 0,0000013
| 0,0002
| 88192,06271
| 0,021419562
| 0,03
| 0,3
| 0,42462845
| 0,0000013
| 0,0002
| 97991,18079
| 0,021126416
|
|
|
|
|
|
|
| Q
| d
| скорость v
| вязкость v
| Шероховатость
| Число Рейнольдса
| Коэффициент гидравлического трения
| 0,001
| 0,4
| 0,00796178
| 0,0000013
| 0,0002
| 2449,77952
| 0,045099996
| 0,003
| 0,4
| 0,02388535
| 0,0000013
| 0,0002
| 7349,33856
| 0,034567824
| 0,006
| 0,4
| 0,0477707
| 0,0000013
| 0,0002
| 14698,67712
| 0,029433573
| 0,009
| 0,4
| 0,07165605
| 0,0000013
| 0,0002
| 22048,01568
| 0,026914733
| 0,012
| 0,4
| 0,0955414
| 0,0000013
| 0,0002
| 29397,35424
| 0,025333212
| 0,015
| 0,4
| 0,11942675
| 0,0000013
| 0,0002
| 36746,6928
| 0,024220497
| 0,018
| 0,4
| 0,1433121
| 0,0000013
| 0,0002
| 44096,03136
| 0,023383599
| 0,021
| 0,4
| 0,16719745
| 0,0000013
| 0,0002
| 51445,36992
| 0,022725701
| 0,024
| 0,4
| 0,1910828
| 0,0000013
| 0,0002
| 58794,70848
| 0,022191922
| 0,027
| 0,4
| 0,21496815
| 0,0000013
| 0,0002
| 66144,04704
| 0,021748421
| 0,03
| 0,4
| 0,2388535
| 0,0000013
| 0,0002
| 73493,3856
| 0,021373011
|
|
|
|
|
|
|
|
|
|
|
|
|
|
| Q
| d
| скорость v
| вязкость v
| Шероховатость
| Число Рейнольдса
| Коэффициент гидравлического трения
| 0,001
| 0,5
| 0,00509554
| 0,0000013
| 0,0002
| 1959,823616
| 0,047611316
| 0,003
| 0,5
| 0,01528662
| 0,0000013
| 0,0002
| 5879,470848
| 0,036381191
| 0,006
| 0,5
| 0,03057325
| 0,0000013
| 0,0002
| 11758,9417
| 0,030845341
| 0,009
| 0,5
| 0,04585987
| 0,0000013
| 0,0002
| 17638,41254
| 0,028094625
| 0,012
| 0,5
| 0,0611465
| 0,0000013
| 0,0002
| 23517,88339
| 0,026347439
| 0,015
| 0,5
| 0,07643312
| 0,0000013
| 0,0002
| 29397,35424
| 0,025105014
| 0,018
| 0,5
| 0,09171975
| 0,0000013
| 0,0002
| 35276,82509
| 0,0241613
| 0,021
| 0,5
| 0,10700637
| 0,0000013
| 0,0002
| 41156,29593
| 0,023412599
| 0,024
| 0,5
| 0,12229299
| 0,0000013
| 0,0002
| 47035,76678
| 0,022799927
| 0,027
| 0,5
| 0,13757962
| 0,0000013
| 0,0002
| 52915,23763
| 0,022286786
| 0,03
| 0,5
| 0,15286624
| 0,0000013
| 0,0002
| 58794,70848
| 0,021849154
|
|