Vexing Hexes

[Garnfellow]

It's been a long time since high school geometry, but I'm not sure about T5's definitions of hexes.

"Hex size (or hex diameter) reflects the distance from the center of a hex to the center of an adjacent similarly sized hex" (37). A World Hex is 1,000 km, a Terrain Hex is 100 km, and a Local Hex is 10 km.

Again and again, Book 3 refers to the distance across a hex as the diameter. For example, "Each Single Hex is 1 km in diameter (from the center of the Single Hex to the center of an adjacent Single Hex)" (41).

So far so good. Book 1 describes a Terrain Hex as "6,500 square km" and a Local Hex as "approximately 65 square km" (41).

But here's a diagram of hexagon

a is the length of the side, R is the circumcircle radius, d is the long diagonal (2 R), r is the apothem, and S is the short diagonal (2 r). The distance from the center of a hex to the center of an adjacent hex is not 2 R, but 2 x apothem (2 r), or S, the short diagonal.

The area of a regular hexagon is 6 x apothem squared / square root of 3. The area of a Local Hex, then, should be 6 x (10/2)^2 / square root of 3, or 87 square km. The area of a Terrain Hex 8,660 (call it 8,700 sq km), and the area of a World Hex 870,000 km.

I believe this only affects the areas in Book 1 and not anything in Book 3. Or have I completely lost it?

 

[Garnfellow]

tl;dr version: the area of a 10 km Local Hex should be 87 sq km, instead of the 65 sq km given in Book 1. This is approximately 8,700 hectares or 21,500 acres. The area of a 100 km Terrain Hex should be 8,700 sq km instead of 6,500 sq km. The area of a 1,000 km World Hex is approximately 870,000 sq km. And the area of a 1 km Single Hex is approximately 1 sq km.

 

[Original_Carl]

Hexagon Calculator

This site helps me a lot with the math stuff on Hexes.

FWIW the area of a Single Hex (1km vertex to vertex) is .65km according to Pythagoras.

 

[Garnfellow]

Hexagon Calculator

This site helps me a lot with the math stuff on Hexes.

FWIW the area of a Single Hex (1km vertex to vertex) is .65km according to Pythagoras.

Yup, and that's likely why T5 gives 65 sq km as the area of a Local Hex. Trouble is, the length of vertex to vertex isn't equal to the distance between the center of a hex and the center of an adjacent hex.

 

[sudnadja]

It's been a long time since high school geometry, but I'm not sure about T5's definitions of hexes.

"Hex size (or hex diameter) reflects the distance from the center of a hex to the center of an adjacent similarly sized hex" (37). A World Hex is 1,000 km, a Terrain Hex is 100 km, and a Local Hex is 10 km.

Again and again, Book 3 refers to the distance across a hex as the diameter. For example, "Each Single Hex is 1 km in diameter (from the center of the Single Hex to the center of an adjacent Single Hex)" (41).

So far so good. Book 1 describes a Terrain Hex as "6,500 square km" and a Local Hex as "approximately 65 square km" (41).

But here's a diagram of hexagon

a is the length of the side, R is the circumcircle radius, d is the long diagonal (2 R), r is the apothem, and S is the short diagonal (2 r). The distance from the center of a hex to the center of an adjacent hex is not 2 R, but 2 x apothem (2 r), or S, the short diagonal.

The area of a regular hexagon is 6 x apothem squared / square root of 3. The area of a Local Hex, then, should be 6 x (10/2)^2 / square root of 3, or 87 square km. The area of a Terrain Hex 8,660 (call it 8,700 sq km), and the area of a World Hex 870,000 km.

I believe this only affects the areas in Book 1 and not anything in Book 3. Or have I completely lost it?

You haven't completely lost it, and T5 swaps the meaning of the size of a hex even within the same diagram. In this, the smaller hexes are supposed to be 100 meters center to center, and they are and that matches the scale on the page. The larger hexes are supposed to be 1km center to center, and they aren't - they are 500 meters outer radius, or 433 meters inner radius, making them 866 meters center to center.

 

[whartung]

The larger hexes are supposed to be 1km center to center,

If it's 10 hexes from center to center, and 100m center to center per hex, why is it not 1km for the larger hexes?

 

[sudnadja]

If it's 10 hexes from center to center, and 100m center to center per hex, why is it not 1km for the larger hexes?

The way it is drawn in the T5 diagram, it's not 10 hexes center to center for the larger hex, it's only 8.6 hexes - using the definition of size of a hex also on the same page, where the hex size is 2x that of the hex inner radius.

To make it clearer, I've drawn purple dashed circles with radius 200m, 300m, 400m and 433m. The (inner) diameter of a small hex is 100m, thus the larger hex inner diameter is only 8.66 smaller hex inner diameters across.

 

[sudnadja]

If it's 10 hexes from center to center, and 100m center to center per hex, why is it not 1km for the larger hexes?

I noticed this when programmatically generating hexes for transcribing real maps to Traveller style maps. The hex counts don't match between the programmatically generated maps and those included in T5, this a 100m/1km hex pattern - I drew circles radius of 50 meters and 1000 meters of adjacent hexes. The center of each hex falls on the 1000 meter radius circle of the other, confirming that these are real 1000m hexes per the definition in T5. Yet the number of smaller hexes making up the larger ones is not the same as in T5. T5 flips the definition of hex size within the same page, the 100 m hexes are inner radius, the 1000 m hexes are outer radius (which makes it not 1000 meters center to center for them)

 

[Commander Truestar]

Hi,
While I enjoyed reading through this thread, I would say it is academic....and not in the "long time since high school geometry" meaning.

While I can say the US population = N number of people per square mile, that average does not mean anything regarding local density. The population density of the state of New Jersey is much greater than that of the State of Alaska.

Just you have to determine the density of a world, to use its size and determine the local gravity, you need to determine the variations in local population per hexagon before you can correctly assign population to any given hex.

That is, except for those populations which are all in one location.

 

[sudnadja]

Hi,
While I enjoyed reading through this thread, I would say it is academic....and not in the "long time since high school geometry" meaning.

While I can say the US population = N number of people per square mile, that average does not mean anything regarding local density. The population density of the state of New Jersey is much greater than that of the State of Alaska.

Just you have to determine the density of a world, to use its size and determine the local gravity, you need to determine the variations in local population per hexagon before you can correctly assign population to any given hex.

That is, except for those populations which are all in one location.

The way I handle this is I have a set of population densities and how they map to the different terrain types. A city has a density of > 10000 people / km^2, a suburb is 3000 - 9999, Rural is 10 to 999, what have you. At the world hex scale almost nothing would be a city hex, the population of the hex would have to be at least 8.6 billion. If you want to show a city that is present though, you then subdivide the hex into subhexes (via the T5 method, but correctly implemented). A 100 km hex would need a population of 86 million within it, and a 10 km hex would need only 866,000. At a close enough resolution, of course, you can differentiate between low density parks within a high density city such as the Imperial Park in the center of Cleon.

 

[WizWom]

You haven't completely lost it, and T5 swaps the meaning of the size of a hex even within the same diagram. In this, the smaller hexes are supposed to be 100 meters center to center, and they are and that matches the scale on the page. The larger hexes are supposed to be 1km center to center, and they aren't - they are 500 meters outer radius, or 433 meters inner radius, making them 866 meters center to center.

View attachment 4751

yeah, that circumscribed circle is obviously wrong. They wanted an inscribed circle for center to center distance.
1 across the flats is the distance from center to center, across the corners will be 2/root 3 of that, about 1.155.
the square area is a flats distance times a half flat and a half corner (just use the line labeled 866, and move those triangles to the east end, you'll see). So, if you have 1000 km hexes, then you get 1000 x (500+577.4) ~ 1,077,350 km^2