In the following exercises, evaluate the triple integrals over the bounded region E=|(x, y, z)| g_1(y) ≤x ≤g_2(y), c ≤y ≤d, u_1(x, y) ≤z ≤u_2(x, y) | ∭_E (x+y) d Vwhere E={(x, y, z) | 0 ≤x ≤√(1-y^2), 0 ≤y ≤1 x, 0 ≤z ≤1-x}
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