In Asia, where cryptocurrency demand has been soaring, the Chinese and South Korean governments have taken hard stances on cryptocurrency regulation. Blockchain-related projects have raised more than $1.6 billion via ICOs to date, lenincoin.com while venture capitalists have provided only $550 million for cryptocurrency companies. Jeff has extensive experience within the financial services industry, excelling in a number of roles ranging from portfolio manager to CFO.
There are currently over a thousand different cryptocurrencies in the world. Some crypto schemes use validators to maintain the cryptocurrency. In a proof-of-stake model, owners put up their tokens as collateral. In return, they get authority over the token in proportion to the amount they stake. Generally, these token stakers get additional ownership in the token over time via network fees, newly minted tokens or other such reward mechanisms. Bitcoin's value fell by more than half its value since its November 2021 peak, which caused Discover more here the entire cryptocurrency market to collapse.
- Bitcoin’s market share has fallen from 81% in June 2016 to 41% one year later, in June 2017.
- To get a broader perspective, let’s take a look at the world’s money supply and the way it is diversified.
- Streeter predicted that some traders might view the crash as a chance to buy currency during the dip, bagging a potential investment.
- He does all kinds of jobs from recovering lost crypto, erasing criminal records, recovering stolen money and all.
- Even though digital currency concepts existed before Bitcoin, Satoshi Nakamoto was the first to create a peer-to-peer digital currency that reliably solved the issues facing previous digital money projects.
- In terms of relaying transactions each network computer has a copy of the blockchain of the cryptocurrency it supports.
A good rule of thumb is that the usefulness of any given cryptocurrency’s market cap metric increases in proportion with the cryptocurrency’s trading volume. If a cryptocurrency is actively traded and has deep liquidity across many different exchanges, it becomes much harder for single actors to manipulate prices and create an unrealistic market cap for the cryptocurrency. Crypto market capitalization or "crypto market cap" for short is a widely used metric that is commonly used to compare the relative size of different cryptocurrencies.
He has specialized expertise in situations requiring a multidisciplinary view. He likes working on different types of projects and with companies in various industries, and freelancing allows him to do that. Jeff’s experience encompasses valuation and financial modeling, investment management and analysis, and corporate transactions.
I have tried out some credit repair companies that I thought were reputable but they weren’t. After really taking time to research a good company, I settled on. I was super nervous since I have had such bad luck, but I am seeing a difference my credit score has been going up and that is amazing to see." I was able to recover my funds from a very sketchy company, 24Options, Last year a friend and I invested all our life savings but got duped in the process. This January, we were able to use the services of R E C O V E R C O I N @ R E S C U E T E A M . Jeff is a high-level financial expert and lawyer with proven skills in financial and investment analysis.
What Is A Pip In Cryptocurrency Trading?
Your gain or loss will be the difference between your adjusted basis in the virtual currency and the amount you received in exchange for the virtual currency, which you should report on your Federal income tax return in U.S. dollars. When you sell virtual currency, you must recognize any capital gain or loss on the sale, subject to any limitations on the deductibility of capital losses. For more information on capital assets, capital gains, and capital losses, see Publication 544, Sales and Other Dispositions of Assets. According to Coin Metrics, the price of bitcoin fell to $25,401.29 on Thursday. This is the first time the cryptocurrency has dropped below $27,000 since December 26, 2020.
<img src="data:image/jpeg;base64,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"