Determine the volume V and total surface area A of the solid generated by revolving the area shown through 180° about the z-axis. Answers: V= A= i i 54 mm mm³ mm² 26 mm 21 mm
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A: Given that, ρ=1.1×103 kgm3r1=0.165 mr2=0.305 mr3=0.33 mt1=0.69×10-2 mt2=0.166 m
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Q: Gold, which has a density of 19.32 g/cm³, is the most ductile metal and can be pressed into a thin…
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A: Here, v1=2.20 m/sv2=4.32 m/sv3=8.09 m/s
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Q: An automobile tire is shown in the figure below. The tire is made of rubber with a uniform density…
A: = Inner radius of sidewall = 16.5 cm = 0.165 m = Outer radius of sidewall = 30.5 cm = 0.305 m =…
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A: Given data, Mass m=8.9 kg Thickness T=5×10-7 m Density ρ=10.1×103 kg/m3
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Q: uniform silver sphere and a uniform gold sphere have the same mass. What is the ratio of the radius…
A: Volume of sphere = (4/3) π r3 density of gold =19,300 kg/m3 density of silver = 10 490 kg/m3
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A: diameter of coin= 19 mm Radius of coin (r) = 9.5 mm Thickness (t) of coin = 1.5 mm density of pure…
Q: An automobile tire is shown in the figure below. The tire is made of rubber with a uniform density…
A: The inner radius of the sidewall, r1=16.5 cm = 0.165 m The outer radius of the sidewall, r2=30.5 cm…
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A: Given Density ρ = 1.10×103 kg/m3 Thickness of thread (T) = 2.50 cm…
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- Raw milk is stored at a dairy farm in a refrigerated cylindrical vat 6.50 feet wide and 12.5 feet high. If the vat contains 3.3 x 10² ft³ of milk, how many kg of milk does the vat contain, given that raw milk has a density of 1030 kg/m ? STARTING AMOUNT ADD FACTOR ANSWER RESET ( ) 1030 (0.001) 9.34 12 (2.54)3 0.01 (12) 0.1 1000 9600 10 0.001 (100) 0.083 (0.01) 103000 2.54 100 330 kg/m cm ft in ft in cm kgA uniform density sheet of metal is cut into the shape of an isosceles triangle, which is oriented with the base at the bottom and a corner at the top. It has a base B = 49 cm, height H = 15 cm, and area mass density σ. a) Consider a horizontal slice of the triangle that is a distance y from the top of the triangle and has a thickness dy. Write an equation for the area of this slice in terms of the distance y, and the base B and height H of the triangle. b) Set up an integral to calculate the vertical center of mass of the triangle, assuming it will have the form C ∫ f(y) where C has all the constants in it and f(y) is a function of y. What is f(y)? c)Integrate to find an equation for the location of the center of mass in the vertical direction. Use the coordinate system specified in the previous parts, with the origin at the top and positive downward. d)Find the numeric value for the distance between the top of the triangle and the center of mass in cm.A- Given that the volumetric flow rate for a fluid within a circular cross-section tube can be represented by Q= πΡΑ ΔΡ 8μL where r is the tube radius, µ is the fluid viscosity, P is the pressure drop across the tube, and L is the tube length, calculate the pressure drop across a tube of length 1 m and diameter of 23 mm. The fluid is blood (μ = 0.0035 N.s/m²) and has a volumetric flow rate of 4.5 L/min. Assuming the same conditions, what would the required pressure drop be for water (μ = 0.001 N.s/m²) and chocolate syrup (μ = 150 N.s/m²).
- Your employer is planning to build several cylindrical storage tanks that will hold fuel. He has decided that all of the cylindrical storage tanks should be the same size, but due to space constraints, is unsure what the diameter and height of each tank should be. Also, he currently does not know exactly how much fuel he will need to store. You are tasked with creating a "flexible" spreadsheet for your employer that will calculate the total volume of several cylindrical storage tanks. The following requirements should be met: • The input section should include inputs for: tank diameter (feet), tank height (feet), number of tanks built and total amount of fuel to be stored (gallons). Enter the following values in the input section of your spreadsheet: O Tank Diameter (feet) = 28 o Tank Height (feet) = 20 o Number of Tanks Built (ea) = 3 O Total Amount of Fuel to be Stored (gal) = 275,000 • The calculation section should compute: o Volume of One Tank (cubic feet AND gallons) o Total…the shell is thin, but has a definite thickness. Calculate the (volume) density of the shell, in g/cm3. Here are the numbers: R = 28 cm M = 800 grams thickness = 0.3 mmLet Pa represent the density of aluminum and Pf that of iron. Find an expression of the radius (ra ) of a solid aluminum sphere that balances a solid iron sphere of radius rf on an equal-arm balance
- An automobile tire is shown in the figure below. The tire is made of rubber with a uniform density of 1.10 × 103 kg/m³. The tire can be modeled as consisting of two flat sidewalls and a tread region. Each of th sidewalls has an inner radius of 16.5 cm and an outer radius of 30.5 cm as shown, and a uniform thickness of 0.675 cm. The tread region can be approximated as having a uniform thickness of 2.50 cm (that i its inner radius is 30.5 cm and outer radius is 33.0 cm as shown) and a width of 19.4 cm. What is the moment of inertia (in kg m2) of the tire about an axis perpendicular to the page through its center? " 33.0 cm 16.5 cm Sidewall 30.5 cm Tread Enter a number. find the moment of inertia of the sidewall and the moment of inertia of the tread region. Each can be modeled as a cylinder of nonzero thickness. What is the inner and outer radius for each case? What is the formula for the moment of inertia for a thick-walled cylinder? How can you find the mass of a hollow cylinder?…A lead cube has a total mass of 50 kg. What is the length of the side?An artist creates a solid sculpture made from 9.00 kg of tin. She wishes to create an identical sculpture, using the same mold used to make the original, out of solid silver. What is the mass (in kg) of the silver sculpture? (The density of tin is 7.26 x 103 kg/m3, and that of silver is 10.50 x 103 kg/m3.) kg
- An automobile tire is shown in the figure below. The tire is made of rubber with a uniform density of 1.10 ✕ 103 kg/m3. The tire can be modeled as consisting of two flat sidewalls and a tread region. Each of the sidewalls has an inner radius of 16.5 cm and an outer radius of 30.5 cm as shown, and a uniform thickness of 0.690 cm. The tread region can be approximated as having a uniform thickness of 2.50 cm (that is, its inner radius is 30.5 cm and outer radius is 33.0 cm as shown) and a width of 22.2 cm. What is the moment of inertia (in kg · m2) of the tire about an axis perpendicular to the page through its center?mass (g) diameter (cm) height (cm) volume (cm^3) 16.20 1.21 5.30 ? 43.98 1.80 6.41 ? 79.49 2.11 8.49 ? 139.1 2.59 9.69 ? 1. The slope of your line is the density of the material of which your cylinders are made. What is this value, including units? 2. Table 2 contains a list of materials, along with their densities/ Based on your value in Question 1, what is your cylinder material? Material Density (g/cm^3) maple 0.77 polypropylene 0.90 polystyrene 1.03 polyamide 1.15 acrylic 1.17 polyurethane 1.23 phenolic 1.32 polyvinylchloride 1.37 poly tetrafluoroethylene (teflon) 2.20 aluminum 2.71A cube 7.81 cm on each side is made of a metal alloy. After you drill a cylindrical hole 1.62 cm in diameter all the way through and perpendicular to one face, you find that the cube has a mass of 0.56 kg. What is the density of this metal? Use π=3.14 . Express your answers in kgm3 and in whole numbers (NOT SCIENTIFIC NOTATION).