CRYPTO NEWS

The Benefits and Potential of Move-to-Earn Apps Like MoveZ

MoveZ

  • Move-to-earn apps have become popular.
  • MoveZ has entered the market to rival STEPN and Sweatcoin.
  • The app’s initial DEX offering (IDO) is set for this May.

Being fit can be rewarding, but motivation can be a challenge. This is where move-to-earn apps come in. These platforms incentivize users to be active by rewarding them with cryptocurrency. These apps have become popular, with examples like STEPN and Sweatcoin enjoying success.

A new player has entered the market. MoveZ is a move-to-earn platform that aims to resolve the challenges faced by its predecessors. Users earn rewards by engaging in physical activity, including jogging, running, swimming, cycling, surfing, and more, representing a massive step up from other platforms.

How Does MoveZ Work?

MoveZ promotes fitness by rewarding users with crypto for their efforts. Several unique value-added features, including the “burn-to-earn” concept, help set MoveZ apart from its competitors. For example, “boost zones” offer users the opportunity to participate in social fitness events and earn boosted rewards.

There are also organizational accounts, which allow workplaces, groups, and communities to organize their sub-accounts and share access to NFTs. In the coming months, expect a strong lineup of non-crypto partners to integrate the app.

MoveZ also has competitive and relaxed options to cater to different types of users. Local and global leaderboards help users go head to head to maximize their fitness and rewards.

MoveZ is powered by BlueZilla, which has a track record of success in the cryptocurrency world. BlueZilla has launched one-third of the best-performing IDOs of all time.

What Does the Future Hold for MoveZ?

With a market cap of just $55,000, versus STEPN’s $2 billion, MoveZ has a lot of room for potential growth. And that growth will be shown when MoveZ’s IDO takes place in May across several exchanges, including BSCPad, MetaVPad, GameZone, and PolyPad.

80,000 users have already been whitelisted for the project, indicating a massive ready and waiting user base. Similarly, the app’s Twitter and Telegram channels have ballooned to over 100,000 combined users in just a few days.

This, combined with MoveZ’s competitive features and BlueZilla’s track record, suggests that the platform has a lot of potential!

RLWE Explanation

In RLWE, we often choose the following polynomial ring, where q is a prime, and n is a power of 2, e.g. $2^k$ $$mathbb Z_q[X]/(X^n + 1)$$ We know that ${X^{2^k}} + 1$ is an irreducible polynomial under $Z$, because of Cyclotomic Polynomial, but in this question, Considering $$mathbb Z_{17}[X]/(X^4 + 1)$$ $(X^4 + 1)$::Listen

In RLWE,
we often choose the following polynomial ring,
where q is a prime,
and n is a power of 2, e.g. $2^k$
$$mathbb Z_q[X]/(X^n + 1)$$

We know that ${X^{2^k}} + 1$ is an irreducible polynomial under $Z$,
because of Cyclotomic Polynomial,
but in this question,
Considering $$mathbb Z_{17}[X]/(X^4 + 1)$$
$(X^4 + 1)$ can be factorized into $$mathbb (X^2 + 4)(X^2 – 4) = X^4 – 16 = X^4 + 1$$
because of $Z_{17}$, moreover it can even be factorized into $(x + 15)(x + 9)(x + 8)(x + 2)$ under $Z_{17}$

Then why would we need to choose an irreducible polynomial like ${X^{2^k}} + 1$ at the first place when it is reducible under $Z_q$, moreover what are the advantages of choosing ${X^{2^k}} + 1$ as our ideal, and does choosing a large enough prime q(much larger than 17) prevents the above scenario from happening?

Thanks!

The Benefits and Potential of Move-to-Earn Apps Like MoveZ

Shopping cart
There are no products in the cart!
Continue shopping
0