classical Mechanics problem: Find the ratio of the radius R to the height H of a...

Suppose the radius, height and volume of a right circular cylinder are denoted as r, h,...

Suppose the radius, height and volume of a right circular cylinder are denoted as r, h, and V . The radius and height of this cylinder are increasing as a function of time. If dr/dt = 2 and dV/dt = 10π when r = 1, h = 2, what is the value of dh/dt at this time?

A circular cylinder with a radius R of 1 cm and a height H of 2...

A circular cylinder with a radius R of 1 cm and a height H of 2 cm carries a charge density of pv = h R^2 uC/cm^3 (h is a point on the z-axis). The cylinder is then placed on the xy plane with its axis the same as the z-axis. Find the electric field intensity E and and the electric potential V on point A on z-axis 2 cm from the top of the cylinder.

10. A circular cylinder with a radius R of 1 cm and a height H of...

10. A circular cylinder with a radius R of 1 cm and a height H of 2 cm carries a charge density of ρV = H r2 sin φ µC/cm3 (r is a point on the z-axis, φ is an azimuthal angle). The cylinder is then placed on the xy plane with its axis the same as the z-axis. Find the electric field intensity E and the electric potential V on point A on z-axis 2 cm from the top...

A sphere with a volume V and a radius of r is compressed (flattened) into the...

A sphere with a volume V and a radius of r is compressed (flattened) into the shape of a cylinder with a radius of r and a height of r/4. The volume remains constant. Show that the surface-to-volume ratio of the sphere is less than that of the flattened cylinder.

Let V be the volume of a cylinder having height h and radius r, and assume...

Let V be the volume of a cylinder having height h and radius r, and assume that h and r vary with time. (a) How are dV /dt, dh/dt, and dr/dt related? (b) At a certain instant, the height is 18 cm and increasing at 3 cm/s, while the radius is 30 cm and decreasing at 3 cm/s. How fast is the volume changing at that instant? Is the volume increasing or decreasing at that instant?

Calculus - Problem 16 - Answer all parts for full credit and show your work. A...

Calculus - Problem 16 - Answer all parts for full credit and show your work. A right circular cylinder with radius r and height h, both in centimeters, has the property that r + h = 9 centimeters. A. Determine a formula for the volume V as a function of the radius r. (No other variables can be used.) B. Determine an appropriate domain for V as a function of r, and explain briefly. C. Use your function V and...

Find the circular cylinder of largest lateral area which can be inscribed in a sphere of...

Find the circular cylinder of largest lateral area which can be inscribed in a sphere of radius 4 feet. (Surface area of a cylinder of radius r and height h is 2πrh.)

Find the temperature distribution T(r,θ,z) inside a cylinder of height z= 20 and radius r= 8...

Find the temperature distribution T(r,θ,z) inside a cylinder of height z= 20 and radius r= 8 , if the cylinder temperature is zero in all surface except the bottom circular surface where it is divided two halves , the first is held at T1= 100 c and the other is held at T2=200 c. please show me the solution with the details of the derivation .

Classical Mechanics problem: The frequency of a damped harmonic oscillator is one-half the frequency of the...

Classical Mechanics problem: The frequency of a damped harmonic oscillator is one-half the frequency of the same oscillator with no damping. Find the ratio R of the maxima of successive oscillations

Find the radius of the container in the shape of a right circular cylinder with an...

Find the radius of the container in the shape of a right circular cylinder with an open top whose volume is 1 liters and whose surface area is minimal. Carefully explain why your answer would give the minimal surface area. Detailed and step by step solution please :)