Research Article
On the Use of Recursive Evaluation of Derivatives and Padé Approximation to Solve the Blasius Problem
Table 1
Taylor series solutions (
) compared (increasing sequence).
| | Present | | Ahmad [7] |
| | 3 | 0.408248290 | 1 | 0.408248 | | 6 | 0.441742835 | 2 | 0.441743 | | 15 | 0.460566286 | 5 | 0.460566 | | 21 | 0.463662320 | 7 | 0.463662 | | 45 | 0.467293212 | 15 | 0.467293 | | 75 | 0.468366120 | 25 | 0.468366 | | 150 | 0.469065604 | 50 | 0.469066 | | 300 | 0.469365358 | 100 | 0.469365 | | 600 | 0.469495691 | 200 | 0.469496 | | 900 | 0.469534749 | 300 | 0.469535 | | 3000 | 0.469583484 | 1000 | 0.469583 | | 6000 | 0.469592426 | 2000 | 0.469592 | | 9000 | 0.469595183 | 3000 | 0.469595 | | 12000 | 0.469596501 | 4000 | 0.469597 |
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