Research Article
Generalized Taylor Series Method for Solving Nonlinear Fractional Differential Equations with Modified Riemann-Liouville Derivative
Table 9
,
,
,
, and
values in Example
4 for
,
, and
.
| | | | | | |
| | 0 | 0 | 1 | 1 | 0 | 0 | | 1 | −1.039754 | 0 | 0 | −1.039754 | −1.039754 | | 2 | 0.569484 | 0.569484 | 0.569484 | 0.569484 | 0.569484 | | 3 | −0.239770 | −0.674339 | 0.674339 | 0.239770 | | | 4 | 0.268032 | 0.268032 | −0.118570 | −0.538923 | −0.135445 | | 5 | −0.285977 | −0.016742 | −0.317020 | 0.171348 | −0.038209 | | 6 | 0.138927 | 0.100162 | 0.181588 | 0.229499 | 0.131055 | | 7 | −0.044360 | −0.198550 | 0.165109 | −0.196168 | 0.060712 | | 8 | 0.088423 | 0.134687 | −0.222951 | −0.085070 | −0.020301 | | 9 | −0.126689 | −0.039427 | 0.005124 | 0.194067 | 0.020357 | | 10 | 0.077910 | 0.031339 | 0.140686 | −0.049923 | 0.016741 |
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