Final answer:
The surface area of the larger sphere is calculated to be 32pi cm^2, using the given volumes of two spheres and the surface area of the smaller sphere along with the sphere volume and surface area formulas.
Step-by-step explanation:
To find the surface area of the larger sphere using the given volumes of two spheres and the surface area of the smaller sphere, we use the formulas for the volume V = 4/3 (pi) (r)^3 and surface area SA = 4 (pi) (r)^2.
Firstly, we calculate the radius of the smaller sphere whose volume is 8pi cm^3:
- V_small_sphere = 4/3 (pi) (r_small)^3
- 8pi = 4/3 pi (r_small)^3
- 2 = (r_small)^3
- r_small = cuberoot(2)
Given that the surface area of the smaller sphere is 16pi cm^2, we can find its exact radius:
- SA_small_sphere = 4 pi (r_small)^2
- 16pi = 4pi (r_small)^2
- 4 = (r_small)^2
- r_small = 2
Now, we calculate the larger sphere’s radius using its volume of 64pi cm^3:
- V_large_sphere = 4/3 pi (r_large)^3
- 64pi = 4/3 pi (r_large)^3
- 48/3 = (r_large)^3
- r_large = cuberoot(16)
- r_large = 2*cuberoot(2)
Finally, we can use the radius to calculate the surface area of the larger sphere:
- SA_large_sphere = 4 pi (r_large)^2
- SA_large_sphere = 4 pi (2*cuberoot(2))^2
- SA_large_sphere = 4 pi (4 * 2)
- SA_large_sphere = 32pi cm^2
Hence, the surface area of the larger sphere is 32pi cm^2.