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A cube has an edge length of 3 in. What is its volume?
27 cubic inches.
Find the exact volume of a cube with sides of 3 meters?
The volume of a cube is the edge length cubed. So, 3m cubed = a volume of 27 cubic meters.
What is the volume of a cube whose edge is 9x-8y?
17
What is the volume of a cube if each edge is 9 in long?
If each edge of the cube is 9in long, then its dimensions are 9x9x9. So to find the volume, multiply them (9in x 9in x 9in = 729 in^3) Your answer is 729 inches cubed.
What will happen to the total surface area and the volume of a cube if its each side is halved?
Surface Area: The area of one side is s2, where s is the length of 1 edge of the cube. So the total area is 6s2. If the edge length is half, the new cube area is 6(s/2)2 = 6s2/4, So the new surface area is the original area divided by 4.The volume of the cube is s3. If the edge length is half, the new cube volume is (s/2)3. = (s)3/8. So the new volume is the original volume divided by 8.
What is the volume of a cube if each edge is doubled?
The volume of a cube is proportional to the cube of its edge.If the edge is doubled, the volume increases by a factor of (2)3 = 8
If a cubic aquarium has edges measuring 4.3 ft each what is the volume in cubic ft?
The volume of a cube is given by the formula V = s^3, where s is the length of the edge. In this case, with edges measuring 4.3 ft, the volume would be 4.3^3 = 79.507 ft^3.
What is a cube with edge length one unit called a unit cube is said to have of volume?
A cube with an edge length of one unit, known as a unit cube, has a volume of one cubic unit. The volume of a cube is calculated using the formula ( V = s^3 ), where ( s ) is the length of an edge. Since the edge length of a unit cube is 1, its volume is ( 1^3 = 1 ) cubic unit.
How do you find the edge of a cube if the volume is 200?
The equation of the volume of a cube is s^3, where 's' is the length of one edge. So the edge would be the cubed root of the volume. In your case, the cube root of 200. Which is 5.848 (approx).
What is edge whose volume is 1384 and how?
To find the edge length of a cube with a volume of 1384 cubic units, you can use the formula for the volume of a cube, which is ( V = a^3 ), where ( a ) is the edge length. To find ( a ), you take the cube root of the volume: ( a = \sqrt[3]{1384} ). Calculating this gives approximately ( a \approx 11.1 ) units. Thus, the edge length of the cube is about 11.1 units.
What is the volume of a cube with each edge measuring 9 inches?
The volume of a cube is the cube of the length of one edge. (9 inches)3 = 729 cubic inches.
How does multiplying the edge length of a cube by a number n affects the volume of the cube?
When the edge length of a cube is multiplied by a number ( n ), the new edge length becomes ( n \times \text{original edge length} ). Since the volume of a cube is calculated as ( V = \text{edge length}^3 ), the new volume will be ( (n \times \text{original edge length})^3 = n^3 \times \text{original volume} ). This means the volume increases by a factor of ( n^3 ). Thus, multiplying the edge length by ( n ) results in the volume increasing ( n^3 ) times.
What do you have to times to get the volume of a cube?
The volume of a cube would be cubing an edge, or e^3, or e*e*e. Either way, you get the volume of a cube.
What is edge length of a cube?
The edge length of a cube is the measurement of one of its sides, which are all equal in length. It is the distance between two adjacent vertices of the cube. If the volume of a cube is known, the edge length can be calculated using the formula ( a = \sqrt[3]{V} ), where ( a ) is the edge length and ( V ) is the volume. For example, if a cube has a volume of 27 cubic units, its edge length would be 3 units.
What happens to the volume of a cube when the edge lengths are doubled?
Volume of cube = l^3 Volume = (2l)^3 = 8*l^3 When you double the length, you multiply the volume by 8.
What is the relationship of the edge length of the cube to its volume?
The volume of a cube is directly related to the length of its edge through the formula ( V = a^3 ), where ( V ) is the volume and ( a ) is the edge length. This means that if you increase the edge length, the volume increases exponentially, specifically by the cube of the edge length. For example, doubling the edge length results in an eightfold increase in volume. Thus, the edge length and volume are intrinsically linked through this cubic relationship.
How much greater is the volume of a cube when the length of each edge is multiplied by 3?
First cube's edge is 4 units, volume is 64 cunits. Second cube's edge is 12 units, volume is 1728 cunits, an increase of 27 times the original. This is to be expected as 3 cubed is 27.
