How to Use The Currency Calculator

If you're just looking to make a quick buck and get out, then no, you don't need to reinvest your profits.

The space available for transactions in a block is currently artificially limited to 1 MB in the Bitcoin network. This means that to get your transaction processed quickly you will have to outbid other users. Gold and diamonds are called precious metals only because access to them is limited in Western society. Gold and diamonds gain the majority of their value only when they are placed in a literal store of value — a jewelry store with high prices and security. With the currency calculator, you can quickly and easily convert amounts between any currencies. In total, there are about 160 different currencies available on the currency calculator.

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.

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.

• The next month you’ll earn additional interest on your starting interest and your balance will be1.010 BTC.
• The taxes on crypto gains are the same as the regular income rates, which range from 10% to 37%, depending on your income.
• Getting a cash advance on your credit card is an easy way to break the bank, whether you're abroad or in the U.S.
• Use of this site constitutes acceptance of our Terms of Use, Privacy Policy and California Do Not Sell My Personal Information.
• The platform lets you withdraw your funds anytime, with one free withdrawal per month.

Mempool.space is perhaps the best graphical representation of what’s going on with the Bitcoin network in terms of demand for block space and fees. Receiving any fee as a miner is a subsidy for operation costs and an extra factor that guarantees profitability. In the long run, fees also guarantee more security for the Bitcoin network and the elimination of spam transactions. Transaction fees are included with your bitcoin transaction in order to have your transaction processed by a miner and confirmed by the Bitcoin network.

I highly appreciate the effort that you put in to deal with these issues, Casitsu has already earned a place at the top of our list. “CannabisCoin.” Accessed Aug. 9, it’s more advantageous because there are no barriers to entry. Cryptocurrency market cap calculator contrastingly, including Quoine Corporation and its Singapore-based unit. The calculator may allow you to calculate exchanges of currencies. Most governments around the world, the IRS included, treat cryptocurrencies like bitcoin as an asset or an investment. This means that the income realized from trading or investing in crypto is subject to capital gains and losses rules similar to other assets like stocks, bonds, and real-estate.

This way, the Markets Insider currency calculator allows you to search for historical exchange rates. The result provided by the currency calculator is displayed in a clearly arranged table. Here, the currency calculator shows the opening and closing rate as well as the lowest and highest rates for the respective date. Coinmama’s live crypto calculator does the math so you don’t have to, giving real rates in real time. You’ll have to report any gains you experience when you buy and sell cryptocurrencies to the IRS. Luckily, many cryptocurrency exchanges provide transaction reports that include all buy, sell and exchange transactions that occur in your account.

How many Bitcoin are there in total?

The other type lets you choose your lockup period, giving you a higher interest rate if you opt for a longer lockup. Nevertheless, if other metrics say that an asset is worth investing in, an increasing market cap is a sufficient signal to back up your decision. Order books contain orders to buy or sell an asset that are determined by exchange users. Orders are matched by the exchange matching https://postheaven.net/camrusotcb/for-many-across-the-country-cryptocurrency-has-transformed-into-an-investing engine to produce completed traders. Curious about the price of Ethereum in your national currency? Simply input the amount of ETH you want to convert, select your local currency, and get the result!

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"