What is the most beautiful ratio of the length, width and height of the box

The best looking proportions of the box are based onSegmentationThe principle is: the aspect ratio is, and the aspect ratio is also.

**Splitting refers to the division of the whole in two, with the ratio of the larger part to the whole part equal to the ratio of the smaller part to the larger part, which is approximately. This ratio is recognized as the most aesthetically pleasing proportion, hence the name ** division.

In the ancient Greek period.

One day Pythagoras.

As he walked down the street, he heard the sound of the blacksmith striking iron very well before passing the blacksmith's shop, so he stopped and listened. He found that the blacksmith had a regular rhythm of ironing, and the proportions of this sound were mathematically expressed by Pythagoras.

Cuboid species.

Cuboids can be roughly divided into three types, one is a cuboid with three sets of equal-length sides, the other is a cuboid with three groups of equal-length sides, which can usually be called regular quadrangular columns, and the last one is a special case of the box, that is, a cuboid with all sides of equal length, called a cube.

or cubes. Volume vs. surface area.

The side lengths of each side of a box can usually be divided into length, width and height, and if the length, width and height of the box are known, its volume and surface area are:

1. Volume: height, length and width;

2. Surface area: 2 (height, length, width, width and height).

Since mathematicians have proved that the most beautiful ratio of a rectangle is the ** division ratio, i.e. ((5-1) 2), the cuboid.

It should be a box with a length of 1 and a width of high.

The length, width and height of the box depends on the specific measurement results, the box leads from a vertex with 3 edges, usually the longest is called long, the erected one is called high, and the rest is wide.

The box has 6 faces. Each set of opposite faces is identical. The cuboid has 12 edges, and the opposite four edges are of equal length. According to the length, it can be divided into three groups, each group has 4 edges.

Properties of the box:The two diagonal lines are equal; The two diagonals are bisected with each other; The two sets of opposite sides are parallel to each other; The two sets of opposite sides are equal; All four corners are right angles; There are 2 axes of symmetry (4 for squares); It is unstable (easily deformed); The square of the diagonal length of the rectangle is the sum of the squares of the two sides; The quadrilateral obtained by sequentially connecting the midpoints of each side of the rectangle is a diamond.

In my own understanding, the length of the cuboid is longer than the width, and 1:3:9 is obviously 1 in length and 3 in width, so it is not logical.

Excuse meA box has 8 vertices, and the three edges that intersect at one vertex are called the length, width, and height of the box. In general, the longer edge in the bottom surface is called long, the shorter edge is called wide, and the edge perpendicular to the bottom surface is called high. Be cautious.

A cuboid (also known as a cuboid) is a straight quadrangular prism with a rectangular base (or a straight parallelepiped with a rectangular bottom and a rectangle at the top and bottom). It is made up of six faces, which are equal in area to each other, and two faces (four faces may be rectangular, or all six faces are rectangular) are squares.

A cuboid is a straight prism with a rectangular base. A cube is a special type of cuboid, which is a cuboid with six sides square[1]. Each rectangle of the box is called the face of the box, the line where the face intersects is called the edge of the box, and the point where the three edges intersect is called the vertex of the box.

The sum of the six faces of the box is called the surface area of the box.

The volume of a box is a measure of a box, and the volume of a box is equal to the product of length, width, and height.

From the analysis, it can be seen that the length, width and height in Figure (1) are: length 8cm, width 4cm, height 20cm; The length, width and height in Figure (2) are: length 9m, width 5m, height 5m; The length, width and height in Figure (3) are:

Length 16dm, width 4dm, height 6dm So the answer is: (1) 8cm, 4cm, 20cm; （2）9m，5m，5m；（3）16dm，4dm，6dm．