Find ∫x3ln(x2)dx\int x^3 \ln(x^2) dx∫x3ln(x2)dx.
x42ln(x)−x48+C\frac{x^4}{2} \ln(x) - \frac{x^4}{8} + C2x4ln(x)−8x4+C
x44ln(x2)−x48+C\frac{x^4}{4} \ln(x^2) - \frac{x^4}{8} + C4x4ln(x2)−8x4+C
x42ln(x2)−x44+C\frac{x^4}{2} \ln(x^2) - \frac{x^4}{4} + C2x4ln(x2)−4x4+C
x4ln(x)−x4+Cx^4 \ln(x) - x^4 + Cx4ln(x)−x4+C