Click http://donovannzqz231.trexgame.net/pi-network-defi-price on these to see how easy it is to start investing in Bitcoin. This calculator estimates the impermanent loss when you provide liquidity. Simply enter the weightage of the assets and the percentage change expected to estimate impermanent loss percentage. Note that this calculator does not include any trading fees earned, which may help cushion impermanent losses. You just need to import your transaction history and we will help you categorize your transactions and calculate realized profit and income.
- If it seems like there has been some major news announcement that caused all markets to go haywire overnight, try researching more information on those stories before reacting too hastily.
- In addition to web sites, you can find and download cryptocurrency converter app.
- Zac co-founded TokenTax after his career in international finance and accounting at JPMorgan, Imprint Capital and Bain.
- In contrast, it takes just 2.5 minutes to mine a Litecoin block.
- Simply enter the amount of Handy you wish to convert to BTC and the conversion amount automatically populates.
If you would like your accountant to help reconcile transactions, you can invite them to the product and collaborate within the app. We also have a complete accountant suite aimed at accountants. CryptoTaxCalculator helps ease the pain of preparing your crypto taxes in a few easy steps. Add any historical crypto income such as mining, gifts, or even exchange rewards like airdrops.
Therefore, the platform is not helpful for those who do not wish to mine. The crypto ecosystem has expanded significantly in recent years. While institutions such as the IMF are starting to embrace its innovation, they are also calling for investors to exercise caution.
In addition to cards without fees, think about getting a card with the latest technology. In lieu of foreign currency exchange desks at airports and major hotels, there are more convenient and cheaper ways to exchange currency, Stallings says. While some desks advertise "no-fee" exchanges, they still build in a hefty profit by offering a high rate. To get started enter the values below and calculate today’s exchange rates for any two currencies or metals.
How does this calculator work?
This Bitcoin calculator is a simple, convenient way to estimate how much you need to spend to buy the amount of crypto you want. Get the latest crypto news, updates, and reports by subscribing to our free newsletter. This calculator breaks down the annual percentage yield across different timeframes for a given principal (in $) and APY percentage to help estimate earnings. If you are at an office or shared network, you can ask the network administrator to run a scan across the network looking for misconfigured or infected devices. We have an annual subscription which covers all previous tax years.
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"