Evaluate the indefinite integral: ∫(7θ6−2θ)dθ\int (7\theta^6 - 2\theta) d\theta∫(7θ6−2θ)dθ.
θ7−θ2+C\theta^7 - \theta^2 + Cθ7−θ2+C
76θ7−θ2+C\frac{7}{6}\theta^7 - \theta^2 + C67θ7−θ2+C
42θ5−2+C42\theta^5 - 2 + C42θ5−2+C
6θ7−θ2+C6\theta^7 - \theta^2 + C6θ7−θ2+C