Integral of 12sinxcos(x^3) dx
The solution
The answer (Indefinite)
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| 12*sin(x)*cos\x / dx = C + 12* | cos\x /*sin(x) dx
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∫12sin(x)cos(x3)dx=C+12∫sin(x)cos(x3)dx
1
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12* | cos\x /*sin(x) dx
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0
120∫1sin(x)cos(x3)dx
=
1
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12* | cos\x /*sin(x) dx
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0
120∫1sin(x)cos(x3)dx
12*Integral(cos(x^3)*sin(x), (x, 0, 1))
Use the examples entering the upper and lower limits of integration.