Using a density of air to be 1.21kg/m3, the diameter of the bottom part of the...

The density of the object 1.21kg/m3 the diameter of the object .15m the power fit of...

The density of the object 1.21kg/m3 the diameter of the object .15m the power fit of the trendline equation y=0.9226x^0.5737 Calculate the drag coefficient using these numbers

Calculate the Reynold's number using a viscosity of air as 1.81E-05 kilograms/(meters-seconds), the density of air...

Calculate the Reynold's number using a viscosity of air as 1.81E-05 kilograms/(meters-seconds), the density of air ( 1.21kg/m3 ), the diameter as 0.15 m, and, from the data, 0.89 m/s.

A spherical raindrop 3.1 mm in diameter falls through a vertical distance of 3550 m. Take...

A spherical raindrop 3.1 mm in diameter falls through a vertical distance of 3550 m. Take the cross-sectional area of a raindrop = πr2, drag coefficient = 0.45, density of water to be 1000 kg/m3,and density of air to be 1.2 kg/m3. (a) Calculate the speed a spherical raindrop would achieve falling from 3550 m in the absence of air drag. (b) What would its speed be at the end of 3550 m when there is air drag?

For a wind turbine with a rotor diameter of 43 meters, air density of 1.125 kg/m3,...

For a wind turbine with a rotor diameter of 43 meters, air density of 1.125 kg/m3, and a wind velocity of 10 m/s, Wind power density is calculated as follows: A= Area= ¼ (π) D2 = ¼ (3.1416) (43)2 = 1451m2 Assuming 1m depth of the disk Volume = Area X Depth = 1451m2 X 1m = 1451m3 Mass = Density X Volume = 1.125 kg/m3 X 1451m3 = 1780 kg WPD = Pwr/ A = ½ ρ V3 =...

A spherical raindrop 2.9 mm in diameter falls through a vertical distance of 3950 m. Take...

A spherical raindrop 2.9 mm in diameter falls through a vertical distance of 3950 m. Take the cross-sectional area of a raindrop = πr2, drag coefficient = 0.45, density of water to be 1000 kg/m3,and density of air to be 1.2 kg/m3. (a) Calculate the speed (in m/s) a spherical raindrop would achieve falling from 3950 m in the absence of air drag. 278.222 m/s (b) What would its speed (in m/s) be at the end of 3950 m when...

Part A Calculate the buoyant force of air (density 1.20 kg/m3 ) on a spherical party...

Part A Calculate the buoyant force of air (density 1.20 kg/m3 ) on a spherical party balloon that has a radius of 14.6 cm . Express your answer to three significant figures and include appropriate units Part B If the rubber of the balloon itself has a mass of 2.00 g and the balloon is filled with helium (density 0.166 kg/m3 ), calculate the net upward force (the “lift”) that acts on it in air. Express your answer to three...

(a) Calculate the absolute pressure at the bottom of a freshwater lake at a point whose...

(a) Calculate the absolute pressure at the bottom of a freshwater lake at a point whose depth is 28.4 m. Assume the density of the water is 1.00 103 kg/m3 and the air above is at a pressure of 101.3 kPa. (b) What force is exerted by the water on the window of an underwater vehicle at this depth if the window is circular and has a diameter of 32.2 cm?

16. A submarine is stranded on the bottom of the ocean with its hatch 25 m...

16. A submarine is stranded on the bottom of the ocean with its hatch 25 m below the surface. In this problem, assume the density of sea water is 03 x 103kg/m3. Calculate the force, in newtons, needed to open the hatch from the inside, given it is circular and 0.55 m in diameter. The air pressure inside the submarine is 1.00 atm. F=?

Question 4 (a) The density of a gas can be calculated using p = ρRT/M ....

Question 4 (a) The density of a gas can be calculated using p = ρRT/M . Derive this equation using pV = nRT where p = pressure, V = volume, n = moles, T = temperature, R = gas constant, ρ = density, M = molar mass (See Reader). (b) Calculate the density of air at 150 oC and atmospheric pressure assuming a composition (by volume) of 21% oxygen (O2), 78.03% nitrogen (N2) and 0.97% argon (Ar). (c) Convert an...

Styrofoam has a density of 32kg/m3. Part A What is the maximum mass that can hang...

Styrofoam has a density of 32kg/m3. Part A What is the maximum mass that can hang without sinking from a 20-cm diameter Styrofoam sphere in water? Assume the volume of the mass is negligible compared to that of the sphere. Express your answer with the appropriate units.