Research Article
Numerical Techniques for Solving Linear Volterra Fractional Integral Equation
Table 2
The exact and numerical solutions using the Haar wavelet method with
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| | Exact solution | Numerical solution | |
| 0.0078 | −0.9116116523 | −0.9116009499 | | 0.1172 | −0.6576734015 | −0.6576324164 | | 0.2266 | −0.5240141808 | −0.5239489931 | | 0.3359 | −0.4203988440 | −0.4203067536 | | 0.4453 | −0.3326826092 | −0.3325562333 | | 0.5547 | −0.2552265445 | −0.2550525941 | | 0.6641 | −0.1850996993 | −0.1848551078 | | 0.7734 | −0.1205470450 | −0.1201906958 | | 0.8828 | −0.0604189763 | −0.0598738640 | | 0.9922 | −0.0039139093 | −0.0030264584 | |
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