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。
\[ \begin{equation}\begin{split}【1/1】求函数{a}^{(xe^{x} + {1}^{(ae^{x})})} 关于 x 的 4 阶导数：\\\end{split}\end{equation} \]\[ \begin{equation}\begin{split}\\解:&\\ &\color{blue}{函数的第 1 阶导数：}\\&\frac{d\left( {a}^{(xe^{x} + {1}^{(ae^{x})})}\right)}{dx}\\=&({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))\\=&{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a)ln(1)\\\\ &\color{blue}{函数的第 2 阶导数：} \\&\frac{d\left( {a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a)ln(1)\right)}{dx}\\=&({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{x}ln(a) + {a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + \frac{{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}*0}{(a)} + {a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + x({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{x}ln(a) + x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + \frac{x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}*0}{(a)} + a({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a)ln(1) + a{1}^{(ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{x}ln(a)ln(1) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a)ln(1) + \frac{a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}*0ln(1)}{(a)} + \frac{a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a)*0}{(1)}\\=&{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + 2x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln(1)ln^{2}(a) + 2{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)ln(1) + x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln(a) + a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln^{2}(a) + a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{x}ln(a)ln(1)\\\\ &\color{blue}{函数的第 3 阶导数：} \\&\frac{d\left( {a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + 2x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln(1)ln^{2}(a) + 2{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)ln(1) + x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln(a) + a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln^{2}(a) + a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{x}ln(a)ln(1)\right)}{dx}\\=&({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln^{2}(a) + {a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln^{2}(a) + \frac{{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*2ln(a)*0}{(a)} + 2{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + 2x({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln^{2}(a) + 2x{a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln^{2}(a) + \frac{2x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*2ln(a)*0}{(a)} + a({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln(1)ln^{2}(a) + a{1}^{(ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln(1)ln^{2}(a) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln(1)ln^{2}(a) + \frac{a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*0ln^{2}(a)}{(1)} + \frac{a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln(1)*2ln(a)*0}{(a)} + 2({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{x}ln(a) + 2{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + \frac{2{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}*0}{(a)} + 2x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + x^{2}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln^{2}(a) + x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln^{2}(a) + \frac{x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*2ln(a)*0}{(a)} + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)ln(1) + ax({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)ln(1) + ax{1}^{(ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln^{2}(a)ln(1) + ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln^{2}(a)ln(1) + \frac{ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*2ln(a)*0ln(1)}{(a)} + \frac{ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)*0}{(1)} + {a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + x({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{x}ln(a) + x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + \frac{x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}*0}{(a)} + a^{2}({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln(a) + a^{2}{1}^{(ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln^{2}(1)ln(a) + a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln^{2}(1)ln(a) + \frac{a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*2ln(1)*0ln(a)}{(1)} + \frac{a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)*0}{(a)} + a({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)})){1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + a{a}^{(xe^{x} + {1}^{(ae^{x})})}({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)}))e^{{x}*{2}}ln^{2}(a)ln(1) + a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}*2e^{x}e^{x}ln^{2}(a)ln(1) + \frac{a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}*2ln(a)*0ln(1)}{(a)} + \frac{a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)*0}{(1)} + a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + ax({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)})){1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + ax{a}^{(xe^{x} + {1}^{(ae^{x})})}({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)}))e^{{x}*{2}}ln^{2}(a)ln(1) + ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}*2e^{x}e^{x}ln^{2}(a)ln(1) + \frac{ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}*2ln(a)*0ln(1)}{(a)} + \frac{ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)*0}{(1)} + a^{2}({1}^{(2(ae^{x}))}((2(ae^{x}))ln(1) + \frac{(2(ae^{x}))(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln^{2}(a) + a^{2}{1}^{(2(ae^{x}))}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln^{2}(1)ln^{2}(a) + a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln^{2}(1)ln^{2}(a) + \frac{a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*2ln(1)*0ln^{2}(a)}{(1)} + \frac{a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)*2ln(a)*0}{(a)} + a({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)})){1}^{(ae^{x})}e^{x}ln(a)ln(1) + a{a}^{(xe^{x} + {1}^{(ae^{x})})}({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)}))e^{x}ln(a)ln(1) + a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{x}ln(a)ln(1) + \frac{a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{x}*0ln(1)}{(a)} + \frac{a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{x}ln(a)*0}{(1)}\\=&{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a) + 3x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln(1)ln^{3}(a) + 6{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + 3x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a) + 2ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln(1) + 9x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + 2a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)ln^{2}(a) + 2a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)ln(1) + 4ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)ln(1) + 2a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)ln^{3}(a) + 4a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln(1)ln^{2}(a) + 3{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + x^{3}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a) + ax^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln(1) + 3x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)ln(1) + 2a^{2}x{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)ln^{2}(a) + 2ax^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)ln(1) + 2a^{2}x{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + 3ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)ln(1) + x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + a^{3}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln(a) + a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{2}(a)ln^{2}(1) + a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{2}(a)ln^{2}(1) + a^{3}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln^{2}(a) + 3a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln(a) + 4a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + 3ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + 2a^{3}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln^{2}(a) + a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + a^{3}{1}^{(3ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln^{3}(a) + 2a^{2}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln^{2}(a) + a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln^{2}(a) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a)ln(1)\\\\ &\color{blue}{函数的第 4 阶导数：} \\&\frac{d\left( {a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a) + 3x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln(1)ln^{3}(a) + 6{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + 3x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a) + 2ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln(1) + 9x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + 2a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)ln^{2}(a) + 2a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)ln(1) + 4ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)ln(1) + 2a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)ln^{3}(a) + 4a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln(1)ln^{2}(a) + 3{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + x^{3}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a) + ax^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln(1) + 3x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)ln(1) + 2a^{2}x{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)ln^{2}(a) + 2ax^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)ln(1) + 2a^{2}x{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + 3ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)ln(1) + x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + a^{3}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln(a) + a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{2}(a)ln^{2}(1) + a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{2}(a)ln^{2}(1) + a^{3}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln^{2}(a) + 3a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln(a) + 4a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + 3ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + 2a^{3}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln^{2}(a) + a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + a^{3}{1}^{(3ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln^{3}(a) + 2a^{2}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln^{2}(a) + a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln^{2}(a) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a)ln(1)\right)}{dx}\\=&({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{3}}ln^{3}(a) + {a}^{(xe^{x} + {1}^{(ae^{x})})}*3e^{{x}*{2}}e^{x}ln^{3}(a) + \frac{{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}*3ln^{2}(a)*0}{(a)} + 3{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a) + 3x({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{3}}ln^{3}(a) + 3x{a}^{(xe^{x} + {1}^{(ae^{x})})}*3e^{{x}*{2}}e^{x}ln^{3}(a) + \frac{3x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}*3ln^{2}(a)*0}{(a)} + a({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln(1)ln^{3}(a) + a{1}^{(ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{3}}ln(1)ln^{3}(a) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*3e^{{x}*{2}}e^{x}ln(1)ln^{3}(a) + \frac{a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}*0ln^{3}(a)}{(1)} + \frac{a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln(1)*3ln^{2}(a)*0}{(a)} + 6({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln^{2}(a) + 6{a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln^{2}(a) + \frac{6{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*2ln(a)*0}{(a)} + 3*2x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a) + 3x^{2}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{3}}ln^{3}(a) + 3x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}*3e^{{x}*{2}}e^{x}ln^{3}(a) + \frac{3x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}*3ln^{2}(a)*0}{(a)} + 2a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln(1) + 2ax({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln(1) + 2ax{1}^{(ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{3}}ln^{3}(a)ln(1) + 2ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*3e^{{x}*{2}}e^{x}ln^{3}(a)ln(1) + \frac{2ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}*3ln^{2}(a)*0ln(1)}{(a)} + \frac{2ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)*0}{(1)} + 9{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + 9x({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln^{2}(a) + 9x{a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln^{2}(a) + \frac{9x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*2ln(a)*0}{(a)} + 2a^{2}({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)ln^{2}(a) + 2a^{2}{1}^{(ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{3}}ln^{2}(1)ln^{2}(a) + 2a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*3e^{{x}*{2}}e^{x}ln^{2}(1)ln^{2}(a) + \frac{2a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}*2ln(1)*0ln^{2}(a)}{(1)} + \frac{2a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)*2ln(a)*0}{(a)} + 2a({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)})){1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)ln(1) + 2a{a}^{(xe^{x} + {1}^{(ae^{x})})}({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)}))e^{{x}*{3}}ln^{3}(a)ln(1) + 2a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}*3e^{{x}*{2}}e^{x}ln^{3}(a)ln(1) + \frac{2a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}*3ln^{2}(a)*0ln(1)}{(a)} + \frac{2a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)*0}{(1)} + 4a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)ln(1) + 4ax({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)})){1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)ln(1) + 4ax{a}^{(xe^{x} + {1}^{(ae^{x})})}({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)}))e^{{x}*{3}}ln^{3}(a)ln(1) + 4ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}*3e^{{x}*{2}}e^{x}ln^{3}(a)ln(1) + \frac{4ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}*3ln^{2}(a)*0ln(1)}{(a)} + \frac{4ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)*0}{(1)} + 2a^{2}({1}^{(2(ae^{x}))}((2(ae^{x}))ln(1) + \frac{(2(ae^{x}))(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)ln^{3}(a) + 2a^{2}{1}^{(2(ae^{x}))}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{3}}ln^{2}(1)ln^{3}(a) + 2a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}*3e^{{x}*{2}}e^{x}ln^{2}(1)ln^{3}(a) + \frac{2a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}*2ln(1)*0ln^{3}(a)}{(1)} + \frac{2a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)*3ln^{2}(a)*0}{(a)} + 4a({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln(1)ln^{2}(a) + 4a{1}^{(ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln(1)ln^{2}(a) + 4a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln(1)ln^{2}(a) + \frac{4a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*0ln^{2}(a)}{(1)} + \frac{4a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln(1)*2ln(a)*0}{(a)} + 3({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{x}ln(a) + 3{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + \frac{3{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}*0}{(a)} + 3x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a) + x^{3}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{3}}ln^{3}(a) + x^{3}{a}^{(xe^{x} + {1}^{(ae^{x})})}*3e^{{x}*{2}}e^{x}ln^{3}(a) + \frac{x^{3}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}*3ln^{2}(a)*0}{(a)} + a*2x{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln(1) + ax^{2}({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln(1) + ax^{2}{1}^{(ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{3}}ln^{3}(a)ln(1) + ax^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*3e^{{x}*{2}}e^{x}ln^{3}(a)ln(1) + \frac{ax^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}*3ln^{2}(a)*0ln(1)}{(a)} + \frac{ax^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)*0}{(1)} + 3*2x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + 3x^{2}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln^{2}(a) + 3x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln^{2}(a) + \frac{3x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*2ln(a)*0}{(a)} + a({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)ln(1) + a{1}^{(ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln^{2}(a)ln(1) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln^{2}(a)ln(1) + \frac{a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*2ln(a)*0ln(1)}{(a)} + \frac{a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)*0}{(1)} + 2a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)ln^{2}(a) + 2a^{2}x({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)ln^{2}(a) + 2a^{2}x{1}^{(ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{3}}ln^{2}(1)ln^{2}(a) + 2a^{2}x{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*3e^{{x}*{2}}e^{x}ln^{2}(1)ln^{2}(a) + \frac{2a^{2}x{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}*2ln(1)*0ln^{2}(a)}{(1)} + \frac{2a^{2}x{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)*2ln(a)*0}{(a)} + 2a*2x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)ln(1) + 2ax^{2}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)})){1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)ln(1) + 2ax^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)}))e^{{x}*{3}}ln^{3}(a)ln(1) + 2ax^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}*3e^{{x}*{2}}e^{x}ln^{3}(a)ln(1) + \frac{2ax^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}*3ln^{2}(a)*0ln(1)}{(a)} + \frac{2ax^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)*0}{(1)} + 2a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + 2a^{2}x({1}^{(2(ae^{x}))}((2(ae^{x}))ln(1) + \frac{(2(ae^{x}))(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + 2a^{2}x{1}^{(2(ae^{x}))}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + 2a^{2}x{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}*3e^{{x}*{2}}e^{x}ln^{3}(a)ln^{2}(1) + \frac{2a^{2}x{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}*3ln^{2}(a)*0ln^{2}(1)}{(a)} + \frac{2a^{2}x{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)*2ln(1)*0}{(1)} + 3a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)ln(1) + 3ax({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)ln(1) + 3ax{1}^{(ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln^{2}(a)ln(1) + 3ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln^{2}(a)ln(1) + \frac{3ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*2ln(a)*0ln(1)}{(a)} + \frac{3ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)*0}{(1)} + {a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + x({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{x}ln(a) + x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + \frac{x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}*0}{(a)} + a^{3}({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln(a) + a^{3}{1}^{(ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{3}}ln^{3}(1)ln(a) + a^{3}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*3e^{{x}*{2}}e^{x}ln^{3}(1)ln(a) + \frac{a^{3}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}*3ln^{2}(1)*0ln(a)}{(1)} + \frac{a^{3}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)*0}{(a)} + a^{2}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)})){1}^{(ae^{x})}e^{{x}*{3}}ln^{2}(a)ln^{2}(1) + a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)}))e^{{x}*{3}}ln^{2}(a)ln^{2}(1) + a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}*3e^{{x}*{2}}e^{x}ln^{2}(a)ln^{2}(1) + \frac{a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}*2ln(a)*0ln^{2}(1)}{(a)} + \frac{a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{2}(a)*2ln(1)*0}{(1)} + a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{2}(a)ln^{2}(1) + a^{2}x({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)})){1}^{(ae^{x})}e^{{x}*{3}}ln^{2}(a)ln^{2}(1) + a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)}))e^{{x}*{3}}ln^{2}(a)ln^{2}(1) + a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}*3e^{{x}*{2}}e^{x}ln^{2}(a)ln^{2}(1) + \frac{a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}*2ln(a)*0ln^{2}(1)}{(a)} + \frac{a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{2}(a)*2ln(1)*0}{(1)} + a^{3}({1}^{(2(ae^{x}))}((2(ae^{x}))ln(1) + \frac{(2(ae^{x}))(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln^{2}(a) + a^{3}{1}^{(2(ae^{x}))}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{3}}ln^{3}(1)ln^{2}(a) + a^{3}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}*3e^{{x}*{2}}e^{x}ln^{3}(1)ln^{2}(a) + \frac{a^{3}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}*3ln^{2}(1)*0ln^{2}(a)}{(1)} + \frac{a^{3}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)*2ln(a)*0}{(a)} + 3a^{2}({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln(a) + 3a^{2}{1}^{(ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln^{2}(1)ln(a) + 3a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln^{2}(1)ln(a) + \frac{3a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*2ln(1)*0ln(a)}{(1)} + \frac{3a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)*0}{(a)} + 4a({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)})){1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + 4a{a}^{(xe^{x} + {1}^{(ae^{x})})}({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)}))e^{{x}*{2}}ln^{2}(a)ln(1) + 4a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}*2e^{x}e^{x}ln^{2}(a)ln(1) + \frac{4a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}*2ln(a)*0ln(1)}{(a)} + \frac{4a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)*0}{(1)} + 3a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + 3ax({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)})){1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + 3ax{a}^{(xe^{x} + {1}^{(ae^{x})})}({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)}))e^{{x}*{2}}ln^{2}(a)ln(1) + 3ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}*2e^{x}e^{x}ln^{2}(a)ln(1) + \frac{3ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}*2ln(a)*0ln(1)}{(a)} + \frac{3ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)*0}{(1)} + 2a^{3}({1}^{(2ae^{x})}((2ae^{x})ln(1) + \frac{(2ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln^{2}(a) + 2a^{3}{1}^{(2ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{3}}ln^{3}(1)ln^{2}(a) + 2a^{3}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*3e^{{x}*{2}}e^{x}ln^{3}(1)ln^{2}(a) + \frac{2a^{3}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}*3ln^{2}(1)*0ln^{2}(a)}{(1)} + \frac{2a^{3}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)*2ln(a)*0}{(a)} + a^{2}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)})){1}^{(2ae^{x})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}({1}^{(2ae^{x})}((2ae^{x})ln(1) + \frac{(2ae^{x})(0)}{(1)}))e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}*3e^{{x}*{2}}e^{x}ln^{3}(a)ln^{2}(1) + \frac{a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{3}}*3ln^{2}(a)*0ln^{2}(1)}{(a)} + \frac{a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{3}}ln^{3}(a)*2ln(1)*0}{(1)} + a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + a^{2}x({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)})){1}^{(2ae^{x})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}({1}^{(2ae^{x})}((2ae^{x})ln(1) + \frac{(2ae^{x})(0)}{(1)}))e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}*3e^{{x}*{2}}e^{x}ln^{3}(a)ln^{2}(1) + \frac{a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{3}}*3ln^{2}(a)*0ln^{2}(1)}{(a)} + \frac{a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{3}}ln^{3}(a)*2ln(1)*0}{(1)} + a^{3}({1}^{(3ae^{x})}((3ae^{x})ln(1) + \frac{(3ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln^{3}(a) + a^{3}{1}^{(3ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{3}}ln^{3}(1)ln^{3}(a) + a^{3}{1}^{(3ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*3e^{{x}*{2}}e^{x}ln^{3}(1)ln^{3}(a) + \frac{a^{3}{1}^{(3ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}*3ln^{2}(1)*0ln^{3}(a)}{(1)} + \frac{a^{3}{1}^{(3ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)*3ln^{2}(a)*0}{(a)} + 2a^{2}({1}^{(2ae^{x})}((2ae^{x})ln(1) + \frac{(2ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln^{2}(a) + 2a^{2}{1}^{(2ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln^{2}(1)ln^{2}(a) + 2a^{2}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln^{2}(1)ln^{2}(a) + \frac{2a^{2}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*2ln(1)*0ln^{2}(a)}{(1)} + \frac{2a^{2}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)*2ln(a)*0}{(a)} + a^{2}({1}^{(2(ae^{x}))}((2(ae^{x}))ln(1) + \frac{(2(ae^{x}))(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln^{2}(a) + a^{2}{1}^{(2(ae^{x}))}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{{x}*{2}}ln^{2}(1)ln^{2}(a) + a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}*2e^{x}e^{x}ln^{2}(1)ln^{2}(a) + \frac{a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}*2ln(1)*0ln^{2}(a)}{(1)} + \frac{a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)*2ln(a)*0}{(a)} + a({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})){a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a)ln(1) + a{1}^{(ae^{x})}({a}^{(xe^{x} + {1}^{(ae^{x})})}((e^{x} + xe^{x} + ({1}^{(ae^{x})}((ae^{x})ln(1) + \frac{(ae^{x})(0)}{(1)})))ln(a) + \frac{(xe^{x} + {1}^{(ae^{x})})(0)}{(a)}))e^{x}ln(a)ln(1) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a)ln(1) + \frac{a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}*0ln(1)}{(a)} + \frac{a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a)*0}{(1)}\\=&{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(a) + 4x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(a) + a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln(1)ln^{4}(a) + 12{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a) + 6x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(a) + 3ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(a)ln(1) + 30x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a) + 3a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{2}(1)ln^{3}(a) + 3a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{4}}ln^{4}(a)ln(1) + 9ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{4}}ln^{4}(a)ln(1) + 3a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{2}(1)ln^{4}(a) + 9a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln(1)ln^{3}(a) + 24{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + 4x^{3}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(a) + 3ax^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(a)ln(1) + 24x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a) + 2a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln(1) + 6a^{2}x{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{2}(1)ln^{3}(a) + 9ax^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{4}}ln^{4}(a)ln(1) + 6a^{2}x{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(a)ln^{2}(1) + 17ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln(1) + 28x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + 3a^{3}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{3}(1)ln^{2}(a) + 3a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{4}}ln^{3}(a)ln^{2}(1) + 6a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{4}}ln^{3}(a)ln^{2}(1) + 3a^{3}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{3}(1)ln^{3}(a) + 17a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)ln^{2}(a) + 19a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)ln(1) + 31ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)ln(1) + 6a^{3}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{3}(1)ln^{3}(a) + 3a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{4}}ln^{4}(a)ln^{2}(1) + 6a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{4}}ln^{4}(a)ln^{2}(1) + 3a^{3}{1}^{(3ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{3}(1)ln^{4}(a) + 6a^{2}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)ln^{3}(a) + 9a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)ln^{3}(a) + 11a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln(1)ln^{2}(a) + 4{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + x^{4}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(a) + ax^{3}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(a)ln(1) + 6x^{3}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a) + 3a^{2}x^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{2}(1)ln^{3}(a) + 3ax^{3}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{4}}ln^{4}(a)ln(1) + 3a^{2}x^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(a)ln^{2}(1) + 6ax^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln(1) + 7x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a) + 5a{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)ln(1) + 3a^{3}x{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{3}(1)ln^{2}(a) + 3a^{2}x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{4}}ln^{3}(a)ln^{2}(1) + 3a^{3}x{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{3}(a)ln^{3}(1) + 12a^{2}x{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{2}(1)ln^{2}(a) + 12ax^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{3}(a)ln(1) + 2a^{2}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + 6a^{3}x{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{3}(1)ln^{3}(a) + 3a^{2}x^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{4}}ln^{4}(a)ln^{2}(1) + 3a^{3}x{1}^{(3ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(a)ln^{3}(1) + 6a^{2}x{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + 6a^{2}x{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + 7ax{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(a)ln(1) + x{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{x}ln(a) + a^{4}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(1)ln(a) + a^{3}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{4}}ln^{2}(a)ln^{3}(1) + a^{3}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{4}}ln^{2}(a)ln^{3}(1) + a^{4}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(1)ln^{2}(a) + 6a^{3}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln(a) + 7a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{2}(a)ln^{2}(1) + 6a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{3}}ln^{2}(a)ln^{2}(1) + 6a^{4}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(1)ln^{2}(a) + 3a^{3}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{4}}ln^{3}(a)ln^{3}(1) + 3a^{3}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{4}}ln^{3}(a)ln^{3}(1) + 6a^{4}{1}^{(3ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(1)ln^{3}(a) + 15a^{3}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln^{2}(a) + 3a^{3}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln^{2}(a) + 7a^{2}{1}^{(ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln(a) + 12a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + 7ax{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{{x}*{2}}ln^{2}(a)ln(1) + 7a^{2}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + 6a^{2}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(2ae^{x})}e^{{x}*{3}}ln^{3}(a)ln^{2}(1) + a^{3}{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(3ae^{x})}e^{{x}*{4}}ln^{4}(a)ln^{3}(1) + a^{3}x{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(3ae^{x})}e^{{x}*{4}}ln^{4}(a)ln^{3}(1) + a^{4}{1}^{(4ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{4}}ln^{4}(1)ln^{4}(a) + 6a^{3}{1}^{(3ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{3}}ln^{3}(1)ln^{3}(a) + 6a^{2}{1}^{(2ae^{x})}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln^{2}(a) + a^{2}{1}^{(2(ae^{x}))}{a}^{(xe^{x} + {1}^{(ae^{x})})}e^{{x}*{2}}ln^{2}(1)ln^{2}(a) + a{a}^{(xe^{x} + {1}^{(ae^{x})})}{1}^{(ae^{x})}e^{x}ln(a)ln(1)\\ \end{split}\end{equation} \]

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