本次共计算 1 个题目：每一题对 x 求 4 阶导数。
    注意，变量是区分大小写的。
\[ \begin{equation}\begin{split}【1/1】求函数\frac{lg(1 + {10}^{(xx)})}{x} 关于 x 的 4 阶导数：\\\end{split}\end{equation} \]\[ \begin{equation}\begin{split}\\解:&\\ &原函数 = \frac{lg({10}^{x^{2}} + 1)}{x}\\&\color{blue}{函数的第 1 阶导数：}\\&\frac{d\left( \frac{lg({10}^{x^{2}} + 1)}{x}\right)}{dx}\\=&\frac{-lg({10}^{x^{2}} + 1)}{x^{2}} + \frac{(({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)})) + 0)}{xln{10}({10}^{x^{2}} + 1)}\\=&\frac{-lg({10}^{x^{2}} + 1)}{x^{2}} + \frac{2 * {10}^{x^{2}}ln(10)}{({10}^{x^{2}} + 1)ln{10}}\\\\ &\color{blue}{函数的第 2 阶导数：} \\&\frac{d\left( \frac{-lg({10}^{x^{2}} + 1)}{x^{2}} + \frac{2 * {10}^{x^{2}}ln(10)}{({10}^{x^{2}} + 1)ln{10}}\right)}{dx}\\=&\frac{--2lg({10}^{x^{2}} + 1)}{x^{3}} - \frac{(({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)})) + 0)}{x^{2}ln{10}({10}^{x^{2}} + 1)} + \frac{2(\frac{-(({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)})) + 0)}{({10}^{x^{2}} + 1)^{2}}){10}^{x^{2}}ln(10)}{ln{10}} + \frac{2({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)}))ln(10)}{({10}^{x^{2}} + 1)ln{10}} + \frac{2 * {10}^{x^{2}}*0}{({10}^{x^{2}} + 1)(10)ln{10}} + \frac{2 * {10}^{x^{2}}ln(10)*-0}{({10}^{x^{2}} + 1)ln^{2}{10}}\\=&\frac{2lg({10}^{x^{2}} + 1)}{x^{3}} - \frac{2 * {10}^{x^{2}}ln(10)}{({10}^{x^{2}} + 1)xln{10}} - \frac{4x{10}^{(2x^{2})}ln^{2}(10)}{({10}^{x^{2}} + 1)^{2}ln{10}} + \frac{4x{10}^{x^{2}}ln^{2}(10)}{({10}^{x^{2}} + 1)ln{10}}\\\\ &\color{blue}{函数的第 3 阶导数：} \\&\frac{d\left( \frac{2lg({10}^{x^{2}} + 1)}{x^{3}} - \frac{2 * {10}^{x^{2}}ln(10)}{({10}^{x^{2}} + 1)xln{10}} - \frac{4x{10}^{(2x^{2})}ln^{2}(10)}{({10}^{x^{2}} + 1)^{2}ln{10}} + \frac{4x{10}^{x^{2}}ln^{2}(10)}{({10}^{x^{2}} + 1)ln{10}}\right)}{dx}\\=&\frac{2*-3lg({10}^{x^{2}} + 1)}{x^{4}} + \frac{2(({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)})) + 0)}{x^{3}ln{10}({10}^{x^{2}} + 1)} - \frac{2(\frac{-(({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)})) + 0)}{({10}^{x^{2}} + 1)^{2}}){10}^{x^{2}}ln(10)}{xln{10}} - \frac{2*-{10}^{x^{2}}ln(10)}{({10}^{x^{2}} + 1)x^{2}ln{10}} - \frac{2({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)}))ln(10)}{({10}^{x^{2}} + 1)xln{10}} - \frac{2 * {10}^{x^{2}}*0}{({10}^{x^{2}} + 1)x(10)ln{10}} - \frac{2 * {10}^{x^{2}}ln(10)*-0}{({10}^{x^{2}} + 1)xln^{2}{10}} - \frac{4(\frac{-2(({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)})) + 0)}{({10}^{x^{2}} + 1)^{3}})x{10}^{(2x^{2})}ln^{2}(10)}{ln{10}} - \frac{4 * {10}^{(2x^{2})}ln^{2}(10)}{({10}^{x^{2}} + 1)^{2}ln{10}} - \frac{4x({10}^{(2x^{2})}((2*2x)ln(10) + \frac{(2x^{2})(0)}{(10)}))ln^{2}(10)}{({10}^{x^{2}} + 1)^{2}ln{10}} - \frac{4x{10}^{(2x^{2})}*2ln(10)*0}{({10}^{x^{2}} + 1)^{2}(10)ln{10}} - \frac{4x{10}^{(2x^{2})}ln^{2}(10)*-0}{({10}^{x^{2}} + 1)^{2}ln^{2}{10}} + \frac{4(\frac{-(({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)})) + 0)}{({10}^{x^{2}} + 1)^{2}})x{10}^{x^{2}}ln^{2}(10)}{ln{10}} + \frac{4 * {10}^{x^{2}}ln^{2}(10)}{({10}^{x^{2}} + 1)ln{10}} + \frac{4x({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)}))ln^{2}(10)}{({10}^{x^{2}} + 1)ln{10}} + \frac{4x{10}^{x^{2}}*2ln(10)*0}{({10}^{x^{2}} + 1)(10)ln{10}} + \frac{4x{10}^{x^{2}}ln^{2}(10)*-0}{({10}^{x^{2}} + 1)ln^{2}{10}}\\=&\frac{-6lg({10}^{x^{2}} + 1)}{x^{4}} + \frac{16x^{2}{10}^{(3x^{2})}ln^{3}(10)}{({10}^{x^{2}} + 1)^{3}ln{10}} + \frac{6 * {10}^{x^{2}}ln(10)}{({10}^{x^{2}} + 1)x^{2}ln{10}} - \frac{24x^{2}{10}^{(2x^{2})}ln^{3}(10)}{({10}^{x^{2}} + 1)^{2}ln{10}} + \frac{8x^{2}{10}^{x^{2}}ln^{3}(10)}{({10}^{x^{2}} + 1)ln{10}}\\\\ &\color{blue}{函数的第 4 阶导数：} \\&\frac{d\left( \frac{-6lg({10}^{x^{2}} + 1)}{x^{4}} + \frac{16x^{2}{10}^{(3x^{2})}ln^{3}(10)}{({10}^{x^{2}} + 1)^{3}ln{10}} + \frac{6 * {10}^{x^{2}}ln(10)}{({10}^{x^{2}} + 1)x^{2}ln{10}} - \frac{24x^{2}{10}^{(2x^{2})}ln^{3}(10)}{({10}^{x^{2}} + 1)^{2}ln{10}} + \frac{8x^{2}{10}^{x^{2}}ln^{3}(10)}{({10}^{x^{2}} + 1)ln{10}}\right)}{dx}\\=&\frac{-6*-4lg({10}^{x^{2}} + 1)}{x^{5}} - \frac{6(({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)})) + 0)}{x^{4}ln{10}({10}^{x^{2}} + 1)} + \frac{16(\frac{-3(({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)})) + 0)}{({10}^{x^{2}} + 1)^{4}})x^{2}{10}^{(3x^{2})}ln^{3}(10)}{ln{10}} + \frac{16*2x{10}^{(3x^{2})}ln^{3}(10)}{({10}^{x^{2}} + 1)^{3}ln{10}} + \frac{16x^{2}({10}^{(3x^{2})}((3*2x)ln(10) + \frac{(3x^{2})(0)}{(10)}))ln^{3}(10)}{({10}^{x^{2}} + 1)^{3}ln{10}} + \frac{16x^{2}{10}^{(3x^{2})}*3ln^{2}(10)*0}{({10}^{x^{2}} + 1)^{3}(10)ln{10}} + \frac{16x^{2}{10}^{(3x^{2})}ln^{3}(10)*-0}{({10}^{x^{2}} + 1)^{3}ln^{2}{10}} + \frac{6(\frac{-(({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)})) + 0)}{({10}^{x^{2}} + 1)^{2}}){10}^{x^{2}}ln(10)}{x^{2}ln{10}} + \frac{6*-2 * {10}^{x^{2}}ln(10)}{({10}^{x^{2}} + 1)x^{3}ln{10}} + \frac{6({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)}))ln(10)}{({10}^{x^{2}} + 1)x^{2}ln{10}} + \frac{6 * {10}^{x^{2}}*0}{({10}^{x^{2}} + 1)x^{2}(10)ln{10}} + \frac{6 * {10}^{x^{2}}ln(10)*-0}{({10}^{x^{2}} + 1)x^{2}ln^{2}{10}} - \frac{24(\frac{-2(({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)})) + 0)}{({10}^{x^{2}} + 1)^{3}})x^{2}{10}^{(2x^{2})}ln^{3}(10)}{ln{10}} - \frac{24*2x{10}^{(2x^{2})}ln^{3}(10)}{({10}^{x^{2}} + 1)^{2}ln{10}} - \frac{24x^{2}({10}^{(2x^{2})}((2*2x)ln(10) + \frac{(2x^{2})(0)}{(10)}))ln^{3}(10)}{({10}^{x^{2}} + 1)^{2}ln{10}} - \frac{24x^{2}{10}^{(2x^{2})}*3ln^{2}(10)*0}{({10}^{x^{2}} + 1)^{2}(10)ln{10}} - \frac{24x^{2}{10}^{(2x^{2})}ln^{3}(10)*-0}{({10}^{x^{2}} + 1)^{2}ln^{2}{10}} + \frac{8(\frac{-(({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)})) + 0)}{({10}^{x^{2}} + 1)^{2}})x^{2}{10}^{x^{2}}ln^{3}(10)}{ln{10}} + \frac{8*2x{10}^{x^{2}}ln^{3}(10)}{({10}^{x^{2}} + 1)ln{10}} + \frac{8x^{2}({10}^{x^{2}}((2x)ln(10) + \frac{(x^{2})(0)}{(10)}))ln^{3}(10)}{({10}^{x^{2}} + 1)ln{10}} + \frac{8x^{2}{10}^{x^{2}}*3ln^{2}(10)*0}{({10}^{x^{2}} + 1)(10)ln{10}} + \frac{8x^{2}{10}^{x^{2}}ln^{3}(10)*-0}{({10}^{x^{2}} + 1)ln^{2}{10}}\\=&\frac{24lg({10}^{x^{2}} + 1)}{x^{5}} - \frac{12 * {10}^{(2(x^{2}))}ln^{2}(10)}{({10}^{x^{2}} + 1)^{2}xln{10}} - \frac{96x^{3}{10}^{(4x^{2})}ln^{4}(10)}{({10}^{x^{2}} + 1)^{4}ln{10}} + \frac{32x{10}^{(3x^{2})}ln^{3}(10)}{({10}^{x^{2}} + 1)^{3}ln{10}} + \frac{192x^{3}{10}^{(3x^{2})}ln^{4}(10)}{({10}^{x^{2}} + 1)^{3}ln{10}} - \frac{24 * {10}^{x^{2}}ln(10)}{({10}^{x^{2}} + 1)x^{3}ln{10}} + \frac{12 * {10}^{x^{2}}ln^{2}(10)}{({10}^{x^{2}} + 1)xln{10}} - \frac{16x^{3}{10}^{(2(x^{2}))}ln^{4}(10)}{({10}^{x^{2}} + 1)^{2}ln{10}} - \frac{48x{10}^{(2x^{2})}ln^{3}(10)}{({10}^{x^{2}} + 1)^{2}ln{10}} - \frac{96x^{3}{10}^{(2x^{2})}ln^{4}(10)}{({10}^{x^{2}} + 1)^{2}ln{10}} + \frac{16x^{3}{10}^{x^{2}}ln^{4}(10)}{({10}^{x^{2}} + 1)ln{10}} + \frac{16x{10}^{x^{2}}ln^{3}(10)}{({10}^{x^{2}} + 1)ln{10}}\\ \end{split}\end{equation} \]

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