3.8.0 ∫ 30x+e−6+2ex (2−64exx)−64 log(x)+2 log2(x)+e−3+ex (−64+(4−64exx) log(x)) 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e−102+34ex−x17+34e−99+33ex log(x)+17x16 log2(x)−136x15 log4(x)+680x14 log6(x)−2380x13 log8(x)+6188x12 log10(x)−12376x11 log12(x)+19448x10 log14(x)−24310x9 log16(x)+24310x8 log18(x)−19448x7 log20(x)+12376x6 log22(x)−6188x5 log24(x)+2380x4 log26(x)−680x3 log28(x)+136x2 log30(x)−17x log32(x)+log34(x)+e−96+32ex(−17x+561 log2(x))+e−93+31ex(−544x log(x)+5984 log3(x))+e−90+30ex(136x2−8432x log2(x)+46376 log4(x))+e−87+29ex(4080x2 log(x)−84320x log3(x)+278256 log5(x))+e−84+28ex(−680x3+59160x2 log2(x)−611320x log4(x)+1344904 log6(x))+e−81+27ex(−19040x3 log(x)+552160x2 log3(x)−3423392x log5(x)+5379616 log7(x))+e−78+26ex(2380x4−257040x3 log2(x)+3727080x2 log4(x)−15405264x log6(x)+18156204 log8(x))+e−75+25ex(61880x4 log(x)−2227680x3 log3(x)+19380816x2 log5(x)−57219552x log7(x)+52451256 log9(x))+e−72+24ex(−6188x5+773500x4 log2(x)−13923000x3 log4(x)+80753400x2 log6(x)−178811100x log8(x)+131128140 log10(x))+e−69+23ex(−148512x5 log(x)+6188000x4 log3(x)−66830400x3 log5(x)+276868800x2 log7(x)−476829600x log9(x)+286097760 log11(x))+e−66+22ex(12376x6−1707888x5 log2(x)+35581000x4 log4(x)−256183200x3 log6(x)+795997800x2 log8(x)−1096708080x log10(x)+548354040 log12(x))+e−63+21ex(272272x6 log(x)−12524512x5 log3(x)+156556400x4 log5(x)−805147200x3 log7(x)+1945772400x2 log9(x)−2193416160x log11(x)+927983760 log13(x))+e−60+20ex(−19448x7+2858856x6 log2(x)−65753688x5 log4(x)+547947400x4 log6(x)−2113511400x3 log8(x)+4086122040x2 log10(x)−3838478280x log12(x)+1391975640 log14(x))+e−57+19ex(−388960x7 log(x)+19059040x6 log3(x)−263014752x5 log5(x)+1565564000x4 log7(x)−4696692000x3 log9(x)+7429312800x2 log11(x)−5905351200x log13(x)+1855967520 log15(x))+e−54+18ex(24310x8−3695120x7 log2(x)+90530440x6 log4(x)−832880048x5 log6(x)+3718214500x4 log8(x)−8923714800x3 log10(x)+11763078600x2 log12(x)−8014405200x log14(x)+2203961430 log16(x))+e−51+17ex(437580x8 log(x)−22170720x7 log3(x)+325909584x6 log5(x)−2141691552x5 log7(x)+7436429000x4 log9(x)−14602442400x3 log11(x)+16287339600x2 log13(x)−9617286240x log15(x)+2333606220 log17(x))+e−48+16ex(−24310x9+3719430x8 log2(x)−94225560x7 log4(x)+923410488x6 log6(x)−4551094548x5 log8(x)+12641929300x4 log10(x)−20686793400x3 log12(x)+19777483800x2 log14(x)−10218366630x log16(x)+2203961430 log18(x))+e−45+15ex(−388960x9 log(x)+19836960x8 log3(x)−301521792x7 log5(x)+2110652544x6 log7(x)−8090834752x5 log9(x)+18388260800x4 log11(x)−25460668800x3 log13(x)+21095982720x2 log15(x)−9617286240x log17(x)+1855967520 log19(x))+e−42+14ex(19448x10−2917200x9 log2(x)+74388600x8 log4(x)−753804480x7 log6(x)+3957473520x6 log8(x)−12136252128x5 log10(x)+22985326000x4 log12(x)−27279288000x3 log14(x)+19777483800x2 log16(x)−8014405200x log18(x)+1391975640 log20(x))+e−39+13ex(272272x10 log(x)−13613600x9 log3(x)+208288080x8 log5(x)−1507608960x7 log7(x)+6156069920x6 log9(x)−15446139072x5 log11(x)+24753428000x4 log13(x)−25460668800x3 log15(x)+16287339600x2 log17(x)−5905351200x log19(x)+927983760 log21(x))+e−36+12ex(−12376x11+1769768x10 log2(x)−44244200x9 log4(x)+451290840x8 log6(x)−2449864560x7 log8(x)+8002890896x6 log10(x)−16733317328x5 log12(x)+22985326000x4 log14(x)−20686793400x3 log16(x)+11763078600x2 log18(x)−3838478280x log20(x)+548354040 log22(x))+e−33+11ex(−148512x11 log(x)+7079072x10 log3(x)−106186080x9 log5(x)+773641440x8 log7(x)−3266486080x7 log9(x)+8730426432x6 log11(x)−15446139072x5 log13(x)+18388260800x4 log15(x)−14602442400x3 log17(x)+7429312800x2 log19(x)−2193416160x log21(x)+286097760 log23(x))+e−30+10ex(6188x12−816816x11 log2(x)+19467448x10 log4(x)−194674480x9 log6(x)+1063756980x8 log8(x)−3593134688x7 log10(x)+8002890896x6 log12(x)−12136252128x5 log14(x)+12641929300x4 log16(x)−8923714800x3 log18(x)+4086122040x2 log20(x)−1096708080x log22(x)+131128140 log24(x))+e−27+9ex(61880x12 log(x)−2722720x11 log3(x)+38934896x10 log5(x)−278106400x9 log7(x)+1181952200x8 log9(x)−3266486080x7 log11(x)+6156069920x6 log13(x)−8090834752x5 log15(x)+7436429000x4 log17(x)−4696692000x3 log19(x)+1945772400x2 log21(x)−476829600x log23(x)+52451256 log25(x))+e−24+8ex(−2380x13+278460x12 log2(x)−6126120x11 log4(x)+58402344x10 log6(x)−312869700x9 log8(x)+1063756980x8 log10(x)−2449864560x7 log12(x)+3957473520x6 log14(x)−4551094548x5 log16(x)+3718214500x4 log18(x)−2113511400x3 log20(x)+795997800x2 log22(x)−178811100x log24(x)+18156204 log26(x))+e−21+7ex(−19040x13 log(x)+742560x12 log3(x)−9801792x11 log5(x)+66745536x10 log7(x)−278106400x9 log9(x)+773641440x8 log11(x)−1507608960x7 log13(x)+2110652544x6 log15(x)−2141691552x5 log17(x)+1565564000x4 log19(x)−805147200x3 log21(x)+276868800x2 log23(x)−57219552x log25(x)+5379616 log27(x))+e−18+6ex(680x14−66640x13 log2(x)+1299480x12 log4(x)−11435424x11 log6(x)+58402344x10 log8(x)−194674480x9 log10(x)+451290840x8 log12(x)−753804480x7 log14(x)+923410488x6 log16(x)−832880048x5 log18(x)+547947400x4 log20(x)−256183200x3 log22(x)+80753400x2 log24(x)−15405264x log26(x)+1344904 log28(x))+e−15+5ex(4080x14 log(x)−133280x13 log3(x)+1559376x12 log5(x)−9801792x11 log7(x)+38934896x10 log9(x)−106186080x9 log11(x)+208288080x8 log13(x)−301521792x7 log15(x)+325909584x6 log17(x)−263014752x5 log19(x)+156556400x4 log21(x)−66830400x3 log23(x)+19380816x2 log25(x)−3423392x log27(x)+278256 log29(x))+e−12+4ex(−136x15+10200x14 log2(x)−166600x13 log4(x)+1299480x12 log6(x)−6126120x11 log8(x)+19467448x10 log10(x)−44244200x9 log12(x)+74388600x8 log14(x)−94225560x7 log16(x)+90530440x6 log18(x)−65753688x5 log20(x)+35581000x4 log22(x)−13923000x3 log24(x)+3727080x2 log26(x)−611320x log28(x)+46376 log30(x))+e−9+3ex(−544x15 log(x)+13600x14 log3(x)−133280x13 log5(x)+742560x12 log7(x)−2722720x11 log9(x)+7079072x10 log11(x)−13613600x9 log13(x)+19836960x8 log15(x)−22170720x7 log17(x)+19059040x6 log19(x)−12524512x5 log21(x)+6188000x4 log23(x)−2227680x3 log25(x)+552160x2 log27(x)−84320x log29(x)+5984 log31(x))+e−6+2ex(17x16−816x15 log2(x)+10200x14 log4(x)−66640x13 log6(x)+278460x12 log8(x)−816816x11 log10(x)+1769768x10 log12(x)−2917200x9 log14(x)+3719430x8 log16(x)−3695120x7 log18(x)+2858856x6 log20(x)−1707888x5 log22(x)+773500x4 log24(x)−257040x3 log26(x)+59160x2 log28(x)−8432x log30(x)+561 log32(x))+e−3+ex(34x16 log(x)−544x15 log3(x)+4080x14 log5(x)−19040x13 log7(x)+61880x12 log9(x)−148512x11 log11(x)+272272x10 log13(x)−388960x9 log15(x)+437580x8 log17(x)−388960x7 log19(x)+272272x6 log21(x)−148512x5 log23(x)+61880x4 log25(x)−19040x3 log27(x)+4080x2 log29(x)−544x log31(x)+34 log33(x)) dx [731]

Integrand size = 3060, antiderivative size = 21 \[ \text {the integral} =\frac {2 x}{\left (-x+\left (e^{-3+e^x}+\log (x)\right )^2\right )^{16}} \] Output:

Mathematica [A] (veriﬁed)

Time = 0.25 (sec) , antiderivative size = 41, normalized size of antiderivative = 1.95 \[ \text {the integral} =\frac {2 e^{96} x}{\left (e^{2 e^x}-e^6 x+2 e^{3+e^x} \log (x)+e^6 \log ^2(x)\right )^{16}} \] Input:

Rubi [F]

Below are the steps used by Rubi to obtain the solution. The rule number used for the transformation is given above next to the arrow. The rules deﬁnitions used are listed below.

\(\displaystyle \int \frac {2 \log ^2(x)-64 \log (x)+30 x+e^{-6+2 e^x} \left (2-64 e^x x\right )+e^{-3+e^x} \left (\left (4-64 e^x x\right ) \log (x)-64\right )}{\log ^{34}(x)-17 x \log ^{32}(x)+136 x^2 \log ^{30}(x)-680 x^3 \log ^{28}(x)+2380 x^4 \log ^{26}(x)-6188 x^5 \log ^{24}(x)+12376 x^6 \log ^{22}(x)-19448 x^7 \log ^{20}(x)+24310 x^8 \log ^{18}(x)-24310 x^9 \log ^{16}(x)+19448 x^{10} \log ^{14}(x)-12376 x^{11} \log ^{12}(x)+6188 x^{12} \log ^{10}(x)-2380 x^{13} \log ^8(x)+680 x^{14} \log ^6(x)-136 x^{15} \log ^4(x)+17 x^{16} \log ^2(x)+34 e^{-99+33 e^x} \log (x)+e^{-102+34 e^x}-x^{17}+e^{-96+32 e^x} \left (561 \log ^2(x)-17 x\right )+e^{-93+31 e^x} \left (5984 \log ^3(x)-544 x \log (x)\right )+e^{-90+30 e^x} \left (46376 \log ^4(x)-8432 x \log ^2(x)+136 x^2\right )+e^{-87+29 e^x} \left (278256 \log ^5(x)-84320 x \log ^3(x)+4080 x^2 \log (x)\right )+e^{-84+28 e^x} \left (1344904 \log ^6(x)-611320 x \log ^4(x)+59160 x^2 \log ^2(x)-680 x^3\right )+e^{-81+27 e^x} \left (5379616 \log ^7(x)-3423392 x \log ^5(x)+552160 x^2 \log ^3(x)-19040 x^3 \log (x)\right )+e^{-78+26 e^x} \left (18156204 \log ^8(x)-15405264 x \log ^6(x)+3727080 x^2 \log ^4(x)-257040 x^3 \log ^2(x)+2380 x^4\right )+e^{-75+25 e^x} \left (52451256 \log ^9(x)-57219552 x \log ^7(x)+19380816 x^2 \log ^5(x)-2227680 x^3 \log ^3(x)+61880 x^4 \log (x)\right )+e^{-72+24 e^x} \left (131128140 \log ^{10}(x)-178811100 x \log ^8(x)+80753400 x^2 \log ^6(x)-13923000 x^3 \log ^4(x)+773500 x^4 \log ^2(x)-6188 x^5\right )+e^{-69+23 e^x} \left (286097760 \log ^{11}(x)-476829600 x \log ^9(x)+276868800 x^2 \log ^7(x)-66830400 x^3 \log ^5(x)+6188000 x^4 \log ^3(x)-148512 x^5 \log (x)\right )+e^{-66+22 e^x} \left (548354040 \log ^{12}(x)-1096708080 x \log ^{10}(x)+795997800 x^2 \log ^8(x)-256183200 x^3 \log ^6(x)+35581000 x^4 \log ^4(x)-1707888 x^5 \log ^2(x)+12376 x^6\right )+e^{-63+21 e^x} \left (927983760 \log ^{13}(x)-2193416160 x \log ^{11}(x)+1945772400 x^2 \log ^9(x)-805147200 x^3 \log ^7(x)+156556400 x^4 \log ^5(x)-12524512 x^5 \log ^3(x)+272272 x^6 \log (x)\right )+e^{-60+20 e^x} \left (1391975640 \log ^{14}(x)-3838478280 x \log ^{12}(x)+4086122040 x^2 \log ^{10}(x)-2113511400 x^3 \log ^8(x)+547947400 x^4 \log ^6(x)-65753688 x^5 \log ^4(x)+2858856 x^6 \log ^2(x)-19448 x^7\right )+e^{-57+19 e^x} \left (1855967520 \log ^{15}(x)-5905351200 x \log ^{13}(x)+7429312800 x^2 \log ^{11}(x)-4696692000 x^3 \log ^9(x)+1565564000 x^4 \log ^7(x)-263014752 x^5 \log ^5(x)+19059040 x^6 \log ^3(x)-388960 x^7 \log (x)\right )+e^{-54+18 e^x} \left (2203961430 \log ^{16}(x)-8014405200 x \log ^{14}(x)+11763078600 x^2 \log ^{12}(x)-8923714800 x^3 \log ^{10}(x)+3718214500 x^4 \log ^8(x)-832880048 x^5 \log ^6(x)+90530440 x^6 \log ^4(x)-3695120 x^7 \log ^2(x)+24310 x^8\right )+e^{-51+17 e^x} \left (2333606220 \log ^{17}(x)-9617286240 x \log ^{15}(x)+16287339600 x^2 \log ^{13}(x)-14602442400 x^3 \log ^{11}(x)+7436429000 x^4 \log ^9(x)-2141691552 x^5 \log ^7(x)+325909584 x^6 \log ^5(x)-22170720 x^7 \log ^3(x)+437580 x^8 \log (x)\right )+e^{-48+16 e^x} \left (2203961430 \log ^{18}(x)-10218366630 x \log ^{16}(x)+19777483800 x^2 \log ^{14}(x)-20686793400 x^3 \log ^{12}(x)+12641929300 x^4 \log ^{10}(x)-4551094548 x^5 \log ^8(x)+923410488 x^6 \log ^6(x)-94225560 x^7 \log ^4(x)+3719430 x^8 \log ^2(x)-24310 x^9\right )+e^{-45+15 e^x} \left (1855967520 \log ^{19}(x)-9617286240 x \log ^{17}(x)+21095982720 x^2 \log ^{15}(x)-25460668800 x^3 \log ^{13}(x)+18388260800 x^4 \log ^{11}(x)-8090834752 x^5 \log ^9(x)+2110652544 x^6 \log ^7(x)-301521792 x^7 \log ^5(x)+19836960 x^8 \log ^3(x)-388960 x^9 \log (x)\right )+e^{-42+14 e^x} \left (1391975640 \log ^{20}(x)-8014405200 x \log ^{18}(x)+19777483800 x^2 \log ^{16}(x)-27279288000 x^3 \log ^{14}(x)+22985326000 x^4 \log ^{12}(x)-12136252128 x^5 \log ^{10}(x)+3957473520 x^6 \log ^8(x)-753804480 x^7 \log ^6(x)+74388600 x^8 \log ^4(x)-2917200 x^9 \log ^2(x)+19448 x^{10}\right )+e^{-39+13 e^x} \left (927983760 \log ^{21}(x)-5905351200 x \log ^{19}(x)+16287339600 x^2 \log ^{17}(x)-25460668800 x^3 \log ^{15}(x)+24753428000 x^4 \log ^{13}(x)-15446139072 x^5 \log ^{11}(x)+6156069920 x^6 \log ^9(x)-1507608960 x^7 \log ^7(x)+208288080 x^8 \log ^5(x)-13613600 x^9 \log ^3(x)+272272 x^{10} \log (x)\right )+e^{-36+12 e^x} \left (548354040 \log ^{22}(x)-3838478280 x \log ^{20}(x)+11763078600 x^2 \log ^{18}(x)-20686793400 x^3 \log ^{16}(x)+22985326000 x^4 \log ^{14}(x)-16733317328 x^5 \log ^{12}(x)+8002890896 x^6 \log ^{10}(x)-2449864560 x^7 \log ^8(x)+451290840 x^8 \log ^6(x)-44244200 x^9 \log ^4(x)+1769768 x^{10} \log ^2(x)-12376 x^{11}\right )+e^{-33+11 e^x} \left (286097760 \log ^{23}(x)-2193416160 x \log ^{21}(x)+7429312800 x^2 \log ^{19}(x)-14602442400 x^3 \log ^{17}(x)+18388260800 x^4 \log ^{15}(x)-15446139072 x^5 \log ^{13}(x)+8730426432 x^6 \log ^{11}(x)-3266486080 x^7 \log ^9(x)+773641440 x^8 \log ^7(x)-106186080 x^9 \log ^5(x)+7079072 x^{10} \log ^3(x)-148512 x^{11} \log (x)\right )+e^{-30+10 e^x} \left (131128140 \log ^{24}(x)-1096708080 x \log ^{22}(x)+4086122040 x^2 \log ^{20}(x)-8923714800 x^3 \log ^{18}(x)+12641929300 x^4 \log ^{16}(x)-12136252128 x^5 \log ^{14}(x)+8002890896 x^6 \log ^{12}(x)-3593134688 x^7 \log ^{10}(x)+1063756980 x^8 \log ^8(x)-194674480 x^9 \log ^6(x)+19467448 x^{10} \log ^4(x)-816816 x^{11} \log ^2(x)+6188 x^{12}\right )+e^{-27+9 e^x} \left (52451256 \log ^{25}(x)-476829600 x \log ^{23}(x)+1945772400 x^2 \log ^{21}(x)-4696692000 x^3 \log ^{19}(x)+7436429000 x^4 \log ^{17}(x)-8090834752 x^5 \log ^{15}(x)+6156069920 x^6 \log ^{13}(x)-3266486080 x^7 \log ^{11}(x)+1181952200 x^8 \log ^9(x)-278106400 x^9 \log ^7(x)+38934896 x^{10} \log ^5(x)-2722720 x^{11} \log ^3(x)+61880 x^{12} \log (x)\right )+e^{-24+8 e^x} \left (18156204 \log ^{26}(x)-178811100 x \log ^{24}(x)+795997800 x^2 \log ^{22}(x)-2113511400 x^3 \log ^{20}(x)+3718214500 x^4 \log ^{18}(x)-4551094548 x^5 \log ^{16}(x)+3957473520 x^6 \log ^{14}(x)-2449864560 x^7 \log ^{12}(x)+1063756980 x^8 \log ^{10}(x)-312869700 x^9 \log ^8(x)+58402344 x^{10} \log ^6(x)-6126120 x^{11} \log ^4(x)+278460 x^{12} \log ^2(x)-2380 x^{13}\right )+e^{-21+7 e^x} \left (5379616 \log ^{27}(x)-57219552 x \log ^{25}(x)+276868800 x^2 \log ^{23}(x)-805147200 x^3 \log ^{21}(x)+1565564000 x^4 \log ^{19}(x)-2141691552 x^5 \log ^{17}(x)+2110652544 x^6 \log ^{15}(x)-1507608960 x^7 \log ^{13}(x)+773641440 x^8 \log ^{11}(x)-278106400 x^9 \log ^9(x)+66745536 x^{10} \log ^7(x)-9801792 x^{11} \log ^5(x)+742560 x^{12} \log ^3(x)-19040 x^{13} \log (x)\right )+e^{-18+6 e^x} \left (1344904 \log ^{28}(x)-15405264 x \log ^{26}(x)+80753400 x^2 \log ^{24}(x)-256183200 x^3 \log ^{22}(x)+547947400 x^4 \log ^{20}(x)-832880048 x^5 \log ^{18}(x)+923410488 x^6 \log ^{16}(x)-753804480 x^7 \log ^{14}(x)+451290840 x^8 \log ^{12}(x)-194674480 x^9 \log ^{10}(x)+58402344 x^{10} \log ^8(x)-11435424 x^{11} \log ^6(x)+1299480 x^{12} \log ^4(x)-66640 x^{13} \log ^2(x)+680 x^{14}\right )+e^{-15+5 e^x} \left (278256 \log ^{29}(x)-3423392 x \log ^{27}(x)+19380816 x^2 \log ^{25}(x)-66830400 x^3 \log ^{23}(x)+156556400 x^4 \log ^{21}(x)-263014752 x^5 \log ^{19}(x)+325909584 x^6 \log ^{17}(x)-301521792 x^7 \log ^{15}(x)+208288080 x^8 \log ^{13}(x)-106186080 x^9 \log ^{11}(x)+38934896 x^{10} \log ^9(x)-9801792 x^{11} \log ^7(x)+1559376 x^{12} \log ^5(x)-133280 x^{13} \log ^3(x)+4080 x^{14} \log (x)\right )+e^{-12+4 e^x} \left (46376 \log ^{30}(x)-611320 x \log ^{28}(x)+3727080 x^2 \log ^{26}(x)-13923000 x^3 \log ^{24}(x)+35581000 x^4 \log ^{22}(x)-65753688 x^5 \log ^{20}(x)+90530440 x^6 \log ^{18}(x)-94225560 x^7 \log ^{16}(x)+74388600 x^8 \log ^{14}(x)-44244200 x^9 \log ^{12}(x)+19467448 x^{10} \log ^{10}(x)-6126120 x^{11} \log ^8(x)+1299480 x^{12} \log ^6(x)-166600 x^{13} \log ^4(x)+10200 x^{14} \log ^2(x)-136 x^{15}\right )+e^{-9+3 e^x} \left (5984 \log ^{31}(x)-84320 x \log ^{29}(x)+552160 x^2 \log ^{27}(x)-2227680 x^3 \log ^{25}(x)+6188000 x^4 \log ^{23}(x)-12524512 x^5 \log ^{21}(x)+19059040 x^6 \log ^{19}(x)-22170720 x^7 \log ^{17}(x)+19836960 x^8 \log ^{15}(x)-13613600 x^9 \log ^{13}(x)+7079072 x^{10} \log ^{11}(x)-2722720 x^{11} \log ^9(x)+742560 x^{12} \log ^7(x)-133280 x^{13} \log ^5(x)+13600 x^{14} \log ^3(x)-544 x^{15} \log (x)\right )+e^{-6+2 e^x} \left (561 \log ^{32}(x)-8432 x \log ^{30}(x)+59160 x^2 \log ^{28}(x)-257040 x^3 \log ^{26}(x)+773500 x^4 \log ^{24}(x)-1707888 x^5 \log ^{22}(x)+2858856 x^6 \log ^{20}(x)-3695120 x^7 \log ^{18}(x)+3719430 x^8 \log ^{16}(x)-2917200 x^9 \log ^{14}(x)+1769768 x^{10} \log ^{12}(x)-816816 x^{11} \log ^{10}(x)+278460 x^{12} \log ^8(x)-66640 x^{13} \log ^6(x)+10200 x^{14} \log ^4(x)-816 x^{15} \log ^2(x)+17 x^{16}\right )+e^{-3+e^x} \left (34 \log ^{33}(x)-544 x \log ^{31}(x)+4080 x^2 \log ^{29}(x)-19040 x^3 \log ^{27}(x)+61880 x^4 \log ^{25}(x)-148512 x^5 \log ^{23}(x)+272272 x^6 \log ^{21}(x)-388960 x^7 \log ^{19}(x)+437580 x^8 \log ^{17}(x)-388960 x^9 \log ^{15}(x)+272272 x^{10} \log ^{13}(x)-148512 x^{11} \log ^{11}(x)+61880 x^{12} \log ^9(x)-19040 x^{13} \log ^7(x)+4080 x^{14} \log ^5(x)-544 x^{15} \log ^3(x)+34 x^{16} \log (x)\right )} \, dx\)

\(\Big \downarrow \) 7239

\(\displaystyle \int \frac {2 e^{96} \left (e^{2 e^x}-32 e^{e^x+3}-32 e^{x+2 e^x} x+15 e^6 x+e^6 \log ^2(x)+\left (-32 e^{x+e^x+3} x+2 e^{e^x+3}-32 e^6\right ) \log (x)\right )}{\left (e^{2 e^x}-e^6 x+e^6 \log ^2(x)+2 e^{e^x+3} \log (x)\right )^{17}}dx\)

\(\Big \downarrow \) 27

\(\displaystyle 2 e^{96} \int \frac {e^6 \log ^2(x)-2 \left (16 e^{x+e^x+3} x-e^{3+e^x}+16 e^6\right ) \log (x)+e^{2 e^x}-32 e^{3+e^x}-32 e^{x+2 e^x} x+15 e^6 x}{\left (e^6 \log ^2(x)+2 e^{3+e^x} \log (x)+e^{2 e^x}-e^6 x\right )^{17}}dx\)

\(\Big \downarrow \) 7293

\(\displaystyle 2 e^{96} \int \left (\frac {e^6 \log ^2(x)}{\left (e^6 \log ^2(x)+2 e^{3+e^x} \log (x)+e^{2 e^x}-e^6 x\right )^{17}}+\frac {2 e^{3+e^x} \log (x)}{\left (e^6 \log ^2(x)+2 e^{3+e^x} \log (x)+e^{2 e^x}-e^6 x\right )^{17}}-\frac {32 e^6 \log (x)}{\left (e^6 \log ^2(x)+2 e^{3+e^x} \log (x)+e^{2 e^x}-e^6 x\right )^{17}}-\frac {15 e^6 x}{\left (-e^6 \log ^2(x)-2 e^{3+e^x} \log (x)-e^{2 e^x}+e^6 x\right )^{17}}+\frac {e^{2 e^x}}{\left (e^6 \log ^2(x)+2 e^{3+e^x} \log (x)+e^{2 e^x}-e^6 x\right )^{17}}-\frac {32 e^{3+e^x}}{\left (e^6 \log ^2(x)+2 e^{3+e^x} \log (x)+e^{2 e^x}-e^6 x\right )^{17}}-\frac {32 e^{x+e^x} x \left (e^3 \log (x)+e^{e^x}\right )}{\left (e^6 \log ^2(x)+2 e^{3+e^x} \log (x)+e^{2 e^x}-e^6 x\right )^{17}}\right )dx\)

\(\Big \downarrow \) 2009

\(\displaystyle 2 e^{96} \left (-15 e^6 \int \frac {x}{\left (-e^6 \log ^2(x)-2 e^{3+e^x} \log (x)-e^{2 e^x}+e^6 x\right )^{17}}dx+32 \int \frac {e^{x+e^x+3} x \log (x)}{\left (-e^6 \log ^2(x)-2 e^{3+e^x} \log (x)-e^{2 e^x}+e^6 x\right )^{17}}dx+\int \frac {e^{2 e^x}}{\left (e^6 \log ^2(x)+2 e^{3+e^x} \log (x)+e^{2 e^x}-e^6 x\right )^{17}}dx-32 \int \frac {e^{3+e^x}}{\left (e^6 \log ^2(x)+2 e^{3+e^x} \log (x)+e^{2 e^x}-e^6 x\right )^{17}}dx-32 \int \frac {e^{x+2 e^x} x}{\left (e^6 \log ^2(x)+2 e^{3+e^x} \log (x)+e^{2 e^x}-e^6 x\right )^{17}}dx-32 e^6 \int \frac {\log (x)}{\left (e^6 \log ^2(x)+2 e^{3+e^x} \log (x)+e^{2 e^x}-e^6 x\right )^{17}}dx+2 \int \frac {e^{3+e^x} \log (x)}{\left (e^6 \log ^2(x)+2 e^{3+e^x} \log (x)+e^{2 e^x}-e^6 x\right )^{17}}dx+e^6 \int \frac {\log ^2(x)}{\left (e^6 \log ^2(x)+2 e^{3+e^x} \log (x)+e^{2 e^x}-e^6 x\right )^{17}}dx\right )\)

Maple [A] (veriﬁed)

Time = 1.64 (sec) , antiderivative size = 32, normalized size of antiderivative = 1.52

Fricas [B] (veriﬁcation not implemented)

Leaf count of result is larger than twice the leaf count of optimal. 2650 vs. \(2 (19) = 38\).

Time = 0.67 (sec) , antiderivative size = 2650, normalized size of antiderivative = 126.19 \[ \text {the integral} =\text {Too large to display} \] Input:

Sympy [F(-1)]

Maxima [F(-1)]

Giac [F(-1)]

Mupad [F(-1)]

Reduce [B] (veriﬁcation not implemented)

Time = 39.14 (sec) , antiderivative size = 5081, normalized size of antiderivative = 241.95 \[ \text {the integral} =\text {Too large to display} \] Input:

Optimal result