The rate of diffusion would be faster for the right cylinder.
a sphere
0.6 apex(: and yall only got this cuz of mee(: KB
A living cell is not a simple geometric shape like a sphere or a cube. What sort of weird cell shape might increase the ratio of surface area to volume Would you be able to test this more complex shape?
Your tank is a cylinder with hemispherical end caps. Although you said "cylindrical midsection," we will interpret that to mean the height, h, of the cylinder, which is six feet. We also infer that the radius of the sphere is equal to the radius of the cylinder, which must be the case if the tank has hemispherical end caps. So, the volume of the tank is equal to the sum of the volumes of the two hemispheres and the cylinder.The equation for the volume of a cylinder is V = pi*r2*h. If you put the two hemispheres together, you have a sphere whose volume is V = (4/3)*pi*r3.So, V = (4/3)*pi*r3 + pi*r2*h = pi*r2*(4r/3 + h),where h = 6 in this case.
DNA, Diffusion, and Surface Area to Volume Ratio.
volume of a regular right circular cylinder is V=pi(r2)h since the radius is (a) then the height of the circular cylinder would be (2a) so the volume of the largest possible right circular cylinder is... V=2(pi)(r2)(a) with (pi) being 3.14159 with (r) being the radius of the circle on the top and bottom of the cylinder with (a) being the radius of the sphere
it would be faster for the right cylinder
He discovered the relationship between a sphere and a circumscribed cylinder of the same height and diameter. The volume is 4⁄3πr3 for the sphere, and 2πr3 for the cylinder. The surface area is 4πr2 for the sphere, and 6πr2 for the cylinder (including its two bases), where r is the radius of the sphere and cylinder. The sphere has a volume and surface area two-thirds that of the cylinder. A sculpted sphere and cylinder were placed on the tomb of Archimedes at his request.
The rate of diffusion would be faster for the right cylinder.
C- The rate of diffusion would be faster for the right cylinder
the cylinder is approximately 50240 m3 the sphere is approximately 33493 and 1/3 m3
Some of many examples are:- Finding the circumference of a circle Finding the area of a circle Finding the surface area of a sphere Finding the volume of a sphere Finding the surface area of a cylinder Finding the volume of a cylinder Finding the volume of a cone Finding the surface area of a cone
It depends on what r is and on what information you have. Even if r is a radius of a circular shape, you would have different formulae depending on whether: it is a sphere and you have the volume, it is a sphere and you have the surface area, it is a circle and you have the area, it is a circle and you have the circumference, it is a circle and you have the length and angle of an arc, it is a cone and you have volume and height, it is a cylinder and you have volume and height etc.
A spectacular landmark in the history of mathematics was the discovery by Archimedes (287-212 B.C.) that the volume of a solid sphere is two- thirds the volume of the smallest cylinder that surrounds it, and that the surface area of the sphere is also two-thirds the total surface area of the same cylinder.
The rate of diffusion would be faster for the right cylinder (APEX)
A cylinder is not a prism because it has a circular base and therefore requires a different formula to figure out its volume, surface area, etc.
The volume of a cylinder is represented by this formula:r2Ï€hwhere r = radius of circular baseand h = height of cylinder