A rectangular packing crate that is 3 feet wide, 4 feet high, and 6 feet long is used to ship jewelry boxes that are 1 foot wide, 1foot long, and 1 foot high. V=lwh. What is the volume of the rectangular packinging crate?
I think it's 72 cubic feet. IS that correct?
Also...
How many jewerly boxes fit inot the rectangular packaging crate?
I don't really understand the above question. Is it also 72?
correct. if it has a volume of 72 ft^3, and each box has a volume of 1ft^2, 72 must fit inside.
thank you so much!!!!
36 INCHES CUBIC
what is the volume in cubic inches of the photograph storage box? (v=lwh)
To find the volume of the rectangular packing crate, you can use the formula V = lwh, where l represents the length, w represents the width, and h represents the height.
Given that the dimensions of the crate are:
Length (l) = 6 feet
Width (w) = 3 feet
Height (h) = 4 feet
To find the volume, substitute these values into the formula:
V = 6 feet × 3 feet × 4 feet = 72 cubic feet
So, yes, your answer of 72 cubic feet for the volume of the rectangular packing crate is correct.
Now, to determine how many jewelry boxes can fit into the rectangular packaging crate, we need to compare their respective volumes. The dimensions of the jewelry boxes are:
Length (l) = 1 foot
Width (w) = 1 foot
Height (h) = 1 foot
To find the volume of one jewelry box, substitute these values into the formula:
V = 1 foot × 1 foot × 1 foot = 1 cubic foot
Now, to determine how many jewelry boxes fit into the crate, divide the volume of the crate by the volume of one jewelry box:
Number of jewelry boxes = 72 cubic feet ÷ 1 cubic foot = 72
Therefore, the crate can accommodate 72 jewelry boxes.
In conclusion, the volume of the rectangular packing crate is indeed 72 cubic feet, and the number of jewelry boxes that can fit into the crate is also 72.