JP2014235357A - Globe and world map - Google Patents

Abstract

PROBLEM TO BE SOLVED: To provide a globe that is easy to see the land on the earth and convenient to learn the flow of human history by using a solid structure on which a substantially polyhedral solid can simply be made at low cost.SOLUTION: A globe can clearly visualize distribution of culture by assuming a region supposed to have the oldest civilization in the human history, to be a polar circle of the earth, and at the same time, can easily show a continuous continent because a gathered portion of the land on the surface of the earth is located in the upper part of the globe. Also, assuming a point 1 to be a pole based on a line extending to connect the point 1 to a point 4 and a line extending to connect the point 1 to a point 2, a line assumed to be a meridian for dividing the earth into eight sections is provided, and a line (u), a line (mi) and a line (me) perpendicular to this line are assumed to be a base or a side of a substantially polyhedral solid, thereby forming a globe body in FIG. 1. Also, the globe can help learning geography, history, etc., by finding a geometric relationship depending on a line connecting points with each other.

Description

The present invention relates to a three-dimensional structure that can be easily produced, a globe and a world map using the same.

The principle of planetary grid proposed by William Becker and Beth Hagans. There is a combination of a regular dodecahedron and a regular icosahedron, which are bi-allelic bodies that can convert each other to a point, and geometrically captures the earth, but there are also 62 points on the earth with Egypt as point 1 However, Khufu's pyramid is a grid on the surface of the sphere, because there is a distance of 190 km, and because the north and south poles are up and down, there are important points on the equator. I am not trying to capture the Earth by deforming the sphere itself.

A dimming map of the world map characterized by not having the “correct upward direction” may be transformed into a regular icosahedron to form a solid. The present invention is also different from the present invention in that the point 1 is set at the top or the center and the icosahedron is not used. The dimming map is good in terms of knowing the continuity of the continent, but when the map was developed, the ocean was cut in a complicated way and the fit into the rectangle was poor.

A well-known globe is a model of a celestial body as a planet that constitutes the solar system as seen from space. Conventionally, in a normal globe, the poles at both ends of the earth axis of the globe of the globe are on the support base of the arc-shaped arm, and the earth axis is tilted by 23.4 degrees with the axis of rotation and the axis of rotation of the globe. It is supported by and is rotated by hand to reproduce the rotation of the earth. However, the support of this arm makes it difficult to see the parts of the North and South Pole, and because it is fixed to the arm with an axis, it is inconvenient to remove the sphere and check it, and it is expensive. There was volume and weight, and it was inconvenient for storage and transportation.

Therefore, conventionally, a technique has been proposed in which a polyhedron is formed using cardboard or the like without using a sphere, and this polyhedron is used as a globe instead of a sphere.

JP 2013-29542 A JP 2010-66703 A Japanese Patent Laid-Open No. 2003-15521 Japanese Patent Laid-Open No. 2001-2336012 JP 2007-328119 A Japanese Patent Application No. 2006-158941

However, the above-mentioned three-dimensional globe requires a heart material constituting the solid, reproduces the earth as a sphere, and reproduces that it rotates around the north and south poles.

The present invention is a terrestrial globe that is not seen as a model of a celestial body, but as an earth viewed by human beings living on the earth. For example, some of the maps sold in Australia are upside down from the world map known in Japan, with Australia as the center of the map and the southern hemisphere at the top. As this is the world seen from the viewpoint of a person living in Australia, the present invention is to provide a globe seen from the human side living on the earth. Emphasis was placed on the land area and human history.

The present invention has a demerit that the earth's axis is lost in the globe, that is, the North and South Poles are shifted, and the reproduction of rotation is almost lost. A new and easy-to-see globe.

Considering the pole of the earth as the position of the pyramid of King Khufu in Giza, Egypt, it was designated as point 1. In addition, the intersection of the prime meridian (Greenwich meridian), which is point 2, and the equator is point 2, and point 4 is found from the position of Stonehenge, an ancient ruin in England, and points 2 and 4 are connected to point 1, respectively. I looked for the line, and found the line (A) and the line (I) that passed the point 1 and made a round of the earth. (A) and (I) meet at a right angle at point 1.

Moreover, the distance from the point 1 to the point 4 is 3599 km. The same distance from the point 1 was provided on the lines (a) and (ii 2), and the points 5 points and 6 points 7 were set. Points with the same distance (3599 km) on the line passing through the midpoints of points 4 and 5, 5 and 6, 6 and 7, and 7 and 4 from point 1 are points 16, 17, 18, and 19, respectively. By providing it, the line (e) line (ki) line (ka) line (o), which was regarded as a meridian dividing the earth into eight parts, was provided at the center of point 1.

Sides that are close to a square surrounding point 1 (because it is on a sphere, it becomes a curve), points 4 and 5, 5 and 6, 6 and 7, 7 and 4, and points 16 and 17, 17 and 18, 18 Since the lengths of sides 19 and 19 and 16 are close to one-eighth of the earth's circumference, eight points that are more precisely one-eight are provided at points 4L, 5L, Eight points of 6L, 7L, 16L, 17L, 18L, 19L.

Assuming that point 20 on the opposite side (back side) of the earth of point 1 is another extreme point, as with eight points of point 1 and points 4L, 5L, 6L, 7L, 16L, 17L, 18L, 19L, In search of eight points surrounding 20, points 21, 22, 23, 24, 25, 26, 27, and 28 were provided.

The line corresponding to the equator when assuming point 1 and point 20 as the pole is the line (U), and the intersection of the line (U) and the eight lines assumed as the meridians connecting point 1 and point 20 is the point. Eight points of 8, 9, 10, 11, 12, 13, 14, 15 were provided.

The points and lines described above are the minimum necessary elements for obtaining a substantially polyhedral solid in the globe of the present invention.

In the globe and the world map of the present invention, what are referred to as “line” and “line” and “side” and “line” have the same meaning, and the term “line” here refers to connecting each point with a line. Say things.

The equator, latitude line, and meridian on the globe are imaginary lines that indicate the coordinate position, and there is no concept of thickness, but in the line here, "thickness" or "width" Is given.

In the globe and the world map of the present invention, the thickness and width of the line are set to 1/1000 of the target distance. For example, if the distance is 1 meter, the line is 1 mm in thickness and goes around the earth. In the line to do, if the circumference is 40,000 km, it is 1 / 40,000 km, and the width is 40 km. For example, since the line (99) has 9997.5 km, the width becomes 99975 km. Moreover, since the distance from the point 47 to the point 48 is 391.28 km, the line width is 391 meters.

In the globe and the world map of the present invention, the line has a symbol with hiragana and a symbol with no hiragana.

In the globe and the world map of the present invention, what is called “point” is an element for obtaining a substantially polyhedral solid in the globe of the present invention, and at the same time, it is a historical monument or ruins, It is also a singular point. For example, the point 37 is the position of the Xi'an drum tower in Xi'an City, Shaanxi Province of the People's Republic of China, but also means Xi'an City and its surroundings. Therefore, the area was given an area. If there is no area notation, the radius is 5 km with the coordinates as the center.

At each point, a name was arbitrarily given for convenience. For example, the Great Pyramid of King Khufu in Giza is the Khuf initial “K”. These are assumed to be meaningless except for ease of explanation and explanation.

The globe according to claim 1 is a globe, each point and each line, and each point and the earth's geographical and historical singularities (monumental buildings, ruins, culture, heritage) ) A globe with or without lines or ranges connecting or separating mountains, rivers, deserts, seas, lakes, etc.

The globe according to claim 2 is a line (A1) (A2) (I1) (I2) (I2) (E) (O) (ka) (corresponding to meridians when point 1 is regarded as a pole. It is a globe that has been deformed with the eight lines of (ki) as the vertical sides and the lines (u) (ha) (mu) (mi) (me) corresponding to the parallels and equator as the horizontal sides.

The globe according to claim 3 is a line (A1) (A2) (I1) (I2) (I2) (E) (O) (Ka) (corresponding to a meridian when point 1 is regarded as a pole. The shape is a cone, an octagonal pyramid, a quadrangular pyramid, with the eight lines of き) as the vertical sides and the lines (u), (mu), (mi) and (me) corresponding to the parallels and the equator as the horizontal sides. FIG. 10 (a), FIG. 11 (a), FIG. 12 (a), and FIG.

In addition, when the form is a quadrangular pyramid, for example, the four sides of the side (slope) are either the side (slope) of the line (a) or (i) or the center of the surface, and become the bottom. Is a surface obtained by transforming the four points 21, 22, 23, and 24, or the four points 25, 26, 27, and 28, into a square shape.

When the form is a quadrangular pyramid as shown in FIG. 10 (b), FIG. 11 (b), FIG. 12 (b), and FIG. Are globes in the form of octahedrons connected to each other, as shown in FIGS. 13 (b) and 12 (b). The shape is a cone in FIG. 10B, and an octagonal pyramid is in FIG. 11B.

The globe according to claim 5, wherein the globe is formed by connecting two at the bottom, and the globe having a shape in which the lower part of the side when the apex is moved up and down is cut horizontally is shown in FIG. 11 (c), 12 (c) and 13 (c).

The world map derived from the globe of claim 6 having a square, circular, or octagonal shape is a world map using equirectangular projection centered on point 1 as shown in FIG. A round world map, which is a square, has the form shown in FIG.

The globe and the world map using computer graphics according to claim 7 are Google
This is represented by Google Earth and Google Maps, which are virtual globe software provided by the company. For example, the contents as shown in FIG. 30 and the point 38 are the inner shrine of Ise Jingu Shrine, or if using computer graphics in incorporating detailed information.

It is also possible to hide or display various information when explaining lines, points, areas, and learning about geography and history.

In the globe according to claim 8, when the vertically long pyramid as shown in FIG. 12, the land and the sea are distorted, but by looking at different viewpoint angles, For example, in road markings on roads, characters and symbols are drawn on the road surface, but in order to improve the driver's visibility, as it is drawn vertically long, when projecting a map to a substantially solid, as it gets closer to the top This is a terrestrial globe in which distortion is corrected by placing the viewpoint close to the bottom surface when enlarged vertically.

10. The globe according to claim 9, wherein each point and a line that connects or separates geographical and historical singularities (monumental structures, ruins, cultures, heritage) mountains, rivers, deserts, seas, and lakes. The globes and maps that are characterized by not being described are the basic points and lines described here, and both the points and lines are in addition to those described and become complicated. End up. For example, in the map of Japan in FIG. 30, it is difficult to display a general globe size. In addition, displaying the line or map on the globe or the map makes it impossible to see the original map information. This can be solved by using computer graphics as described above. For example, a world map showing a limited theme, such as "Language distribution in the world" or "Homo-sapiens diffusion path", or a roughly polyhedral globe can be used. By making.

The globe according to claim 10, wherein when the shape is a sphere, the globe that can be used as a conventional globe is, as an example, a shaft having a function of rotating, as shown in FIGS. 18 (a) and 18 (b), This is possible by providing two pedestal fixing portions (A) and (B) to which the components shown in FIG.

The coordinates, name, area, area name, etc. from point 1 to point 73 are described below.
In the code column, only the coordinates are shown.

(Point 1) Latitude 29 ° 58'44.78 "N Longitude 31 ° 8'3.92" E Name K (Khufu pyramid apex)
Area In the narrow sense, the top of the Khufu pyramid (capstone) In the broad sense, the radius is 180 km.

(Point 2) 0 ° 0'00.00 "N 0 ° 0'0.00" E Name RAIL (Rail)
(Intersection of three lines of the Greenwich meridian, the equator and the second meridian)

(Point 3) 0 ° 0'00.00 "N 180 ° 00'00.00" E Name TRAIN (Train)
(Intersection of three lines of the 180th meridian, the equator and the second 180th meridian)


(Point 4) 51 ° 17'5.49 "N 1 ° 44'7.71" W Name SH (Stonehenge, UK)
The radius including the area to Stonehenge is 15 km.
The center of Stonehenge is 51 ° 10'43.98 "N 1 ° 49'34.37" W, so it is 13km away from point 4)
(Point 4L) 51 ° 29'50.27 "N 2 ° 22'8.17" W Name LSH
Area radius 15km

(Point 5) 45 ° 50'43.36 "N 67 ° 23'24.05" E Name JC
Area 5L radius 15km
(Point 5L) 45 ° 58'20.34 "N 68 ° 0'29.11" E Name LJC

(Point 6) 3 ° 35'1.52 "N 51 ° 5'2.30" E Name RS
Area 6L radius 15km
(Point 6L) 3 ° 12'36.03 "N 51 ° 19'53.40" E Name LRS

(Point 7) 7 ° 14'2.77 "N 6 ° 31'56.54" E Name AA
Area 7L radius 15km
(Point 7L) 6 ° 54'1.30 "N 6 ° 13'37.87" E Name LAA

(Point 8) 33 ° 38'41.31 "N 143 ° 22'38.64" E Name YAMATO (on the Pacific Ocean, about 400 km away from Tokyo)

(Point 9) 4 ° 42'39.22 "S 118 ° 21'2.33" E Name ER (Indonesia)

(Point 10) 42 ° 8'33.63 "S 89 ° 59'53.48" E Name CHI (Indian Ocean)

(Point 11) 59 ° 51'49.94 "S 20 ° 16'51.32" E Name SR (Antarctic Ocean)

(Point 12) 33 ° 34'56.23 "S 36 ° 31'47.81" W Name SAI (South Atlantic)

(Point 13) 4 ° 44'52.77 "N 61 ° 29'2.68" W Name WR (near Venezuela Guiana Highlands)

(Point 14) 42 ° 11'24.43 "N 89 ° 56'15.86" W Name TAI (Illinois, USA)

(Point 15) 59 ° 49'59.76 "N 159 ° 41'36.83" W Name NR (Alaska)

(Point 16) 62 ° 6'38.02 "N 37 ° 20'24.49" E Name KN (Republic of Karelia) North of K point
(Point 16L) 62 ° 32'4.56 "N 37 ° 30'18.13" E Name LKN

(Point 17) 22 ° 13'50.63 "N 66 ° 14'32.90" E Name KE (Pakistan Arabian Sea) East of K point
(Point 17L) 22 ° 3'30.08 "N 66 ° 40'10.10" E Name LKE

(Point 18) 2 ° 26'1.51 "S 28 ° 15'1.22" E Name KS (Near Rwanda)
(Point 18L) 2 ° 51'58.30 "S 28 ° 12'52.52" E Name LKS

(Point 19) 27 ° 47'0.31 "N 5 ° 50'38.96" W Name KW (west of Algeria) West of K point
) Point 19L) 27 ° 41'10.84 "N 6 ° 19'6.70" W Name LKW

(Point 20) 29 ° 58'44.98 "S 148 ° 51'56.85" W Name U (Back of the Earth of the South Pacific Ocean Pyramid of King Kuhfu)

(Point 21) 2 ° 52'20.98 "N 151 ° 48'49.04" W Name DOG (Dog) (behind LKS)

(Point 22) 27 ° 42'13.96 "S 173 ° 40'24.55" E Name CAT (Cat) (LKW point behind the earth)

(Point 23) 62 ° 31'52.42 "S 142 ° 27'10.79" W Name BIRD (Bird) (behind LKN)

(Point 24) 22 ° 4'47.11 "S 113 ° 19'19.91" W Name MOAI (Moai) (687km to Easter Island behind LBK)

(Point 25) 6 ° 54'13.22 "S 173 ° 46'24.52" W Name BAA (Backside of the earth at LAA point)

(Point 26) 51 ° 27'21.77 "S 177 ° 36'30.02" E Name BSH (behind LSH)

(Point 27) 45 ° 58'24.68 "S 111 ° 59'47.73" W Name BJC (Back side of LJC)

(Point 28) 3 ° 12'37.61 "S 128 ° 40'13.81" W Name BRS (behind LRS)

(Point 29) 0 ° 1'18.08 "S 121 ° 1'48.31" E Name MILK (Milk)

(Point 30) 0 ° 6'25.98 "N 58 ° 49'36.67" W Name HONEY (Honey)

(Point 31) 38 ° 0'31.14 "S 94 ° 35'39.88" E Name NANTO (southeast of Point 1)

(Point 32) 38 ° 3'42.42 "N 85 ° 19'33.61" W Name HOKUSE (northwest of Point 1)

(Point 33) 37 ° 56'56.42 "N 147 ° 29'4.99" E Name HOKUTO (Northeast of Point 1)

(Point 34) 37 ° 53'36.02 "S 32 ° 25'59.19" W Name NANSE (southwest of Point 1)

(Point 35) 0 ° 9'48.43 "N 53 ° 22'48.66" E Name SURYA (Surya)

(Point 36) 53 ° 5'49.09 "N 7 ° 45'53.66" W Name OFFARY (Offaly)

(Point 37) 34 ° 15'42.30 "N 108 ° 56'19.82" E Name XI'AN (Xi'an) Drum Tower in Xi'an, China
Area radius 10km (distance to the Great Tower is 5.2km)

(Point 38) 34 ° 27'17.93 "N 136 ° 43'32.16" E Name ISE (Ise Jingu Naiku)

(Point 39) 14 ° 23'52.88 "N 104 ° 40'49.29" E Name PREAH (Thailand-Cambodia border "Preah Vihear Temple")
Area radius 50km (same as point 44 Nasca on the back side)
(Sundaland Ayutthaya Dynasty Myson Sanctuary to Angkor Wat and radius 100km)

(Point 40) Area 3km radius (distance to the north foot) Name YELLOW

(Point 41) 19 ° 53'15.17 "N 86 ° 5'40.49" E Name KONARK (Konark)
(Suriya Temple, the Sun God of Konark, Orissa, India)

(Point 42) 73 ° 42'56.39 "N 137 ° 8'0.47" E Name STAR (near Stolbovoj Island, Russian Arctic)
Area radius 20km

(Point 43) 50 ° 37'34.47 "N 114 ° 0'25.60" E Name MONGO (Starting point of the Mongolian Empire)
Area radius 20km

(Point 44) 14 ° 36'44.36 "S 75 ° 9'45.12" W Name NASU (Nasca Lines and Surroundings)
Area radius 50km (same as point 39 on the back side Preah Vihear)

(Point 45) 37 ° 31'18.20 "N 136 ° 30'26.23" E Name WLTV (World Line Triangle vertex)

(Point 46) 32 ° 54'46.30 "N 129 ° 39'26.15" E Name WLTW

(Point 8) 33 ° 38'41.31 "N 143 ° 22'38.64" E Name YAMATO = WLTE
A triangle is formed at a point 45 (WLTV) and a point 46 (WLTW) and a point 8 (YAMATO).
YAMATO points also serve as WLTE points.

(Point 47) 37 ° 20'18.52 "N 136 ° 44'17.02" E Name JOTV
(Japan Original Triangle vertices)

(Point 48) 35 ° 22'33.93 "N 140 ° 21'37.81" E Name JOTE (Kazusa Ichinomiya Tamae Shrine)

(Point 49) 35 ° 24'45.87 "N 133 ° 5'5.59" E Name JOTW (Matsue City, Shimane Prefecture)

(Point 50) 19 ° 41'32.51 "N 98 ° 50'36.76" W Name TEOTI (Teoti) (Pyramid of the sun)

(Point 51) 90 ° 00'00.00 "N No longitude 0 ° 0'0.00" E Name North Pole

(Point 52) 90 ° 00'00.00 "S No longitude 0 ° 0'0.00" W Name South Pole

(Point 53) 63 ° 29'60.00 "S 138 ° 0'0.00" E Name South Pole (April 2013 Google Earth)

(Point 54) 82 ° 17'57.57 "N 113 ° 24'3.70" W Name North Pole (April 2013 Google Earth)

(Point 55) 20 ° 16'22.85 "S 30 ° 56'3.71" E Name Great Zimbabwe

(Point 56) 32 ° 53'11.91 "N 106 ° 20'14.77" W Name White Sands
(Tularosa Basin, New Mexico) Area 20km radius
(Point 57) 15 ° 9'23.90 "S 25 ° 50'49.96" E Name Zambia

(Point 58) 15 ° 9'24.02 "N 154 ° 9'10.15" W Name Waiha

(Point 59) 30 ° 9'37.66 "N 106 ° 52'41.11" E Name Center village

(Point 60) 35 ° 26'56.71 "N 136 ° 43'47.21" E Name Kitajogase, Gifu City

(Point 60Gifu) 35 ° 23'31.60 "N 136 ° 43'20.83" E On the site of Gifu Prefectural Government

(Point 61) 33 ° 27'58.84 "N 136 ° 30'21.48" E (2 kilometers east of the midpoint of the line consisting of 46 and 8)

(Point 62) 41 ° 9'27.97 "N 126 ° 13'33.98" E Name Gogu

(Point 63) 48 ° 7'40.54 "N 90 ° 0'0.00" E Name Shige
A point between 5334 km from the equator and 4670 km from the North Pole.


(Point 64) 48 ° 8'10.66 "S 90 ° 0'0.29" W Name Tom

(Point 65) 35 ° 52'55.73 "N 76 ° 30'48.46" E Name K2Kara (Karakorum Mountains K2)
Area radius 10km

(Point 66) 36 ° 41'40.85 "N 155 ° 4'58.84" W Name dog regress

(Point 67) 15 ° 56'10.15 "S 139 ° 22'36.06" E Name Cat regress

(Point 68) 81 ° 52'54.36 "S 6 ° 53'32.55" W Name Bird regress

(Point 69) 7 ° 5'39.75 "S 81 ° 50'50.95" W Name Moai regress

(Point 70) 24 ° 37'33.74 "N 108 ° 42'16.62" W Name Brs regress

(Point 71) 18 ° 4'52.84 "N 162 ° 59'3.11" E Name Baa regress

(Point 72) 54 ° 20'57.70 "S 120 ° 17'44.80" E Name Bsh regress

(Point 73) 44 ° 52'35.40 "S 63 ° 10'37.20" W Name Bjc regress

Although the minimum necessary elements for obtaining a substantially polyhedral solid in the globe of the present invention have been described above, the historical and geographical monuments and ruins of human beings intended by the present invention, and topographical anomalies Since it is possible to learn points etc. from a different perspective than before, it is necessary to describe points and lines in the embodiment, and it also explains the present invention, so some examples are captured. It will be added as.

In addition, the “points” and “lines” listed here are coincidental, but they represent geometric relationships and are also interesting discoveries on the map. Also related. Since it is useful for learning while associating geography and history, some examples are described.

About point 2 (RAIL) line (a). Line (A) is from intersection 2 (RAIL point) of the Greenwich meridian and the equator,
Passes Khufu's pyramid point 1, passes point 5, point 45, point 8, 180 ° meridian and equator, point 3 (Train point), passes point 20 (behind 1), point 12 Go around the earth. Tilt about 47.97 ° to the equator. Line (I) passes through point 4 (Stonehenge, England) at right angles with (a) and point 1 (Khufu's pyramid). (Point 4 and Stonehenge have a distance of 13.4 km, but the SH area has a radius of 15 km. The ecliptic is inclined about 23 degrees 26 minutes with respect to the celestial equator. When expressed in a globe, the intersection of the equator and the Greenwich meridian where the longitude and latitude of the earth are 0 ° is used as the starting point of the equinox in the celestial sphere. , The intersection of the meridian and the equator, expressed as the starting point.

Point 29 and point 30 are the intersections of the equator and the line. The line corresponding to the equator when two points are regarded as poles passes through the four points of the point 1 Khufu pyramid, point 51 north pole, point 52 south pole, and point 20. In addition, this line is a line that runs from point 1 to the north and south.
31 ° 8'E Meridian 148 ° 51'W

FIG. 24 shows the point 8 viewed from directly above. The largest circle corresponds to the equator when the point 8 is a pole. The circle with the number of the touching sign means that it passes on this line. For example, the point 4 is the back side of the sphere as shown in FIG. This is an image of the boat-shaped multi-conic projection divided into four parts.

As shown in FIG. 28, FIG. 29 and FIG. 30, the line connecting the line (ni) and the points 4 and 45 is axisymmetric with respect to the axis of symmetry (a). A) is symmetrical with respect to the axis of symmetry. Between point 1 and line A (point 1) connecting point 48 and the vicinity of Japan, the distance at point 48, which is almost parallel, is 5.61 km away, but is the same at point 1. It passes Komaso Ichinomiya Tamamae Shrine, Torigoe Shrine, Shinobazu Pond, Mt. Yatei, Mt. Myogi, Mt. Asama, Mt. Kaminami in Nagano City, Mt. Hakuba Norikura, Mt.
On the map, the line (Nu) is called from the east to the west, that is, the Goraikou line. Since point 51 is the North Pole and point 52 is the South Pole, it intersects with (Nu) at a right angle. In other words, the triangle consisting of the points 47, 49, 48 is an exact isosceles triangle, and there is an Ise Jingu (Uchinomiya) on the extension of the line connecting the apex angle 47 and the midpoint 60 of the base, and above and below the north pole. Reach the South Pole. The map line (Nu) reaches point 6 (RS) from Kazusa Ichinomiya Tamae Shrine, but is parallel to the latitude line until Izumo Taisha Shrine. The latitude of the three points is the latitude of point 60 latitude 35 ° 26'56.71 "N point 48 Tamamae Shrine
35 ° 22'33.96 "N 35 ° 24'6.92" N from Izumo Taisha. Only the point 60 has a slightly higher latitude. Although it is possible to make it an error range, a point 60Gihu is provided to make it parallel to the latitude line. (Location of Gifu Prefectural Office) Latitude is 35 ° 23'31.60 "N. Distance to (Point 60) is 6.3km
Distance from point 47 to point 48 = 391.28km Distance from point 47 to point 49 = 391.27km Distance from point 60 to point 48 = 329.85km Distance from point 60 to point 49 = 330.99km Point 60 from Gihu to point 48 Distance = 330.501km Distance from point 60Gihu to point 49 = 330.389km

As shown in FIG. 25, it is a conceptual diagram seen from right above the earth when point 4 (Stonehenge, England) is seen as a pole, and the largest circle is the equator when point 4 is taken as a pole. Is a line corresponding to. Line (Chi) intersects with Rain (T) at point 8 and point 12, and is the farthest away on line (I). The distance is about 210km
Line (Chi) is a line extending point 18 connecting point 17 and point 5 and a line extending point 7 connecting point 7 and 17 ° 23'56.75 "N 114 ° 24'25.00" W point and 17 ° 25 ' 30.41 "S 65 ° 25'50.07" Three lines intersect at two points, point E

As shown in FIG. 33, the line connecting points 35 and 36 is 8114 km, which is about one fifth of the earth's circumference. The line connecting the points 16L and 17L is 5009 km, which is one eighth of the circumference of the earth. Lines 4L-5L, 5L-6L, 6L-7L and 7L-4L surrounding point 1 and four lines 16L-17L, 17L-18L, 18L-19L and 19L-16L similarly surround point 20 The line consisting of points 21, 22, 23, 24 and 25, 26, 27, 28 and the cross section that bisects the earth form an octagon.

Generally speaking, the pyramids of Giza, Egypt, and the three major pyramids of ancient Egyptian Pharaohs Kufu, Kaffler, and Menkaure, are in the Nubian region of the Sudan territory. There is a pyramid.
The Meloe type (nubia) type mentioned here is a substantially polyhedral solid as shown in FIGS. 12 (a), (b) and (c).
FIG. 38 and FIG. 39 show an example in which a cross-sectional view from a side surface of a substantially polyhedral solid is derived from a pentagon and an octagon.

The area of the line surrounding the point 20 that is the bottom surface is almost the ocean.
Chatham Islands total area 963km2. Population 761 (1991)
Tonga Kingdom Population: 104,509 (2011) Total land area of Tonga Islands is about 697km2
Independent Samoa South Pacific (Oceania) total (2008) 179,000 people Area = 2831km2
American Samoa Grand total (2003) 70,260 people Total area 197km2
French Polynesia 273,777 (2011) Total area 4167km2
Niue (Niue, Niue) Population: 1,398 (2009) Total area 259km2
Cook Islands Population: 10,900 (June 2011) Area = 236 km2

In the case where the points 22 21 23 24 are corners of the bottom surface, Samoa Independent Country, American Samoa, and Chatham Islands are not included.
In either case, New Zealand, Fiji and Easter Island are not included.
The total land area of the Tonga Islands is approximately 697km2.
Independent State of Samoa area = 2831km2
American Samoa in the east is a small island such as the main island of Tutuila, where the main capital Pago Pago is located, and the eastern Manua Islands. Total area 197km2
The total land area (including uninhabited islands) included in the frame is less than 10,000 km2. This is less than 0.01% of the total land area (%).
When the bottom is made into a substantially polyhedral globe, it is enlarged and displayed. If there is no bottom, the area of the line surrounding the point 20 will be greatly distorted when it is made a world map, so it will be described in a part of the ocean.

The following are points that connect on the line.
The thickness and width of the line, which is 1/1000 of the target distance described in (0017), may not apply to the following.
Point 6
Point 6-Ajanta Cave Temples-Xi'an, Point 37-Point 45
Point 6-Seizan Suraman-Tamgari Point 6-Mohenjodaro-(Karakorum Mountains) K2-Gosai Castle-Mongolian Stone Circle-Itchinsky Volcano Point 6-Point 17-Orkhon Valley-Point 28-Point 24-Easter Island Point 6-Guge Ruins-Tammon Seki
Site 6-Birthplace of Shakyamuni-Beijing-Goguryeo Site 6-Chomoramma-Potala Palace 6-Ellora Caves-Ajanta Temples-Xi'an-WLTV
Point-6 Izumo Taisha-Former Ise-Mt. Fuji-Tamamae Shrine (Mikomi Line)
Point 6 ~ Pie ruins ~ Taiwan (moon-shaped stone pillar)
Point 6-Borobudur ruins-Besakih temple-Rinjani mountain (Indonesian islands)
Point 6-Pyramid of Nubia (Meroe)-Ruins of Napata region-Point 50 Pyramid of Teotihuacan 5L-Suleyama Suleiman To-Point 65 Karakoram Mountains K2-Guge Ruins-Point 41 Hindu Sun God (Konarak Surya Temple)
Point 5-Isle of Man-Dong Engas Point 5-Chomoramma-Borobudur Point 5-Tiricimir Mountain-Barmara-Golkonda Fort-Mediligiria-Polonnaruwa Point 5-Orhon Valley-Asama Mountain-Samukawa Shrine (Chiba)-Palmira Ruins-Point 1 Kufu King Pyramid = Line (Ah)
Point 5-Ropson-San Diego Point 5-Point 51 North Pole-Grand Canyon-Sedona Cathedral Rock Point 7-Cameroon Mountain-Point 57-Point 55 Great Zimbabwe Point 7-Kohunlich-Monte Alban Site 7-Richhat Structure (Sahara) Eyes)-Manhattan-Chaco culture-Sedona Cathedral Rock-San Diego point 4-Carnac stones-Altamira cave-Tissit point 4-Lourdes fountain-point 7
Point 4-Patterson-Rockville-Atlanta-Point 50
Point 1 to point 55 = south south of point 1.
Point 1-Mecca-Habara Ruins-Malibu Ruins-Point 31 = Southeast from Point 1

From the anthropological view of the world map in Fig. 15 and Fig. 16, the historically old region (Egyptian civilization, Mesopotamian civilization) is located in the center, so various historical steps and the distribution of languages, races, religions, etc. Since it is easy to understand when a figure is replaced, it is also effective for learning such as history.
Because it is a perfect circle and square, it is a good shape for an interior.

A globe with the shape of the Great Pyramid of Khufu as the apex, using the form of the Great Pyramid of Giza, which is the only existing structure in the world's seven wonders, as shown in Fig. 1 and Fig. 13 (a). And since various archaeological sites and geographical singularities are used as the elements that make up the form, you can learn geography and history happily.
It does not require a pedestal or rotating mechanism and can be easily developed. Moreover, since it is a simple and stable form, there is less concern about falling down or rolling.
Compared to a spherical globe, it is easier to see because it has a wider field of view, and most of it faces diagonally upward. Since the land on the earth occupies the top, it is easy to see the shape of the land and the chain of continents.
Anthropologically, the old part of history is at the top, so it is easy to understand when overlaying various history steps and language, race, religion, etc., so learning about history, etc. It is also effective.
As a school teaching material, it is easier to store than a sphere by making it a structure to assemble or by stacking, and it is easy to handle because it is in a stable form.
By creating a format as an expanded view, you can use your personal computer to create your own original globe. For example, it is possible to make various distribution maps, such as the distribution map of languages in the world, three-dimensionally easily and inexpensively.

An example of the perspective view of this invention. A perspective view of a sphere described by point 2, line (A) and line (I) It is explanatory drawing of each point by a world map (Merkattle projection) Illustration of each line, a, i, u, e, o, ka, ki, ke, by world map (Merkattle projection) Illustrations of each line, ku, ko, tat, chi, tsu, te, nan, ne, ne, ma, mi by world map (Merkattle projection) Explanatory drawing in the boat-shaped multi-cone projection which assumed 12 points every 30 degrees as if it were a point 1 pole. a and c are perspective views when point 1 is on the top. b is an illustration of point 1 as seen in FIG. a and c are perspective views when the point 20 is facing up. b is an explanatory diagram of the point 20 as seen in FIG. A perspective view of a sphere explaining points 29 and 30 A perspective view showing an example of an embodiment based on a cone A perspective view showing an example of an embodiment based on an octagonal pyramid The perspective view which shows an example of embodiment when it is based on a quadrangular pyramid (Melloe type) A perspective view showing an example of an embodiment based on a quadrangular pyramid A perspective view showing an example of when the line (a) and the line (i) become the hypotenuse and the center of the surface The top view which shows an example of the circular world map centering on the point 1. FIG. The top view which shows an example of the square world map centering on the point 1. FIG. A perspective view showing an example when the embodiment is a sphere Sectional drawing which shows an example of the globe which can use together the conventional globe and the globe of this invention. (a) is a figure which shows the horizontal side and part of a substantially polyhedron based on a quadrangular pyramid. (b) is a perspective view showing a substantially polyhedron based on (a). (a) is a figure which shows the horizontal side and part of a substantially polyhedron based on a quadrangular pyramid. (b) is a perspective view showing a substantially polyhedron based on (a). The top view which shows an example of the expanded view of the substantially polyhedron based on a quadrangular pyramid. Explanatory drawing of the concept showing the relationship between points and lines on the sphere in a plane Illustration of mainly line Illustration of point 8 Illustration of point 4 Illustration of points and lines Enlarged view of the center of (Fig. 26) Overhead view of points and lines around Japan Mainly, illustration of points 57, 58 and line Mainly explanatory drawing of points 47, 48, 49, 60, 38 (A) is a bird's-eye view of Stonehenge (b) is a top view and a line superimposed on (a) The figure which showed the line in the top view of Stonehenge The figure which shows the form and angle which consist of point 35 point 36 and the point 17L point 16L The figure which shows an example of the position of the line (u) line (me) by the sectional view of the pyramid of Kuhfu and the side view of the octahedron Image of a quadrangular pyramid with a base of 5000 km Image of Meloe type (Nubia type) Example of obtaining the shape of a substantially polyhedral cross section based on a quadrangular pyramid from a pentagon Example of obtaining the shape of a cross section of a polyhedron (Melloe type (Nubia type)) based on a pentagon to a quadrangular pyramid Example of obtaining the shape of a cross section of a polyhedron (Melloe type (Nubia type)) based on a quadrangular pyramid from an octagon.

(Embodiment 1)
An example of embodiments of the globe and the world map of the present invention will be described in detail with reference to the drawings. The globe of the present embodiment is obtained by projecting a map by deforming the globe, which is a sphere, into a substantially polyhedral solid based on each point and line determined as shown in FIG.

The globe can be configured as shown in FIGS. 10 (a), 11 (a), 12 (a), and 13 (a). In both cases, the bottom surface is based on the line. The vertex is point 1.

The globe can be configured as shown in FIGS. 10 (b), 11 (b), 12 (b), and 13 (b). In either case, the upper vertex is the point 1, the other vertex is the point 20, and the horizontal side of the side that bisects the solid is a line.

The globe can be configured as shown in FIGS. 10 (c), 11 (c), 12 (c), and 13 (c). In either case, the bottom is the line (the first) and the vertex is the point 1. In this case, the side that is a line in the above-described side is in any of the parallel positions, although the line (line) (see) is in parallel.

As shown in FIG. 14, the globe can be a case where the line (A) is a “side” or a “surface”.

As shown in FIGS. 19 and 20, the globe can make the land easier to see by partially enlarging or reducing the projection surface of the map.

As shown in FIG. 17, the globe is a globe with point 1 on top.

As shown in FIG. 18, the globe can be used as a conventional globe or a globe of the present invention.

As shown in FIG. 21, the globe can be formed into a substantially three-dimensional globe by assembling it as a plan development view. By using a format for personal computers, individuals can easily print and assemble their original globes.

The world map is an example of a circular world map as shown in FIG.

As shown in FIG. 16, the world map is an example of a square world map.

FIG. 22 is an explanatory diagram of a concept showing the relationship between points and lines on a sphere in a plane, and is an explanatory diagram of a concept in which the boat-shaped multiconic projection is divided into four parts every 90 degrees. 7 (b), FIG. 8 (b), FIG. 23, FIG. 24, FIG. 25, FIG.

1 (Point 1) Latitude 29 ° 58'44.78 "N Longitude 31 ° 8'3.92" E (Hereinafter, latitude and longitude are omitted.)
2 (Point 2) 0 ° 0'00.00 "N 0 ° 0'0.00" E
3 (Point 3) 0 ° 0'00.00 "N 180 ° 00'00.00" E
4 (Point 4) 51 ° 17'5.49 "N 1 ° 44'7.71" W
(Point 4L) 51 ° 29'50.27 "N 2 ° 22'8.17" W
5 (Point 5) 45 ° 50'43.36 "N 67 ° 23'24.05" E
(Point 5L) 45 ° 58'20.34 "N 68 ° 0'29.11" E
6 (Point 6) 3 ° 35'1.52 "N 51 ° 5'2.30" E
(Point 6L) 3 ° 12'36.03 "N 51 ° 19'53.40" E
7 (Point 7) 7 ° 14'2.77 "N 6 ° 31'56.54" E
(Point 7L) 6 ° 54'1.30 "N 6 ° 13'37.87" E
8 (Point 8) 33 ° 38'41.31 "N 143 ° 22'38.64" E
9 (Point 9) 4 ° 42'39.22 "S 118 ° 21'2.33" E
10 (Point 10) 42 ° 8'33.63 "S 89 ° 59'53.48" E
11 (Point 11) 59 ° 51'49.94 "S 20 ° 16'51.32" E
12 (Point 12) 33 ° 34'56.23 "S 36 ° 31'47.81" W
13 (Point 13) 4 ° 44'52.77 "N 61 ° 29'2.68" W
14 (Point 14) 42 ° 11'24.43 "N 89 ° 56'15.86" W
15 (Point 15) 59 ° 49'59.76 "N 159 ° 41'36.83" W
16 (Point 16) 62 ° 6'38.02 "N 37 ° 20'24.49" E
(Point 16L) 62 ° 32'4.56 "N 37 ° 30'18.13" E
17 (Point 17) 22 ° 13'50.63 "N 66 ° 14'32.90" E
(Point 17L) 22 ° 3'30.08 "N 66 ° 40'10.10" E
18 (Point 18) 2 ° 26'1.51 "S 28 ° 15'1.22" E
(Point 18L) 2 ° 51'58.30 "S 28 ° 12'52.52" E
19 (Point 19) 27 ° 47'0.31 "N 5 ° 50'38.96" W
(Point 19L) 27 ° 41'10.84 "N 6 ° 19'6.70" W
20 (Point 20) 29 ° 58'44.98 "S 148 ° 51'56.85" W
21 (Point 21) 2 ° 52'20.98 "N 151 ° 48'49.04" W
22 (Point 22) 27 ° 42'13.96 "S 173 ° 40'24.55" E
23 (Point 23) 62 ° 31'52.42 "S 142 ° 27'10.79" W
24 (Point 24) 22 ° 4'47.11 "S 113 ° 19'19.91" W
25 (Point 25) 6 ° 54'13.22 "S 173 ° 46'24.52" W
26 (Point 26) 51 ° 27'21.77 "S 177 ° 36'30.02" E
27 (Point 27) 45 ° 58'24.68 "S 111 ° 59'47.73" W
28 (Point 28) 3 ° 12'37.61 "S 128 ° 40'13.81" W
29 (Point 29) 0 ° 1'18.08 "S 121 ° 1'48.31" E
30 (Point 30) 0 ° 6'25.98 "N 58 ° 49'36.67" W
31 (Point 31) 38 ° 0'31.14 "S 94 ° 35'39.88" E
32 (point 32) 38 ° 3'42.42 "N 85 ° 19'33.61" W
33 (Point 33) 37 ° 56'56.42 "N 147 ° 29'4.99" E
34 (Point 34) 37 ° 53'36.02 "S 32 ° 25'59.19" W
35 (Point 35) 0 ° 9'48.43 "N 53 ° 22'48.66" E
36 (Point 36) 53 ° 5'49.09 "N 7 ° 45'53.66" W
37 (Point 37) 34 ° 15'42.30 "N 108 ° 56'19.82" E
38 (Point 38) 34 ° 27'17.93 "N 136 ° 43'32.16" E
39 (Point 39) 14 ° 23'52.88 "N 104 ° 40'49.29" E
40 (point 40) 35 ° 35'9.95 "N 109 ° 16'11.92" E
41 (Point 41) 19 ° 53'15.17 "N 86 ° 5'40.49" E
42 (Point 42) 73 ° 42'56.39 "N 137 ° 8'0.47" E
43 (Point 43) 50 ° 37'34.47 "N 114 ° 0'25.60" E
44 (Point 44) 14 ° 36'44.36 "S 75 ° 9'45.12" W
45 (point 45) 37 ° 31'18.20 "N 136 ° 30'26.23" E
46 (Point 46) 32 ° 54'46.30 "N 129 ° 39'26.15" E
47 (Point 47) 37 ° 20'18.52 "N 136 ° 44'17.02" E
48 (point 48) 35 ° 22'33.93 "N 140 ° 21'37.81" E
49 (Point 49) 35 ° 24'45.87 "N 133 ° 5'5.59" E
50 (point 50) 19 ° 41'32.51 "N 98 ° 50'36.76" W
51 (Point 51) 90 ° 00'00.00 "N No longitude 0 ° 0'0.00" E North Pole
52 (Point 52) 90 ° 00'00.00 "S No longitude 0 ° 0'0.00" W South Pole
53 (Point 53) 63 ° 29'60.00 "S 138 ° 0'0.00" E South Pole
54 (Point 54) 82 ° 17'57.57 "N 113 ° 24'3.70" W North Pole
55 (Point 55) 20 ° 16'22.85 "S 30 ° 56'3.71" E
56 (Point 56) 32 ° 53'11.91 "N 106 ° 20'14.77" W
57 (Point 57) 15 ° 9'23.90 "S 25 ° 50'49.96" E
58 (point 58) 15 ° 9'24.02 "N 154 ° 9'10.15" W
59 (Point 59) 30 ° 9'37.66 "N 106 ° 52'41.11" E
60 (point 60) 35 ° 26'56.71 "N 136 ° 43'47.21" E
(Point 60 Gifu) 35 ° 23'31.60 "N 136 ° 43'20.83" E
61 (Point 61) 33 ° 27'58.84 "N 136 ° 30'21.48" E
62 (Point 62) 41 ° 9'27.97 "N 126 ° 13'33.98" E
63 (point 63) 48 ° 7'40.54 "N 90 ° 0'0.00" E
64 (point 64) 48 ° 8'10.66 "S 90 ° 0'0.29" W
65 (point 65) 35 ° 52'55.73 "N 76 ° 30'48.46" E
66 (Point 66) 36 ° 41'40.85 "N 155 ° 4'58.84" W
67 (Point 67) 15 ° 56'10.15 "S 139 ° 22'36.06" E
68 (Point 68) 81 ° 52'54.36 "S 6 ° 53'32.55" W
69 (Point 69) 7 ° 5'39.75 "S 81 ° 50'50.95" W
70 (Point 70) 24 ° 37'33.74 "N 108 ° 42'16.62" W
71 (point 71) 18 ° 4'52.84 "N 162 ° 59'3.11" E
72 (point 72) 54 ° 20'57.70 "S 120 ° 17'44.80" E
73 (point 73) 44 ° 52'35.40 "S 63 ° 10'37.20" W

A = A line passing through points 1, 7, 5, 8, 3, 25, 20, 27, 12, starting from point 2 and going around the earth a 1 = Point 1 to point 8 on the line "a" And go to point 20.
A2 = Pass a point 12 from a point 1 on the line “A” to a point 20.
I = a line passing through point 4, starting from point 1, 6, 10, 26, 20, 28, 14 1 = from point 1 on point “i” through point 14 to point 20.
I 2 = from point 1 to point 10 on the line “i” to point 20.
U = Lines starting from point 8 and passing through 9, 10, 11, 12, 13, 14, and 15 Equivalent to the equator when point 1 is regarded as the pole of the earth
E = Line from point 1 to point 15 to point 20 = Line from point 1 to point 9 to point 20 = Line from point 1 to point 11 to point 20 = From point 1 A line passing through point 13 to point 20 = a line passing through point 37, 37, 40, 42, 32, 44, 31 = starting point 4 (strictly speaking, the center of Stonehenge 51 ° 10'43.98 "N 1 ° 49'34.37" W)
A line that passes through points 5, 39, 9, 26, 27, 44, and 13 = A line that passes through points 39, 20, and 44 starting from point 1 = A line that passes through points 44, 12, and 39 starting from point 8 Line 1 = Line corresponding to the equator when assuming point 4 as the polar point of the earth. Starting at point 8, passing through point 12, coordinate 17 ° 30'50.67 "N 114 ° 34'17.04" W coordinate 17 ° 25 ' 28.70 "S 65 ° 25'49.83" Lines passing through E = Lines connecting point 8 and point 36 = Lines connecting point 8 and point 35 = Starting from point 39, 15, 44, 11, There is a point 46 (WLTW) on the line extending from the point 45 (WLTV) to the point 50 (Teoti).
N = Line connecting point 6 to point 45 Passing through point 37 = Line connecting point 6 to point 48 JOTE Passing through point 49
Ne = point 4 (SH point) (strictly, Stonehenge center 51 ° 10'43.98 "N 1 ° 49'34.37" W)
Line connecting point 40 = point 57 point 59 point 38 point 58 line a = point 57 point 6 point 37 point 58 line a = point 57 latitude 26 ° 57'32.23 "N longitude 108 ° 7 The line connecting the point of '5.68 "E and the point 58 = the line corresponding to the north regression line when assuming the point 1 as the North Pole = the 90 ° meridian point 14 points 63 points 10 points 64 in the east and west.
This corresponds to the equator when point 2 and point 3 are considered as extreme points.
Pass through points 66, 67, 68, 69, 70, 71, 72, 73.
This line corresponds to the Southern Regression Line when Khufu's pyramid at point 1 is regarded as a pole (north pole).
It is a point of 7400km from the point 20, and the angle from the center of the earth is 23,43 ° (same as the inclination of the earth axis) from the line (U).
Mu = Points 5L, 17L, 6L, 18L, 7L, 19L, 4L, 16L The circular line of a circle with a radius of 3648km centering on Point 1 = Points 21L, 22L, 23L, 24L, 25L, 26L, 27L , Circle line with a radius of 3648km centering on point 20 connecting 28L

Claims (10)

The location and structure of the pyramid of Khufu in Giza, Egypt, the intersection of the Greenwich meridian (primary meridian) and the equator (at 0 ° latitude and 0 ° longitude), the ancient ruins of England, and the location and structure of Stonehenge, a ring stone , A globe characterized by each point and line derived from them. A terrestrial globe characterized by a deformed shape of the earth, which is a sphere based on points and lines.   The globe according to claim 2, wherein the shape is a cone, an octagonal pyramid, or a quadrangular pyramid.   4. The globe according to claim 3, wherein two globes having the same shape, an octagonal pyramid, and a quadrangular pyramid are connected at the bottom. 5. A globe having a form in which two are connected at the bottom surface according to claim 4, wherein the bottom of the side surface is cut horizontally when the apex is raised and lowered.   A world map in which the form derived from the globe according to claim 1 is a square, a circle, or an octagon.   7. The globe and world map using computer graphics according to claim 1 and the world map of claim 6. 4. The globe according to claim 3, wherein the land and the sea are distorted when a vertically long pyramid as shown in FIG. 12 is seen, but distortion is corrected by changing the viewpoint angle. The globe according to claim 1, wherein each point and a geographical and historical singularity (monumental structure, ruins, culture, heritage) are connected to and demarcating a mountain, river, desert, sea, lake. A globe and map characterized by things that may or may not be listed. 2. The globe according to claim 1, wherein when the shape is a sphere, the globe can also be used as a conventional globe.