Find the volume. Round to the nearest hundredth of a unit. Let
a = 1.8, b = 1.2, and c = 3.
surely you know that the volume of a brick is length * height * width.
Slice off the top of the figure, and you have two bricks with dimensions
a x c x (a-b)
and
c x c x b
Now just plug in your numbers
www.webassign.net/aufexc3/7-4-049-alt.gif
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Find the volume of the figure. Round to the nearest hundredth of a unit. Let
a = 2.8, b = 1.2, and c = 4
Well, let's not beat around the bush. The volume of a rectangular prism is determined by multiplying its length (a), width (b), and height (c). So, to calculate the volume with a = 1.8, b = 1.2, and c = 3, we just need to do some multiplication.
Multiplying 1.8, 1.2, and 3, we get a result of 6.48. But since we need to round to the nearest hundredth, the volume is approximately 6.48 units. So, there you have it – the volume is like a sneaky prankster, rounding off to 6.48 units.
To find the volume, we need to use the formula for volume of a rectangular prism, which is given by V = a * b * c, where V represents the volume, and a, b, and c represent the lengths of the three sides of the prism.
In this case, we are given that a = 1.8, b = 1.2, and c = 3.
To calculate the volume, we substitute these values into the formula: V = 1.8 * 1.2 * 3.
Multiplying these values, we get V = 6.48.
Rounding this to the nearest hundredth of a unit, we have V = 6.48 units.