Revision as of 21:02, 11 December 2017 editJkallassy (talk | contribs)32 editsmNo edit summary← Previous edit | Revision as of 21:11, 11 December 2017 edit undoJkallassy (talk | contribs)32 editsNo edit summaryNext edit → | ||
Line 3: | Line 3: | ||
As of December 2, the high selling cat was sold for $117,712.12 on that day. | As of December 2, the high selling cat was sold for $117,712.12 on that day. | ||
The virtual cats are breedable and carry a 256 bit distinct genome with unique DNA and different attributes that can be passed to offspring.<ref name=":0">{{Cite news|url=https://www.cnbc.com/2017/12/06/meet-cryptokitties-the-new-digital-beanie-babies-selling-for-100k.html|title=Meet CryptoKitties, the $100,000 digital beanie babies epitomizing the cryptocurrency mania|last=Cheng|first=Evelyn|date=2017-12-06|work=CNBC|access-date=2017-12-10}}</ref> Several traits can be passed down including cool down time (how much time is required before a cat can breed), whiskers, fur color and background color.<ref>{{Cite news|url=https://techcrunch.com/2017/12/03/people-have-spent-over-1m-buying-virtual-cats-on-the-ethereum-blockchain/|title=People have spent over $1M buying virtual cats on the Ethereum blockchain|last=Tepper|first=Fitz|work=TechCrunch|access-date=2017-12-10|language=en}}</ref> There are a total of 4 billion possible cats that can be bred.<ref name=":0" /> | The virtual cats are breedable and carry a 256 bit distinct genome with unique DNA and different attributes that can be passed to offspring.<ref name=":0">{{Cite news|url=https://www.cnbc.com/2017/12/06/meet-cryptokitties-the-new-digital-beanie-babies-selling-for-100k.html|title=Meet CryptoKitties, the $100,000 digital beanie babies epitomizing the cryptocurrency mania|last=Cheng|first=Evelyn|date=2017-12-06|work=CNBC|access-date=2017-12-10}}</ref> Several traits can be passed down including cool down time (how much time is required before a cat can breed), whiskers, fur color and background color.<ref>{{Cite news|url=https://techcrunch.com/2017/12/03/people-have-spent-over-1m-buying-virtual-cats-on-the-ethereum-blockchain/|title=People have spent over $1M buying virtual cats on the Ethereum blockchain|last=Tepper|first=Fitz|work=TechCrunch|access-date=2017-12-10|language=en}}</ref> There are a total of 4 billion possible cats that can be bred.<ref name=":0" /> These variations contain different phenotypes (what you see) and genotypes (what you don’t see). According to the companies website, CryptoKitties is a non-fungible token ERC #721 that is indivisible and unique. | ||
A group known as Axiom Zen innovation studio developed the game.<ref>{{Cite news|url=https://www.bloomberg.com/news/articles/2017-12-04/cryptokitties-quickly-becomes-most-widely-used-ethereum-app|title=CryptoKitties Mania Overwhelms Ethereum Network's Processing|date=2017-12-04|work=Bloomberg.com|access-date=2017-12-10}}</ref> Until November 2018, Axiom Zen intends to release a new CryptoKitty every 15 minutes,<ref name=":0" /> with the rest of supply determined by breeding of crypto-kitties. Crypto-kitties owners may put them up for sale for a price set in ethers. | A group known as Axiom Zen innovation studio developed the game.<ref>{{Cite news|url=https://www.bloomberg.com/news/articles/2017-12-04/cryptokitties-quickly-becomes-most-widely-used-ethereum-app|title=CryptoKitties Mania Overwhelms Ethereum Network's Processing|date=2017-12-04|work=Bloomberg.com|access-date=2017-12-10}}</ref> Until November 2018, Axiom Zen intends to release a new CryptoKitty every 15 minutes,<ref name=":0" /> with the rest of supply determined by breeding of crypto-kitties. Crypto-kitties owners may put them up for sale for a price set in ethers. |
Revision as of 21:11, 11 December 2017
CryptoKitties is a game that involves one of-a-kind digital kitties, cryptocurrency and users who buy, sell, and sire (breed) their digital kitties. CryptoKitties lets players buy and breed there digital one of a kind kitties on Ethereum’s underlying blockchain network. A test version of CryptoKitties was unveiled at ETH Waterloo on October 19 2017, the largest Ethereum hackathon in the world.
As of December 2, the high selling cat was sold for $117,712.12 on that day.
The virtual cats are breedable and carry a 256 bit distinct genome with unique DNA and different attributes that can be passed to offspring. Several traits can be passed down including cool down time (how much time is required before a cat can breed), whiskers, fur color and background color. There are a total of 4 billion possible cats that can be bred. These variations contain different phenotypes (what you see) and genotypes (what you don’t see). According to the companies website, CryptoKitties is a non-fungible token ERC #721 that is indivisible and unique.
A group known as Axiom Zen innovation studio developed the game. Until November 2018, Axiom Zen intends to release a new CryptoKitty every 15 minutes, with the rest of supply determined by breeding of crypto-kitties. Crypto-kitties owners may put them up for sale for a price set in ethers.
Reception
There are concerns that Cryptokitties is crowding out more serious, significant business that use the Ethereum platform. As of December 5, 2017 Etherscan has reported a sixfold increase in pending transactions on Ethereum since the game's release just a week earlier. "CryptoKitties has become so popular that it's taking up a significant amount of available space for transactions on the Ethereum platform," said Garrick Hileman, from the University of Cambridge.
References
- ^ Cheng, Evelyn (2017-12-06). "Meet CryptoKitties, the $100,000 digital beanie babies epitomizing the cryptocurrency mania". CNBC. Retrieved 2017-12-10.
- Tepper, Fitz. "People have spent over $1M buying virtual cats on the Ethereum blockchain". TechCrunch. Retrieved 2017-12-10.
{{cite news}}
: no-break space character in|title=
at position 63 (help) - "CryptoKitties Mania Overwhelms Ethereum Network's Processing". Bloomberg.com. 2017-12-04. Retrieved 2017-12-10.
- "CryptoKitties cripple Ethereum blockchain". BBC News. 2017-12-05. Retrieved 2017-12-11.