Research Article
Analytical Approximation to the Solution of Nonlinear Blasius’ Viscous Flow Equation by LTNHPM
Table 2
Comparison between the Howarth and LTNHPM methods for .
| | Howarth [2] | | |
|
0
|
0.00000
|
0.00000
|
0.00000
|
0.2
|
0.06641
|
0.06641
|
0.06641
|
0.4
|
0.13277
|
0.13276
|
0.13276
|
0.6
|
0.19894
|
0.19894
|
0.19894
|
0.8
|
0.26471
|
0.26471
|
0.26471
|
1
|
0.32979
|
0.32978
|
0.32978
|
1.2
|
0.39378
|
0.39378
|
0.39378
|
1.4
|
0.45627
|
0.45626
|
0.45626
|
1.6
|
0.51676
|
0.51676
|
0.51676
|
1.8
|
0.57477
|
0.57476
|
0.57476
|
2
|
0.62977
|
0.62977
|
0.62977
|
2.2
|
0.68132
|
0.68131
|
0.68131
|
2.4
|
0.72899
|
0.72898
|
0.72898
|
2.6
|
0.77246
|
0.77245
|
0.77245
|
2.8
|
0.81152
|
0.81151
|
0.81151
|
3
|
0.84605
|
0.84604
|
0.84604
|
3.2
|
0.87609
|
0.87607
|
0.87608
|
3.4
|
0.90177
|
0.90173
|
0.90176
|
3.6
|
0.92333
|
0.92321
|
0.92333
|
3.8
|
0.94112
|
0.94067
|
0.94112
|
4
|
0.95552
|
0.95396
|
0.95553
|
4.2
|
0.96696
|
0.96192
|
0.96704
|
4.4
|
0.97587
|
0.96047
|
0.97639
|
4.6
|
0.98269
|
0.93806
|
0.98564
|
4.8
|
0.98779
|
0.86475
|
1.00322
|
5
|
0.99155
|
0.66723
|
1.06671
|
|
|