So you can check the current rates, plan your investment, and make your purchase, all in one place. Therefore, the cryptocurrency calculator is most often used to check the benefits of buying or selling Bitcoin. You do not need to track the exchange rates of different coins on other platforms or calculate what result you will get in exchange. You can simply choose and immediately get data on any of the coins, without wasting your time.
The global cryptocurrency markets have grown significantly in recent years. Handy market price is updated every three minutes and is automatically displayed in BTC. Simply enter the amount of Handy you wish to convert to BTC and the conversion amount automatically populates.
Hey calculate your gains or losses and generate tax reports with your data. Stock market investors aren’t the only ones who can benefit from compound interest. Thanks to the amazing trading volumes and crypto market cap in recent years, some https://www.coinbase.com/learn/crypto-basics/what-is-staking online platforms have started to offer services that allow crypto investors to increase their crypto holdings. Their conversion rates have been based on the CoinDesk Bitcoin Price Index as well as the price indices of other digital assets.
Subtract the cost basis of $30,000 from the proceeds of $32,000, and your gain is $2,000. This amount is subject to short-term capital gains tax and reported on that year's tax returns. Calculating your crypto gainsOnce you’ve assembled your full transaction history, you can start calculating your capital gains and losses. To illustrate the specific details of the calculation, let’s walk through some concrete examples of how to match up crypto trades.
- If you're ever approached with an investment opportunity that promises high returns—especially if it sounds too good to be true—investigate further before handing over any money!
- According to the given information, trading in crypto money exchanges is entirely the visitor's own initiative.
- Whenever a transaction is sent, miners demand for an arbitrary amount of bitcoin fractions so that they add that specific transaction in the next block.
- Use the free crypto tax calculator below to estimate how much CGT you may need to pay on your crypto asset sale.
Bitcoin, for instance, has experienced downhill trends since its inception, and there will likely be more in the future. When the market goes down, it's good to resist the urge to sell everything you own and re-invest into similar assets currently performing well. It's essential to only invest what makes sense for your financial situation and risk tolerance level.
Compute total return, annualized return plus a summary of profitable and unprofitable returns for cryptocurrencies supported byAlpha Vantage. CFDs and other derivatives are complex instruments and come with a high risk of losing money rapidly due to leverage. You should consider whether you understand how an investment works and whether you can afford to take the high risk of losing your money. After you check either of these resources to make sure that your transaction will not get stuck in the mempool, you are ready to manually set your Bitcoin fees. Unconfirmed Transaction Count on Johoe's Bitcoin Mempool Statistics Another valuable and well-reputed resource is Johoe’s Bitcoin Mempool Statistics. The website features a collection of graphs that will help you better understand what’s going on with Bitcoin fees and unconfirmed transactions.
In addition to web sites, you can find and download cryptocurrency converter app. To do this, simply type in the search for "crypto converter app", read the user reviews and http://zanderdpdh115.huicopper.com/1-bitcoin-fee-estimator-and-calculator-2022-updated choose the one you like best. When withdrawing cryptocurrency to the card, the funds received may be taxed. Be sure to read the tax laws of your country regarding the conversion of digital coins into traditional currency. FTX exchange offers a range of cryptocurrencies, up to 10x leverage, access to global liquidity, no-fee debit cards for FTX users, fee-free first ACH deposit and benefits for FTT token holders.
Fomo Cryptocurrency Calculator alternatives and competitors
The Ethereum price used in the calculation above is a “volume weighted average” across a number of exchanges. Mobile App Buy, sell, earn and exchange crypto anywhere and anytime. Our crypto calculator allows you to instantly convert BTC, ETH, and other crypto to USD. Finder monitors and updates our site to ensure that what we’re sharing is clear, honest and current. Our information is based on independent research and may differ from what you see from a financial institution or service provider. In order to calculate your crypto taxes, you'll need to keep track of all your transactions throughout the year and figure out what capital gains or losses you have on each transaction.
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"