Find the height of a cuboid whose base area is 240 cm’ and volume
is 1224 cm?
Answers
Answer:
Height is an integral dimension in determining an object's volume. To find the height measurement of an object, you need to know its geometric shape, such as cube, rectangle or pyramid. One of the easiest ways to think of height as it corresponds to volume is to think of the other dimensions as a base area. The height is just that many base areas stacked upon each other. Individual object volume formulas can be rearranged to calculate height. Mathematicians have long ago worked out the volume formulas for all known geometric shapes. In some cases, such as the cube, solving for height is easy; in others, it takes a little simple algebra.
Height of Rectangular Objects
The formula for the volume of a solid rectangle is width x depth x height. Divide the volume by the product of the length and width to calculate the height of a rectangular object. For this example, the rectangular object has a length of 20, a width of 10 and a volume of 6,000. The product of 20 and 10 is 200, and 6,000 divided by 200 results in 30. The height of the object is 30.
Height of Cube
A cube is a kind of rectangle where all the sides are the same. So to find volume, cube the length of any side. To find height, calculate the cube root of a cube's volume. For this example, the cube has a volume of 27. The cube root of 27 is 3. The height of the cube is 3.
Answer:
volume = l * b * h
volume = area * h
1224 = 240 * h
h = 1224/240
h = 5.1 cm
Step-by-step explanation:
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