Final answer:
The rate of the base of the cylinders is 3:4. The ratio of the volumes is 9:16. The mass of the largest cylinder depends on the density of copper.
Step-by-step explanation:
To find the rate of the base of the cylinders, we can set up a ratio using the formula for the area of a circle, A = πr2. Let's call the base of the smaller cylinder r1 and the base of the larger cylinder r2. So the ratio of their areas is:
(r12) / (r22) = 9:16
To find the rate of the base, we take the square root of both sides:
r1 / r2 = 3/4
So the rate of the base of the cylinders is 3:4.
To find the ratio of the volumes, we use the formula for the volume of a cylinder, V = πr2h. The ratio of the volumes is:
(r12h1) / (r22h2) = 9:16
Finally, if the height of the smaller cylinder is 5 units, we can use the volume ratio equation to find the height of the larger cylinder:
(r12h1) / (r22h2) = 9/16
Substituting the known values, we get:
(r12) / (r22) * (h1 / h2) = 9/16
Plugging in r1 = 3, h1 = 5, and solving for r2 gives:
r2 = 4, h2 = 20
Therefore, the mass of the largest cylinder would depend on the density of copper.