Some protocols usually provide returns in the http://fernandohqaj880.almoheet-travel.com/1-bitcoin-fee-estimator-and-calculator-2022-updated form of other tokens, where users need to manually claim, sell the tokens and compound them to their initial deposit. The APY shown will then be the yield that depositors can expect to receive if they manually compound on a daily or weekly basis. APY, short for annual percentage yield, measures the rate of return when users deposit their funds into different lending and yield farming protocols. APY includes the effects of compounding interest, which can transform low daily or hourly returns into massive amounts over time. Since APY reflects the return on investment over a year, you should only expect to receive the advertised rates if your funds are deposited over that time horizon. Returns may also vary at any moment due to a multitude of factors such as token price and additional token incentives.
To use the mining calculator for profitability, enter the hashrate for your crypto miners for each of the supported mining algorithms. You can use our software to categorize all of your transactions, and will only need to proceed to payment once you want to view your tax report. We always recommend you work with your accountant to review your records.
The company says it has over 500,000 users and tracks over $20 billion worth of crypto assets across 25 blockchains and over 300 exchanges. Its user count has grown fivefold since April 2020 when it first amassed 100,000 users. Credit cards offer some of the lowest currency exchange rates. Card companies base their https://www.coinmama.com/crypto-calculator exchange rates on wholesale prices offered to bigger institutions, so you're bound to get a fair rate. You can simplify this process by using a crypto gains calculator. These work by aggregating your data and then automatically linking your cost bases to your sales, using accounting methods like FIFO or LIFO.
Yes, you do have to pay taxes on crypto since it is viewed as ‘Property’ by the IRS. Therefore, any transactions concerning cryptocurrencies are governed by the same tax principles applied to “Property” as per IRS Publication 544, Sales and Other Dispositions of Assets. The process where a taxpayer uses high-tech computers to validate cryptocurrency transactions while maintaining a public transaction ledger is called mining. According to the law, the fair market value of the cryptocurrency mined, as of the date of receipt, should be included in the taxpayer’s gross income. For the cryptocurrency listed on an exchange platform like Coinbase, the exchange rate is set by market supply and demand. It will be converted into the value of US dollars that it is worth at the time.
- A capital gain is realised if you dispose of an asset (e.g. Bitcoin) for a higher value than you acquired it.
- Below is a short list of some of the important terms pertinent to foreign currency exchange.
- They store crypto online in digital wallets provided bycrypto exchangesor purchasehardware walletsfor even better protection.
- These taxes apply even if you use crypto to make purchases, meaning you may be on the hook for sales tax plus taxes on any gains your crypto has made since you first bought or received it.
- Brock Pierce backed the entire loan for the house with bitcoin.
You want to compound for one year, with weekends excluded from the time . This means your figure will compound for 365 BUSINESS days, with an end date around 511 days from your start date, depending on when the weekends fall. The option to deduct weekends from the years, months, and days figure you've entered, allows you two options for compounding when excluding weekends. Let's look at each option with an example of a one-year calculation.
No minimum balance because everyone should have unparalleled access to fair, rewarding financial services. As history has shown, anything that a group of people in an economy attaches value to can be used as currency. The first "official" currency was minted in the seventh century BC by King Alyattes of Lydia in modern-day Turkey. For practical reasons, Lydian currency took on the form of a round coin, which became the first ever standardized unit of currency.
In addition, international airports normally have kiosks or stores for currency exchange. They are convenient, but they normally have the worst exchange rates and highest fees. Generally, the IRS taxes cryptocurrency like property and investments, not currency. This means all transactions, from selling coins to using cryptos for purchases, are subject to the same tax treatment as other capital gains and losses.
How to Use Crypto Profit Calculator Tool?
The Ethereum network has a native token, ETH, which serves as a means of payment for transactions. Additionally, Ethereum can be used to build Decentralized Autonomous Organisations, or DAO’s. The Ethereum network is also used as a platform to launch digital tokens. The project is seeking to expand its scalability by implementing a proof-of-stake consensus algorithm.
Your real mining income can be quite different from those calculated by any of these calculators. You must factor in halving as the cost to sustain mining goes up naturally, while the rewards surely go the other way. It may make mining unprofitable unless the coin appreciates countering the periodic cut in block reward. As long as you own both wallets there's no tax to pay on transfers. However, you still have to keep track of the original cost of the transferred coins and have sufficient proof of it.
Deducting weekends from time
Besides, CoinDesk has the option to convert crypto to fiat or crypto to crypto, and they have several cryptocurrencies for that process. Coindesk crypto converter focuses on determining the rates of exchange between major fiat currencies and cryptocurrencies. The platform is also a straightforward one as you can easily locate the conversion section and understand what is needed of you. To ensure that they have left little or zero room for error, Coindesk has made sure that its conversions have up to six decimal places. Currencies used in different countries are rarely, if ever, exactly equal in value. As a result, exchange rates exist to enable the equal exchange of currencies.
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"