Red Tiger releases NFT Megaways TM, the globe’s first NFT-based slot game

Red Tiger, an award-winning casino game and software provider, and part of Evolution Gaming. Today, announced their release of NFT Megaways^TM.

NFT Megaways^TM is the world’s initial slot game to integrate non-fungible tokens (NFTs).

NFT Megaways^TM is a game that features four CryptoPunks, some unique curious characters that are created by Larva Labs who are among the earliest examples of non-fungible tokens (NFTs). The Evolution Group purchased Red Tiger’s artworks earlier this year, with the proof of ownership being kept on Ethereum’s blockchain.

This one-of-a-kind online crypto type game was heavily inspired by heavy interest in cryptocurrencies, along with the trading of unique and digital-only assets. This slot game features four of Evolution’s CryptoPunks assembling on the slot reels to multiply – repeatedly – with a player benefiting from the value of the cash prize on offer.

The 6-reel, 7-row NFT Megaways^TM is one of those slot games that bring about a unique and thrilling crypto pixelated environment that would be instantly familiar, especially to persons who’ve keenly followed the rise and progress of non-fungible tokens. At the heart of NFT Megaways^TM are CryptoPunks 914, 3008, 4701 and 8143. These are 4 distinctive, diverse and some of the weirdest looking characters.

The primary aim of NFT Megaways^TM is simple: Get the brats, win the cash! The four CryptoPunks here do act as WILD symbols that can land only on the CryptoPunks Bar and go along to substitute for the entire paying symbols.

The moment a CryptoPunk gets to land on the bar and takes part in a win that has low-paying symbols, the CryptoPunk will go ahead and collect them. This then makes the CryptoPunk’s multiplier to increase by 1x for every low-paying symbols that’s collected. The multipliers can increase all the way up to 30x, and up to 2 CryptoPunks have a possibility of landing in the same spin. Should 2 CryptoPunks take part in the same winning way, it means that their multipliers will be multiplied by each other.