The volume of the container in the shape of a rectangular parallelepiped is 20.9 m3.
The volume of the container in the shape of a rectangular parallelepiped is 20.9 m3. Find the height of the container if the bottom area is 3.8 m2
From the condition, we know that the volume of a container having the shape of a rectangular parallelepiped is 20.9 m3. The area of the bottom of the tank is also known as 3.8 m2. In order to find its height, let’s recall the formula for finding the volume of a rectangular parallelepiped.
The formula for finding the volume of a rectangular parallelepiped looks like this:
V = a * b * c, where a and b are the length and width of the base of the rectangular parallelepiped, and c is the height.
The product of the length and width of the base is the area of the base: S = a * b;
V = S * c;
c = V / S;
c = 20.9 / 3.8 = 5.5 m tank height.