\(\int (d+e (F^{c (a+b x)})^n)^2 \, dx\) [1]
\(\int (d+e (F^{c (a+b x)})^n) \, dx\) [2]
\(\int \genfrac {}{}{}{}{1}{d+e (F^{c (a+b x)})^n} \, dx\) [3]
\(\int \genfrac {}{}{}{}{1}{(d+e (F^{c (a+b x)})^n)^2} \, dx\) [4]
\(\int (d+e (F^{c (a+b x)})^n)^{3/2} \, dx\) [5]
\(\int \sqrt {d+e (F^{c (a+b x)})^n} \, dx\) [6]
\(\int \genfrac {}{}{}{}{1}{\sqrt {d+e (F^{c (a+b x)})^n}} \, dx\) [7]
\(\int \genfrac {}{}{}{}{1}{(d+e (F^{c (a+b x)})^n)^{3/2}} \, dx\) [8]
\(\int \genfrac {}{}{}{}{1}{(d+e (F^{c (a+b x)})^n)^{5/2}} \, dx\) [9]
\(\int (d+e (F^{c (a+b x)})^n)^{4/3} \, dx\) [10]
\(\int (d+e (F^{c (a+b x)})^n)^{2/3} \, dx\) [11]
\(\int \sqrt [3]{d+e (F^{c (a+b x)})^n} \, dx\) [12]
\(\int \genfrac {}{}{}{}{1}{\sqrt [3]{d+e (F^{c (a+b x)})^n}} \, dx\) [13]
\(\int \genfrac {}{}{}{}{1}{(d+e (F^{c (a+b x)})^n)^{2/3}} \, dx\) [14]
\(\int \genfrac {}{}{}{}{1}{(d+e (F^{c (a+b x)})^n)^{4/3}} \, dx\) [15]
\(\int \genfrac {}{}{}{}{1}{(d+e (F^{c (a+b x)})^n)^{5/3}} \, dx\) [16]
\(\int \genfrac {}{}{}{}{1}{(d+e (F^{c (a+b x)})^n)^{7/3}} \, dx\) [17]
\(\int (d+e (F^{c (a+b x)})^n)^p \, dx\) [18]
\(\int (d+e (F^{c (a+b x)})^n) (f+g x)^3 \, dx\) [19]
\(\int (d+e (F^{c (a+b x)})^n) (f+g x)^2 \, dx\) [20]
\(\int (d+e (F^{c (a+b x)})^n) (f+g x) \, dx\) [21]
\(\int (d+e (F^{c (a+b x)})^n) \, dx\) [22]
\(\int \genfrac {}{}{}{}{d+e (F^{c (a+b x)})^n}{f+g x} \, dx\) [23]
\(\int \genfrac {}{}{}{}{d+e (F^{c (a+b x)})^n}{(f+g x)^2} \, dx\) [24]
\(\int \genfrac {}{}{}{}{d+e (F^{c (a+b x)})^n}{(f+g x)^3} \, dx\) [25]
\(\int (d+e (F^{c (a+b x)})^n)^2 (f+g x)^3 \, dx\) [26]
\(\int (d+e (F^{c (a+b x)})^n)^2 (f+g x)^2 \, dx\) [27]
\(\int (d+e (F^{c (a+b x)})^n)^2 (f+g x) \, dx\) [28]
\(\int (d+e (F^{c (a+b x)})^n)^2 \, dx\) [29]
\(\int \genfrac {}{}{}{}{(d+e (F^{c (a+b x)})^n)^2}{f+g x} \, dx\) [30]
\(\int \genfrac {}{}{}{}{(d+e (F^{c (a+b x)})^n)^2}{(f+g x)^2} \, dx\) [31]
\(\int \genfrac {}{}{}{}{(d+e (F^{c (a+b x)})^n)^2}{(f+g x)^3} \, dx\) [32]
\(\int \genfrac {}{}{}{}{(f+g x)^3}{d+e (F^{c (a+b x)})^n} \, dx\) [33]
\(\int \genfrac {}{}{}{}{(f+g x)^2}{d+e (F^{c (a+b x)})^n} \, dx\) [34]
\(\int \genfrac {}{}{}{}{f+g x}{d+e (F^{c (a+b x)})^n} \, dx\) [35]
\(\int \genfrac {}{}{}{}{1}{d+e (F^{c (a+b x)})^n} \, dx\) [36]
\(\int \genfrac {}{}{}{}{1}{(d+e (F^{c (a+b x)})^n) (f+g x)} \, dx\) [37]
\(\int \genfrac {}{}{}{}{1}{(d+e (F^{c (a+b x)})^n) (f+g x)^2} \, dx\) [38]
\(\int \genfrac {}{}{}{}{(f+g x)^3}{(d+e (F^{c (a+b x)})^n)^2} \, dx\) [39]
\(\int \genfrac {}{}{}{}{(f+g x)^2}{(d+e (F^{c (a+b x)})^n)^2} \, dx\) [40]
\(\int \genfrac {}{}{}{}{f+g x}{(d+e (F^{c (a+b x)})^n)^2} \, dx\) [41]
\(\int \genfrac {}{}{}{}{1}{(d+e (F^{c (a+b x)})^n)^2} \, dx\) [42]
\(\int \genfrac {}{}{}{}{1}{(d+e (F^{c (a+b x)})^n)^2 (f+g x)} \, dx\) [43]
\(\int \genfrac {}{}{}{}{1}{(d+e (F^{c (a+b x)})^n)^2 (f+g x)^2} \, dx\) [44]
\(\int (d+e (F^{c (a+b x)})^n)^{5/2} (f+g x) \, dx\) [45]
\(\int (d+e (F^{c (a+b x)})^n)^{3/2} (f+g x) \, dx\) [46]
\(\int \sqrt {d+e (F^{c (a+b x)})^n} (f+g x) \, dx\) [47]
\(\int \genfrac {}{}{}{}{f+g x}{\sqrt {d+e (F^{c (a+b x)})^n}} \, dx\) [48]
\(\int \genfrac {}{}{}{}{f+g x}{(d+e (F^{c (a+b x)})^n)^{3/2}} \, dx\) [49]
\(\int \genfrac {}{}{}{}{f+g x}{(d+e (F^{c (a+b x)})^n)^{5/2}} \, dx\) [50]
\(\int \genfrac {}{}{}{}{f+g x}{(d+e (F^{c (a+b x)})^n)^{7/2}} \, dx\) [51]
\(\int (d+e (F^{c (a+b x)})^n)^p (f+g x)^m \, dx\) [52]
\(\int (d+e (F^{c (a+b x)})^n)^2 (f+g x)^m \, dx\) [53]
\(\int (d+e (F^{c (a+b x)})^n) (f+g x)^m \, dx\) [54]
\(\int \genfrac {}{}{}{}{(f+g x)^m}{d+e (F^{c (a+b x)})^n} \, dx\) [55]
\(\int \genfrac {}{}{}{}{(f+g x)^m}{(d+e (F^{c (a+b x)})^n)^2} \, dx\) [56]
\(\int \genfrac {}{}{}{}{e^x}{4+6 e^x} \, dx\) [57]
\(\int \genfrac {}{}{}{}{e^x}{a+b e^x} \, dx\) [58]
\(\int \genfrac {}{}{}{}{e^{d x}}{a+b e^{c+d x}} \, dx\) [59]
\(\int \genfrac {}{}{}{}{e^{c+d x}}{a+b e^{c+d x}} \, dx\) [60]
\(\int e^x (a+b e^x)^p \, dx\) [61]
\(\int e^{d x} (a+b e^{c+d x})^p \, dx\) [62]
\(\int e^{c+d x} (a+b e^{c+d x})^p \, dx\) [63]
\(\int \genfrac {}{}{}{}{F^x}{a+b F^x} \, dx\) [64]
\(\int \genfrac {}{}{}{}{F^{d x}}{a+b F^{c+d x}} \, dx\) [65]
\(\int \genfrac {}{}{}{}{F^{c+d x}}{a+b F^{c+d x}} \, dx\) [66]
\(\int F^x (a+b F^x)^p \, dx\) [67]
\(\int F^{d x} (a+b F^{c+d x})^p \, dx\) [68]
\(\int F^{c+d x} (a+b F^{c+d x})^p \, dx\) [69]
\(\int (e^x)^n (a+b (e^x)^n)^p \, dx\) [70]
\(\int e^{n x} (a+b (e^x)^n)^p \, dx\) [71]
\(\int (F^{e (c+d x)})^n (a+b (F^{e (c+d x)})^n)^p \, dx\) [72]
\(\int (a+b (F^{e (c+d x)})^n)^p (G^{h (f+g x)})^{\genfrac {}{}{}{}{d e n \log (F)}{g h \log (G)}} \, dx\) [73]
\(\int \genfrac {}{}{}{}{e^{2 x}}{a+b e^x} \, dx\) [74]
\(\int \genfrac {}{}{}{}{e^{2 x}}{(a+b e^x)^2} \, dx\) [75]
\(\int \genfrac {}{}{}{}{e^{2 x}}{(a+b e^x)^3} \, dx\) [76]
\(\int \genfrac {}{}{}{}{e^{2 x}}{(a+b e^x)^4} \, dx\) [77]
\(\int \genfrac {}{}{}{}{e^{4 x}}{a+b e^{2 x}} \, dx\) [78]
\(\int \genfrac {}{}{}{}{e^{4 x}}{(a+b e^{2 x})^2} \, dx\) [79]
\(\int \genfrac {}{}{}{}{e^{4 x}}{(a+b e^{2 x})^3} \, dx\) [80]
\(\int \genfrac {}{}{}{}{e^{4 x}}{(a+b e^{2 x})^4} \, dx\) [81]
\(\int \genfrac {}{}{}{}{e^{4 x}}{(a+b e^{2 x})^{2/3}} \, dx\) [82]
\(\int e^{-n x} (a+b e^{n x}) \, dx\) [83]
\(\int e^{-n x} (a+b e^{n x})^2 \, dx\) [84]
\(\int e^{-n x} (a+b e^{n x})^3 \, dx\) [85]
\(\int \genfrac {}{}{}{}{e^{-n x}}{a+b e^{n x}} \, dx\) [86]
\(\int \genfrac {}{}{}{}{e^{-n x}}{(a+b e^{n x})^2} \, dx\) [87]
\(\int \genfrac {}{}{}{}{e^{-n x}}{(a+b e^{n x})^3} \, dx\) [88]
\(\int \genfrac {}{}{}{}{f^{a+b x}}{c+d f^{e+2 b x}} \, dx\) [89]
\(\int \genfrac {}{}{}{}{f^{a+2 b x}}{c+d f^{e+2 b x}} \, dx\) [90]
\(\int \genfrac {}{}{}{}{f^{a+3 b x}}{c+d f^{e+2 b x}} \, dx\) [91]
\(\int \genfrac {}{}{}{}{f^{a+4 b x}}{c+d f^{e+2 b x}} \, dx\) [92]
\(\int \genfrac {}{}{}{}{f^{a+5 b x}}{c+d f^{e+2 b x}} \, dx\) [93]
\(\int \genfrac {}{}{}{}{e^x}{1+e^{2 x}} \, dx\) [94]
\(\int \genfrac {}{}{}{}{e^x}{1-e^{2 x}} \, dx\) [95]
\(\int \genfrac {}{}{}{}{e^x x}{1-e^{2 x}} \, dx\) [96]
\(\int \genfrac {}{}{}{}{e^x x^2}{1-e^{2 x}} \, dx\) [97]
\(\int \genfrac {}{}{}{}{e^x x^3}{1-e^{2 x}} \, dx\) [98]
\(\int \genfrac {}{}{}{}{f^x}{a+b f^{2 x}} \, dx\) [99]
\(\int \genfrac {}{}{}{}{f^x x}{a+b f^{2 x}} \, dx\) [100]