Final answer:
The student is provided with three separate integrals to calculate the volumes of solids based on the region R, each involving different types of cross-sections or rotation about an axis, but the integrals are not evaluated.
Step-by-step explanation:
To answer the student's question involving calculus, we'll consider the region R bounded by the axes and the given functions. We will formulate, but not evaluate, integrals for three different scenarios involving solid volumes.
Volume with Square Cross-Sections
The integral for the volume of the solid whose base is R and whose cross-sections perpendicular to the y-axis are squares is given by:
∫04 (x-3)² × (x-3)² dy
Volume Formed by Rotation Around the X-Axis
The integral for the volume of the solid formed by rotating R around the x-axis using the disk method is:
π ∫016 (4 - y)² dy
Volume Formed by Rotation Around the Y-Axis
The integral for the volume formed by rotating R around the y-axis using the shell method is:
2π ∫34 x(√ y) dx