Find the maximum and minimum volumes of a rectangular box whose surface area equals 10000 cm^2 and whose edge length (sum of lengths of all edges) is 560 cm. Among all closed rectangular boxes of volume 27 cm 3 , what is the smallest surface ar...
A spherical tank has a radius of 175.0 in. Calculate the volume of the tank in cubic inches; then convert this to Imperial gallons. One Imperial gallon equals 277.4 cubic inches. What factor does the volume change with a surface area?
0.72 kgf/cm2 equals 0.696846 atmAll In One Units Converter Physics Chemistry Recipes ⇆ 0.72 kgf/cm2 = 0.696846 atm Formula: multiply the value in kgf/cm2 by the conversion factor '0.96784110535417'. So, 0.72 kgf/cm2 = 0.72 × 0.96784110535417 = 0.696845595855 atm. Conversion of 0.72 ...
My piece of this metal occupies 545.1 cm cubed. How much mass is there in my piece? An 11.0-kg iron weightlifting plate has a volume of 1400 cm3. What is the density of the iron plate in g/cm3? Iron has a density of 7.86 g/cm^3 (1 cm^3 equals to ...
A spherical balloon is filled with gas at a rate of 4 cm^3/s. At what rate is the radius r changing with respect to time when the volume V = 36pi cm^3/s? How many cm^3 in a liter? Consider the ideal gas law P times V equals k times ...
What is the volume of a piece of iron (p = 7.9 g/cm cubed) that has a mass of 0.50 kg? What is the volume of a piece of iron (p=7.9 g/cm^3) that has a mass of 0.50 kg? What is the volume of a piece of iron (4.4 g/cm^3) that has a mass of...
Question: Find the dimensions of the box with volume {eq}2744 \, \mathrm{cm}^3 {/eq} that has minimal surface area. (Let {eq}x {/eq}, {eq}y {/eq}, and {eq}z {/eq} be the dimensions of the box.) Maximize and minim...
What are the lengths of the edges giving the minimum surface area? (Give the three lengths as a comma separated list.) Find the maximum and minimum volumes of a rectangular box whose surface area equals 3000 square cm and whose edge length (su...
Among all closed rectangular boxes of volume 27 cm 3 , what is the smallest surface area? Find the maximum and minimum volumes of a rectangular box whose surface area equals 10000 cm^2 and whose edge length (sum of lengths of all edges) i...
A closed rectangular box has a volume of {eq}44\ \text{cm}^3 {/eq}. What are the lengths of the edges giving the minimum surface area? Maximum-Minimum Problem For a given volume, the shape that has the smallest surface area is a spher...