- $A = \int_{-1}^3 |3x^2 - 6x| \,dx$ ; $B = \int_2^5 |x^2 - 7x + 12| \,dx$
- $I = \int_{1/e}^e |\ln x| \,dx$ ; $J = \int_0^{2\pi} (|\sin x| + |\cos x|) \,dx$
- $K = \int_{-1}^1 |e^x - 1| \,dx$ ; $L = \int_0^{\pi} \sin x |\cos x| \,dx$
- $M = \int_{-1}^4 \frac{|x-1| + |x-2|}{|x^2-9| + x^2 + 16} \,dx$ ; $\int_{-1}^2 (|x| + |x^2-1|) \,dx$
Calculer les intégrales suivantes :
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