Table of Contents
- 1 When side of cube is tripled its volume becomes times of its original volume?
- 2 What happens to the surface area of a cube if each side is tripled?
- 3 How many times the volume of cube will increase if its each edge is tripled?
- 4 How will the volume of a cube change if the length of its edge is halved?
- 5 What is the ratio of volume of cube to that of sphere which will fit inside it?
When side of cube is tripled its volume becomes times of its original volume?
then volume would become 27 times.
When a cube is tripled in size then the volume is?
Similarly when length is tripled (x = 3) surface area is increased ninefold (32 = 9) and volume is increased twenty-sevenfold (33 = 27). The increase in volume is always greater than the increase in surface area.
What happens to the surface area of a cube if each side is tripled?
If you multiply it by 6 the total is 6cm2 . Now if you triple the sides they have 3cm per side. The SA per face is now 9cm2 . so if you multiply it buy 6 it comes to a total of 54cm2 .
What happened to the volume of a cube when its edge is tripled?
If edge of cube will be tripled then the volume will be 27 times. greater than the original volume.
How many times the volume of cube will increase if its each edge is tripled?
Answer: Explanation: If the edge of the cube is tripled surface area of the cube increases by 9 times. If the edge of the cube is tripled volume of the cube is increases by 27 times.
What happens to the volume of a cube if the length of an edge is doubled?
As we know that the cube has 6 sides and each side represents the square. Let the side length of the cube be a unit. Now it is given that the edge of the cube is doubled. So, the new volume of the cube is eight times the old volume.
How will the volume of a cube change if the length of its edge is halved?
When the length of the side is halved, the length of the new edge becomes. It means that if the edge of a cube is halved, its new volume will be times the initial volume.
Can a cube be tripled?
Then [Q(α):Q]=3≠2n for n∈N and hence our choice of α=3√3 cannot be constructible and hence we cannot triple the cube.
What is the ratio of volume of cube to that of sphere which will fit inside it?
6:π
Let side of cube is a and radius of sphere is r. So, the required ratio is 6:π.
What can be concluded about the surface area of a cube if its edge is doubled?
Justification: A cube has 6 faces, each with a surface area of x2. This gives a total surface area of 6×2. If each side length is doubled, then the surface area of each face becomes 6(2x)2 = 6(4×2) = 24×2.