If you need to amend your tax return for previous years you will be covered under the one payment. We also offer a 30 day 100% money back guarantee, where if you contact our support team you can collect a full refund. We support all major international exchanges, such as Binance, Coinbase, and FTX. If you used a DEX such as Uniswap, Pancakeswap, or SushiSwap, we have you covered.
- Here, the currency calculator shows the opening and closing rate as well as the lowest and highest rates for the respective date.
- Among the most popular allowed methods are FIFO, LIFO, and HIFO.
- All of the features you would expect a currency converter app to have .
- The way cryptocurrencies are taxed in most countries mean that investors might still need to pay tax, regardless of whether they made an overall profit or loss.
- Our platform performs tax calculations with a high degree of accuracy.
So the network will raise the difficulty level if more miners join. In contrast, it will ease off if miners leave the network to keep a constant flow of block generation per unit time. Another important factor affecting mining sustainability is the crypto itself. As mining gives you more of the coin you mine, its value holds utmost importance to you. For instance, you get 6.25 BTC for mining each block, which amounts to nothing if Bitcoin’s value somehow plummets to the ground.
You should also create a portfolio of different coins or tokens so that if one project performs poorly, there will be others that still have the potential for growth. When you're investing in cryptocurrency, it is essential to do your research. You should know what you are investing in and have a general idea of how the coin or token works. Calculating crypto taxes can be tricky, especially when you're new to the world of cryptocurrencies. There are so many different types of cryptocurrencies, each with its own price fluctuations. The daily reinvest rate is the percentage figure that you wish to keep in the investment for future days of compounding.
This means you can get your books up to date yourself, allowing you to save significant time, and reduce the bill charged by your accountant. You can discuss tax scenarios with your accountant, and have them review the report. Directly upload your transaction history via CSV or API integrations. Our platform is trusted by industry leading accountants who value detailed and accurate reports. If you are an accountant please contact us to learn more about our accountant portal and corporate pricing. Identify, track and organize all of your crypto activity across hundreds of exchanges, blockchains and wallets with ease.
Crypto Net
You can also use our Prices Calculator Table to calculate how much your currency is worth in other denominations, i.e. .1 HANDY, .5 HANDY, 1 HANDY, 5 HANDY, or even 10 HANDY. Academy Learn more about the world of cryptocurrency and how to use 3Commas to your benefit. Sign Up NowGet this delivered to your inbox, and more info about our products and services.
At the time, bitcoins were barely worth anything and it was important for the network mempool to not get flooded. We also show the latest fee estimate in US Dollars/transaction in the list below. To calculate the fees per transaction, we consider that the average Bitcoin transaction is about bytes big. Once your transaction is included in a Bitcoin block and thus obtains the first confirmation, you will need to wait approximately 10 minutes for each additional confirmation.
With the capital raise, CoinTracker’s total valuation grew to $1.3 billion, making it the latest unicorn to be crowned in the crypto industry. In the startup world, unicorns are companies that have attained a valuation of at least $1 billion. Brock Pierce backed the entire loan for the house with bitcoin. The world’s biggest crypto lender https://cryptoplora.com/ Nexo announced it officially backed its first mortgage using the cryptocurrency so “Mighty Ducks” actor Brock Pierce could buy a $1.2 million dollar home. Yes, all NEXO Tokens used as collateral will also earn interest. It doesn’t matter if your tokens are in your Credit Line or Savings Wallet as long as they are in your Nexo account.
Earn in CEL questions? We have answers
If the yield is generated annually, then the APR and APY should be precisely the same. Below is the APR for farms on Trader Joe, which highlights both the yield for providing the liquidity, as well as the bonus returns from staking the LP tokens in the corresponding farm. The general rule of thumb is that the higher the number of compounding periods, the higher the APY. Sometimes, a protocol may display the APR, or annual percentage rate, instead of APY. The critical difference is that it http://lanehtyi749.cavandoragh.org/how-to-make-money-online-usa can be regarded as simple interest, where the effects of compounding are not included.
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grIGBw4JPE4GSB0kAq5VxgQYzkybMZYYaBU444sJSkDpJJ4DFUxFTASHmMj5NHMZHyackyGFqCUOoUVJ3wAeJT3/AKK4VJjoJC3kApGSCroHfP10xFICbuYyPk0cxkfJpWLpCMp2IXSlbKEOKKkKSjdVvYwojdPvTkAkjhnGRWcPskZDqSMgdPdPRTEUgJt5jI+TRzGR8mnHnUbdC+Xb3SrdB3hgnvfTWODcbfc21u26axJQ26tlamnAsJcQopWk46CFAgjuEEUxFICbnWHWcb6eB6DWOnG5j9Gk/PTdVgZChPET4M39Fahddk+JRqrynafxjdbexPgzf0VqF12T4lGqvKdp/GN1Q6qwXwaoooqEWyHW5fjr7K/Kcj8G/XoYrzz9bl+Ovsr8pyPwb9ehiiLg1BnNp7EPVF8s94Yt1st9gZVIkSZdwKJLjCWUuKkNx+TwtkFRQVhz3yFDHCp1UQ1Pszs+s3H29UXG4XC3utvNoty1NJYa5VhbDhSUIDmS244PdLIBUSBwGAUFIF7YtNC5MM7zrMMRJr8x2Qy409GcYVF3WiypO8SsS0FOOJynAO9TnF2m6XnOxYsI3F+VKUtJjN259TzG6oJUp5G7lpOVDirAIORkcaZU7CdCqtZs8iOp2MpiTHUhMeMwlSXlMKUooZaQgqBjNEEpPQc71OVj2WWTTb8KXYp8uA/ESpp1UWPEYTLaLgXybrbbIbxkcChKVcT7riakQozS6xa8tl+0ZH1xGt90RCkspfbZVCWZBSrGMNpBJ6ekZHd6K7P6/wBNsWK33/nElxi6rDUJlqK4uQ+4UqVyaWQnfKwlCyU4yAhROMGm9/ZbZJOjomh37jcHLdAdbcjb/IrU2ls/o2ylTZQ4hI4YcSo8ASSQDWUbNLExYLNYYEqbDGnpHObZKZUjlo7hQ4gkbySg5Q84nCkkYV0ZAIhSlEraJpaFCdny5jrTTD70d3ejrCkuNR1SHElOM5DSFH6Rjp4UiO1rRyFupeeuLIYhJuLy3bbIQlqMouhDqyUYSFlhwJB4q4YByKwXDZHY7m/Kcm3q8uMzHH33I3LNhrl3oiorjow3vZLa1HGd0KOQBTjddnGm723d2Lqy7IZvdrj2iW2pQ3Swyp5SMcOCsvryfmTw4cZyUCd/5+BIpG2DRMWOH3n7iFJbkOusi2SFPMIY5MuqdQEbzYSl5pWVAZSsEZzS4bR9LquHY9t6WsCQ1EMpEN0xQ+4UhDfLbu5vErQMZ6VAdNN9v2Q6VttuctsflUNuwJ1uWWWI8bebl8lyp3WGkI3gGUAK3e5xzSPUWzCWdO3ayaTu77Iu6d3kpUgBmG8Qkc8a3Wi4XUlCVhG+lBVk+5JzTJSJ3qXsXeDfLMq421xTkda1oQspIC9xwoJGelJKTg9BGCMg1zqS6qstnfnISFLQAlAPRvE4FdYlog2DTcax2xgMw7dGbjMNjoQ22AlI/cBSu5W+PdYLsKTxbdTjI6R3iKkEAidFBkjLVQRu63pq3JvXZV5TwRy62XCnk93e3QMdIz3P41LXNRstQ4cpbKjztvlAAQMcB3/ppn9hd0e3Ykq9BcJICCEow4tAOQkmpG5Z4TrbTLjOUMp3EAKI9z3uHSOFaPcwwsmNeEmF9WXC12OdKwooCQtPHAye73sU6IWHGwsAjeGcHppM7aoTySlbHSreJCiDnGOkfNSpKUtoCQAAkYA7gFZEjcthO9Q7Xw/8KQvKNu/Et1KZs1i2wH7hKXusx21OuKxnCUjJ+6ortCWlvR8V9ZAbanW9xaj0JQJDZKj3gBUrLsV9gtrcbW24nBG8CCDXkUXNbelYOPsU/rUXY8E2RkdJ30ate9hnVKr2ibUdQaQuSVpYkqMi0AtkckhHAtqPfIG9k93PzVa9w2mMxtWTtIQrM5LmwWUvKTzplsuAt7/uUqUCeHdxim/Q+yWw6I1Td9TR5ofXPViM2pKRzdHdBI4rOeG8riAAKk6tMaeVe3tQgOpmyEhLxRMdS26AndG82FbisDhkivpLTXsb6uKkP2wN+/5LyKFK0Mp4ahzn5KKwduFgfeiQ7hb5ECZPbgvRozjralutylKS2obqj0buVd7NSfaBx0Nfz/y2R/lqrhvR2kGUoS3b2UhtuK0n9IrgmMSWR0/1ST/3zWPaFLjN6GvoXIbTvwHkJyocVKQQkD5ySBXjXvVoehVSzL9rt/UvRsDKm3YHZ5j6pyt3wG0j/wBNH+UabNdahlWWIyxBUEPSSRvkZ3Ujpx8/EU6QUluFa0uDdIQgEHuHkzwrpqPTzGoYiWXHC060rebcAzg/lW9igUqeLgPosq4JLsPWoTZ9U3WFdYzL8x2XHkLCFBzB6TjeSan790bYS4rkVqLa+TwniSd3e4VHLRoNUac1MuUxt4MHebQ2jdBV3zUmdtcJ51TzrW8tXT7ogdGM4z047tdVVzHEQsKTXtGaStX5t4oKYq9wlIUoKSd3JwPvpbP+Bun/APWsKLNAbWHEtHeBzxWo5OcgnJ4n6azTyBDcHfAA+ck1mYnJbCd6QzvhKvoH8KxNKCHEqPQDxrLO+Eq/d/Ck9WGigqJa/wBnV21re13yNq1y2rtsJtNmaZQ2pAlB0PKW/vtqUUFbUbggpOG1cfdcGm6bNNTXeLPs8p+xmCvsw7HUtxxannJkkPoDiCjCEoIKSQVk8FADG7Vh1pd1aG37XumNaM7OdG3qTZY0eI1JlSIquTefccyQkLHFKQAOjpJOeitaFnNd4ptXHbraywUTXqCVtBb9AXJnV7V/ei2OM2J7dxVIjuLVJZSIQjmEjLaQWd4bwVlIxw5MH3VI9U7JX74jUUuHNhsXC63yPc23QEhT0ZphhHNnFracASVtKVjcWkHdO6TWmWwbqmNsar03oyVqdy6JnK/QO3Ecs42vPRvq47pz3TWxB2nbSxEM0ajtxbUtDbX9BAK1KUU8QSCMFJ79dVS7alMxiHzXl0P1HZ6zZDHTv05hT63bHVtXGxuXJ6DKt9uciuPxZTvON7k489BQP0SEKSFy290biQEoPAYArC1sau4ix7SjU0eFBVblIkc23t9ueht1qM+3wAIS28knOCDGZx3cRvR+1/U69fsaQ1BIiz2ZKywH2WQ2UOYOPekgjIx++sXVSba71slt2noNjcVFe1BLWy7PTHS+qM0jd3ihCiEqWd8Y3jjgawdZHh4YdSu2nelndQfXEgNyPHkn+3bGrxb7Uy2wLcq5NzA8h56e25HYAbQjlEsJhIbVvbg3kFIVwGHQTmrB2d6aXoy33O1vt29KJF3n3Bp6MSFOokSHHxyid0bqk8pucCrIQDkZ3RTXU/7Yb9q7WGoNnt+vKL4uzxWJjdxSyhpxBXgLjuhslBWhRxvJODg9NXzk981nWpOpuwuXXZbSy1U9ozTkltwebcSlKFA8c0hooqgELoTxE+DN/RWoXXZPiUaq8p2n8Y3W3sT4Oj6K1C67J8SjVXlO0/jG6zOqsF8GqKKKhFsh1uX46+yvynI/Bv16GK88/W5fjr7K/Kcj8G/XoYoiKKKbH9QQ2XVMoYkvFB3VKaayAe6M0iUTnRTT7I4/+z5/2P8A80eyOP8A7Pn/AGP/AM1MFRKdqKafZHH/ANnz/sf/AJoGpIe8A7FmNJ7q1s+5H04NIKmU7UVwCCMg5BrmoRFFFFEXBAUCCMg9NJ+x8TuNqA7wWoD6gaU0URJux8X5K/tFfnR2Pi/JX9or86U0gn32zWspTcrnGjFQykOupSSPmBNSJOihzg0SSs3Y+L8lf2ivzo7HxO62ojvFaiPqzXEG5W+5Ncvb5jMlvON9pwLGe9kUqpmgIcJCwyYseWwuLJYbdZcQULbWnKVJPSCD0io0dlugic+xiHx728P+9SuiuS0WGzWsg2im18aSAfqt6VorUJ2Ty2eBI+iintW6C8WYn1q/Oj2rdBeLMT61fnUrorn9TXb/AMuzwN5LX1ha/eu8R5qKe1boLxZifWr86zQ9nGiYMhuXG03DS60oKQopKt0joIBJGaktFS26LvaQ5tBgI/6W8lBt1qcINV3iPNdFtNuILbiApJ7hrD2Pi/JX9or86U0V6K5Um7Hxfkr+0V+dHY+L8lf2ivzpTRREm7Hxfkr+0V+ddkQoyFBYbJUniCpRVj6zWeiiJpnfCVD6P4VhSkrUEg4ycVmnfCV/u/hWJn9anPfrUaKqXC2N44uKzVB9Ul1KNl20y4eoYV7VZ75FZ5sXy1yjT7QOQlaQQcgk4IPdwc8MbEAg9BpFcyMIGePGop1X03hzTmsrRZ6dppmlVEgrWHZN1Cml9IMruWo9VzbhdHPcodhoDDbSM9wKCiSeHHNWXN6mzScgGRJ1Df3nEkLClyUniBwPvOmrZhqSWEYI4Cu8kjkF8e5WzrbXc6S4rjp3RYabcIphVlobYnpHS15N6iKlyZiAooclOBRQTwJAAHE5PE5p72ibH9F7UrImxavgqkMtOB5h1tZQ6w4OhSFjiD91SW2kB1QPepxyO/Wb61RzsROa6qdkoUqZpsYA06hVns92PaN2VCbH0vEdVKuT3KzZsp0uyJC8k5Ws/SeA79WAm2t490s5pO8pPPSrIxvU6AjHCqve52ZOa1p0mUm4GCAE2S4gjgKSokE92ktOFzI3ED56b6NzCsU8RPgzf0VqF12T4lGqvKdp/GN1t7E+Do+itQuuyfEo1V5TtP4xuqHVWC+DVFFFQi2Q63L8dfZX5Tkfg369DFeefrcvx19lflOR+Dfr0MURFR9sAA4+Ur+JqQUwI6D/AGlfxNWbqoKFKCAVK6AMmoRZtqkK/WOJebZY5UhdxfTHgxWpcVxx9RaU8clLpS2Q2lSiFqSRjGMkCpuoEpIBwSOnvVC/a9lLn+yBy+Mi+NrZVHkNQAiO2G0PoAUzv5USiS6Cd8f1cY3cVq2N6wqY8sCk9jvEPUFoiXqBv8hMaS6gLThSc9wjuEHIPzilqxlCge8aQaeskbTlkh2OI4441DaDYccxvrPdUccMkkk479L1+8V9BqDE5LRs4Ri1UR2g9ULsn2RT4Fh19qZy2zZkJEtltMGQ/vNFSk72W0KA4oUME54VFu3b6m3x/d9Dzf5VWtcdE6N1KI0zUelLPdH2mEtIdmwWn1pR07oK0kgZJOPnNIxsp2VngNnGleH/ACiN6lSw0AP3gz2jkuSoy3F52b2gbpaSf/YKte3c6mzx/d9Dzf5VHbt9Tb4/u+h5v8qp1Y9kOz2NCcbu2gdKPvc5krChaY5AaU8tTSfeD3rZQP3d3ppwGyfZYeI2b6W9ER/Uq82bou7xyWYbeJH82eE+ZVr27fU2+P7voeb/ACqO3b6m3x/d9Dzf5VWX7U2y3/dvpf0PH9Sj2ptlv+7fS/oeP6lMVm6Lu8clOC8emzwnzKuI3VkbCb3Ibs+mNYOTbvNUGIMdVrlth19XBCSpTQCQVEcSQKt+y2WNamSeL8t73UmU4MuPL7pJ73eT0JHAAAUxSdkmzdbDiYWhdPwpBSeSkx7Ww26yvuLQoJyFA4II71LmNVxLe2mPql1q1y2xurU8dxh0/KbWeBB6cZyOgiqPwOEUgfjn/S0pbam7FanA8CAQBx1JWPVbcaxR3dYs4juW5PLS1oT+ujJ4uJWB74hOSnugjhwJBjfbEbJu7qZwf9C/6lSKfOZ1e2LPa0iRAeUkzZKkfoVNA5LSCeCyvG6cZABOTnAKwaH0bjjpOz+YterRppgRVBnqP2UVG13uxWZwA3yCZPVBCiPbEbJfGdzzF/1KO2I2S+M7nmL/AKlS/wBg+jPFOz+YterR7B9GeKdn8xa9WrYrP0Xd45KmzvD3jPCfMoh2xGyXxnc8xf8AUo7YjZL4zueYv+pUv9g+jPFOz+YterR7B9GeKdn8xa9WmKz9F3eOSbO8PeM8J8yiHbEbJfGdzzF/1KO2I2S+M7nmL/qVL/YPozxTs/mLXq1wdEaLHE6Usw/6Fr1aTZ+i7vHJNneHvGeE+ZRHtiNkvjO55i/6lHbD7JvGZzzB/wBSpDO0Lpd1+AuHpuyIbbkFcgcya923yaxge54+6KD+6lg0Too9GlbMcf8AAterSbN0Xd45KAy8Cf5s8J8yiXbD7JvGZzzB/wBSjth9k3jM55g/6lS72D6M8VLP5i16tHsH0Z4p2fzFr1ajFZ+i7vHJTs7x94zwnzKI9sPsm8ZnPMH/AFKO2H2TeMznmMj1Kl3sH0Z4p2fzFr1aPYPozxTs/mLXq0xWfou7xyTZ3j7xnhPmUDk7fNljrxWjUiyDj/UZHqVi9vjZd4yK8ykepUwm6O0il9QTpa0DGOiC16tYmdHaRLqQdLWjpH+oterWodZ4/ie8clU07w6bPCfMosNvezHxncH/AEcj1K4Vt52XqPHUyz9MKR6lT9WitFgE+xWy+YterTSnQ+nGEyOd6csy+UkLWziE17lo43R736agPs59k945IWXgPbZ4T5lFRt62Xp6NTKH0Q5HqVydvezAjB1Os/TDkepU6i6K0YtlJOlLMTj9ha9Wu72iNGJaWpOk7NkD9ha9Wm0s/RPeOSnZXh7xnhPmUBG3nZcOI1Kof9FI9Sufb82Y93VC/M5HqVMrfo3SDjigvStnPDuwWvVpf7CNGeKVm8xa9WhqWceye8ck2V4e8Z4T5lXnt87LvGRXmT/qV3G3zZiBj2TuD/opHqVL3dH6OEwgaWs+7kdEJrH/trvbdCaXZbeTcNN2Rxan3Vt4hNcGyolA973BgUx2fonvHJRgvCYxs8J8yhze3XZlIdQ0jUi1LWoJSDDf4knh0oqeUnm6O0e0lC2NMWgEK4FMJrIP92lFZvNM/wBHaumg20NnbuB7AR9SU8RPgzf0VqF12T4lGqvKdp/GN1t7E+DN/RWoXXZPiUaq8p2n8Y3WB1XWF8GqKKKhFsh1uX46+yvynI/Bv16GK88/W5fjr7K/Kcj8G/XoYoiKTLt8dSirBSScnB7tKabXb9EQ8tlDT7pbO6ooSCM90cTVmtLtFBIGqz9jmO+r66OxzHfV9dJuz7H7HK/uD86Oz7H7HK/uD86tgeq4mpT2OY76vro7Gx+7vEd4mk3Z9j9jlf3B+dceyGKkjlY8htJ6VKQMD6cGmB6Ymp0wEpwOGBVf6bjTLbeW5KoMlpfN32rs4Iy/6RLW+2GV5x+kATyp3hkJSrjjoFgJIUAodB6K5qrXQofTxkGdFV0WwyHrPdIibZKbdXY1N3HDTjRlXAZO8Dw5Qk72VDIUFAcRwqyLchaLfFQ4CFJZQCD0g4FKaKlzy5Vp0RS0RRRRVFsioftCtsecxFfcjmS/FDqo0dduMtp1wpGAoAEI4jAUSOk8amFFWa7CZVKjMbS0qBWiFLTqdmS9a3mbiZT65snklcmuKWv0bYc6FAKLYCRxBSo4HSZ4OA41zRRzsRlRTpimCAiiiiqrRFFFFERTZqJuI9Z5Lc6OHmVJwUGKqSCc8Mtp4qGcEinOigyUESIVTQ7LcWkNNv2uQtaW0Js7girSlh3nbqlrCcf0dJbLXBWPcp3eOMU+6Lt06JeG1uQ3WHRDdTdnFMqQJEsupKFhRGHPchz3QzgKA+YTyitTVJXM2yhpBn8/PlkuBXNFFZLqRRRRRE0zvhK/3fwrACUkEHiONdrvKjQlOypchthlsArccUEpSMdJJ4Cm+JfrHLlMRW7nHK5Bw0krwXP7OfffurVoJEhZl7QYJUccgpYYXGnWl+Raxennn2VNLeLjZZISopwVLHKYPd48e5mmdm239UaOh+DL7PckwI8paVKLTIjALQp3oHuwvKc8VKB49IuBMdjAHJCklwZbbCVISBmritG5c7rKDnP4fzJRTQ+LeqSIVsdhxFMxwW3WVNFUkBXKqwRxJBQCroJB4npqUuXBxxBRuAZGKURIzJZClNgk92u0iMxyKyGwCBms3ODjK3pU9k3CE3MPqYXvpAPcpQu5q3FbzIKcHIGSa6wGkOOELGcDhmnDm7Pg0/VUEhaBVCm2MCe86qzOO2Vctpx1lq2uMoP6J4YMcgqWQotEqwckpP9Xh2ahX7kkf0CSm+lDAhS3EKPIMCKErQp3iB+kC8pJyVEHB6asl5pIlFsDAzTkIzGB+jTWprZaLk9EbOv5+aKBaRZUy9L5pAdhQFMRgGnGVNEyQF8svCgCSctgq6CQeJ6aklLrgy22lKkJA444UhqpdizW1OmKTcITxE+DN/RWoXXZPiUaq8p2n8Y3W3sT4Oj6K1C67J8SjVXlO0/jG6yOq2C+DVFFFQi2Q63L8dfZX5Tkfg369DFeefrcvx19lflOR+Dfr0MURcHoqNRAP0vzuuH/Eak1RmGf1vzOuf+41rT0PwWb/AOQSLVF+Rpewzb85b5MxuEyp5xqPu7+4kEqPuiBgAEnj9GTwpru20C1Wa4vxpkZ1MOE8xFmTt5IbYfeALaCkneOQpGSBgcon58Pd+tDN/sdwsUh1bTVwiuxVrRjeSlaSkkZ7ozTHeNnttvVzelTJTpgzHmJU2BuJLcl9kANLKiN4Y3W8gHB5NPz5s2N6yq7T/X+fmSSWLW6r/rOLZVQpVvWmzOXJcZ5SFb7TrjIYcJSSM+5eBTnIOekEGpdNA5q5w/qmohYNBu6f1jHv67hIuKzZ3LWuS8EIKGW3GlMN7qQMni+SrHEnjjgKl88gRHcke9NWyxCEZiwHHqojtF6ozZXsdn2/T+u7xKhzZkFExpDUNx4FoqUgHKQQOKFcKiXb0dTn40XD0U/6tXPI0vpq+Ijyb1p62z3m2UtpXKiodUlPTgFQOBknh89Yfa/0H4k2H0az6tGuoAQ9pJ7fssalO2ucTTqNA62k/wBhU929HU5+NFw9FP8Aq0dvR1OfjRcPRT/q1aFh2a6Rhwls3HS1hlPKlSXQvse0rDa3lqbRxT/VQpKfm3acfa/0H4k2D0az6tTis3RPf9lmKd4kTtG+E+ZU929HU5+NFw9FP+rR29HU5+NFw9FP+rVw+1/oPxJsHo1n1aDs/wBB+JNg9Gs+rTFZuie/7Jsrx943wnzKnu3o6nPxouHop/1a57ejqdPGi4ei3/Vq0UbPdEJuzzx0pp8sqYbbQzzBnKVhSypWN3ugpH7qX+1/oPxJsPo1n1aYrN0T3/ZQGXif9jfCfMqf7ejqdPGi4ei3/Vo7ejqdPGi4ei3/AFauD2v9B+JNh9Gs+rR7X+g/Emw+jWfVpis3RPeOSnZXj7xvhPmVPdvR1OfjRcPRb/q0dvR1OfjRcPRT/q1cPtf6C8SbD6NZ9WkEnZxo125w5TGk7CiOwh5L7fY9ob6lBO7w3cHGD09+gdZj7J7/ALKDTvEf7G+E+ZVb29HU5+NFw9FP+rR29HU5+NFw9FP+rVwJ0DoFQBToqwEHoItrPq1z7X+g/Emw+jWfVpis3RPeOStsrw963wnzKnu3o6nPxouHop/1aO3o6nPxouHop/1auH2v9B+JNh9Gs+rR7X+g/Emw+jWfVpis3RPeOSbK8Pet8J8yp7t6Opz8aLh6Kf8AVo7ejqc/Gi4ein/Vq0rls60XJMZMPSdgaLMhDro7HtDebGcp4J7tLE6B0EsAp0XYSO+Lcz6tMVm6J7/sqhl4TG0b4T5lUPb0dTn40XD0U/6tHb0dTn40XD0U/wCrVwe1/oTxJsXo5n1aPa/0J4k2L0cz6tMVm6J7xyVtleHvG+E+ZU/29HU5+NFw9FP+rR29HU5+NFw9FP8Aq1cHtf6E8SbF6OZ9WkV22daLkwHosPSVgYkOpw2s29kFJ7/BOaB1mPsnvHJVdTvECdo3wnzJq2d6s0vthYOv7DIXNs7bpj28PMqbAWgDlHShXHeyd0EjgEnHvjU6mQIdwiriTYzbzLgwpC05BFRdlEXRc+QbZa0N2aThbjUJgf0Z0AAqDaBkpUAnO6MgjOCCSHJ7WVmKUot7jk+Q5wbYjNlSiruBRxhH0rIArJ4xGWDJdNFwYzDWIxb+vsUQk7YdH6EnytKaqu0oS7e7utr5BbpcZUkLbKlAcSArdPdO7nu0km9UTstfSkIu8nh/wbn5VMIWjIb4dnXyBCkXCa6X31KZS4EkgAISVDJCUhKfnxnAzXMnSVgjkHsJbiD/AMKj8q2DqHtAz2/ZYbK2+w9oG4FpJjdvUTj9UZssbZShV3lZH/BuflXL3VHbK1tKSm7yskYH9Cc/KpWjSNgdZUo2e2pyD/qyOH3VijaMsca3x237XbXnkMpSpXNkHfUE8SCRx45NJs3RPf8AZRgt8xtG+E+ZQ+F1Q2y5hwqcu8nBHD+huflS3tkNlP8AtiV5k5+VSWPpSwSF7gsVuGOJ/oqPypSdE6e7llt3mjf5ULrNvae/7Js7f7xvhPmUDd6oXZeuVyou8ndz+xuflS7tj9lX+2JXmTn5VJfYzp1mUGVWS25z+yt8fupTD0tYWHZq5Nota0uPhbYMdH6NG4kbvEcOIJ/fQus/RPf9lGC3g/5G+E+ZQt/qhNmM1Tcdi7SStawkAw3BxPAdypvXE7TmnkNoUiw25JzkERUD/tXNUcaZA2YI7TP9LpoNtDZ27geECP7KeInwZv6K1C67J8SjVXlO0/jG629ifBm/orULrsnxKNVeU7T+MbrA6rrC+DVFFFQi2Q63L8dfZX5Tkfg369DFeefrcvx19lflOR+Dfr0MURcHjTe9YoDzqnsOIUs5VuLIBPfxTjWMvsg4LqQR89S1xbooIB1SD2PwvCyftTR7H4XhZP2ppfzhjwyPro5wx4ZH11faP4quBnBIPY/C8LJ+1NA0/byQV8s4Bx3VOEg/TS/nDHhkfXRzhjwyPrptH8UwM4LuAAMCuFoDiFIVnChg4OK684Y8Mj66OcMeGR9dZwVdMWhba9abI5CdjLjhFwnqbbUOhpUp1SCPmKSkj5jUhrHzhjwyPro5wx4ZH11JkmVVjQxoaNyyVweIrpzhjwyPro5wx4ZH11EKyjwsjMjWHZTsU2w3AYJS+GUpU++7wUrexk7qRjP/AKh71SWsfLsH/wA1H96jl2fDI+upJJVGtDZjeslFYzIZ7jqPro5wx4ZH94VCuu56DUG7CXuLEvkGz27DUy776gt9TSlxyw3vlC8E5UoFOenio5yKm3LseGR/eo5wx4ZH94VZpLVm9gfvTHoGNPh6LssO5wzFlR4LLTjROSkpQBx4cDw6O5UgrHzhjwyP7wo5wx4ZH94UcS4ypY0MaGjcslcHorpzhjwyP7wo5wx4ZH11WCrqvL5Z5Uy+SZFrs75YLDqJSBD5DlByrSlJC+HLlaUrA6QM9Izxk+j4y40eaUwnIcV6Y45FYW3yZQ0Qke8/q5UFKx8/cp85wx4ZH10c4Y8Mj66uXEiIXO2gGvxyslFY+cMeGR9dHOGPDI+uqQV0LuagF3tupDqW4PwmXFyJKktwXlRgppmPzfdUeVxlCg5vHAIzvdBzwnnOGPDI+ujnDHhkfXVmkt3LOowVABKgumYSosyYti1vW+IpiM2lhxrkyXkpVyit3u9KBvd3d7vTUkYxyyPprvNUlchSkkEcOI+isPRxFaE4syopsFNuEJ8GOjNIrmRuoFJOcyO46r666LcW4d5aio/OaoGwryovcrFK5pfG4tveLUu4Q5G8lsulSU8mVr3D+sAKSCnujh81NsWxXdllCZFpfW8puOmA9zfdDCkS3FurI/8AICkKQd3hw9zxxip2h51sYQsgVyt95ad1ThIPz1oHELmdZmuM/mspRbccqrPepypjSpSFbyFEH5q786keGV9dZlsrpBhRnVsJ2VqSI5bISudsvtrLvNMApwRnl/6oTnO73cYxg012y03RmNb2rlZpEmBFWy7cULgjlHny08lz3IGXkhZaUFHe4knJxwmxJJ3iSSe7WQSXwMB1XD560DiBC53WcOfjlJLLFmQ9M22LcEqS+0ylK0qOSnhwST3wMCs1d1uOOHK1k479dKqtmtwgAJ4ifBm/orULrsnxKNVeU7T+Mbrb2J8Gb+itQuuyfEo1V5TtP4xuszqtAvg1RRRUItkOty/HX2V+U5H4N+vQxXnn63L8dfZX5Tkfg369DFERTG5+sX/aP8afKY3f1i/7R/jVmqCohrrazs82ac3GttURrY5LBLLSkrccWkcCoIQFK3c8M4xUQ7bDYB4/o9Hyv5Vau9W4tattQQpRIRZ4oSCegbzh4fvNVPprZ5e9VwW5lrkW9CpMw2+Iw/IDbsqTupUG2wRgqO+kDJGSQK+ustx2WpZWV6zyJE7o+i+dtF612V3UqbQY7ea367bDYB4/o9Hyv5VHbYbAPH9Ho+V/KrQl/ZlqRm2IuLRhSXDGjTFw2H96S2y+pKWlqbwMgqWhPuScFQzjNZntlOp0SUQo71rmSBOZt0luJNQ8Yb7qwhCXd3oBWd3eGUg8M5IB39RXf7w/Lks/W1rHsD581vh22GwDx/R6PlfyqO2w2AeP6PR8r+VWgytn8sCU63f7I5FgrablSkyF8kytwrCUqJRnOW1dAPSO/SPVukZejbkbTcbjbpMpH61uI6XOSOAQFEpHSCMYzUtuCwvOFr3T8OSg3xamiS1v58V9NdD7VdC7SI0qZom8rujMJxLT624b6dxShkD3SB3Kk3O0eAk+buflWtfW8h/4U1fw/wDyMf8AyzW2+B3q+WvGg2x2p9BmYHHsXu2Kq60UG1Xanmo5ztHgJPm7n5VxzxHgZPm6/wAqfZ86Ha4T9xuD6GI0ZtTrzizhKEJGST9AqGPbWrUjSretGtO3561BuQ/JdTHbQqG0wtSXFOpW4k8NxR3UhSsD3ueFcYLjot3OazVO3PEeBk+br/KjniPAyfN1/lWTUGsYVibgBq3TrnKuZVzWJCQgvOJSneWv9IpCQlIxkkjiQBkkCmgbWtNurhriRbjKhyWIsh2a0wOSiJkHDPLBSgsEnpCUq3elW6ONVc/AMToA61BewGJTnztHgZPm6/yrnnaPASfN3PyppVtd0wyZj02PcYsKMzKfamusAtS0xzh7kglRWSD0BSUlXSneHGnvTmroeoBMact022S7cpAlRJwbS60lad5CzuLUkpI6CFHoIOCCAZUFRuNhBHUpxsnDOaxc7R4CT5u5+VHO0eAk+buflTwxdrXJc5GNcIzrhGd1DqVHHfwDSpCkOJC0EKSRkEcQanEQrCDoVHedo8BJ83c/KuzT7bxKU7wUnpSpJSofuPGpDgd6m66ISHGlhIzhQz83CpDpKmE3S5cWBFenTpDcePHbU6666oJQ2hIyVKJ4AADJNVW/1VmwOO8the0BhSm1FJKIUlaSR3lBsgj5xS7qk3HG9husFNrKSYG7kHHAuIBH1E18zUpCiEkgZOMnoFfRXPdNK8GOfVcRBjKORXjXleFSxvDWAZic19Ie2x2AeP6PR8v+VR22OwDx/R6Pl/yq0Pd2W3tJtSIN1s0528tqkRG48o5UwlTiVvKK0pShCSy7vKURgJJ6ONdWdmN3kToEWPerI4zdHVRocxuZvsOyApALG8lJKV/pEHCgAQcg4r0fUVg9475cu1cPra19EfnxW+XbY7APH9Ho+X/Ko7bHYB4/o9Hy/wCVWgzWzjUEyVeo1oXDuXYCGudOcivZQhtBwoAqA3lABRwO4lR7lMt0sk+zN292ahATcoiZrG6rOWlKUkE945QrhV2/p+wvMB7p+HJQ6+LU3Vo+fNfRqB1Uewu6To1tga5S9JluoYZbFvlArcUoJSni3jiSKs7njfgZPm7n5V8q9nH+kXSx/wCdQf8APRX13SBgcK8O+rvp3a5jaRJmdV6l2W19tDjUAEcFHOeI8DJ83X+VHPEeBk+br/KpJw71RJnaRZ5F5Nqat1yUyqU/AZnJZSY78tlK1OMIwrf3xybgyUhJKFAEnhXiAk6L0nOazVKeeI8DJ83X+VHPEeBk+br/ACo05raHqG6T7I7Z7larjbmWJLsachsKLLxWG3AW1rTglpwYJChu8QMjLS3tf0upt+U9FuTETmzkuFJWwkouLSHEtlUfdUScrcbACgkq30kAjjU/u0hV2jImU7c8R4GT5uv8qOeI8DJ83X+VNntq2w4ht6evS7yJKoqrOlpnnaFJaS6pRPKclu8mtCt4OEe6A997mj23NMOqjOwo1wlwXmIsh+e0ynkIiJKt1nld5QUCT0hKVbvAq3Qc1P7uCjbU+Kc+eI8DJ83X+VHPEeBk+br/ACp6kXO3QyEzJsdlRTvYccSk47/E9FZWpMZ8JUy6hYWMpKVA5HfH11XEVoCDlKYOeI8DJ83X+VHPGR79DyB8pbK0gfSSMCpJgd6uFoStJSpIIIwRTEVMJjpRGiKke63gEg4PfpMgYQkd4CnO2/qVf2qsTkoCVISEJCB0AYrT7rsnxKNVeU7T+Mbrbh66QmFltx0ZHerT3rrlyiSuos1U0yvKuyVpPR/xjdZqy+ElFFFEWyHW5fjr7K/Kcj8G/XoYrzz9bl+Ovsr8pyPwb9ehiiIpjc/WL/tH+NPlMbn6xf8AaP8AGrN1UFfP3q2/9Nh8kRf4uVWVk2j3TTWjRp2x7keaq5OTTMVFZccbSppCByLi0lbKwUk7yCk9HHhW+213qbdBbZLrGvt+kXKBcYzIjmRBcQnlWwSUpWFpUDgk4IwePHPDFf8AaG7MfGvVH2sf+VX2ljvmxNsrKNaZaBunRfM2m7bS60Oq0og9a1rb208jbYUBq1IbXa41pVDkNx2kOrkw1JJQ+4kBbzCyM7q1HdUhsjGCKw2TaHo3SFyfuOl7Zd1dlJ8N6Y1MU2RHjMy25JZaUk5cUVtIAWoJ4A+5ycjZrtDNmPjXqj7WP/Ko7QzZj416o+1j/wAqtPWl15gTnrkVmbvtx1j5LUSRrh2fYr/bJ7anH7tIiOMuIbQhLaGVuqIUEgZJ5UcfmpBrfUDGqdUz7/FYcZalqQpKHCN5OEJTxxw7lbldoZsx8a9Ufax/5VHaGbMfGvVH2sf+VWrL6u6mcTSe49XILN112x/8o7/ziunW8f8A7U1h5Rjf5aq24qpNimx3T+w23XO2aauVwnN3R9D7qpykFSVJSUgJ3Ep4ce7Vk9knvkIr5G9KzLVa31qeh5L6Ow0nULO2m/Uc0j1hpX2XW9i3qvU62pYlNyt+IllRcUg5SlaXm1oUkK3VY3elKT3KgL2ybVJ0SrRMmXZ72l56a8m4XNO4/BceeWtDrIZbTlSd8K6UHezhQGMWV2Se+Qijsk98hFcILm6LZ9JlQy5RS7aZ1aJtuv0eZbX51kLsaJzjlEh+I6y2HC6RnDvKN7wKRjdGOkkiNRNCzLRANojTmHI8pmK3OdWgpWVte+UhPEYWOGCfc9PHoqzHpzzzZQUo4/NUfuSX3GHmggb60KSPpIr8/wD12LaaLDQnDvhddlp0gc9VXN/t8UNjTdwmluHCafbjy2YynBHXJOG1PdAATkjAJ3uk7tWJZNI3aWNR3W/yYjc/UUduEUw99TTDLba0oOVbpUolxaj0dIA6MmKWnSablKcVc4MmKy3yKVRRIJbfKBkbwHBSRw4AkA5GSOAs1mc802lAQjh9NX/Q/pPo7hUmOvjlp8/ksqtL/iFzo6o+P9fOUyp2fNLaaalXOQdxqO0pbLzzbpDTjiwQ7yhdGeUx78+97xwJBp+0psNjgWVL6nkwIzccOKzlYQkDJyScnHdJrr2Se+Qijsk98hFfeQSqANGicqb7p0tfQr/tXXsk98hFYJEhcggrAG70AUDSrSqu6pb/AEF6wz0cxH+aivmdX1r1Jp606ssM/Td8jc4gXFhUd9vJBKFDuEdBHSD3CK18X1B2y5S1FvVOqEJJyE8tHOB3v1VfT3JelnsNNzK05mdJXh3pYa1qe11PcFqdbNoEGC9poPW196Pa7HMsc9CXAhTrUl2UVqbVxwQiUMZHvk8Riu8fWWm7EdP2/T8a5PwLXe271LdmBtDzy0lACEISSEgJQeJUclXcAFbWdoZsy8bNT/ax/wCVR2hmzLxs1P8Aax/5Veob4u0mZPceJP1JXn+rLZEZd44QtWtPbUo2lwFQLA1Lck3tV0nc6UoB1kJKW2BuKHDdckBWQQeU6OFItZ37RWoLZbuxQvUeZa4aYDDTzLRZU0l5xYUpYXvA7rmMbvSK2y7QzZl42an+1j/yqO0M2ZeNmp/tY/8AKqBe92tcHgkHsPYrG7ra4QY71p3s4P8A9RNLeWoP+eivrwOgfRWrFj6iLZxYb3b77F1RqRx63SmpbaXHWN1Sm1hQBw0DjI79bKi5PD+oivDv63Ube9honQFendVkqWQOFTfCc6rqXszkv65RqqG1DhMwn3J0dtMuQ4mTKWw41vrYJDTPF1RUpsFayBlQ4gzPsk98hFHZJ75CK8ES3ML1HtbUEOUN01ojU9kvVzv7EfT9tN1MRp+3wuVVHKW1rL0jOEfploWEj3I/Vp3irhhmTsavjtsg2B+7wWoOnICoVkW2hanFkPsOtLkA4A3ebNpISTvZUcp4AWX2Se+Qijsk98hFWl0yqbCmRBUDb2fazZv69etyrOq/vSXFLiKU5zQR1x2mdwObu+VAspXvbvHJTgcFUjibHb3arV7GIF3hO2u4xoLNzdeQpL4XHPu1NJGUkOJATgkbmM+6zirI7JPfIRR2Se+QimJyj0emU033Rar3c5c83EtImWtVsU3hwgZ5T3eAsIUf0n9ZJIxwIzWS1aLYtV/N/anyVuLTJStpbrimwHXG1+4QVFKMcng7oG9nJpy7JPfIRR2Se+QiqwVrhanKuD0U3dknvkIrqu4vqSUhKRnu1GEq0pIj3o+gU4wjiI4R3Cf4U39FL4fwN39/8Ks7RQFHiSVKUTkknj++tS+uk/E21T5QtX4xuts+6fpP8a1M66T8TbVPlC1fjG6orL4d0UUURbIdbl+Ovss8pyPwb9ehfeT8ofXRRREbyflD66TGFGUSoniTnpoooi45jF7/APio5jF7/wDiooqZKI5jF7/+KjmMXv8A+KiiklEcxi9//FRzGL3/APFRRSSiOYxe/wD4qOYxe/8A4qKKSURzGL3/APFRzGL3/wDFRRSSiDBiju/fWNcK3HgvH10UVVwDxDswi4TEtqPeqA//AKrtzeB4T76KKNaGCG5BEc3geE++jm8Dwn30UVaSiObwPCffRzeB4T76KKSURzeB4T76ObwPCffRRSSiObwPCffRzeB4T76KKSURzeB4T76ObwPCffRRSSiObwPCffRzeB4T76KKSURzeB4T76ObwPCffRRSSiObwPCffRzeB4T76KKSURzeB4T76ObwPCffRRSSiObwPCffRzeB4T76KKSURzeB4T76ObwPCffRRSSiObwPCffXfMVlhaG3BxBPTRRUSii3LNZP6QdJ/jWpfXSpLA6jjUzZeQFOXK1pQCcFR522cDvnAJ/caKKIvh/RRRRF/9k="