Final answer:
The rearranged integral is ∫dx dy dz. The order of integration can be changed, but the limits of integration must be adjusted accordingly.
Step-by-step explanation:
The rearranged integral can be written as ∫dx dy dz.
When rearranging a triple integral, the order of integration can be changed as long as the limits of integration are adjusted accordingly. In this case, the integral is rearranged from ∫dzdydx to ∫dx dy dz.
For example, if the original limits of integration were a to b for x, c to d for y, and e to f for z, then the rearranged integral would have the limits of integration b to a for x, d to c for y, and f to e for z.