# Complicated Monetary Systems 処理...

Nowadays it is so simple to calculate a daily life transaction. Each country has a national currency, with different names but basically the same units, and eventually a subdivision, like a penny for a pound or a cent to a dollar, usually 1/100. But it was a time when the monetary system was much more complicated than a simple division by 100. For example, if you need to pay a dollar and 39 cents, you know that you can pass 5 quarters and receive back one cent and one dime. Or you can pass two dollars and you receive 1 half and two nickels and a cent…

The Greeks had a much more complicated system. The currency was a talant- a unit of weight around 26-28 kilograms…

Normally, no coins of this kind exist… but when you went to buy something you use the subdivision. One talant was equal to 60 “mina” and each mina to 100 drachm. The drachm was a coin around 4,5 gr, in normal standards. And it was also divided in 6 obols, or 3 halfobols, or 2 thirdobols. And of course the silver drachm wasn’t equal to the gold drachm. Complicated? Not as in Roman times…

The Romans used a silver-gold ratio. One aureus was 1/72 the weight of the standard unit of monetary measure, the “livra” – or pound.

It was equal to 25 denarii, minted in silver. Of course, half denarii and half aureii were minted.

One denarius was equal to 4 copper sestertius and one sestertius to 2 dupondius or 4 asses. The as and the dupondius was the same size but on the dupondius the emperor had a radiate crown and not laurels. One as was also divided in 2 semis or 4 quadrans. So one aureus =25 denarii=100 sestertii=200 dup as=800 semis=1600 quadrans. Simple? Try to calculate how many aureus you have if you own 47 copper asses…

In medieval France, the most valuable coin was “the gold louis”- louis d’or. It was made from gold and had some halves or double louis… it was divided in 4 ecu, minted in silver and each ecu was equal to 6 livres made from silver. One livre was equal to 20 sols and each sols was equal to 12 denier. But was also equal to 4 liard, so the liard:denier ratio was 1:3

Or simpler

1 louis d’or=4 ecu=24 livres=480 sols=1920 liards=5760 denier.

No problem, but only if you don’t have to work with coins all day and give the change…

In Britain, the system was somehow the same. One pound was equal to 20 shilling, each shilling to 12 pence and each pence to 3 farthing. So one pound is 240 pence or 720 farthings…

Russia had a similar problem. A rouble was made from silver. It was equal to 2 poltinik (“ half”) each poltinik was equal to polupoltinic (“half of half”). One poltinic was five grivna. A grivna was 3 altin and a kopeek and each kopeek was two denghi (“money”) or 4 polushka.

Peter the Great realized that the system was much too complicated and decided to take the rouble and the kopeek as the new units, in a ratio of 1:100. So a poltinik was 50 kopeek, a polupoltinik 25, a grivna 10, an altin 3, and denghi was ½ while the polushka was ¼ of a kopeek.

Now, by replacing the name of a coin with a numeral, everything became simpler and soon, every country in the world adopted the subdivisionary system.

Stefan Vasilita

Nowadays it is so simple to calculate a daily life transaction. Each country has a national currency, with different names but basically the same units, and eventually a subdivision, like a penny for a pound or a cent to a dollar, usually 1/100. But it was a time when the monetary system was much more complicated than a simple division by 100. For example, if you need to pay a dollar and 39 cents, you know that you can pass 5 quarters and receive back one cent and one dime. Or you can pass two dollars and you receive 1 half and two nickels and a cent…

The Greeks had a much more complicated system. The currency was a talant- a unit of weight around 26-28 kilograms…

Normally, no coins of this kind exist… but when you went to buy something you use the subdivision. One talant was equal to 60 “mina” and each mina to 100 drachm. The drachm was a coin around 4,5 gr, in normal standards. And it was also divided in 6 obols, or 3 halfobols, or 2 thirdobols. And of course the silver drachm wasn’t equal to the gold drachm. Complicated? Not as in Roman times…

The Romans used a silver-gold ratio. One aureus was 1/72 the weight of the standard unit of monetary measure, the “livra” – or pound.

It was equal to 25 denarii, minted in silver. Of course, half denarii and half aureii were minted.

One denarius was equal to 4 copper sestertius and one sestertius to 2 dupondius or 4 asses. The as and the dupondius was the same size but on the dupondius the emperor had a radiate crown and not laurels. One as was also divided in 2 semis or 4 quadrans. So one aureus =25 denarii=100 sestertii=200 dup as=800 semis=1600 quadrans. Simple? Try to calculate how many aureus you have if you own 47 copper asses…

In medieval France, the most valuable coin was “the gold louis”- louis d’or. It was made from gold and had some halves or double louis… it was divided in 4 ecu, minted in silver and each ecu was equal to 6 livres made from silver. One livre was equal to 20 sols and each sols was equal to 12 denier. But was also equal to 4 liard, so the liard:denier ratio was 1:3

Or simpler

1 louis d’or=4 ecu=24 livres=480 sols=1920 liards=5760 denier.

No problem, but only if you don’t have to work with coins all day and give the change…

In Britain, the system was somehow the same. One pound was equal to 20 shilling, each shilling to 12 pence and each pence to 3 farthing. So one pound is 240 pence or 720 farthings…

Russia had a similar problem. A rouble was made from silver. It was equal to 2 poltinik (“ half”) each poltinik was equal to polupoltinic (“half of half”). One poltinic was five grivna. A grivna was 3 altin and a kopeek and each kopeek was two denghi (“money”) or 4 polushka.

Peter the Great realized that the system was much too complicated and decided to take the rouble and the kopeek as the new units, in a ratio of 1:100. So a poltinik was 50 kopeek, a polupoltinik 25, a grivna 10, an altin 3, and denghi was ½ while the polushka was ¼ of a kopeek.

Now, by replacing the name of a coin with a numeral, everything became simpler and soon, every country in the world adopted the subdivisionary system.

Stefan Vasilita

このテキストは機械翻訳されています。 オリジナルを表示しますか？

この記事は役に立ちましたか？

1人がこの記事が役に立ったと感じました