CN1773450A

CN1773450A - Straight number

Info

Publication number: CN1773450A
Application number: CN 200410092040
Authority: CN
Inventors: 刘荣杰
Original assignee: Individual
Current assignee: Individual
Priority date: 2004-11-08
Filing date: 2004-11-08
Publication date: 2006-05-17

Abstract

A direct number is a kind of number which can be presented by direct number coordinate series, direct number drawing and direct number algebraic expression for describing above five amounts of object simultaneously.

Description

Straight number

Technical field

The invention belongs to art of mathematics and data processing descriptive statistics field, be applied to each subjects such as natural science, social science.

Technical background

Real number, plane vector, tri-vector, hypercomplex number, their shortcoming is: can not describe five amounts simultaneously.

Summary of the invention

One, a kind of straight number, a kind of algebraic expression of number:

C＝{[a ₁x ₁(x ₁.y ₁，z ₁)+a ₂x ₂(x ₂，y ₁，z ₁)+…+a _nx _n(x _n，y ₁，z ₁)]L+[b ₁y ₁(x ₁，y ₁，z ₁)+b ₂y ₂(x ₁，y ₂，z ₁)+…+b _ny _n(x ₁，y _n，z ₁)]W+[c ₁z ₁(x ₁，y ₁，z ₁)+c ₂z ₂(x ₁，y ₁，z ₂)+…+c _nz _n(x ₁，y ₁，z _n)]H}+{[a ₁x ₁(x ₁，y ₁，z ₁)e ₁+a ₂x ₂(x ₂，y ₁，z ₁)e ₂+…+a _nx _n(x _n，y ₁，z ₁)e _n]L+[b ₂y ₂(x ₁，y ₁，z ₁)e ₁+b ₂y ₂(x ₁，y ₂，z ₁)e ₂+…+b _ny _n(x ₁，y _n，z ₁)e _n]W+[c ₁z ₁(x ₁，y ₁，z ₁)e ₁+c ₂z ₂(x ₁，y ₁，z ₁)e ₂+…+c _nz _n(x ₁，y ₁，z _n)e _n]H}e

The number that this algebraic expression is arranged is straight number.Straight table structure, straight number is made up of two parts, and a braces is one one, and not having " e " braces portion is real part, and it is imaginary part that the braces portion of " e " is arranged, and braces portion and bracket office form, and bracket office is made up of item, and item is formed a by subitem ₁x ₁(x ₁, y ₁, z ₁) be one.

In item: the first subitem (a ₁): first letter (a) is directly to count numerical value, and number (1) is first alphabetical mark.

Second subitem (the x ₁): first letter (x) is a mark of directly counting coordinate axis, and number (1) is first alphabetical mark.

The 3rd subitem (x ₁, y ₁, z ₁): x ₁, y ₁, z ₁It is the coordinate of directly counting coordinate axis.

L is the abbreviation of length (length), and W is the abbreviation of width (wide), and H is the abbreviation of height (height).

Le is the mark of L in { } e, and We is the mark of W in { } e, and He is the mark of H in { } e.

{ } is real part, in { }:

[] L is a L office, and [] W is a W office, and [] H is a H office.

{ } e is an imaginary part, in { } e:

[] L is a Le office, and [] W is a We office, and [] He is a He office, a, and b, c is a real number, nL, nW, nH, nLe, nWe, nHe is a natural number.

NL, nW, nH, nLe, nWe, nHe is the quantity of innings discipline

n＝nL+nW+nH+nLe+nWe+nHe

C is straight number, and c is that n directly counts

E is a unit, and e is the component in coordinate system, and e is the unit directed line segment, and direction is along coordinate axis.

Straight number system

Straight number is divided into real straight number, and void is directly counted, real empty straight number.

Real straight number: have only the straight number of real part, be real straight number.

Algebraic expression: C={}, or C={[] L+[] W+[] H}

Empty straight number: have only the straight number of imaginary part, be empty straight number.

Algebraic expression: C={}e, or C={[] L+[] W+[] H}e

Real empty straight number: the straight number of real part and imaginary part is arranged, be real empty straight number.

Algebraic expression: C={}+{}e, or [] L+[] W+[] H}

+{[]L+[]W+[]H}e

1, real straight number is divided into the real straight number in plane, the real straight number in space.

1.1 the real straight number in plane

The real straight number in plane: real part has only the reality of 2 offices directly to count, and cries the plane real straight number.

Algebraic expression: C=[]+[]

1.2 the real straight number in space

The real straight number in space: have the reality of 3 offices directly to count in the real part, cry the space real straight number.

Algebraic expression: C=[]+[]+[]

2. empty straight number

Empty straight number is divided into the empty straight number of empty straight number in plane and space.

2.1 the empty straight number in plane: imaginary part has only the empty straight number of 2 offices, cries the plane empty straight number.

Algebraic expression: C=[] e+[] e

Be that plane vector is exactly the empty straight number in plane.

2.2 the empty straight number in space: imaginary part has the empty straight number of 3 offices, cries the space empty straight number.

Algebraic expression: C=[] e+[] e+[] e

Be that space vector is exactly the empty straight number in space.

3. real empty straight number

The real empty straight number in plane: 2 kinds of offices are not 0 in real part and the imaginary part, cry that the plane is real emptyly directly counts.

Algebraic expression: C={[]+[] }+{ []+[] } e

The real empty straight number in space: in the real part imaginary part, 3 kinds of offices are not 0, cry that the space is real emptyly directly counts.

Algebraic expression: C={[]+[]+[] }+{ []+[]+[] } e

Arithmetic

1, real directly several

1) arithmetic

Additive operation: each subitem value addition of the respective items in the corresponding office in the corresponding portion, follow real number addition rule.

Subtraction: each subitem value of the respective items in the corresponding office in the corresponding portion is subtracted each other, and follows real number subtraction rule.

Multiplying: each subitem value of the respective items in the corresponding office in the corresponding portion multiplies each other, and follows the real multiplications rule.

Division arithmetic: each subitem value of the respective items in the corresponding office in the corresponding portion is divided by, and follows real number division rule.

2, void is directly counted

Follow the vector operation rule,

Two, directly count rectangular coordinate system and straight number figure

Straight number rectangular coordinate system is made up of real part axle and imaginary part axle, and real part axle and imaginary part axle intersection point are coordinate origin, are labeled as 0.

The real part axle, i.e. directed line, real part axle and imaginary part axle are orthogonal.

Straight number polar coordinate system is directly counted polar coordinate system and is directly counted the directly several cylindrical coordinate systems of spheric coordinate system

Straight number figure

Flat sided straight is counted figure

Straight several point: geometric figure is a point.

Straight number line joint: geometric figure is a line segment.

Straight number is square: geometric figure is a rectangle.

Straight number lattice shape: geometric figure is the square grid of forming mutually.

Figure is directly counted in the space

Straight number side body: cube.

Straight number lattice body: pile by the square body that square body is formed.

Three, be applied to various theories in social science and the natural science subdiscipline.Theoretical subject: theoretical object of being explained.Subject is made up of factor, and factor is explained by the factor numeral, i.e. the factor numeral.Straight number is corresponding to subject, and the straight several figures of straight number in straight number coordinate system are corresponding to subject, and the item of straight number is corresponding to factor, and the numerical value subitem in straight several is corresponding to factor numerical value, and the coordinate axis of straight several coordinate systems of straight number is corresponding to factor, i.e. factor axis.The numerical value of coordinate axis is corresponding to factor numerical value.

Embodiment

Four, straight number and straight number figure and straight number coordinate system

1 horizontal 1 vertical straight number also makes 1L 1W directly count.

Algebraic expression: C=a ₁x ₁+ b ₁y ₁

Should be 1 horizontal 1 vertical straight number coordinate system, the i.e. rectangular coordinate system of a transverse axis of a longitudinal axis mutually.Be that this coordinate is a cartesian coordinate system, the straight geometry of numbers is expressed as a point.

1 horizontal 2 vertical straight number also makes 1L 2W directly count.

Algebraic expression: C=a ₁x ₁+ b ₁y ₁+ b ₂y ₂

Straight number figure is straight number line joint.

Straight number coordinate is 1 x ₁Axle, 2 y ₂Axle, y ₂Axle and x ₁Axle is vertical, with y ₁Axle is parallel.

The straight number of 1 horizontal 1 row also is plural number.

Algebraic expression: C=a ₁x ₁+ b ₁y ₁e ₁

Straight number coordinate is: promptly 1 horizontal 1 be listed as straight number coordinate system, the i.e. rectangular coordinate system of a transverse axis of a longitudinal axis.

The straight number of 1 row, 1 row also is plane vector.

Algebraic expression: C=a ₁x ₁e ₁+ b ₁y ₁e ₁

Be the vector of 2 components.

Straight number coordinate is: promptly 1 row, 1 row are directly counted coordinate system, the i.e. rectangular coordinate system of a transverse axis of a longitudinal axis.

2 horizontal 2 vertical straight numbers also make 2L2W directly count.

Algebraic expression: C=a ₁x ₁+ a ₂x ₂+ b ₁y ₁-b ₂y ₂

Straight number figure is directly counted square straight several rectangles

Straight number coordinate is: 2 transverse axis are parallel to each other, and 2 longitudinal axis are parallel to each other, and the transverse axis and the longitudinal axis are orthogonal.

3 horizontal 3 vertical straight numbers also make 3L3W directly count.

Algebraic expression: C=a ₁x ₁+ a ₂x ₂+ a ₃x ₃+ b ₁y ₁+ b ₂y ₂+ b ₃y ₃

Straight number figure is i.e. " field " shape of straight number lattice shape

Straight number coordinate is: 3 transverse axis are parallel to each other, and 3 longitudinal axis are parallel to each other, and the transverse axis and the longitudinal axis are orthogonal.

The flat sided straight number is the directly subclass of number of space, and when the perpendicular office that directly count in the space, high office is 0 o'clock, is the flat sided straight number.

The real straight number in space

1 horizontal 1 vertical 1 vertically counts:

Algebraic expression: C=a ₁x ₁+ b ₁y ₁+ c ₁z ₁

1 horizontal 1 vertical 1 vertically counts coordinate system, promptly is general rectangular coordinate system in space.

1 horizontal 1 vertical 1 vertical number figure is a point.

2 horizontal 2 vertical 2 perpendicular real straight numbers:

Algebraic expression: C=a ₁x ₁+ a ₂x ₂+ b ₁y ₁+ b ₂y ₂+ c ₁z ₁+ c ₂z ₂

Straight number figure: regular cube

Straight number coordinate is: 2 transverse axis are parallel to each other, and 2 longitudinal axis are parallel to each other, and 2 vertical pivots are parallel to each other, and the transverse axis and the longitudinal axis and vertical pivot are orthogonal.

3 horizontal 3 vertical 3 perpendicular real straight numbers

Algebraic expression: C=a ₁x ₁+ a ₂x ₂+ a ₃x ₃+ b ₁y ₁+ b ₂y ₂+ b ₃y ₃+ c ₁z ₁+ c ₂z ₂+ c ₃z ₃

Straight number figure: 4 lattice bodies that cube becomes

Straight number coordinate is: 3 transverse axis are parallel to each other, and 3 longitudinal axis are parallel to each other, and 3 vertical pivots are parallel to each other, and the transverse axis and the longitudinal axis and vertical pivot are orthogonal.

1 row, 1 row, 1 high empty straight number is tri-vector.

1 perpendicular 1 row, 1 row, 1 high real empty straight number,

Algebraic expression: C=c ₁z ₁+ a ₁x ₁e ₁+ b ₁y ₁e ₂+ c ₁z ₁e ₃

Be hypercomplex number.

Straight number coordinate is: 1 transverse axis, and 1 longitudinal axis, 2 vertical pivots are parallel to each other, and the transverse axis and the longitudinal axis and vertical pivot are orthogonal.

2, directly count the subject of economic theory: the object that economic theory is explained.Subject is made up of factor, and factor is explained by the factor numeral, i.e. the factor numeral.Straight number is corresponding to the economics subject, the straight several figures of straight number in straight number coordinate system are corresponding to subject, and the item of straight number is corresponding to factor, and the numerical value subitem in straight several is corresponding to factor numerical value, the coordinate axis of straight several coordinate systems of straight number is corresponding to factor, i.e. factor axis.The numerical value of coordinate axis is corresponding to factor numerical value.Be applied to financial rate stock etc.

3, directly count the subject of statistical theory: the object that statistical theory is explained.Subject is made up of factor, and factor is explained by the factor numeral, i.e. the factor numeral.Straight number is corresponding to subject, and the straight several figures of straight number in straight number coordinate system are corresponding to subject, and the item of straight number is corresponding to factor, and the numerical value subitem in straight several is corresponding to factor numerical value, and the coordinate axis of straight several coordinate systems of straight number is corresponding to factor, i.e. factor axis.The numerical value of coordinate axis is corresponding to factor numerical value.

4, directly count the subject of physics theory: the object that physics theory is explained.Subject is made up of factor, and factor is explained by the factor numeral, i.e. the factor numeral.Straight number is corresponding to subject, and the straight several figures of straight number in straight number coordinate system are corresponding to subject, and the item of straight number is corresponding to factor, and the numerical value subitem in straight several is corresponding to factor numerical value, and the coordinate axis of straight several coordinate systems of straight number is corresponding to factor, i.e. factor axis.The numerical value of coordinate axis is corresponding to factor numerical value.

5, directly count the subject of chemical theory: the object that chemical theory is explained.Subject is made up of factor, and factor is explained by the factor numeral, i.e. the factor numeral.Straight number is corresponding to subject, and the straight several figures of straight number in straight number coordinate system are corresponding to subject, and the item of straight number is corresponding to factor, and the numerical value subitem in straight several is corresponding to factor numerical value, and the coordinate axis of straight several coordinate systems of straight number is corresponding to factor, i.e. factor axis.The numerical value of coordinate axis is corresponding to factor numerical value.

Subject is made up of factor, and factor is explained by the factor numeral, i.e. the factor numeral.Straight number is corresponding to subject, and the straight several figures of straight number in straight number coordinate system are corresponding to subject, and the item of straight number is corresponding to factor, and the numerical value subitem in straight several is corresponding to factor numerical value, and the coordinate axis of straight several coordinate systems of straight number is corresponding to factor, i.e. factor axis.The numerical value of coordinate axis is corresponding to factor numerical value.

Claims

1, a kind of straight number, and directly count coordinate system, directly count figures, the straight several coordinate systems on microcomputer software, directly count figures, it is characterized in that one, a kind of straight number, a kind of algebraic expression of number:

C＝{[a ₁x ₁(x ₁，y ₁，z ₁)+a ₂x ₂(x ₂，y ₁，z ₁)+…+a _nx _n(x _n，y ₁，z ₁)]L+[b ₁y ₁(x ₁，y ₁，z ₁)+b ₂y ₂(x ₁，y ₂，z ₁)+…+b _ny _n(x ₁，y _n，z ₁)]W+[c ₁z ₁(x ₁，y ₁，z ₁)+c ₂z ₂(x ₁，y ₁，z ₂)+…+c _nz _n(x ₁，y ₁，z _n)]H}+{[a ₁x ₁(x ₁，y ₁，z ₁)e ₁+a ₂x ₂(x ₂，y ₁，z ₁)e ₂+…+a _nx _n(x _n，y ₁，z ₁)e _n]L+[b ₂y ₂(x ₁，y ₁，z ₁)e ₁+b ₂y ₂(x ₁，y ₂，z ₁)e ₂+…+b _ny _n(x ₁，y _n，z ₁)e _n]W+[c ₁z ₁(x ₁，y ₁，z ₁)e ₁+c ₂z ₂(x ₁，y ₁，z ₁)e ₂+…+c _nz _n(x ₁，y ₁，z _n)e _n]H}e

The number that this algebraic expression is arranged is straight number.Straight table structure, straight number is made up of two parts, and a braces is one one, and not having " e " braces portion is real part, and it is imaginary part that the braces portion of " e " is arranged, and braces portion and bracket office form, and bracket office is made up of item, and item is formed a by subitem ₁x ₁(x ₁, y ₁, z ₁) be one;

In item: the first subitem (a ₁): first letter (a) is directly to count numerical value, and number (1) is first alphabetical mark;

The 3rd subitem (x ₁, y ₁, z ₁): x ₁, y ₁, z ₁It is the coordinate of directly counting coordinate axis;

L is the abbreviation of length (length), and W is the abbreviation of width (wide), and H is the abbreviation of height (height);

Le is the mark of L in { } e, and We is the mark of W in { } e, and He is the mark of H in { } e;

{ } is real part, in { }:

[] L is a L office, and [] W is a W office, and [] H is a H office;

{ } e is an imaginary part, in { } e:

[] L is a Le office, and [] W is a We office, and [] He is a He office, a, and b, c is a real number, nL, nW, nH, nLe, nWe, nHe is a natural number;

n＝nL+nW+nH+nLe+nWe+nHe

C is straight number, and c is that n directly counts

E is a unit, and e is the component in coordinate system, and e is the unit directed line segment, and direction is along coordinate axis;

Straight number system

Straight number is divided into real straight number, and void is directly counted, real empty straight number;

Real straight number: have only the straight number of real part, be real straight number;

Algebraic expression: C={ }, or C={[] L+[] W+[] H}

Empty straight number: have only the straight number of imaginary part, be empty straight number;

Algebraic expression: C={ } e, or C={[] L+[] W+[] H}e

Real empty straight number: the straight number of real part and imaginary part is arranged, be real empty straight number;

Algebraic expression: C={ }+{ } e, or [] L+[] W+[] H}

+{[?]L+[?]W+[?]H}e

(1) real straight number is divided into the real straight number in plane, the real straight number in space;

1.1 the real straight number in plane

The real straight number in plane: real part has only the reality of 2 offices directly to count, and cries the plane real straight number;

Algebraic expression: C=[]+[]

1.2 the real straight number in space

The real straight number in space: have the reality of 3 offices directly to count in the real part, cry the space real straight number;

Algebraic expression: C=[]+[]+[]

(2) void is directly counted

Empty straight number is divided into the empty straight number of empty straight number in plane and space;

2.1 the empty straight number in plane: imaginary part has only the empty straight number of 2 offices, cries the plane empty straight number;

Algebraic expression: C=[] e+[] e

Be that plane vector is exactly the empty straight number in plane;

2.2 the empty straight number in space: imaginary part has the empty straight number of 3 offices, cries the space empty straight number;

Algebraic expression: C=[] e+[] e+[] e

Be that space vector is exactly the empty straight number in space;

(3) real empty straight number

The real empty straight number in plane: 2 kinds of offices are not 0 in real part and the imaginary part, cry that the plane is real emptyly directly counts;

Algebraic expression: C={[]+[] }+{ []+[] } e

The real empty straight number in space: in the real part imaginary part, 3 kinds of offices are not 0, cry that the space is real emptyly directly counts;

Algebraic expression: C={[]+[]+[] }+{ []+[]+[] } e

Arithmetic

(1) real directly several

1) arithmetic

Additive operation: each subitem value addition of the respective items in the corresponding office in the corresponding portion, follow real number addition rule;

Subtraction: each subitem value of the respective items in the corresponding office in the corresponding portion is subtracted each other, and follows real number subtraction rule;

Multiplying: each subitem value of the respective items in the corresponding office in the corresponding portion multiplies each other, and follows the real multiplications rule;

Division arithmetic: each subitem value of the respective items in the corresponding office in the corresponding portion is divided by, and follows real number division rule;

(2) void is directly counted

Follow the vector operation rule,

Two, directly count rectangular coordinate system and straight number figure

Straight number rectangular coordinate system is made up of real part axle and imaginary part axle, and real part axle and imaginary part axle intersection point are coordinate origin, are labeled as O;

The real part axle, i.e. directed line, real part axle and imaginary part axle are orthogonal;

Straight number figure

Flat sided straight is counted figure

Straight several point: geometric figure is a point;

Straight number line joint: geometric figure is a line segment;

Straight number is square: geometric figure is a rectangle;

Straight number lattice shape: geometric figure is the square grid of forming mutually;

Figure is directly counted in the space

Straight number side body: cube;

Straight number lattice body: pile by the square body that square body is formed;

Three, be applied to various theories in social science and the natural science subdiscipline, theoretical subject: theoretical object of being explained, subject is made up of factor, factor is explained by the factor numeral, it is the factor numeral, straight number is corresponding to subject, the straight several figures of straight number in straight number coordinate system are corresponding to subject, the item of straight number is corresponding to factor, numerical value subitem in straight several is corresponding to factor numerical value, the coordinate axis of straight several coordinate systems of straight number is corresponding to factor, i.e. factor axis, and the numerical value of coordinate axis is corresponding to factor numerical value;

1 horizontal 1 vertical straight number also makes 1L1W directly count;

Algebraic expression: C=a ₁x ₁+ b ₁y ₁

Should be 1 horizontal 1 vertical straight number coordinate system mutually, i.e. the rectangular coordinate system of a transverse axis of a longitudinal axis, promptly this coordinate is a cartesian coordinate system, the straight geometry of numbers is expressed as a point;

1 horizontal 2 vertical straight number also makes 1L2W directly count;

Algebraic expression: C=a ₁x ₁+ b ₁y ₁+ b ₂y ₂

Straight number figure is straight number line joint;

Straight number coordinate is 1 x ₁Axle, 2 y ₂Axle, y ₂Axle and x ₁Axle is vertical, with y ₁Axle is parallel;

The straight number of 1 horizontal 1 row also is plural number;

Algebraic expression: C=a ₁x ₁+ b ₁y ₁e ₁

Straight number coordinate is: promptly 1 horizontal 1 be listed as straight number coordinate system, the i.e. rectangular coordinate system of a transverse axis of a longitudinal axis;

The straight number of 1 row, 1 row also is plane vector;

Algebraic expression: C=a ₁x ₁e ₁+ b ₁y ₁e ₁

Be the vector of 2 components;

Straight number coordinate is: promptly 1 row, 1 row are directly counted coordinate system, the i.e. rectangular coordinate system of a transverse axis of a longitudinal axis;

2 horizontal 2 vertical straight numbers also make 2L2W directly count;

Algebraic expression: C=a ₁x ₁+ a ₂x ₂+ b ₁y ₁+ b ₂y ₂

Straight number figure is directly counted square straight several rectangles

Straight number coordinate is: 2 transverse axis are parallel to each other, and 2 longitudinal axis are parallel to each other, and the transverse axis and the longitudinal axis are orthogonal;

3 horizontal 3 vertical straight numbers also make 3L3W directly count;

Straight number figure is i.e. " field " shape of straight number lattice shape

Straight number coordinate is: 3 transverse axis are parallel to each other, and 3 longitudinal axis are parallel to each other, and the transverse axis and the longitudinal axis are orthogonal;

The flat sided straight number is the directly subclass of number of space, and when the perpendicular office that directly count in the space, high office is 0 o'clock, is the flat sided straight number;

The real straight number in space

1 horizontal 1 vertical 1 vertically counts:

Algebraic expression: C=a ₁x ₁+ b ₁y ₁+ c ₁z ₁

1 horizontal 1 vertical 1 vertically counts coordinate system, promptly is general rectangular coordinate system in space;

1 horizontal 1 vertical 1 vertical number figure is a point;

2 horizontal 2 vertical 2 perpendicular real straight numbers:

Straight number figure: regular cube

Straight number coordinate is: 2 transverse axis are parallel to each other, and 2 longitudinal axis are parallel to each other, and 2 vertical pivots are parallel to each other, and the transverse axis and the longitudinal axis and vertical pivot are orthogonal;

3 horizontal 3 vertical 3 perpendicular real straight numbers

Straight number figure: 4 lattice bodies that cube becomes

Straight number coordinate is: 3 transverse axis are parallel to each other, and 3 longitudinal axis are parallel to each other, and 3 vertical pivots are parallel to each other, and the transverse axis and the longitudinal axis and vertical pivot are orthogonal;

1 row, 1 row, 1 high empty straight number is tri-vector;

1 perpendicular 1 row, 1 row, 1 high real empty straight number,

Be hypercomplex number;

Straight number coordinate is: 1 transverse axis, and 1 longitudinal axis, 2 vertical pivots are parallel to each other, and the transverse axis and the longitudinal axis and vertical pivot are orthogonal;

2, straight number according to claim 1, straight number economic theory is characterized in that, the subject of economic theory: the object that economic theory is explained, subject is made up of factor, factor is explained by the factor numeral, it is the factor numeral, straight number is corresponding to the economics subject, the straight several figures of straight number in straight number coordinate system are corresponding to subject, and the item of straight number is corresponding to factor, and the numerical value subitem in straight several is corresponding to factor numerical value, the coordinate axis of straight several coordinate systems of straight number is corresponding to factor, be factor axis, the numerical value of coordinate axis is applied to financial rate stock etc. corresponding to factor numerical value;

3, according to claim 1, the described straight number of claim 2, it is characterized in that directly counting statistical theory, the subject of statistical theory: the object that statistical theory is explained, subject is made up of factor, factor is explained by the factor numeral, it is the factor numeral, straight number is corresponding to subject, and the straight several figures of straight number in straight number coordinate system are corresponding to subject, and the item of straight number is corresponding to factor, numerical value subitem in straight several is corresponding to factor numerical value, the coordinate axis of straight several coordinate systems of straight number is corresponding to factor, i.e. factor axis, and the numerical value of coordinate axis is corresponding to factor numerical value;

4, according to claim 1, straight number physics theory is characterized in that, the subject of physics theory: the object that physics theory is explained, subject is made up of factor, factor is explained by the factor numeral, it is the factor numeral, straight number is corresponding to subject, the straight several figures of straight number in straight number coordinate system are corresponding to subject, the item of straight number is corresponding to factor, and the numerical value subitem in straight several is corresponding to factor numerical value, and the coordinate axis of straight several coordinate systems of straight number is corresponding to factor, be factor axis, the numerical value of coordinate axis is corresponding to factor numerical value;

5, according to claim 1, straight number chemical theory is characterized in that, the subject of chemical theory: the object that chemical theory is explained, subject is made up of factor, factor is explained by the factor numeral, it is the factor numeral, straight number is corresponding to subject, the straight several figures of straight number in straight number coordinate system are corresponding to subject, the item of straight number is corresponding to factor, and the numerical value subitem in straight several is corresponding to factor numerical value, and the coordinate axis of straight several coordinate systems of straight number is corresponding to factor, be factor axis, the numerical value of coordinate axis is corresponding to factor numerical value;