Question: 1. Consider the integral volume bounded by the following cylindrical coordinates: bounded below by z = 0, bounded counter-clockwise by 6' = 1r / 2,

1. Consider the integral volume bounded by the following cylindrical coordinates: bounded below by z = 0, bounded counter-clockwise by 6' = 1r / 2, contained outside the cylinder r = %, and bounded above by the surface 26' z=1. it? Write (but do not solve) an iterated triple integral that represents the volume of the given region in Cylindrical coordinates in all 6 orders. (dzdrd', ddzdr, etc.) [Note Each possible order will only require one integral]

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