Question

A box of sticks of equal lengths is provided.The minimum number sticks needed to build a frame to enclose a 3 dimensional volume is

1. 6
2. 12
3. 3
4. 8​

Answer 1

2)12 imagine a cube. Hope it helps

Answer 2

The minimum number sticks needed to build a frame to enclose a 3 dimensional volume is 12 and option (2) is correct.

Step-by-step explanation:

Given:

A box of sticks of equal lengths is provided.

to build a frame to enclose a 3 dimensional volume.

To Find:

The minimum number sticks needed to build a frame to enclose a 3 dimensional volume.

Concept Use:

Shapes  which can be measured in 3 directions are known as three-dimensional shapes.  Length, width, and height (or depth or thickness) are the three dimensions of three-dimensional shapes

A cube is a solid or three-dimensional shape which has 6 square faces. The cube has  properties like all edges are equal,8 vertices,12 edges and 6 faces.

Solution:

As given,a box of sticks of equal lengths is provided.

Length of sticks of  box are equal.

As given,to build a frame to enclose a 3 dimensional volume.

A cube frame can be build with the help of  minimum 12 sticks.

It will definitely enclose 3 dimensional figure.

Thus,the minimum number sticks needed to build a frame to enclose a 3 dimensional volume is 12 and option (2) is correct.

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