Just make sure to pay it off before the interest has time to accrue. A few hundred dollars in traveler's checks can be a good emergency fund if you have any trouble with your cards or lose your wallet, Meyers says. Sales of traveler's checks are in decline as travelers adopt new technology and more convenient methods of payment, says Brusilovsky of Travelex Currency Services.
Beaxy provides advanced charting tools, a revolutionary swipe trading app, world-class FIX and REST API, and FIAT onboarding and offboarding to make for the best possible Bitcoin trading experience. Trade bitcoin in the most sophisticated and simple ways on Beaxy. The transaction is performed without any additional fees on Nexo’s part. Any resulting charges are fees from the exchange that facilitated the trade.
The taxes on crypto gains are the same as the regular income rates, which range from 10% to 37%, depending on your income. You can use FlyFin’s crypto gains tax calculator to figure out how much you’ll be taxed for your crypto. Also, credit cards and debit cards are probably a safer alternative to holding a bunch of cash. However, keep in mind that a lot of cards https://www.coinbase.com/learn/crypto-basics/what-is-staking not oriented towards travel perks will have foreign transaction fees. While modern currency is physically represented by coins and paper bills, most large-scale currency transactions are done electronically. Modern technology utilizes sophisticated currency exchange mechanisms and systems to exchange currencies between digital accounts rather than physically.
Cryptocurrency Calculator In the world of cryptocurrency, having a calculator at hand is always useful to enable you to keep track of your cryptocurrency investments. Whether you want to convert cryptocurrencies to fiat currencies or work out your cryptocurrency trading profits, our online calculator is the user-friendly tool you need. The rates displayed by the calculator represent market exchange rates, and are provided for informational and estimation purposes only. They do not include any conversion fees or other charges applicable to a conversion or other transaction. The calculator may allow you to calculate exchanges of currencies currently not available through Coinmama. The calculation by the calculator shall not be binding upon New Bit Ventures in the execution of transactions.
- Below is a short list of some of the important terms pertinent to foreign currency exchange.
- It is common for people to come back from foreign destinations with some foreign currency left over.
- 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.
However, by the time you read this article, the figure might be quite different. The most effective way to minimize your crypto capital gains tax is to own the asset for over 12 months, as this will give you a 50% discount. The Swyftx cryptocurrency tax calculator will ask you if you’ve held your crypto asset for 12 months. If you have, the calculator will automatically apply a 50% discount to your capital gain.
Once you select the base and target currencies from the list and enter the desired amount into the provided field, the currency calculator immediately gives you the result. Additionally, you can also choose whether to calculate the result based on the current exchange rate or the exchange rate on a certain date. The way cryptocurrencies are taxed in most http://israelxmoa115.image-perth.org/1-bitcoin-fee-estimator-and-calculator-2022-updated countries mean that investors might still need to pay tax, regardless of whether they made an overall profit or loss.
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.
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"