The volume of the inscribed cube of a sphere with a surface area of 16 π is
64√3/9
RELATED INFORMATIONS
- 1. The volume of the inscribed cube of a sphere with a surface area of 12 μ is
- 2. The volume of the inscribed cube of a sphere with a surface area of 16 π is
- 3. If the surface areas of a cube and a sphere are equal, then their volume ratio?
- 4. Cuboid, cube, cylinder, cone and sphere are divided into two types Why? Please specify. If the exam? What should I do?
- 5. Write a program to calculate the surface area and volume of cylinder, sphere, cube and cuboid
- 6. The volume of cube, cuboid and cylinder can be calculated by multiplying s by H, right?
- 7. There are several kinds of cube, cuboid, cylinder, cone and sphere
- 8. How to find a cube, a cuboid, a cylinder, a cone, tell the volume, how much the surface area increases with a knife? Or cut a knife, what is his surface area and volume? Hurry! Please tell me the calculation formula and method! 30 minutes can solve, I give 150 wealth value!
- 9. Volume formula of cuboid, cube, cylinder, cone and sphere
- 10. A cuboid is made up of 12 cuboids whose edges are 1 cm long. What is the maximum surface area and the minimum surface area of the cuboid
- 11. If the volume of the cube is 8 cubic meters, the surface area of the inscribed sphere is?
- 12. If the volume of the inscribed cube is 64, then the surface area of the sphere is 64______ .
- 13. (x^3) ------------ dx (x^2+1)^1/3
- 14. Kneel down to seek the calculus of (e ^ - xcosx) DX It's a process
- 15. Solving indefinite integral [(LNX) 179] / X & # 178;] DX by integral method
- 16. If y = e is given to the power of 3x, find D & # 178; Y / DX & # 178;
- 17. ∫ upper 2 lower 1 [(xex power - 2 + 3x & # 179;) / x] DX; ∫ upper 3 lower 1 | 2-x | DX; ∫ upper 1 lower 0 (X & # 178; - ex power + 2sinx) DX
- 18. ∫(3x+1)/[(√4+x²)] dx ∫sin√x dx Please give the detailed steps of these two questions
- 19. Calculus problem: let a primitive function of F (x) be cos (2x), and find ∫ f '(x) DX Let a primitive function of F (x) be cos (2x), and find ∫ f '(x) DX
- 20. Let sin2x be a primitive function of F (x), and find ∫ f (x) DX