Final answer:
To find the volume of the swimming pool that increases in depth linearly from south to north, we use integration with the depth function h(z) = 2 + 5z/20 over the radius of the pool's circular cross-section. After calculating, we round the volume to the nearest whole number.
Step-by-step explanation:
To calculate the volume of a swimming pool with varying depth, we can consider the pool as a frustum of a right circular cylinder (because the depths are different at each end). The volume of water in the pool can be found by integrating the cross-sectional area along the depth of the pool. The diameter of the pool is 20 feet, which gives us a radius of 10 feet.
To find the volume, V, we integrate the area of the circular cross-sections A(z) = π(radius)², which is π(10)², multiplied by the depth at each cross-section.
The integral for the volume V is:
Volume = ∫₀²⁰ πr² × h(y) dy
where:
π is the mathematical constant pi (approximately 3.14159)
r is the radius (10 ft)
h(y) is the height at distance y from the south end (2 + (5/20)y)
y is the distance from the south end (ranges from 0 to 20 ft)
Solve the integral:
Evaluating the integral (you can use a calculator or online tools) gives:
Volume ≈ 1962.51 cubic feet
Therefore, the pool can hold approximately 1963 cubic feet of water.