Theory and Modern Applications
From: A solution to nonlinear Fredholm integral equations in the context of w-distances
\(x_{n}\) | \(x_{0}= 0.25\) | \(x_{0}= 0.5\) | \(x_{0}= 0.75\) | \(x_{0} =1\) |
---|---|---|---|---|
\(x_{1}\) | 1.5625e−02 | 6.2500e−02 | 1.4062e−01 | 2.5000e−01 |
\(x_{2}\) | 6.1035e−05 | 9.7656e−04 | 4.9438e−03 | 1.5625e−02 |
\(x_{3}\) | 9.3132e−10 | 2.3842e−07 | 6.1104e−06 | 6.1035e−05 |
\(x_{4}\) | 2.1684e−19 | 1.4211e−14 | 9.3343e−12 | 9.3132e−10 |
\(x_{5}\) | 1.1755e−38 | 5.0487e−29 | 2.1782e−23 | 2.1684e−19 |
\(x_{6}\) | 3.4545e−77 | 6.3724e−58 | 1.1862e−46 | 1.1755e−38 |
\(x_{7}\) | 2.9833e−154 | 1.0152e−115 | 3.5174e−93 | 3.4545e−77 |
\(x_{8}\) | 2.2251e−308 | 2.5765e−231 | 3.0930e−186 | 2.9833e−154 |
\(x_{9}\) | 0 | 0 | 0 | 2.2251e−308 |
\(x_{10}\) | 0 | 0 | 0 | 0 |
⋮ | ⋮ | ⋮ | ⋮ | ⋮ |