Home » Bookkeeping articles » Loan Amortization

Loan Amortization

November 15, 2021
Bill Kimball
array(3) { [0]=> array(0) { } ["find"]=> array(0) { } ["action"]=> string(7) "replace" } string(102608) "<p><img src="data:image/jpeg;base64,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" alt="amortization definition" class="aligncenter" style="display: block;margin-left:auto;margin-right:auto;" width="367" height="275" /></p> <p>Amortization is important because it helps businesses and investors understand and forecast their costs over time. In the context of loan repayment, amortization schedules provide clarity into what portion of a loan payment consists of interest versus principal. This can be useful for purposes such as deducting interest payments for tax purposes. For example, a mortgage lender often provides the borrower with a loan amortization schedule. The loan amortization schedule allows the borrower to see how the loan balance will be reduced over the life of the loan.</p> </p> <p>Save money and don&rsquo;t sacrifice features you need for your business. Patriot&rsquo;s online accounting software is easy-to-use and made for the non-accountant. The accountant, or the CPA, can pass this as an annual journal entry in the books, with debit and credit to the defined chart of accounts. Since a license is an intangible asset, it needs to be amortized over the five years prior to its sell-off date. To understand the accounting impact of amortization, let us take a look at the journal entry posted with the help of an example.</p> </p> <p>At first, payments will mainly go to interest and very little to principal. Then, as the loan is closer to being paid off, the payment goes more towards principal than interest. They are an example of revolving debt, where the outstanding balance can be carried month-to-month, and the amount repaid each month can be varied. Examples of other loans that aren&#8217;t amortized include interest-only loans and balloon loans. The former includes an interest-only period of payment, and the latter has a large principal payment at loan maturity.</p> </p> <p>The percentage depletion method allows a business to assign a fixed percentage of depletion to the gross income received from extracting natural resources. The cost depletion method takes into account the basis of the property, the total recoverable reserves, and the number of units sold. Unlike depreciation, amortization is typically expensed on a straight line basis, meaning the same amount is expensed in each period over the asset&#8217;s useful life. Additionally, assets that are expensed using the amortization method typically don&#8217;t have any resale or salvage value, unlike with depreciation. At this point 10 years later, her interest payment is $2,367 and her principal payment is $1,385, after which her balance is $568,009. At the very end of her amortization schedule, 30 years later, her interest payment has dropped to just $16, but her payment against the principal, her last one, is $3,742. The rate at which the balance decreases is called an amortization schedule.</p> </p> <p><h2>Free Accounting Courses</h2> </p> <p>In the first month, $75 of the $664.03 monthly payment goes to interest. Intangibles amortized over time help tie the cost of the asset to the revenues generated by the asset in accordance with the matching principle of generally accepted accounting principles . Amortization schedules are used by lenders, such as financial institutions, to present a loan repayment schedule based on a specific maturity date. In addition to Investopedia, she has written for Forbes Advisor, The Motley Fool, Credible, and Insider and is the managing editor of an economics journal. Using each company&rsquo;s earnings before interest, taxes, depreciation and amortization in 2020, UMG and WMG have multiples of 35.9 and 31.5 of value to EBITDA, respectively.</p> </p> <ul> <li>Consumers often make decisions based on an affordable monthly payment, but interest costs are a better way to measure the real cost of what you buy.</li> <li>Amortization is an accounting technique used to lower or expense out the value of an asset over time.</li> <li>A business will calculate these expense amounts in order to use them as a tax deduction and reduce their tax liability.</li> <li>In this case, if we suppose that the interest rate is set at 10%, then company A would actually need to repay £275,000 per year for the debt to be fully amortised.</li> <li>The loan amortization process includes fixed payments each pay period with varying interest, depending on the balance.</li> <li>If you only pay some of the interest, the amount that you do not pay may get added to your principal balance.</li> </ul> <p>In general, longer depreciation periods include smaller monthly payments and higher total interest costs over the life of the loan. In a loan amortization schedule, this information can be helpful in numerous ways. It&#8217;s always good to know how much interest you pay over the lifetime of the loan. Your additional payments will reduce outstanding capital and will also reduce the future interest amount. Therefore, only a small additional slice of the amount paid can have such an enormous difference. The second situation, amortization may refer to the debt by regular main and interest payments over time.</p> </p> <p><h2>What Is Negative Amortization?</h2> </p> <p>With depreciation, amortization, and depletion, all three methods are non-cash expenses with no cash spent in the years they are expensed. Also, it&#8217;s important to note that in some countries, such as Canada, the terms amortization and depreciation are often used interchangeably to refer to both tangible and intangible assets. The two basic forms of depletion allowance are percentage depletion and cost depletion.</p> </p> <p>It demonstrates how each payment affects the loan, how much you pay in interest, and how much you owe on the loan at any given time. This amortization schedule is for the beginning and end of an auto loan.</p> </p> <p><img src="data:image/jpeg;base64,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" alt="amortization definition" class="aligncenter" style="display: block;margin-left:auto;margin-right:auto;" width="358" height="231" /></p> <p>Your lender may offer you the choice to make a minimum payment that doesn&rsquo;t cover the interest you owe. The unpaid interest gets added to the amount you borrowed, and the amount you owe increases. Operating Income Before Depreciation and Amortization shows a company&#8217;s profitability in its core business operations. If you haven&rsquo;t refinanced your mortgage in the last year, now is the time. If the asset has no residual value, simply divide the initial value by the lifespan. For clarity, assume that you have a loan of $300,000 with a 30-year term. To learn about the types of amortization, we shall consider the two cases where amortization is very commonly applied.</p> </p> <p>This can put you at risk of foreclosure if you run into trouble making your mortgage payments. Certain businesses sometimes purchase expensive items that are used for long periods of time that are classified as investments. Items that are commonly amortized for the purpose of spreading costs include machinery, buildings, and equipment. From an accounting perspective, a sudden purchase of an expensive factory during a quarterly period can skew the financials, so its value is amortized over the expected life of the factory instead.</p> </p> <p>You may need a small business accountant or legal professional to help you. When an asset brings in money for more than one year, you want to write off the cost over a longer time period. Use amortization to match an asset&rsquo;s expense to the amount of revenue it generates each year.</p> </p> <p><h2>Statistics For Amortize</h2> </p> <p>In lending, amortization is the distribution of loan repayments into multiple cash flow installments, as determined by an amortization schedule. Unlike other repayment models, each repayment installment consists of both principal and interest, and sometimes fees if they are not paid at origination or closing. Amortization is chiefly used in loan repayments and in sinking funds. Payments are divided into equal amounts for the duration of the loan, making it the simplest repayment model. A greater amount of the payment is applied to interest at the beginning of the amortization schedule, while more money is applied to principal at the end.</p> </p> <p>It also serves as an incentive for the loan recipient to get the loan paid off in full. As time progresses, more of each payment made goes toward the principal balance of the loan, meaning less and less goes toward interest. The amortization of a loan is the process to pay back, in full, over time the outstanding balance. In most cases, when a loan is given, a series of fixed payments is established at the outset, and the individual who receives the loan is responsible for meeting each of the payments. The payment is allocated between interest and reduction in the loan balance. The interest payment is calculated by multiplying 1/12 of the interest rate times the loan balance in the previous month. The interest due May 1, therefore, is .005 times $100,000 or $500.</p> </p> <p><img src="data:image/jpeg;base64,/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgICAgMCAgIDAwMDBAYEBAQEBAgGBgUGCQgKCgkICQkKDA8MCgsOCwkJDRENDg8QEBEQCgwSExIQEw8QEBD/2wBDAQMDAwQDBAgEBAgQCwkLEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBD/wAARCAEVAWgDASIAAhEBAxEB/8QAHQAAAgMBAQEBAQAAAAAAAAAAAAYEBQcDAggBCf/EAFsQAAICAQMCAgUGBgsNBwMCBwECAwQFAAYRBxITIQgUFSIxMkFUYZPSI1FSkrLRFhckNDVCVWJ0kZQzOENTVnFzdpahsbTURFdjZIGV4hhydyUmJzZndYPB8P/EABkBAQEBAQEBAAAAAAAAAAAAAAABAgMEBf/EADERAQABAgMGBAUEAwEAAAAAAAABAhEDEiExQVFhkfAEInGhEzKBscEUUtHxQmLhwv/aAAwDAQACEQMRAD8A/qRUqVTVhJrRf3Nf4g/Frr6pV+jRfmDRU/ekP+jX/hqp3RvPb20IoWzN0ixbYpTpQRtNatuP4sMKAu5/HwOAPMkAE6kzEReUmYpi8rb1Sr9Gi/MGj1Sr9Gi/MGsuqdX9yPua1i7W06sgrReNPhaV4TZqnCAh8WSPjwJW4mjLwxSs8QaMgymZVXQ9vbmwO68eMnt7Jw3a4YxuU5DxSD4xyIeGjcfOjAMPnA1mnEpq2M04lNekJ3qlX6NF+YNHqlX6NF+YNdtGttuPqlX6NF+YNHqlX6NF+YNdtGg4+qVfo0X5g0eqVfo0X5g120aDj6pV+jRfmDR6pV+jRfmDXbRoOPqlX6NF+YNHqlX6NF+YNdtGg4+qVfo0X5g0eqVfo0X5g120aDj6pV+jRfmDR6pV+jRfmDXbRoOPqlX6NF+YNHqlX6NF+YNdtGg4+qVfo0X5g0eqVfo0X5g120aDj6pV+jRfmDR6pV+jRfmDXbRoOPqlX6NF+YNHqlX6NF+YNdtGg4+qVfo0X5g0eqVfo0X5g120aDj6pV+jRfmDR6pV+jRfmDXbRoOPqlX6NF+YNHqlX6NF+YNdtGg4+qVfo0X5g0eqVfo0X5g120aDj6pV+jRfmDR6pV+jRfmDXbRoOPqlX6NF+YNHqlX6NF+YNdtGg4+qVfo0X5g0eqVfo0X5g120aDj6pV+jRfmDR6pV+jRfmDXbRoOPqlX6NF+YNHqlX6NF+YNdtGgyb0ra1ZfRf6vMteIEbFzvBCDkfuCbRrp6V/8Aeu9Xv9Rc7/yE2jQaHer5O3t+WrhslHj70tXsr23ridYJCvk5jJAfg+fBI518m4nfPVXp/e3ZNbgxN7O7derXzuWnxXrNix47qIQkj31Ph8up8NFRF5PCDX19U/ekP+jX/hr5I39LF7c67DxF87m3/n/8WDXk8VpaqJ4/aZeLxl4tVE66/aZ/CWepHU7Gbky2402/tqPMxYyC1dupt9PGes4gKju9ock8TQcj+aOeewa54/cPVnf3UnB0cRZxO39w5PF182+Xq4cRs2LZk8plF11nPDKBHIjdvcSpU+evWami9o7s/Cp//KeOHyh+TjNW/SKSM9ctoAOp/wD4W1B8fn5g154vNUU3m1/y8sXmqKZmdv5fSGRlsVcPanEoM8NZ3DqvA7whPIB5+f5vPWU+jP1FzO6vR6w/UPqLnxZt+Hfnv5CaOOICKGxMO5hGqqAqIPgPm1rOUryWsZbqwgGSaCSNeTwOSpA18r9KenfpB4vpMvo87q6Z4vH7fu0clRsbhTPRSywesCaRH9XQEtxI6rwG+HJ8tenErroxJyxM+XThe734tU04lExe2t7X5Wv7tB2v6X/THdG48Tg0we78XT3BY9Uw+byeIMGNyEvPCrFL3EksfIcqPP48a67l9LHY20dxWMLntl78rY6pkPZk+4HwTLio5u/s/uxcEr3eXIU8/NzrOMN0b9ITdeO6ddMd/wCC2xhtsdOsnUvy5elkDPPkxUBWFYogoMfKnhi/HPPd5cdpU+qHo5+kbvS7umnkMbX3A1rMtkMdmbG6540FHxVMdOKh3CFWUeZZ14HDcEntJ5Ti48WtF9eG2NNvDfw2dfFVj+KjDmYp103b7TePS9tffe3jf3pV7A6fbtzGyLu3N3ZbL4WtBdmhxGMW0JK8iF2lUiQBUjXt72fsA7147vPjStjb1wHUXaOL3ttey8+Ly8Anrs6djgckMrL8zKwKkfjB1k+P6Ub0g65dRt8S0IFxG4tqVsVj5fWELSWFiVWUrzyoBHxPl8NXno+bL3j0u9H3CbRzOJiO4sRTuH1NbKMjzNNLJGniAlfPuXz54HP1a7YVeJeZr2a7uFVUfW8RE/V6sOvGnGtV8uu7hltrzvPRkPUrr/1IwnWW3uTB5sR9M9n7gxe183VFeN0sz2EkaxN4hXvXwSY1IDD3uzy8zzsvU70iNl9Ktz4/aGaw+48nlMvQe/Qgw9AW2s9rhfBRQwYyH3mHl29qsSw8gcQxnoW7mzXSHKV929Q92VN0571vK38HWysXseXJO7PH4kYQhuSsXc3d8R5EcDThsrpd1cm6mdJN9b0w8ELbY2raxGak9dilZbHDpGw7Se/vXtYkc8Enn4a4YU+IjyVaTM3vt2xN+kxp6vPTX4iM1Vp81rX3eaI2bvLOzlMpcHpydHbFSjkUw28hSmsLVyFtsMRBh5mcqqW5O/tVjwW4jMh4+vy009RvSc2J073JNtEYHdW58rTqrevwbdxnrnqEDDlXnYsoQEcH4ngEE8cjWTXfR76ozejn1J6dx4asc5uPek+Zx8PrsXbJVaxXcOX57VPbG54JB8vr0wZjpz156ddTt3bz6Vbd29uOlv7H0oLUeQv+rSY21Xh8IOeRxJF7zN2qeTzx7vbyyMXxGSJmOG7jTe1vXRr4niKdvLW2zWY2b9Iifqcdyelf0s29gNobliizmYo73S0cScXR8aRpIAoaFoyyuJGdhGoAPvfEge9pMPpa5tuumL2JH0u3auAyGErWTXfAMMpFankTiZh43atWNX7JG7SVkVx5gah7Y9Gre2y5uhVCu1TJR7IvZW9uC1HMEjie0AwEStwzqG5UcDny5IHPAbt/7C6qUfSP2/1h2FgsVmcdJgRtzJQ273qz1IzZMrTjyPfwpHAHJJUjgcg66TVjTMTOnmiLW3ZYv9Lza/Jma/FVUZp0tl2R6X/pW7J60ttjCb93BdfqF1CWhvm3h1p0cFFJYx4Cd3hxIkx766dvHiMVPLD3BzybzFelds3OdPa/UXD7E37erW8rLiK+PqYZZ7ssscYd3CRyMvhgcjuLj3lI48tZvlekPpAYXpn1M23sjFVkyW9983LoZchFHJ7HmT3nRy3COxVU4PvBWby+BEnP9Oev+W6VbV23t3YFPa9PbOSaC3tTHbqMBy2PESdjG7CFKt4hlLLyCx97zPA1yoxMami1p0indO2bX6b9s7eDXxMamZiIn/Kdl98219+ltq8396XlCLopuDqF0721mVzmGyUeIsY/M4pg2MsH3i92NJAUi7Qyhg/y2VT8+vUnWa1vLc/RrIG7vbZpz9/IV58NZwsUSZRooYyTMXm7o4eWJjZRIWDHkLwDpN2v6M/VIdIesOyctjcZjMlvOzWt4qNcrJch9ztkMbTyEykgjsLyeZPJ8xpubp31l3fuLonuTde0cbipdlW7yZaKtk0mEUBrxRxSc+XczlGPavd28jk63FWNNUZv9J94zdN8fiHKK/E1xE1RO/S07qusXjVd5r0yelOFzV2i+I3bcw+Mvezr+5KmHMmIq2AwVlefuB8iQPdU88jjkHU/ffpW9Pdh7oyOzp8BuvNZTHUq+S8LC41bYmrSoXMqEOAERe0uz9oHevBbz4yCToJ6Q+N2BuH0dcLiNrT7SzuWltpuae8wlgqPMshRq/b3NL7g8/MefHPwYaVtrovuvbvWzdW5Yasb7ft7Iqbfx1l7CeJLPEiJwyc9y/I8yRxrNOJ4iqmOPpvy1TMdYiInfd2jE8TVVa1tY3bNbfXTW7Wtj76wXUbZeO33tOSSzjsrXM9YSL2PyCVZGB+DBlZT8RyD5keevmroN1V6m9Vt9eu5/rvi8JkamVmhv9O58FFFItZGI7Y53YSu/aOSQDwQeeNbD6N2w92dNeg+A2TuKrBUzuOith4/FWWNHexLInLISCOHUng6yjM9HuufVjf+z8t1A2FsjbFjamWgyN7dGIutJZyaRMCIoo+3vVWIHlKfL4gjgq3bEmv4lExE7tNbbY1+nCdsJi1YteDh1TE5t8ReLz9NnLdxaaPSi6eTb+k2Hj8Tui+tfJphrWcqYppMVWvM4QQSThuVbvIXnt45Px489ZD0r9LnHbOq7ppdU33dmDBvW/U9qQ48z08VTLokCTTcqFHIk4VQzcA+XmOWzpl0+9IHpFuXL7K25g9r5DZ+a3TJnjnbV1lnr1ZZEM0JgA7mm7E4U/JBPJJHkq/b9H3qfL6OXU/p3Hh6xzm5t42cxjYPXIu2Wq9iu6sX57VPbE54JB8vr1wz48xTXvtN4tv8un3tPqldXiKtY0mJndwiq3rfTr01XqP6TewunO4W2u2F3RuXI16a5C9Ft7GeuDH1mHKyzsWUIpHn8SeOCeORz43V6UnTPbeM2tkMdXz255t412t4qjgMebVuSBR78jRllKhTyCPlcq3APaeMl6lejl1Fj6mZLfW3toVN4Y3ceNpV7VD9lFrCzU7EEKxEloXVZoiq/Bu48seAvBLWT9D+rHTzNdN9/wDTDZu2bGQ2/g7GDym3zlZUrQCaR5e+GebudgHlfuLEt5DgEE9u/ieIvN40vw2Rr1vpsvtWcbxOarS0ek8Y156Xm3GNg6O+ktDi9h7p35vy/ns1Qu9R5sFiFWFTNWhmSNoEKSMnYignkeZHPHB1qHUPrNi6mR3v0xxCZStuXCbMt7jS6scYrogRlTsfv7vEDFTwU4+v5tYs/o19Y7vRrdmCvRYVd2TdQDvKjHFY/clzhU5VWPmgJMnaH4PujnjnkXmP6V9d9z9Rt8dQ99bYweNk3N0+tYCnVx+REwhssQI4ZGbjljwzFwOwBgOSQdc4qxvhRh2m9v8AxO/jmMLEx6LUzE6zG7/ab+mll1sb0j8Zs3on04v74/ZHurdW6MaZYaOIpG7kLnhk+JL2cqOFHHJJBPzc8HjXel/VDa3VzbH7KdqNbSGOxJTs1rsBhs1LEfHfDKnJ7WHIPkSPMeevmLM+i/1Ph2t0uzVDBU8tltp4KTD5jBNnpsc7hnZlaG3XYcEFz3ct2kAfK1u/o6dP8n0+2ZfqZnZuO2zdymVmyElGnlrGSPDJGoaWedmLSnsPPae3jj5+denCrxasWqK4tGv3012aweFr8RE0UVxpaNt7/LF9eN9NWqaNGjXpfRGjRo0Bo0aNAaNGjQGjRo0Bo0aNBlXpX/3rvV7/AFFzv/ITaNHpX/3rvV7/AFFzv/ITaNA7bnx25MttCbHbSzkeHys8USwXZIBKIR3L3kKfLuKdwBIIBIPB44OFQeihmK8IgXcGElH8Z7GHpzyueeeXkkrs7tz58sST+PX0dU/ekP8Ao1/4a7a5V4NOJN6nHEwKMWb1Pm//AOljNnknObd8xwf/ANv0PMf2XQnotbkr2a1+huzFULlKVJ61qliqtaaKRDypDxV1bjn4rz2kcgggka+kNGsfpsNj9JhcPdDw8OTr4mlBmrkNvIR140t2IYvDjlmCgO6pye0FuSByeOeNTNGjXoemNBo0aNAaNGjQGjRo0Bo0aNAaNGjQGjRo0Bo0aNAaNGjQGjRo0Bo0aNAaNGjQGjRo0Bo0aNAaNGjQGjRo0Bo0aNAaNGjQGjRo0Bo0aNBlXpX/AN671e/1Fzv/ACE2jR6V/wDeu9Xv9Rc7/wAhNo0Gn1P3pD/o1/4a7a41P3pD/o1/4a+c9n9Puq2GyO44sbjM7gLma3aZrWYT2WwfFPatOWgcySyMRHJEeJogVJAUEAjXKvEmiqKYpmb/APP59nPErmjWIv8A13D6S0a+YLWA9KmkMjl6V7cE+TyGExCSKlnGNFHLFNIttYYpGVEsshjcN5RENMC3cIlXRtg7Z6m7ixedq9W8vkvV8jjK+OipMlOJD4lGEWZiIC7LKJvGXgSlR7xXkFSJGLNV7Uz3f+Pdzox5rqinLMX5NZ15WRH7ux1btPa3B54P4jr5lubZ9Jansm3nMZRvR71lnpYOP1O/RcjHUq0oW0RY5iIntSNI6hlkCMnxKFDMgw/pEbbOYlwO3bRk3Dcv2ZPVrNACC060DHZcSv8AI7YriBV7j3EcqAQwkY15tlm3p09tvCdOLM+JmIvNE9O/6fSGjXzZej9LUPuoI+VeT2rE2KSrHiVhkrCabhYJZJe5IzH6v4hliMgIJQPyRr6RiMhjQyqFcqO4A8gH5/P59bw8T4kXtMerrRi56pptMW4vWjRo10dRo0aNAaNGjQGjRo0Bo0aNAaNGjQGjRo0Bo0aNAaNI/WjFbgzPTu9T2tjLOQyS28fZiq15o4pZliuQyyKrSOiA9iP8pgD8OfPSHlLfpF5Pd8+Uw2EzGNxssLzVqFmzi1qx1/UX4glZTLML3rnaQ6l64i45JIKnlXi5JtaZ9HKvFyVWtM7NjdNGvmzFUPSxt7ZjOQyOZo5GlBlrEKucSZrcoNJqMFjt7o+DzdUlCvko5Ye6S1dRtm73yXWHAbp2tgrlj1eoleW7bsQHH00BmLPEvirPFY99eSI5Y5FCq4XtBEnGmLeWd3v/AAxTjzVEzFM7tradGvnyvB6TeepV69w5nbrCKnDYlSXFyTNJFj7YnlX+6IFltiqRyOe1h5J74Xy2G9KCbGPRbcWWin8KS2LaDF+KZzjEcVwOwoIxeDRj3e7tJ5cjh9Sce15yzpy2+hHiL28k68vu+hdGvnDP1vSupVatPBy5XISxZkzeuGbFKXqmtScxzRlVBi8dryAoRIoRAQ4YSLY5BeveIt7dgbcl+SfdecyOLuQSxVXXE1RaM1e1EYoiOBTrypxIx5ksx8+Y4F+NabTE92/M2/4keJvEzknTk37Ro0a7PSNGjRoDRo0aA0aNGgNGjRoDRo0aDKvSv/vXer3+oud/5CbRo9K/+9d6vf6i53/kJtGgdLlHeVgwyYPceKpVfBQeFZxL2H7uPM94nQcfDy7f/XVFSy25shjMbmK/U3a4qZiqLtF5cFJEZ4DGJO9Ve2G4CEMfLkD48acobcMNeFHWUnwlPuwuw+H4wCNZg/RDbVjDYrBZDeG7rlXC02x9MyQ10kjreEkaRh46qt7nYGB57mJIcuvu6zliWZoif7ky17G7rbtHV6mbTmZIFtMseHZiIW+TIeLnyDweG+B1xhye5LMyV6/VbZ0ssgjKImKLMwdDIhAFzk9yKzD8aqSPIaXdm+j/ANN9i0bFTBTZ5JbVa9VntlAk7i3FXjkbujhUBlWpF2cABfPgccAU+M9FXpDjMVNiRJuKdbDWWlmdVSRjPLSkfgxwKFA9QiVQoHarygcdw4ZY7lMkc+sn8Wt2tQ9qr1O2kaXb3+sjDt4Xb293Pf65xx2+98fh5/DXvGNvXMwyWMT1E2zciimeB3hwcjhZEPDKSLfxB0r0eg2w6rQJZyW4L9WLLpn5KVmvEa9jJBgTZdFrqOT2IOxe2NQg7EUkkuWxts7f6fYFduYE5BqUcjSoJ4GZlLcd3mEHPJBbz547iBwoADLHcmSOfWX77K6k/wCWmB/2fl/6vR7K6k/5aYH/AGfl/wCr1f8AtGv+TY/s0n3dHtGv+TY/s0n3dMsdyZI59ZUHsrqT/lpgf9n5f+r0eyupP+WmB/2fl/6vV/7Rr/k2P7NJ93R7Rr/k2P7NJ93TLHcmSOfWVB7K6k/5aYH/AGfl/wCr0eyupP8Alpgf9n5f+r1f+0a/5Nj+zSfd0e0a/wCTY/s0n3dMsdyZI59ZUHsrqT/lpgf9n5f+r0eyupP+WmB/2fl/6vV/7Rr/AJNj+zSfd0e0a/5Nj+zSfd0yx3Jkjn1kuLQ6kmy8H7M8D7iK/P7H5fnLD6X/ADdeL8O/MXSnyWS3/turUqxtNPPNgpESNFHLMzG3wAB8+r1cjWXITMUsecMY8q0h/jP/ADdQd11MfurbWT23O1mKPJVZKxkOPeTs7lI7u1l4PHx4/qIPnpljuTJHPrJYr7ozVupbv1eqO2pqtJYmlsR7dnaI+IB4YRxa7ZC3coCoSSWA45IGucW8shPPHXh6t7TeSV40jC4KUhvE8kIPrXBUt7vd8kN7pPd5aj0OluNxtI1KuduiSQUmms+x+Jp5apR45JWVQZT4kUZ5fuPaGXn3u4R6vRvb9KStJXz+ZApwxVYg1An8Alg2Sp9zzJn97u+Zfd4+fUyx3Jkjn1lZjdeVOT9ijqztM3jY9W8D2HL3+J3dnw9b+T4n4Pu+T4nuc9/u6dMJV3LW8b9kOaoZDu7fB9Vx7Vez493d3Syd3Plx8OOD8efLPo+kO2491Luw5nNNYEvJi9TbsMPr/tDw/kc8+s+fdz8j3eP42tQr2orPd4Syjt4574nT+ruA51YiIWKYjX8y7aNGjWmho0aNBT5qnuuzPG2389jaEQTiRLWMeyzNz8QyzR8Dj5uD/n0k4reOazNy3TpdRsOvqdhqr2LG0blerJMsphaOGxLYWKZhKChEbMQ3l8daPPchrMFkWYkjn3IXcf1qDrK8h0R2PktyTbqmyWdS7Lca4PCxtZEDMrq6uBV/DgpI6BpzI8YY+G0ZJJzMQzNETr+ZXGJ3Fm85jaeWxfVfaM1XIReNXc4Z0LoIxKfda2GBCMrMCAVB8wNeKm5c3kMRHn6HVLa9nHzZD2VHYhwEzo9r1j1bw14tef4X3eR5fxue3z0uXvRy6UXTh+2LM1lwmN9mV0hqqFMfgLEHPdAeJOEVu5e3uI97uX3ddE6BbGaiuKu7g3ZbonKvnJqzQRQpNfdm7pm8GshUlGCdqFUCqCFDFmaZY7lMkc+smCbcuYgv4nFt1Z2i9vOyNHjoosK8jWCsUsrEdts8KEgmPceF5QjnngGXVyG57yQSUuqez7C2u/wDFiS4l7WVW7eLnvcMyg8fAsB840pYf0fth7fjxsWJy24ETErYaCJ6EPhvPLXs1zM/ZWR+RHbkHajohIVipbljTv6MGyXrYOV917nlyeCnS3DakoxrG1la8ddZvAjgREZUijK9naC8cbSibt4LLHcmSOfWWh+1Nx+PJV/bW2b40Su8kfso9yKqh2JHrnIAUhj+IEH4a8yZjcUVunQfqrtD1nISJDViGIYvM7xySIFAucnuSGZh+MRtx8DpZv8Ao89Jr+EfANUzMNdgAHjibxF4M5HvNEef3y/k3IIVAeQCD32/0F6W7ZzO3dwYqplY722ZbM9SQVewSyTwxQu8qpCociKEKvkAoduAPd7WWO5Mkc+snT2V1J/y0wP+z8v/AFej2V1J/wAtMD/s/L/1er32pV/Itf2SX7uj2pV/Itf2SX7umWO5Mkc+sl5aHUk2Xr/szwPuIr8/sfl+csPpf83XT2V1J/y0wP8As/L/ANXq2TJ1vX5m7LPBhjH71l5+U/8AN139qVfyLX9kl+7q5Y7kyRz6yovZXUn/AC0wP+z8v/V6PZXUn/LTA/7Py/8AV6vfalX8i1/ZJfu6PalX8i1/ZJfu6mWO5Mkc+sqL2V1J/wAtMD/s/L/1ej2V1J/y0wP+z8v/AFer32pV/Itf2SX7uj2pV/Itf2SX7umWO5Mkc+sqL2V1J/y0wP8As/L/ANXo9ldSf8tMD/s/L/1er32pV/Itf2SX7uj2pV/Itf2SX7umWO5Mkc+sqL2V1J/y0wP+z8v/AFej2V1J/wAtMD/s/L/1er32pV/Itf2SX7uj2pV/Itf2SX7umWO5Mkc+ssT9KXG9QI/Rn6svd3dhJq67IzhljjwckbOnqM3IDGywUkfPwePxHRq59KzJVpPRg6uoqWeW2NnQOa0gH7xm+crwNGtRERsaimzWan70h/0a/wDDWH1cj6U9W/ZH7HMUa00NzNp400Vk9zSQCtigwli8GRUFku/bLGCU7ZH8wNrgrrLXhYyyr+DUcK5A+GkwdVdj1sBt7P5nJ5HHRbjxa5euskM8ohh8FZT4zxKyRHhgo7mHe3up3Hy1VLEO5fSQxmOtwZLY9DNZCVKLUZqKwVoI2KxvcWZZLbMAve8UZXvJaJmYcEc1W2b/AKT020Xyuc2pUr7mt7mc+qTWkkrVMcuK8NJVSOwoZWtoGMRckGVjwOA6tuE679INx1L9/Cbxt3KuNxsuWsTx0rnh+rRRRyy9jeHxLIiTRFok7pF8RQVBIGuMvpA9Hor4wzbtyK5U1xa9nPjb62kQz+B+EhMPiRkSfKDKCq++wCe9oFa9lfS2x1+atj8DhMnDPcyirZkihRIYYq8UdJ1j9YU8SypNMyFiy96ryAeF/MvnPS1nTMYyltTE1ibWSrY+/XWB/wAAIHFSciSyO1mk8NipQ8csD5KA7Nk/SB6WY+lalgzeVyNyrD45p0aFyaSRPMGRSI+DCrq0bzkiJJFKO6sCov4Opuw592psYZ24czIzKIkr2miXiWxGoefw/CRmapZCqzAt4TdvdxyQS+peZ9JqBMrW6dbXx1tbWSip4+Z2gierTalD4lp++Yh2FmaYgdo4FTjtcSBtOPSvKdV8kM8OqWApYzwMk8eINZkPj0xz2O/bI/DEBSR5cFiByBzqpn9IPojWttQm6hqtlMeco0ISwZBV9VS0H7QnPvQSK6r8puHCglHC2e3OrfTXdt7F4/bu5L1yTNiy2OdadtYbSV1QyyRytGEaMeKg7w3aWJUEsCAD9o1H9TX/AB9j7U6PU1/x9j7U6CRo1H9TX/H2PtTo9TX/AB9j7U6CRo1H9TX/AB9j7U6PU1/x9j7U6D8T+EZv9BF+k+pOq5aSNkJh6xYHEMfwlP5T67+oJ9JtfbNoPd2SzDSsTUq4sWEidoYS4USOAe1e4+Q5PA51jtvK9Z32lh5Fgy8WfWDILZiFKHiSyLMYi8TtDRqnqxmdSG7SyqpYvwp1/wBQT6Ta+2bR6gn0m19s2gzbbV7qIl+mco+4LOPtXVr90lGFJI4lkmaF2BCsqvAIGmdl7gx7FAcsI9T1R569T29UguWzkpY7F2rRHgyElHnmSFGblhwoZ15Px4+Y6t4K6wd3Esr93Hy3Lcf5udB10aNGgNGjRoDWFqnXPBbuvT4XE5nI0LeUkFizkHgkCVTK7R+r1zkPDYcdid6isVT3mjmc+5t01ZZ2DGWZOBx7khUf7tIH7bWwU3BldtTZXK+u4q/WxpSGCxYM80ySMvhiFWJC+BYDnjhPAkZu1RzoEiDJeldgKG2sVFt/E5zjEs+VuyiNJY7Qpp2QkGzxIwnDhpAQHJHko97XvHZj0kztqvirGzrU2Xfcj3Gvzy1K8YxItNIsMipbkZJD2qpVO9RAwHPfyAzL156RQ7Yxm7Mru65iqWUpC9GLsVhHjj7qqv4gCkKUa7WDefADlue1WImN1e6fVMVjMpmcvlceuSxVbMlXr2ZVq151cxmaWJGjjLGN0XuYdzgKvLMoIJmFy/pP5TIbSm3LtiLH+A1qxloKa1xXcipeWJZJPWi55mNP8GsZHwYuvDKs2XcfpQUMflaL7MxWSyMsNQYm9WihirRStGHtGxE9zu7VaTwowjEsYXZuFZTpj3B1n6abbv3cVezeaa3QLJMIsdeeBJASCjWBF4KEHjks4ChlLEBgTUVvSS6KyVse1zduWo38jCsseLsY2+t8MyxssZreF4vewlQoO38ICSncASAWr2U9LWtvjFyRbcpXcXDUuxytDHXiqzyNehSITK1vxIz6vBJMJUWTt9ZMZTleSy7YzXpH2NjZLK7p21iau4Vr1kqY+vFG/EhsOLEgb1nskIgKFI2aMFl83Hce28zHVfZOK3ljdgxX8rczeQykeLMEENllhdqz2WZnCFSEjVC/aT4Zng8TsEitqBc6/wDRfG15bWV3zboRw21pk3Kl2uWdvG7GQSRgvG5rTqkq8xu0ZVWLcAhRT5L0gtvbDxl6PFG/u3P7jsvcprVWzHRqeq2GijBa2kccffXrjvVhwJeOx5CzN+R7x9JqzJlsU2wcZSuyZCwMVOwWeCOgnZ2yysJlVmJkIROVZvDclVUd2mi71r6T43KzYi9uzIwzVrL1J5WpXfVopUcJIHn8PwlCM0YZiwVfFi7iPETurovSG6O3aGNyeG3RlcpXy1qrTqPUo3Csks9lYFTuZAocFmcxk95jildVYIeAYem9rqXNaycXUelRSVYoHqzVI1jVgZJ1KFBLJ5hUjfu5H927ePcOnrSrs/P7d3zRXcm2MpctY6zEBDM6zQF+2SRT7siq3HKngkcH4jkHnTB6gn0m19s2glaNRfUE+k2vtm0eoJ9JtfbNoJWjUX1BPpNr7ZtHqCfSbX2zaCVo1F9QT6Ta+2bR6gn0m19s2glaNRfUE+k2vtm0eoJ9JtfbNoM09K/+9d6vf6i53/kJtGo/pWUkT0YOrrCxYPGxs6eDKxH7xm0aDU4JZUrQhKzuPDXzDKPm+s6T4OknTeCpBj4thVDWrK6wwu3ekaugQqqsxAXtRQAPIdoI4I506VP3pD/o1/4a+esD0A6v7JvK+zuomNip/sPxu1lim8YNXeBppGsqwB7+x5HWJTxwlh+T+CVZA1T9qnp/Hgbm26uyK1SlkKlylMK5WORorSIljhw3d3OsUfc3PJ7FPPI11q9MdhU5o54Ni1BJHG0Ss3DngsWJPcx5Yljyx97z4541mOY6H9XpIsOcf1ImvS4641gm7m7sTIfUDAkqSKHYsks1uQoeFkV0RjwihWraPTjqliqm4DuHqfcvZG5Dfhxdpp2kjrSTdvZP4HYiL2lFZYj3iP3lVyGOgu5eknTKxLJ39PMb4jlHk7ERWKjnhTwwPhkliU+SzEsQSSdXce09tw5FsvFtKqt15UmawI4+8yK8zq3PPxDWbBH1yv8AjOswo9Juo+D2huSWvl1vbq3HmMdYZhuC5CsOPheAeq+udhm9yMTr4qp3yAgsOWPEeLpp6QceSvxv1Q4gv0alaOwtp3StJFF+GmWJkBSR2WJRw7qwM0hCEiMg/RdJOncdeKCTYlSZo4miM0oUyvyxfvZ+eS4ZmZW+KFm7e3k6n4vYGzcK2JbE7Kp1DgkePHeEiKKwfu7u0c/H338z5jvfjjubnPrnSLq1BXoQYPqxk4/CvwzWmmyk7s8KKQAGlSXu4LMzR8KJPdDMO0a5xdHOquOnW3S6m27dmR8Us01rJWFYR115sc8KwkEk0s8gj4RQFSPkIxVQ2jx5/oUn5y/r0ePP9Ck/OX9esVz3TbrrnNy5DI4rqFLgMa2WaVIIstLI92r3Dw/deF46fggFuyMMLHPbKUHnq+zGxOqMm18NtnAb+s07kWFngyWWklaZ3vkxOkqFyW85BKOCpCxsQAOFXQaZ48/0KT85f16PHn+hSfnL+vWP7X6ZdZ6W8cDkdx9TJbWAx0cb3aS5CZ5bTpBIqRu3hoHCSyEtJ7vjqI++MNHy+z6Dh48/0KT85f16PHn+hSfnL+vXfRoK9Z5xkJiKUhPgx+Xcv5T/AF67+sWf5Pk/PT9ehP4Rm/0EX6T6k6CN6xZ/k+T89P16PWLP8nyfnp+vUnRoK3IVo8rXWrfxDzRJNDYVTIo4kikWSNvJvmdFP/p5+WpsMksnPiV2i4+HcwPP9R1n2b6fZ2/1Pj3VAKkmJkjxzuz5CZLNeetLOWMMfY0YWRZUViGUlUdOOJGYaNoDRo0aA0aNGg5SyyxkCOs8gI+IZRx/WdKFnp/0/wAnYjefYuLlnrTS2FZUiDrJJJ3yMSDzyzc93Px5YHyJBdNZZufpRnDZy2V6f3sZgsnl83FfntQxmvK8AqLEweSNSzlZwtjwz7kpj8NyFkYgLK70Z6WZCc2LvTDFyymBqqsY05SFggZE973FZYo1YLx3KoB5Hlq7n2btazj3xNjZVOSnJUrUXgaOMo1eu5eCIjn5KMzFR8xJ0hbD6T9SNt7hpzZnekdzEYjG1qVFGszWGEkdNoDL4ci/g2LHub8I3fz5hSvnV4npJ11ikwVbM9WrFmnVKe1GGSl8awotCSRAUhTu8RVThuUaIGSL8IjAqGi1Om2w6eNkxNbp9j1pzmRpYjHGwlaQgyM3J5YsRyxPJJ8zydR6PSXpxjTWNPpzQRqjpLExVWIdCpjYksSxTsXsJ57QOF4BI0nV+nnV7D9NpNq43cCWLdFcNj8fGt6SiGrQz1zbc2IwzxK0SzIvYveEA/jNwOVPpz1+rZHibqSjVLUMNZ2SzJL6uoryKWCyID3xsw4kDEzMI2dEKkkNLGz9sruM7vGzavtouJfXu2PxQ/hGLuB58mMbFCR5lQoPIVeF2Loh0yhrGBdgwtN45srbkcSWFk8QygiRmJ4WQ96p8gMA3byAdJsnRzrjXXGRY7rNfEUNiJ74e/K0k8aQ1wAskqSdvE/rsxXgeKrRQsQgHZLt9IOrEdeg+N6m25r0VCvFZsWMnYQyWe+uZ38lbmNjEzhAF44MY7BNIwB8g6a7Dr0Y8ZH08xxrRqUEbxRuGB8Hnu7ie4n1aAknkkxKTyRr3H072THj62LGw6TValpLsEcio/ZYVWVZQWJPeFdgG+I503D4fHnX7oF7b2Gxu11fE7f2+tGoiK4hiZQO5nkJYknzJJ//AO8tXHrFn+T5Pz0/XoT+EZv9BF+k+pOgjesWf5Pk/PT9ej1iz/J8n56fr1J0aCN6xZ/k+T89P16PWLP8nyfnp+vUnRoI3rFn+T5Pz0/Xo9Ys/wAnyfnp+vUnRoI3rFn+T5Pz0/Xo9Ys/yfJ+en69SdGgyP0rZ7B9F/q6GoyKDsbO8kuvl+4Zvr0a7+lf/eu9Xv8AUXO/8hNo0GlwVa01eF5a8Tt4ajlkBPw1834T0nnoXMom9MBhp6eLp2rVy5j/AAFrVJo568Udb1iOxYidnM0x/CNXlVYQ0kEYdTr6QgWya0JiliVfDXyaMk/D8fcNfvgWeCvi1uCeSPAPmfztBkOE69YTLYfM7osbLOOwuPp463XnuzQwtItq/aqFpS3uQxoa6yM5Y8K554K+a1jPSr2xLjo7N3bFSaSrSp2slJVsRCKE2k7oiCx8kADOXY9vgo8qlkU6+hDFbIIM1cg/EeAfva/PAs+Y8Wt5+R/AH72gyncnWCrBew+3NvbYhGZzdfE3IY7fgv4MFuwsbs0aSAssa9waRW8MSNEvce8aiZnr/tjauTvYbce3Ak9VrcizIsccPgx2rMEbsWPIQerKJZSPDjaxB3ECQEbF4Vvnnxq/PHHPgn72gw2m+VLXPlx5wH72gQ+l/UzCdUaNfK4/aNvG0r9eW1RkuJD3TxRztCzFUZuz3gCATyQefL4affUKP0OD7MaBHcHwngH/APhP3tHZd+kQfYn72gPUKP0OD7MaPUKP0OD7MaOy79Ig+xP3tHZd+kQfYn72gPUKP0OD7MaPUKP0OD7MaOy79Ig+xP3tHZd+kQfYn72gPUKP0OD7MaPUKP0OD7MaOy79Ig+xP3tHZd+kQfYn72gjLQotkJg1KAgQx8Axj8p/q139m476BW+yX9WvIr3BO8/rMPLoqceCfmJP5X87XTsu/SIPsT97QY9W6xQ3LuXoQbawwmwxrzzpJIVLQTzTRRKvucM5NackjyAQkj4c8MJ1hu5qrJOu09uQOmSmxjRi20nhGO8aT2HJjXiIWElRQQGk7HYAKhOte9kQ9xf1bH9zSicn1McmQfB/lfKHJ8/j568SYKnM7SS0cY7MrIzNSBJViSwPn8CSSR+MnQZTjOsZyOWxFVdoYc08skEq2I5+7tL2KsD1wCg7pIzcjZmHu8rJGPeRiNlhrVq/Pq9eOLu+PYgXn+rUOPDV4pjYiqY5JTJ4pdaYDF+CO7nu554Zhz8fM/j1NiE458aRG/F2oV4/3nQdNGjRoDRo0aDlNUq2CGnrRSEDgF0B4/r1kee6g3dgZDNXt418PkMRDmUxOPgoYj1adS9QWk8SaWwyyORzCiKimSZo1XgvwNdkWwSPBljUfP3IW/8A9jXMx3D8ZoD8/nCfvaDG9o9csLu7LUsBFtmpVyMeLhyGWgAWVqryU2n8Lj3WBDDtBYAMAeOODxByfpF4bD4jBZu504uepZeS2BO614+YqsUnjT9gd/DQSrEvvsOEaRyeE97chFbBJE1cE/E+AfvaDFbI4M1cj/QH72gxtvSC2mkOPnm2NNCuThuWK3i2qMYeOtCJJHVmlCMo5PJVj2qA58mGnHpdvLHdSsPezce2q9GvBcSGtyUkM0L1YJ0lPA93kT+Q/EAfn4Dn4No8cy1/L4fgD97QI7gHAngA+qE/e0H57Nx30Ct9kv6tHs3HfQK32S/q167Lv0iD7E/e0dl36RB9ifvaDz7Nx30Ct9kv6tHs3HfQK32S/q167Lv0iD7E/e0dl36RB9ifvaCKmOx/tCZfUa/AhjPHhL+U/wBWpHs3HfQK32S/q15Fe4J3n9Zh5dFTjwT8xJ/K/na6dl36RB9ifvaDz7Nx30Ct9kv6tHs3HfQK32S/q167Lv0iD7E/e0dl36RB9ifvaDz7Nx30Ct9kv6tHs3HfQK32S/q167Lv0iD7E/e0dl36RB9ifvaDz7Nx30Ct9kv6tHs3HfQK32S/q167Lv0iD7E/e0dl36RB9ifvaDz7Nx30Ct9kv6tHs3HfQK32S/q167Lv0iD7E/e0dl36RB9ifvaDKfStx9BPRf6uulKurLsbOkERqCD6jN9WjXr0rVtj0X+rvdPCR+wXO8gREH94TfztGg1Su3ZSicgntiU8Ack+Wsip+knhkiinzWAljjtw07NY0bkU/bHYWwwjm7/D7J0Ws5eJe8+8oXuJ41r1T96Q/wCjX/hrhNhsRYnr2Z8ZVklqzNYgdolJjlKlS6+XkxUkc/Hg6xVFUz5Zc8SK5+SbMpxvpIYeW9FTy+3rtWSwkDLDDLDM8XfamrsXYOFbh409xO6Q954U9rcR8h6Um0kq148dhcmMjdPEENpYwic147KGRo3btDwydy8cnlWBA4Otl9Uq8g+rRchu8HsHk3n5/wCfzP8AWdBp1CQxqw8r8D2Dy8gP+AH9WsZcT93sxkxbWiv2Zzn+v+ztuZrLYW9jM0zYe5BQnsLWVYGnljDqqu7qDwGTuPwUEueER3Wrm9JTbWMwtjL57beXqeqRiSxHC9eftLWrMCIO2Tln4pzyEAcKqHk8+WtbapVd2letEzsOGYoCSOOPM/5idfhqVGUq1WIhjyQUHBPPPP8AWSf/AF1cuJ+72amnEmZtV6aMy3n6ROyNjZXLYnMUco8uJiMrtAkL+NwtZ2VF8Tv5C2425ZVU9r8EldeLHpFbXjsLUqbZ3Bbl9ZmpusaVkMc8U1eFkPiTL/hLdcAjkcPzzwCdaTFhsRDYt2osZVWa/IstqQRL3TOqqilzx5kKiAc/Mo/Fr1UxOLoCUU8fXh8eZ7EvZGB3yuQWc/jJIBJ+oaZcT93sk04t9KvZlz+kvsg17NuthNwzwVjEDKtSNEcPTktsVZ5FB7IYmJHPJ8u0Nzzq92X1exm7s4m23w1vH35EyEqCSWKSNo6ttqzcMrk95KhivHug+fzEvIp1ASwqw8sACeweYA4H+4ka9JXrxuZUgjVzzywUA+fx89WKa7xMyU04sTrV7OmjRo10dho0aNAaNGjQZz1V6q2+ne4tibfqYrH2m3nmZMT41zIerrAwrySR8KqO7lpFROQvavd7xBZQczwXpU53JTYlL238JX9fq0rs6JcdjD4t01HrhiBzIeDYRio5i8in8fX0XZoUbktaa3Tgnkpy+PXeSMM0Mnayd6E/Jbtd15HnwxHwJ1+HHY8kk0a5JYOfwS/KC9oPw+IXy/zeWgwOH0nctN1NXYa7cx3gNb7PHFlu8p7aGL8EDjjxuD63z8PC93t/wuvoTXAUqSuJBUhDh/FDCMc9/b293P4+3y5/F5a76A0aNGgNGjRoDWZT9ettUPUYL2MyElq/fytMQ0EFkQrRtGB5JW93sB5jbj4gP84BOtN1wNKkW7jUhJLd/Phjnu/H/n+vWKoqn5ZszVFU/LLHrvpQbUgkp+FhMmiAST5FZhF4leAVbU6FFSRjK7iryAvKqG98qeAWml1kw17AZHca7dzkNfGx1WljnihjlaSdgFiCtJyGHcpJbheGHBOnk1KpIY1oiQCAewfA/Ea9JXrxx+FHBGqeXuhQB5fDy1Ipr4udNGLE61ezH5PSk2GvrSQYbO2JqccbzRRxQArzVlsyL3NKFJjjgfuAJ8yvb3c86ZNsdaNu7q3TDtClhs1DfevNPMZaymKsY554SkkiMy9xetLwQSDwPPk8aevU6gJYVYeW+J7B5+XH/AnXoV64kEwgjEiggN2jkAnk+elNNcWzT7EUYt9atPR00aNGujsNGjRoDRo0aA0aNGgNGjRoDRo0aA1S7xymVwm27uZw1VLNiiq2WhZS3iQo6tMqgEHvMQcL8fe7fJvkm60aD5F9Jz0gLVr0eOpsV7aFytjs1s/MYymXRkcW/VpBICz8d5aGxVmSNVB8OK23cfCK6NbL6V/9671e/wBRc7/yE2jQafU/ekP+jX/hrtqvt5Sjg8BNmspP4NOhUa1Yk7S3ZGidzNwoJPAB8gCdVeN6j7GykUUlfdFCKSVZWFe3L6tYURuySd0MvbIva0bg9yjgqdAyaNUFfqDsK3LNBV3tgZpaySSzJHkoWaNI+O9mAbyC8jkn4cjnXK51I6f0WRLO9MKryPXjVFuxsxM7KsPuqSeHLrwfhwQeePPQMmjUWN3OSnjLHtEERC8+QJaTk/7h/Vqik6mbGr529tu5uGCnex393FtHgiB4hJCyyARuR6xByFYkeKnPHI026Gwz6NL9vqDsLHhDf3vgKwlBZDNkoU7gFD8jlvP3SG/zEH4HXaxvTZ1R5I7W7MNC0MsUEiyXolKSSgtGh5byZgCVHxIB40F1o1XYDcWD3TjRl9vZOC/TaWWETQtyvfG5Rx/6MpGpGPd5Kis7FiWfzJ5/jHQSdGljFdS9i5ie3WqbjrJLSvezJVshq/dZ7nQRp4oXxCWjkAKcglG4540VupvT+3clpVt44eRojChkF2MxNJK7qkSvz2tITEw7Ae4eXl5jQM+jSzL1L2BBKqS7wxCxMspNg3I/AQxmMOjSc9quPFjPaTzweeNW+Oz2DzE9uriMzRuzUJPBtx17CSNXfz92QKSUPkfI8HyOnMT9GosbuclPGWPaIIiF58gS0nJ/3D+rVFe6l7JxtTKXr2dihhw8stew8iOgeaONpJIoiwAmdVVuVj7iCpB8xxpcM+jVEm+9kyV1tru/C+C1U3Q/r8XHq4btMvPd8gMCpb4Ajj46iQ9TdjWKeKvw7hqtFmWVK3De95w+Ny6/GMCMqxLcAdy8/KHLfYvvNGjVFW3xtG7lqODx+4aNy7ka7268VadZS8Cngye6TwhIIDHyJBA8wdWcbuclPGWPaIIiF58gS0nJ/wBw/q0ErRo0qr1R2EfaZm3FDVXEvPHZe3G9dS0L9kvhtIqiUI/CsY+4Aso+LDkGrRqio772VkjXWju3ETPa8EQxrdj73MqeJEoXnnlkPcBxyR56vdNhtGjUWN3OSnjLHtEERC8+QJaTk/7h/VqVoDRpXqdTNkWrVynJmxSloXPZ8oyMEtINY7e/w4zOqCVuzhvc7vdZT8GBP7T6l7FyK4lsZualdOcMXqSV5BI7iRHdGZR7yKRG3mwA5HHx8tCdDPo0aixu5yU8ZY9ogiIXnyBLScn/AHD+rQStGjRoDRo0aA0aixu5yU8ZY9ogiIXnyBLScn/cP6tStAaNGjQGjRqLG7nJTxlj2iCIhefIEtJyf9w/q0ErRqJlsrQweKuZrKT+DSx9eS1Yl7S3ZEilmbhQSeACeACdUcfU3YT0JsjLumhWSvXFqeK3J6tPDESArSQy9siAlkA7lHPevHPcOQZ9GlfHdTtg5KottN142sGhez4duwleQQoxVpCjkMEBBHcRxpip3aeRqQ5DH24bVWzGssM8MgeORGHIZWHkQR5gjS1i7MPSv/vXer3+oud/5CbRqN6VbufRv6yxlj2jp9mCF58gTSs8n/cP6tGg0vIYehuHbljA5SIyUslSepYQMVLRSJ2sOR5jyJ8xrOLPSjox1CaS5t67RkZ8dBWVsTcR44qXrSuOxEPaqvJUZeR5crLx5l+b5ut/RjHRxVch1Z2dWmESkxzZysjcEfHgvzrJqmN9FjHPI2O6+4KusqVY3RdyY8p2wxzI3aCCF8Qzu78ccvyw7SzcyNdS8TF2mZ7pD0ohpzS5ui8de5PHCxazJ2maWefwxxz8TLel4+bll58gNT6/RnYVSeK1UozV5q8iyxtDOYgrg0yCFXhR54+t5Ace63l7zc5L7M9E9IilfrbtaF2ChnGcxrd5V6jguGBV/eoxkhgQe+T8Y4n4Cf0W9vZGpkK/W7bFk0bda5AlrcVGXh4azwICSeSOJC3x8mA4IHlq07byltG9R/wrY/o8P6UmlTcXRzp/udcucthu6TOWkuXp0kKSyskKwqpYefYEQcL8A3vDhuDqvj699DRkp5D1k2R2mCJQfb9T4hpOf8J9Y1Ibr70KYFT1l2R5jj+H6v39SeMNKjb3Tjo9foXstjMvUylYXrd+e1XyIaKFppI7BUlG7VVVSHjn+IFPwOp9Pod0vanItLGd9a6PG74pzywevLB3CQe8wMdiX4sRy3I41mLUvRhnGNF30hsLZXGwrVVH3HjwksCRqkaOqgA9ih+G47j4r8kggBj2Zuv0b9k5ezmsf1y2pZsWa0VZvWM/R4VUiij90KV7QRAhKjy554A+GtRpozOrYMFgqG3aBxuNEormeewFkkLlWlkaRwCfPjuduB83w13xn7zT/wC5/wBI6TP2/uhf/fLsj/3+r9/UbH9e+hsdVUfrJsgEM3l7fqflH/xNRUPKdKejmOztVsvPWrZbJXZLlJLl1C8snjO7LFHLyGHi2ifJSQZEHI90CPtfoj08oixgbeRs5fIUYIIZnZ/BaOEpOIgRGACeJ5z3Hlj3fHhVAqN+br9HDqBlcRmMn122xUsYaOeOu1TcNFWHivC5YMxLIwNdOCpHkXB5DaURgPRbFeCsfSKxZjhWcMv7J8fxIZWdizDj4gyOAfmDEfOdIjQnVrzdC+m7NFI2MscwxvEn7sk47Xijib5/yIkH+cc/E6s+nvTup08gyVSjlbFuDIXHtqk0aAw9zEle5R3N8eOWJ8gOAPPnGp6PoryiZI+u224o5SCI1z+OKoBNLL2L5ciMmZwY+e0+Tcdw7talX679CK1eKtF1k2QEiRUX/wDX6vwA4H8fVjSNE2zqdo/4Vsf0eH9KTSDuHp50ns7sszZ3JJXz25K8lRomyfgzW67qytEqdwLKfP4An3AOeFAHuPr30NGSnkPWTZHaYIlB9v1PiGk5/wAJ9Y0u7q3r6Nm778mUyfWvaiWTj3oQvDuSovq/d3fhkHcR4g724Y88fMNZ3x33rZo0SdDunT3p8oMZKlqwe8zLMfEWQWnsq6OeWQiWRj7pAI4BBAA1Hk6AdMpYhWnxtuSAQtCInvylArV0rueO74mONAT+NefjrJ48D6LJE1O3142tYoGBI4IWztAtHKYJoJpeSSpZ0kg+Cjg1Yj58Hmyev6Kr2Xm/bv2x4boY/AO4aBiRTZmscIvwX3p5FIHkV4B8xzqwy1na/TjYmAzftHb3lcxqGtJFFYAjid1DEvEnCrIyFDz2gkcH5+S1R/wrY/o8P6Umsk2Pvv0cdgLdjwvWvZ7x3vALrLnaPIMUYjXgqQeOxVHBJA7fLjk8sEfXvoaMlPIesmyO0wRKD7fqfENJz/hPrGosaHW5uLb+PydXC385QrZC751qstlEmm+PyEJ5b4H4D5jpWs9GtjXLqX7cF2Roblu/ChtuEinskmdlAI+UHdfPnhXYDgHSjurevo2bvvyZPJ9a9qJZOPehC8O5Ki+r93d+GQd5HiDvbhjzxz5DSPHgfRZKzU7fXja1iga6RwQtnaBaOUwTQTS8klSzpJB8FHBqwnz4PK14174faFvadO+9Wz/tN7FNjHW5KtuSbG3I8hCz23PM8cdeNXYc8EhakA5+Pk3zOwLnBdp2Zp69a1DLLVcRzojhmiYqGCsB8klWU8H5iD8+vnd6/oqvZef9u/bHhuhj8A7hoGJAbM1jhF+C+9PIpA+K8A+Y500bH336OWwFuR4XrXs947vgd6y52jyDFGI14KkHjtVRwSQO3y45PNmWYa3H/Ctj+jw/pSa43Nxbfx+Tq4W/nKFbIXfOtVlsok03x+QhPLfA/AfMdJUfXvoaMlPIesmyO0wRKD7fqfENJz/hPrGl3dW9fRs3ffkyeT617USyce9CF4dyVF9X7u78Mg7yPEHe3ax54+Yam+GjxkelWy8pljm7lKdrT3Deciy4WRz6sSCOeO3upVm4/HH9bAwsX0U2DiM7jtx1qtxr+LjjjqyS3HfsSONY1XzPmAiKOD5cgn4sxOOx4H0WSJqdzrxtaxQMCRwQtnaBaOUwTQTS8klSzpJB8FHBqwnz4PNi9f0VXsvN+3ftnw3Qx+Adw0DEgNmaxwi/BfenkUgfFeAfMc6sfZmdY9X0RBdp2ZZ69e1DLLVcRzojhmiYqGCsB8klWU8H5iD8+uUf8K2P6PD+lJrJNj779HLYC3Y8L1r2e8d3wC6y52jyDFGI14KkHjtVRwSQO3y45PLBH176GjJTyHrJsjtMESg+36nxDSc/4T6xoqbvvN9Q8duXBUdmYmG1QkrW7eSkmrsygRS1gsYcH3XeOSfsADFmVfLtVtLA6odUaJsTWOluQvAkT+DF4o8MGpVYRRHwB3fhZpQS55HhSfi7VY/2/uhf/fLsj/3+r9/R+390L/75dkf+/wBX7+gTY+tm+6eYvYuXp3k8g691uNIatkSCv6sWVkRq6Hs8VGX8KVYszKvcR26eele5t2bsxmTyu7MDbw0hvRipTs12iaOE067sB3KpceM8w7iOeQR/F4Ef9v3oVzz+3Lsjn/8Av9X7+v39v7oX/wB8uyP/AH+r9/SNibzlH/Ctj+jw/pSaWN/bm3ft67iU2xtxsvHbZo7C+HIVjZpoI0ZnRW7FUSyOeVPIjPw4J1Vx9e+hoyU8h6ybI7TBEoPt+p8Q0nP+E+sak/t/dC/++XZH/v8AV+/qTF2i9jOqvUySzWjv9L7oS/eiQEV7KCnXerVkIkbwz3N3zTr3cBQYGVu066S9WOo1dT4/Sa8WTF1L7rCtiQl5Wi74k4h4Zo1kcFCVbujPICnkXv7f3Qv/AL5dkf8Av9X7+j9v7oX/AN8uyP8A3+r9/VRebEy24M1t/wBc3RQWnkFuW4HiWGSIdkc7pGwEgBIKKpDDybnkeR1bR/wrY/o8P6Umk39v7oX/AN8uyP8A3+r9/UaPr30NGSnkPWTZHaYIlB9v1PiGk5/wn1jQNe85drjbV+lvLKVaGJyMElGxLZsrXUpKhVlDkjgkE8efOk+50s6X28rTpW7Fp8pchsXKsi3XWR0UUo5XUpwvkIai/wCYnj5R1UdQOoXo7dRcB+x7MdbNnRV/HSxzFnaLEsvPAIkLKR5n5vxaRL2E9F6+155/SPx5e/HYhlc7qoMxjmeJmUk8luPBQDnnyA554Gpa97nCzT8r6P2wrmLkoY5bmPnZoGjsJYeRo2iedl91jwR+6pwfqYfAqCNAwWMXC4TH4dLBnWjVirLKY0QuEUKD2oAq88fBQAPmGvnt6PortPYnTrxt6M24LNeYLuLH8N48ksjyDkeUvMvAkHvBUUA8FuX/AGt1c9H/AGngquAodaNlPBV7+1mz1MFizl2JCuBySx+A1qZ1lIhC9Kv+9y6zf/j3L/8AJ2tGkz0nOtfRzK+j71dx+L6r7PuWruw8tWrQQZutJJNK1OyFRFDksxLAAAcknRqK+jagHqsP+jX/AIa68D8WokME0leFkuyxDwl91VQj4fWpOvXqlj+U7H5sf3dBTT5DccPUSjiVWF8Baw1uw5Wo/fFbinrqoabuKkOkz8J2g/g2PLDyVi4H4tLv7I8cN2LsuTK5OPKSU3vRCSiVhmiRkV/DmMfhuVMkfcqsSO8cjVz6pY/lOx+bH93UH5H/AApYH/l4f0pNZX1m331L2rufb2P2NjPWq16etBZHs97A7Zp/DklPZ73ES9rnt+AJ7ue5daXHVse05x7Rn58CLz7Y/wAqT+bql3pvnAbAXHncuZy0Zytj1SktbGSWTNY45WIeFEwDtwQqngsQQvPB4DIrfVfqzVnrUXd2x9vH5OxHl02+w7ZK1yvBCHZn8JTP63GVBVQiQTsxYrwsY9Xes6pdikigGShit2q1dMLL6vO8RnV66yE9x7UjrSRqOZJGtof7mrcPUHpF9KLdt6VHeGZtSpjXzDeBgrLr6ilhoHsd4r9pjWRHDNzwApJ8tTJeufTyGrHek3HmxWnstThm9iT+HLP4Syxxo3gcM0sbo8QH90DDt550DP03y2azm0K2Q3AO62bFyATeAYfWYIrMscFjs+bxYkjk8vI9/I8iNXuN86ac/lP+kdQsJfr7ixFPO4nM2Zad6FZ4XaFEJVhyOVZAVP4wQCD5HXTHVbBqKRkZx7z+QWP8o/zdBkHWfqV1P291Gxmx9k+yq1TJYGbI+uW6VmQRTRX6aSGSVI5EiQV5ZeG8OQB2XxPDBTxIeb6rb/nWhYwFiWvBYx1MWllxQlkqStyLMsnb7okjlXwHj+CsWBHI1o26Op+xdmZmXAbl3u1K/Xw1nPyxGAP4dGAgSSMVjIB8z2oT3P2P2huxuOW4uq2yNrW6WOyu6rvruSxj5irUrUGnnlqLNBEZAkcRI9+1CApHJ5YgEI5AZXT6wdabG1rly/g/Usi80UhBw8vNE8XC9bsJ973oKK8t737uH4041Ho7ufd26sLeu7wrmG0lleIjUav6uzRqz1+D5t4bEryfP8fnqInXDptLiLWcg3lemqVJ0gLR46Rmm7hKRJEgi7pY+ILB71BXiGQ8+6dNO29xY/daXHxGUyY9RsGvKtmiazc9oYMqyxqWRlYFXHKsPgToLeP+FLA/8vD+lJpU61bqz+xulG6d4bVhqyZXEY2W3WWzC8sXco5JZEIJ4HJ82VeR7zIvLBijq2Pac49oz8+BF59sf5Un83UPdu4MTsfbl/dm59wWamLxsXjWJRAJWA5AAVEjLuxJCqqgsxIABJA0GPZnqt1dty36WLxgwl5njfDJkcDYENqL1cd5lk7mIbxO5lijVpSZIFK/g59WNzdnVnI7Dw1rbWViTcQizDXmnx7TUpFrrJ4UpdIA3az+riMLGHdJi4Ruxl01Z7rN0923XyF3JbuyBq4l40yFmvjJJ4ahkiSWPxJI4Sq9yyR9vJ82cKPPkDhlOuPT/DbPxe/chuHNpgsxDYsVriYaWRfDgRncuFhJT3EdxyB3IjMOQpIBm6bZbL5zZePyWfSUX3M0czugUSlJnQSpwqcxuFDo3YvcjKxUE8avI/4UsD/y8P6Umq7bWXqbtwNHcuFy156GRhE9Z5a6xM8Z+S3ayAgEeYPHmCCPI6kR1bHtOce0Z+fAi8+2P8qT+boLPgfi188S9W+rl+tmJIIqdSLHbou4aWaDBTv4FZRG0Mod3IPaO9X7o1JZx5IFBk371Sx/Kdj82P7ukC11s6d1oZZ03XlbKxXJ6HNXDzzB54igdEKQEP8ALHaVJDhXKlgj9oZxT6wdabG1rlu/g/Usi80UhHseXmieLhet2H5XvV6K8ty37uH4041Do7ufd26sNeubxrmG0lleIjUav6uzRqz1+D5t4bEryfP8fnqInXDpvNiLWcg3jemqVJkhJjx0jPL3eIRJEgi7pY+IJz3qCvEMh5906Y9o7twm+alm9trPXbEFWcwM8lTwg54DB074x3xsCCrryrD4E6C9j/hSwP8Ay8P6Umul2SWCnPPXjV5Y4mdFIYhmAJAIUFvj+IE/iB1Cjq2Pac49oz8+BF59sf5Un83Xawpp15bdvNSQwQI0ksknhKqIByWJK8AADknQfN+1+s/V7O4KLcGZuVacVrFssaUcPIGjurbeMSskylBAwCIJfHIUty8ankK04LePWHJbZ3LRyV6FdzQZCJMXYxuOMlExzWmhSPiaJHAjBiebkN2xurq7BvK/x3pA9MsxZlpYTc+byNiHFjMvDUwdiSVahmMIcoIO4e+p8uOe33vk+epGK659Pc9tHM76wO481k8Jgbc1K9ap4eaYJJFz4pVVhLMqgclgCACDzwRoLDpDmt55jGZdd8z17F6pk5IY5a0Lxw+F2qVRQ8UbBl5IYENwfLvb46c4/wCFLA/8vD+lJpb2FvvbnUzF2szs/cF61Tp3ZcfLJLT8DiePjvUCSME8cgc8fHkfNq7jq2Pac49oz8+BF59sf5Un83QTbsssFOeevGryxxM6KQxDMASAe0Fvj+IE/iB18x7d6zda8/h6Wcuy0q0N6kEk9UxEwNaZbjo9kxSIwMPYqqriY+83vRqSe36Z9UsfynY/Nj+7rOZevHTKPLxYGHeOStXZpL8ccVXEzTFzSRXsFAkJ71VXHDJyGPIUsQeAz+Dq71tbAZOTIYWKteFiCSOWLFTEVg0Nl3r+G4B5WSGnEe4FubfIJDRnWm9GN1by3Zhspc3rSNW1DkGjiiNUw+GnYpMfB8/dYkefvDjhvPXCr1s2Df2zk93Y7cWauY3EIs1pq+GmkkWBu/icRiHvaLmKUd6grzG458jpk2nurEb2rWre381kJI6k5ryGekYCTwCGUSRqWQgghxyp+Y6C7j/hSwP/AC8P6UmpXA/Fqsjq2Pac49oz8+BF59sf5Un83Ur1Wx/Kdj82P7ug+Xf2+uvNuHA34MBHLQtZTcdDLPQ25YLVfUbaLWMbSyBZPEB8AKyozuXX3JAVR7yG/OqWU3tm9tYVbVCMZSlBhphhxNWkqtFC8ss0p+QpEs7DngOaxRGVuQzAnXzpTJBHaj35bNeaO1NFOMZL4Ui17kNSTtfwe1j41iAKASWWVJF5QhtTM91i2RtzJ3sPkM/mXtY2eOvYWtiJZwsjiPyBjhIbtM8Abt57WniU+bqCGicD8Wosf8KWB/5eH9KTX76pY/lOx+bH93UWOrY9pzj2jPz4EXn2x/lSfzdBknWPqx1L2X1Ah2rsvbcWWhubRymTqxJjp55TkIZoEjZ2UqvgospZlXuZvkkozQiSv3n1e6oe0sbV2hgxHi5dqWMhbybUmlVctHcpxNU7gCkLor2VKSckvzz2iJi2qbo3rtvZuQxGJz+5bcN7PSTQ46tFUM8thoomkfhY42IAVQOTwC7xoOWdVNNd6wbGx2No5a5uLLQ1r62ipOJl7oWryGOWOZfB5icSqYwrgFnHaAT5aDM6/V3rbY2NmsrNhYauariGzDVkxUyNHIXsrJSQEEFh4VM90nnxaI57mjGtb6W7hzm5sblL+atLMqZF4q4NQ1pIlCL3RtGSSoVywXu94rwW8zqsx3Wnp/lKuWuUt0ZaSPCU5bt0DETF0SIIZ1VBD3PJF4kYkjUFkLqGAJ0x7X3Tgt5jJnbW5prow14426VhVRHZEUcpj5ZB3EJNHyRyASR8QQARPSr/AL3LrMP/AOnuY/5K1o1w9KmvOvo59ZOb8zcdPsuTyqeY9TteR93RqjXIJ2jrwqK8r/g181A4+H+fXv1pvok/9Q/Xr1U/ekP+jX/hrtoFyvt+Ovu61vAWstJNaqLUNSQQNBGqkEFD2+IvmCSA/aSxJUngi79ab6JP/UP16UPZm6v24Ey0MWTj2+MLNDZeS+GqS2TJCYfDg8U9rqon7m8JD7w5eQEKjvoK2Oy3tSc+qz/veHy4H5Un16p97bPxW/KuNr5VMnXkw+Riy1GeqyK8NuJXEcnDBlbtLk9rKVJA5BHIN/H/AArY/o8P6UmsZ66bU60ZPJ38h0xvZhhLiIY6MNfLitDBk0klKzOhlj7ouxu2ReSHLR+6ezuQLDHejh06wa447cr5rFSYvFUsLXkhaCQ+p1Z55443WZHVwZbDO3cD3MkbHzUHUodB9qoiQRZHcqV4mV4oPErOkbIkKQFe6IlTEtauFIPLCICQyBn7lHNbP62VbVabApum3QhzVn12pLuIRz26Qx0rd8bm03YZbkVdEIdBGk7kQx9pdq+ls/rvXnEdqDe1mCeeJPG/ZHCslSPwoDDIsfrna/gMlxXVnbxTPA0nrQRu0N929jKe2cJSwGNqW/VqEKwxmQhnIHzsefiT5ngAefkBrvjrLCmo9VnPvP8AAD8o/XpN6I4jqBhtsXK3USW4117qPXW5eFuVU9UrrMfEDv7j2ltSIvd7sciLwgAjR5xn7zT/AO5/0jqBA370a2f1I3PV3PuiLOO9TEWsOtavbMETRTywylyyESdyvXjIAcLyFYqzIhWHlOg2yM1Yiv5JM3Ndhw0u3kneZJAce00MqxPFIGilK+Aih3RmILFiSQR26wUOpFvcexJNkJmpsXDk7ft+vjrsFQPWalMqF5HYNyJCoUKCO5gSUKpIqLmtsdc721sBRwb7mq5XG+04rRlyQAMMjM8CvL67y8ghZI1Les9rAjxlYGwaHGP0f9gw7cyW04a+ZGKykKVZq0jwzIKySSSJBxIjdyq01ggv3PzMT3cpEY3LZ22KuyqFnH0ZsrcSzbe2XuCFpFLADt70VS4AUAF+5gAB3cAAY/tDZvXeLHbjo7gt7ijlv4a5Wp2DnUkMcpgg9S8LmZzDJGyWlkfksTPF3S2O0yronRzF9UMZW3QeqViOa1bzzWMX4V42Y0oGnVVEXlVKcSLMCpHm3c3JDAkHCOy3tSwfVZ/3vD5cD8qT69VW/trY/qJsrNbGzCZCCjnKUlGxJXWLxFRxwSokDIf8zKwPwII1eR/wrY/o8P6UmlTrXU3le6T7pqdPJL6bkkxsoxpoPGlgzceSo0joqk+Y7u5SOeVIYDUFKvQ/Z9e+t/Hz7mq9zd9mBr3rMVluxkLstjxOxyHl5ePsfmVz3cnnVvV6cYWDH18fYnzdxa3tB43neIETXeTPP2oqp4nLzdrBfdE0qgBW7dZlnNr+kBl7F6lk/b1dcnLHJQyOC3FEfZKLXEbLLCxrLIzEAngSqGed1ClYeLKxsDqNntgYXASW934TJY6DMeJfi3HKbbhlcVEkC3GWWVjJE/c8jLGYJEUqrqdUavtfC0tpYWLCY6C9LGks9h5Z+wySzTSvNLI3bwoLSSO3ChVHPCgAACXHZb2pOfVZ/wB7w+XA/Kk+vVT0zo7gxuyMbR3PDYiyMIlV1s3HtT+H4r+EZZWllLSGPsLgSOoYsFJUDV7H/Ctj+jw/pSag9+tN9En/AKh+vWar0N2ksOTRbG4VlyWcmz/jrNF3V7Uiqp7F7OwjheOXVmPPvM3A41LXzrZ2p14vVMy9qfdcwi3RdMEMObgqzW8U4iMZi8OVBGFZeF5lQ8d57U7yuqHGD0fdhVMZJiKUeer1yVWELYjY14lE4WJCynlQtu4vL9zcWG97lYjG3bI2bh9g0J8bg4Mk8Esisi2GRzDGqhI4lI491VAALcsf4zMdYvV2j6R8e1b2OydjO2b008ck7wZ2NJJ5lFsNJXk8ZTDCWkx7eGDGOKs4MY7+2bUujWI33iMNkId/Pfa9JbDl7d8WvFfw1EssJDt4cLOCUj9ztHP4NPhoG+Oy3tSc+qz/AL3h8uB+VJ9epEsxmieFqtkB1KkrwpHI+Yg8g/Xr8j/hWx/R4f0pNdbizvTnStIyTNGwjZe3uVuPIju5HPP4/L8egybF+j5tbEbcrbXp5rdK06qOqAvUb3nmaR2KmEoQwd4zH2+EUZuULEtpiq9MNvQT357Hte4clPUmsCcw9rCtZ9ZhThFX3VlaU/jIlYMSAgTGNubQ9ICPBR39y0t9ZPJT4hqM1Y7ljrCJhdcrMvhXox4/YUkKn/Br4Yn5PaGzb/T7qgNs7m2rmcju2w+TyUU1LM29wSQXYlezxM6er2yscccMgeONOxWaJ1eMDwwwartnbtLa3r5prkbDX7Hju1jwyUAUKka9oX3VUAAnlj87E6sY7Le1LB9Vn/e8PlwPypPr0o9Hdvbr2zi8zj902szbZsrLLVs5a8bM80RVfeX8PMI4uQexQU8vMxqT5usf8K2P6PD+lJoPfrTfRJ/6h+vWc47ortfHXb9xbW4JUyeXsZqzXeSHwpJ5QnA8kDAIUVgQQzH5bOOANO1851Nmdc8juS5Zyt/dy1485mI6b+2YoK5ozRxCKZkhsDjt4cQqUkHcCzJDzoNC210W2ZtXHyYnH18xJTkan+BnljdQlWz6zBH8ASqytK3mSWEzhiQECX+ytmYXYVfIVcFUvlMlde9L4vhkh2AHHKgd3kB7zdzt8WZj56ympt/r63THceNxVXNUN0XYo0gOX3BFIitEgEktewr2HjedvghWONFHkEfueTQukGJ31iaOcTfb3Gnny0s1X1m56xzEVXzQ+JJ2oTzwB4Q/FDF8CDbHZb2pYPqs/wC94fLgflSfXqV6030Sf+ofr14j/hWx/R4f0pNS9QY3F6NXTY0I8fkIdyXRDay9uKR8i0TxPkbMc8/YYSnaO6FAOOOeXZu53ZizTdLdtW94R74yEWVtZOLweC5iVG8PtIDhFUyL4kcUoVyypJGrRhCW7sbr7N9JG3iElyFndslxP2TVkBz0ELGR8lWkxll0imRQojFn3Q8gVPLsZCK5fNwbV35uzeNwJT3jg8bLYx6+tRbl8KBkVVeaZY4LXchUB6/hLGqs8jSv4vbF2Ua96030Sf8AqH69RY7Le1Jz6rP+94fLgflSfXqy1Ej/AIVsf0eH9KTUCrvnp/id+5LbeVyc+bpzbXvyZGmaMyxFpXrywe83BYcLKx90qT5qSUZlZfu9CNoZTEUMDlnzFujjHsyVI2jqqYmnHMhVliBT3y7hY+xOG8Pt8ICMV3VHE9Vb3VChJt2Dcdvab7WyEFuDG5KKnGt82K5hYETwyvIVD+Qki4VWCyp3OrrG79veknmLOAkxMltcVR2p7PyUEWWMNqzlluUTLIwSWv3hoobAjlWaLgGUkASKrUP+A6IbM23FdgxyZvwb9OxSlieWLtCWIo47BUBR2d4grntHCp4KiNUUsrMGxdiba6c18pV2tjcjDDmMgclZSew04E5gihPZ3sSqlYEPaPLnnjjnjWb7g2Z1fh2rbm2/7YOVyebW7ZoncU8yQ1Ioyggime1G6CSYib8E0YEfulT2CGR06M4DeG3MRl6W8LGWszSZSSaCfJ3zallRlXkp+GlCRdwIRR4fl5mNCfMFz0qbDN6OfWX9zTDnp9lx5geX7jtefx0a6+lX/e5dZv8A8e5f/k7WjQarBVhlrwu/fz4ajykYfN9R179Rr/8Aifav+vXOFrgrwiCCF18JfN5Sp54/EFOvXiZL6LW/tDfc0CpFv3bFjqjJ0ormWTKwYh8vO4s+7GqyRJ4XHd3d/E8bny4Cuh/jDTb6jX/8T7V/16gMK8majsNSxLZaCvJGjmfmwkDshcD3O4IzJGT8xKr+Iam+Jkvotb+0N9zQR46cHtOdfwnAghP91b8qT69LHUTeabDbDquCkuLmLE9YWZskK1aq8daWxzM7EuFKQyHlUbjsPlyVDM0b5D2nP+5q/d4EXI8duOO6T+Zqv3TgcFuilDjN5bewWSqpYSeCHIOJFWdQex1Dp5OB3cEefx40GQ4v0mq+azD4aj0s3FDImEGcD3LYhDRtflpxwgebePK8LiKMgGRuAvu8yCzfr9WFGpkItlWJEvWoq0Ea5bmTieCvNXmZAvKxcXKyTP5iN5UVfF7hpyl6bdNLcEAl2Bs+SPHRw1IW8KM+rpB4pjjU+H7oT1ifgfN40n5R55/tddLmlef9gezPEm+WwSLl/GBA5/B+feCwH4/m0DFtPJ0t17bx244as9dchAs3hPOzGMn4ryD58Hnz+f6tTcdSgaopPic9z/4Vvyj9evGKiWnjoKOFx+Nho1UEEEVafiKNU93sUKnAA444+bjX7jnyPqi9tasR3P8AGdh/GP8AM1Albu6lQ7b37T6c0dp5LIZLIYK5m607WvBrSLXmhjeJTy0kjgTB2EUbso7fdJcDSxuD0j9n4jLYLb1HDXbuVzu2otzJB603EEMtirDFG5jEjMx9aZiY1cKsRLcB0Jfdy7C2XuDKruXdmzNuXb9ejJSFu6QzLVZ0dkJZPkh0RuT8k88ccnnnkdmbDaqtHMbV2xJDBXkREuSK/hV5JY3ZF70JWIyQwcKOFHhRgAdqgULGQ6zV8XibWXtbaElcZaLF0pq2WeaCfurNZaR5FT3AkK8sVEiBjx39qu6s3TXeCdQMXdyFnA3MNLTuNW9UsSWFmCdqsjsJI4/lBuQU70I81dvmmWdp7TzOLOKtbS21cx1eSRjXYI8Mbu4lc9vh8KSxDH8fPJ+Opm38PisFFbh2vgcLRjntPNaWk4RWsHgOzhU+V5Dnnz8hoJsdKD2nOv4TgQQn+6t+VJ9eqTqTuih032Fnd+WsRkcnDgqUl2SrTkPiyKg5PBZgqgDzZieFUEnyGrqN8j7Tn/c1fu8CHkeO3HHdJ/M1G3LgaW7cDe23unA4zI4nIQmG3Vsylo5EPzEFPqBB+IIBHmNQZlc9IDCTDMfsT2re3BJhLUdOavTycUlixK0Jfw68cTuZXVlnVgOABVsMCQqeJPyXVbIVdmYnduN2LYys2R9fSTF1blsXEmqrKzRJC9dZHb8BIrBkQh+1QHLKCz5TYexbdulczGx9qyWKUfq1SSeOPuij7V/BoTH5L2xL7o8uIx5eWipt7YlDHwU6e3dqQ0pa9qvBGrxiN4Ze31hF9zgq3hp3geR7Rz8NUWGy8xT3htqnuFIfBNgypJEk858KSORo3jPipG4ZWRlZWRSGBBHlqxjpwe051/CcCCE/3VvypPr1wwVStjMTWobbxeKr42FSK8dObthUckntCpx8SSfrJ12jfIe05/3NX7vAi5Hjtxx3SfzNQS/Ua/8A4n2r/r1j0/XukXt16Ow8uZq2ct4D915CKFRYhETKZFV3ljWRJC6cx89qgngOhbX/ABMl9Frf2hvuaUZenWwKuPyFazsXayUshdkyF1JVXw5LT8d8rd0fHceB56oRaPpG4HJbekztLaeQJkMctOGS92+LXdbjd8jDnw3Ax1r3AHHJi973mKPfTbetHqLip8tBibFGJXjeBXtM7SQSRh43bjjtYq3mo5AI8mb46/Jdg9PGp3IJdjbR9Vlsd1tDHGIzMSp98eHx3c9vx8/P6/O52/h8XgorcO2MDhaUc9p5rS0nCK1g8B2cKnyvIc8+fkNBNjpQe051/CcCCE/3VvypPr12sVq1eCScx2JPDQv2RyOzNwOeAOfM/VrhG+Q9pz/uav3eBFyPHbjjuk/ma7yC9NG0M1Go8bqVZWmJDA/EEdnmNBi2B9IeHclBcpS2Dfo1Zcc9uF8nflhV50sPDJW8WOOSHxV8MlovE8YEhfC55It8Z1gt5Ta+fzn7BLWNyWDtLD7Fyt2zUuSxvK8ULENBxzK6dsfZ4kbk8CTyOrZOlfSLG1ExA6fbLhggr9qwusfuQeN4o+Kc9ol94H5m1bUtu7Gw4tT0NubVqA2llstG8aD1hZFkVnPZ8sSRow58+5QfjoPHTndjb6x+QtX9u3cHZoXXqPStPZWZVABVnWWOPjuB5BTvQjzV2+ZjjpQe051/CcCCE/3VvypPr1B27jMRiIrke1cLhKsc9p5rYoyBQ9g8dzP2p8vyHPPn8NTY3yPtOf8Ac1fu8CHkeO3HHdJ/M0Ev1Gv/AOJ9q/69ZTuLrVTwm7sntKLZmWc4e7Rr3Ls80qwJXsxSuLXESyyJCGiMfiyIkRfuHiAqdap4mS+i1v7Q33NKd3Ymw587NmMjsza8mWydiGzJNP2mWeaupEb+aclkViOfiAdAl7a9IXbm6qm8/Ze18k2R2Pi1yGRx3tKDxvF77KtWH4XtDqtZHLk9hE6BWYhuHPpzvKDf9TIzy7eyOHloWhAYLTyh2Ro1kR/eVfirD5Pcn5Lt8dS4sJtFY7bwYDbIjcGtaKOgBDtLzHJwnztYn8j8TM/5R5mbdwuJ2/BZrbVwGEoQy2XlsJRcRq0/kGLBU+V5AHnz8hoJ0dOD2nOv4TgQQn+6t+VJ9epXqNf/AMT7V/16iRvkPac/7mr93gRcjx2447pP5mpPiZL6LW/tDfc1Bi25vSNxe3ru4qUfTvcNx9t5mzhrHF6vEztDiXyIlCPKHCPHHIEYqA3HIJ+Gp24OuNbbm7LW2Mls2/WWPIR06lm1PahS5CKnrU9pGMPhGGJQUZxIVV+0SGIHuDg/T3YlS1lchNsba6T5m569kZZVUmxYkgar4j90fymieSP6xJIPi7c/tnYGxLt2aa3sXas9sNXlmaSNGkDIvZCzcx8+SjtBPzDj4aobPUa//ifav+vUWOlB7TnX8JwIIT/dW/Kk+vUjxMl9Frf2hvuajRvkfac/7mr8+BDyPHbjjuk/magRt7dU8ds/e9XYf7H7Utu5gbmdivWsgtSj2V5oY5EMjMWYqJw7diOVXt8j3DVXu/rJb2t6gB0y3FM2Qx1a4iOlvuikkIMkUghhl48JO4ydvc4K/I7eXDZurp7sfc2UTce8dk7byF2tTaqtq9w7JX8WOUryyfASRxsCfkkcjjk88rvTnYBjeXK7I2zKrV/AaS4RIfAEgcJ3OhPYrFe1eeF90DgADVCvmevG2Nsbb3DuLceLkrJhY6k9ZI8mrDIRWg5haJnKfFYpHJAKhFJ7iyyIjd063hj+oWLt5Wtj5qccFt4I0exIXePgFHZWClSwPPl3KfirsPPRW21sPHVMmtTbO061W4ZYMkqGNY5TJwHSUCPg93A5U6tcBicZho7abZweGppZtST2hTkCB7B472ftT5fkOefPQZx6VNSFfRy6y8eJ7vT7MEcyMfP1K19ejXn0qXvH0c+snfXgHPT7L93ExPA9TtfD3fPRoNbhvUq9eGOe5BG3hKe15ADxx+I69e1MZ/KNX7Zf166VP3rD/o1/4a68D8Wgz6jtODH9WMhv+ruClDSyVExWqy25GNixxAiOY2cxR9iV+O5AGfxOG+QpLx7Uxn8o1ftl/XpHxXUHK3es+Z6c26qQ1KGPW5W4rAvMhWA+M0ni9yqXlljUGHtYwv2yFkdF0Hgfi0FZHksd7Tnf1+t2mCIA+KvHPdJ9esn6xdIouoF3K39v5Pa9KzncbWxt61YiUWgsBstE6zKCx7HnRgvlz2EdwDEHYYwPatjy/wCzw/pSaR+tG9N47FxW38hs7HUbsmR3DRxFqKzXklIisv4YkTsdO3sYqzE93uhgASRoM8z3QJMhkaGYxeW2dTs4jJ2J6kL0xLDJSNCSGKu5J7lVrIpzyqCQxr+ZbngRKvQLI05++PN7Tkr2LEkluvK7M7x2IoEshJe33H5qjtdVB7LM6r4Xutrne9I/deN9Vku5HbUWLvY3J3YM2aDeqE071eqpLm34QEz3ayp+E7U7ZWdx2lFk7e9IHeeb3DV2xYyez6OTvWpa9aGSCUxSSJJIssKytOvfJFGK03aqmSQXIfcjTulAaJ0b2XF0z27cxGR3Jjbk1u1DN3VyERVipVqi+RPynWqJW/E0rDz47i647JY5aiq2QrA9z+RlX8o/XqLsTM39ybI29uLLV44L2UxVS7ZijQqiSywq7qoYkgBmIAJJ/GdWWM/eaf8A3P8ApHQY51Q6XZbdnVHG9RdtZ7asTUtt28K6ZRDO3fLbrTI0YPciFfBZg4XydY+9JQFMVbunoiNzeodl3AY+LF4ytSrQV8zcX36zgQczIUkAVAG5B55HawcEtq16u9cMn056jUdpT2sHjMPc21dy5yNuGSxLHYhtVolBQSRokZ8cJ3u6p3yJ3SR8BZazc/pA7jxeXo4qrFhYaR2RZ3Bdzghks41snHYpxipDY8SKHj8NKPwkinmSE+QDBg9Zbonk83tndm3J9+4Gkdxw14TPUpqqyNX7mR5IgQB4kkjSSKhHvL8WV2RXvpRtb9r7EZDFZLcmNvCe+88EkZRW8IgAd54BLHgng93HwDEaSs11Y6lYrZNrdck+2ax9pLHCl2nLXZakadtghHmDO4tOlZAwj7mAPA8VAHPor1Cy/UbAZLJ5ymtS3Syc1J6wrrGa5UKfCftml5deeGDeG4Pk0aH4g3x5LHe0529frdpghAPirxz3SfXpU61bXrdT+lG6en9LKYpbGdxstSE3JvwAcj3fE7eeV5A5BVlPwZXXlS6Rge1bHl/2eH9KTSp1q3rlOnHSjdO+8LDj5LuCxst2IX37a4KDkl/eXkAcnjuTngAsvPcIMsyXQGzkbWRiym6tr5nH7gkifKCzWNawnZFHGEhkjYssYEMHuKY2IrQKZCA/ewy9J4s5sTH7G3XnMPbpUocmpjNyeV3awrLXjawziZkiEr8sW8Rmigk7lZTpdzXpD7xN29icZVw2Gyb2IYcFUz+Pt1VyweBSxSWZogeJO/tWNXYh4FKqWYrdP1W37mthYfM7Lye1rubngy81sSVpHoulRWKzJKk3CxMxrhTyxdLKSABVYao0XYFMbV2jQwOW3FVu2avi90gsFwqtKzpH3uS8nYrKniOe9+zub3mOrePJY72nO/r9btMEQB8VeOe6T69VnTXctreOycZuO60Ek1sS90tePsgmCSuglh95u6FwoeN+ffRlby7uBeRge1bHl/2eH9KTUH77Uxn8o1ftl/Xr57X0ehH7Wvpl9oHIS7pv5yg7w9zGvaEXiRSzH8IS7wo7c9/nHH7zBUCfRvA/Fr51t+kDvoVc1eP7F6FTDbov4C1YkrzTRVI4/CMUkkniqnIBcOD2nmSPlY+3h6I9H0dr+N25NgId8YKwFKRxPKjBZkQXVEko7j+EIyMp8ufOvF5+8SmndI9nxdOMNbxN7cGMtl5kEUkDdnfHHGqLJICf7o3by3HI+s6y6t6SO/JNr38nkMVhcfer2I0lE1aYJjn4td9WdTICZQ0VFOSUIORg5XlkD6p0a37m+oGGyGQzsVKOxUtiu8NWJk9Vk8NWkqyhmY+LExKt8k8/FV0DdHksd7Tnf1+t2mCIA+KvHPdJ9eutu7jbVSasMpWQyxsncJ+OORxzyrBh/wChB/ERrpGB7VseX/Z4f0pNdbUkkNWaaCJZJEjZkRiQGYDyBIBIH+YE/UdB8z7R9HfNbQ23XxtDP7QFyPHNQlAmmNV4/XHlVBC3MKuqSErYEXi94Hd3jli4bY6O19v7dzuzI89h4dvZq3HMKItTWhDGbHiWQj2Hd0M0TyR9qkJGVV0ALtwk7f8ASf3bkdux7lz+Z2Via1jENZj7InlZbK3Xr97h7CKKxYJCJvEMYkbzYDlQ37c6t9RM3tzcdaxa2wN00MjFWoLjq0lugwmsiGKJ38dGZ18Su8x93w0mjbtPiBQDr0s2nQ6dYzJ4dMvR9SsZGSzTrxXZZlhjYKOAZnZl5IJ8NT2J8F8tNkeSx3tOd/X63aYIgD4q8c90n16VekO8Nx7vxmYO6pcPLfxeVloucUD4EfaqnwmJdj4q88Op4Kny4+fTnGB7VseX/Z4f0pNB++1MZ/KNX7Zf16+fMd6PEMeYy9nI5nbUlPK5vL3ZI1mmYSU7scayRTws3hWmkMZDGcSMgPuOeAq/RnA/Fr51qde+oWV3Hew9QbTr+qZzM4WOARyzzyyV442gCqJV8TsDl5+3tZEI5RPiQ5430e7GL6eZLp/W3bhTVsSLNU7rdh/V7BWRZbKGR2KF1nk/AjmJTGOxVMjMmldI9oRdOcPbxV7cGLtF5kEUkDdnfHHGqLJICf7o3by3HI+s6Q8h1v6gYXp9FvTJV8U/tDIwQV1THFHgrCL90TNHJaXvC2WWsvLxlmKle4yxodI6V76fftPOXVzGKyUGOy02PiloxeEyGNV745YzJIyOrMR73aWADdgBUkGWPJY72nO/r9btMEQB8VeOe6T69SvamM/lGr9sv69fkYHtWx5f9nh/Sk1K4H4tQfOvUnoBY331H3bvCDdW369TcWEx2NgMjytbrzwrcieVW7+1VWK4/agBR2Y+7G4Mr9t3dBL27dzXtwHqFi8ctjKY7LCGJPFWR4GqO0UgLLyoelHIp5JLBCQvYe+z64dcd19M9+4fauIxeJehk9v3sq9qwksksUle1UjdiAyRxxJFYdy8jrHzx4kkAAMnnc3WjeeIw21s5Wk2/HHncEtxoJKcrO+SWWvG9RGMy8FjYIVO1peYXVUldlTVG1e1MZ/KNX7Zf16ix5LHe0539frdpgiAPirxz3SfXqz4H4tRYwPatjy/7PD+lJqDHOqHS7L7s6o43qLtrP7Vialtu3hXTKIZ275bdaZGjB7kQr4LMHC+TrH3pKApig5roxfyeexu4q25NvQR4nZ1naNPDTyvZrV0exUdJ4pW95X7aoJJRj3LFyW7AdPXW/qJlemO1MduHE1sfM1nP4vFzi53kCGzZSJzGiEM8p7gFUcnk8hZCBG6Vk+svUCquExtRdtzZi7k85i7MCwnkNUsyxwyiBrKzdngokrhBISDyfDQhxR3y3Reja2ecHXz2HfKm5HdTICaWoYngj8Ct2eA4cKkTSOUZmVpHk5HErcNfSHabdOcHdw2V3RjsiZbjSwzRhI2aPtUAvwByx4J497t+AYjWV1vSO6kPsbceesYnbi5HD+qSxqrBY5PED99dQ84BmVmpqVkeJgbSjsJMIm1fo91C3B1Ci3ZNuHbc2EbCbhkxVSvPTnryvXWrWlWRhKB3FmmfhlHb29o8yCSC16VN+i/o59ZAl2Bi/T7LqvEink+p2vIefx0a7+lWB/9OXWb/wDHuX/5O1o0GqQw2HrwtFbaNfCX3QgPzfXr16tc/lFvs114iuJBBCjQzsfCU8pCzD4fjA169oxfR7f9nf8AVqCnG5aH7LBspspfTLPTe+ivi5lgkhRo1cpYMfgsVMsYKhyw7h5aufVrn8ot9muquvRx9fcl7dAXJPavU61JkeFjHHHC8rjsHbyCxnbu8/PtX4cas/aMX0e3/Z3/AFaCNHXt+05x6+3PgRefhr+VJqJuTPUdpY72tnszPBU8QRtKlJphHyCS7+GrFEVQzM7cKqgsxABOpUeQj9pzt6va84Ihx4D8/Kk+rVB1L2ji+p+0Lmy8tczFGjfKiw9OqhkZAeeAZYnCEHhldQHRlVkZWAOiqo9cemwsGp+zacz+pDJiMYmwWakSg9aA8LkwDxBzKPcHZLyR4Unb0l609O4KjX7G9ZYaimcGzJi51hHhQic/hDF28NCfFjPPEqctH3gE6WZPR42emVnzeLzm4sbclq1ccj1sdS7IqEAULUVGqlTG3hw9/cCzrBAjMUiRBMp9D8FSHqybs3bJj/CswGhJWrtD2S01prwfV+8PHXjjjSQN38Bu5m8STvI1KBZ7MMdiDJs0cqh0bwl81I5B+GuOOr2zUUi+wHc/l4a/lHXqnYrUacFKKC4UrxrEpau/JCjgc+X1a8Y7IRLUUer2j7z/AAruf4x+rQQd0bmwmy6MGT3Xuyvi6tm3DRhlsBVDzysFjQeXxJ/9AASeACRTS9U9j1qlW++8v3Jca4sdhKMjQqa0jRzeI4Ttj4kRkHeR3sOF7jrr1J2fjOpWCq4K/ezONWplKOVjsUqwE6yVp1lUK7oxj5K8d6drgE8MPPmhvdHNqZTI427kpslPHh8pksrRjfGQM8Mt2R5Ze2ZoTMgEkjkeG6dy9qv3geYWEPWfpzYw9jPV99eJSrSxxMyUJS7lw5Vo4/D75U4imPiIGQCCbkjwn7WXA7hxW52yKbf3PFfOIuHH3TCisIbAijlMZPHBPZNGfLn5XHxBAzAejd08G28/tYvlHo7mWvFkUkxFJxOkHAi70NXsdwO8eKymU9/JclIyjt062DtPpdBm6m1oc54Gey0mZsJcmsWuyw8UUb9jScsFPghuCT7zMfgQADJHXt+05x6+3PgRefhr+VJqNuXOY3Z+Bu7n3PuSPHYvHRGa1ZmjULGg8vmHJJJAAAJJIABJ1IjyEftOdvV7XnBEP3u/PypPq1TdRdt43qPsXObEyMuRp1s7SkpSWIaSySRBxx3KsqOhI+I5U8fEcHggqvy/V3p9g4bVm/v2EwUWjW3NXqtYjreJCk0ZkeJGVA0csRUsQCZYgOS6g/uW6rbSwODobkzOZzVPHZFJ5IZpduXV7VhBZ/FXwO6E9qsyiQKXAJXuA50tnoPtSLITXaW495pDfmWxlaVuX2jWyTqrLzKlyOUL5PJ5R9g5fnjlU7bjH9LtvVMFV29cv5nI1aiZIIlrH1zEZLoIllMKwCIsPEnCjs7As8i9pUhQQ5Ya8c7jK+XoXrqV7K98YtY96svHJHvRSorr8P4yjy4PwOvcde37TnHr7c+BF5+Gv5Umq7ZuGxuytuVdt0DkrMVdppWmnrcPLJLK8sjkIiovLyMQqKqqCAoAAGrCPIR+0529XtecEQ48B+flSfVoqX6tc/lFvs10kWesfTqqs5G/4bL17U1J4qdV7MpniKCSNY4kZnI8RPkg/Hy+B4dvaMX0e3/Z3/VrLG6H7caplK67i3PDJkM/Y3DDLFXhX1KeYDuWKPwTF289xJZCzM7MxZjzoi9XrH08kxlrMQ77WapUnSBnipSSNIW7+14lVC00ZEUx8SMMnEMx7uI37b3a+6MRvOtYubb3C9yCtMYHk9UaNWPAIZC6jxI2BBWReUYeak6zmD0d9kU8VNh6GY3VXgZlFcrHGzVYV8cLEhaE9yhbdxeX7m4sMSxKRlHbYGz8N07x9nGYmfMWoJpg0QtQcmCFVCRwqUReVRRwC3c5/jM2gYI69v2nOPX258CLz8NfypNd5knrxPPPlfDjjUu7uiBVUDkkk/AAajx5CL2nO3q9rzgiHHq78/Kk+rUiW9DLG8RguAOpXkV35HP/AKaKRaPWrp9lYpZ8Lu29lYIaguvNjsJatxCIyGPjvihZS/crfg+e/tBbt7fPUit1b2bd2zf3lQ3BlbmFxszwz3a237k0bFCwd4+yEmWNe1uZYwyDjnu40l430ctuYnb9fAUd4brgWtTaktiLHUlkMbTmQoT6qfwXYzQ+B/cRGxAjBPdpnxPSjbOKfKEW8xLHl7da1ZhFCCCJjBZFhF7IYEUgyeL3MQXcTMGZuE7SGjam6MbvbHy5XbuXuzVIp3r+LPjJawkZeOTH4yL4iefk68qfPgng6sI69v2nOPX258CLz8NfypNUuzNsYjZCZNMb6/KuTutcZWoRwrFyoVY0SCJF7QFHvEFz8WZjq5jyEftOdvV7XnBEP3u/PypPq0VL9Wufyi32a6SD1h6feuy4+vvZrclaS3HZanj5bEVY1lVpzNJHGyRBQy+bkBj5KSQRp29oxfR7f9nf9Wsso9DtsU8tZyj5jPzCzmbuaMBoVlRHsheY0ZYA8aB17z2MpkZiZTJoi/o9XNiZPC3dwY7eMtqjjzH47w42Z2COWCyqgj73i5STmVQUHhS8sPDftutpbqxe+MdJl9tZm3ZpRzNAJ5cdJXSVl45aMyovip5+UicofPgng6z7H+j/ALMxOEz+BxuSztaDckcEGQePG0w00UIAjDD1btdwPEHisplPiclyUjKO2x9qYbYcGRr4xsjMuRuG2wkpJGIh2qqxqIY0BACj3mBdj5szHz0F5HXt+05x6+3PgRefhr+VJqV6tc/lFvs11EjyEftOdvV7XnBEOPAfn5Un1ale0Yvo9v8As7/q0UoZjqpsTBbjn2jkd8w+3aq12kxsFZrFoCcOU4ijVmPuxSO3APYi979q8NrtuDqRs/bGTnw2b3ksN6rHVmnrpVaV4YrHrBilcIh7IytO0xc8KqwuzFVHOkrf3o77G6jb4u76z9/cC2bVfHQx14K0Yigkpm12TANEe6XtuTKrty0XPdEUbhhMzfQrZeczmU3JPlN2xZDOCquTdZ3eKyIq01VuIZFaOIyQWJI3MSoR5MvY3LEjU/Vrn8ot9muosde37TnHr7c+BF5+Gv5UmpPtGL6Pb/s7/q1FjyEXtOdvV7XnBEOPV35+VJ9Wiq3cm8dubRuYzH7m3jVx1nMyyQ0Ipwoaw8cZkcKOPmVfj8OSo+LKDVZDqrsXFV8Xas7zB9u4s5vHxwUZJprdIPXQzJFGhdh3Wq447effHl5HjrvHZuM3luHaO47N7M0p9oZOTJ11q1wvrBevJCYpHKGQRkSclUZQ3HDdw8glT+jrsqe/i84ua3ZXzGHwCbap3YD5LRjmhlgDQPG0LOhh47ynn4shI817CGgdZunz0JMlV3nNdhS3HSQUsXPZknkkEhQwxxRM8yN4M3EkYZCYpB3co3DFtrc2L3fBZs7fz0tmOpOa8jNTaLlgAQy+Iq96EEFXXlGHySdZ1W9HvY9LA39uVMhuBadxUhjEtOvYarAjyskcRlgbjt9ZtASHmTiw3v8Aup2OOwNkbc6dJmVwde4TnMlJk7THHxwkysqr5iGJA54QcyOGkb4s7HQJ3pUwWR6OfWTuus3HT7Lk/g18x6na8tGvz0qL0b+jn1kAgsDu6f5hRzCw4/cdr4+XkPPRqjYqn70h/wBGv/DXbUGOjDYghkeSwD4SjhLEiD4fiUga9ey63+Nuf2yX72gRqNXqGOt9+5Za7+xJsUyRAzKa/i/ufw+E7vJu71rkhQ3B952XwlTRdIce98G3VFulclTLRXzjZMnDO9xwk0cbQhyq9/cVBsRgPxwWWRfih5cPZdb/ABtz+2S/e0H7H/Ctj+jw/pSaznrxU6l3cTioelntVMu9xYjPWmjStBC7IksswZ1LlImkdFIZT2MOFkMTq9x42ucnOni2+BBEf33Lz8qT5+7VB1H3LW6e7eXPexc5mO6zHX8ClPO7IGBJkfgkqihSWbg8fE8DkgMcy+I9IYbmpXqD7wk2rFPnXt431+slqeJ4aaVI/FDmWMmeW4/ejt2JC3hKndEossJjOtS5GrUzFneREtvHs+SWaERRsk1jxJDX7z7rVTURo+PDEhlkYPIg77ej6Qu0spFJPjdu7hsRw1aGScrkoyXoXGZa9mJVnLSLIySLGvAZzG5UdoDH3B16ws2Mnyy7M3NJFVqT25o4cnE0qrFDHYY9pnHuCCaFmc8KGlSMdzsF0GmbAg3FV2Zh627bE9jMRVVS5LOUMkkg8izeGAnJ+J7QB5+QHw1bYz95p/8Ac/6R159l1v8AG3P7ZL97UbHYyu1RWMtv5T/C3KP4x/nagS+qn7ZDbt6fQ7Js5eLFWMxYg3AaEVYiOs1SXslkeZX7VSQKQoThjxywIRXzrLR+kbkH2tF6tmPYdXZ3qmcNS0lfIT5tbNITO3mpPuR2PDeJgpBmPLB49b9Yo1K1eWw75B1iRnKx2Z3cgDnhVDcsfxAeZ1i9D0jtr5nFe1cNtbcMwOJkyqwTZNI5Ssczxsnasref4Nj5E+9xHx3ngUUcGF9IqztDI1s5b3AuUFivadYJ1ItWFaysscbw2IXhrur0CPDcBTFKew8v3an0fp78pVM8m+prsrvlXekbbAv4RRO7jiRwF7+7jtKrx8lFHlpUs9eMPXp5d/2E7sN/C5CGlbpCw7PAkgnImlKO3hxj1aUk8EBTG3Pa3Idun268V1Bx9rI0qeTqRQyqsXi32bxoXQPHKCjkAMp+B8xoGuP+FbH9Hh/Sk0q9an3pH0o3TJ07lux7kTGytjTShjlnMwHICLJ7vcRyOeCRzyFYgKWCPG1zk508W3wIIj++5eflSfP3fVqm6ibjwvTbY+a35lq+Xt08HUe5PDUtOZXRfjx3yKqj5yzMqqAWYgAnUGUZmp6QuVnvY++u4MY16aJ8TfxdupPHj0FcRus8S+F4rs3J4J8NXmmYMPBr6tLG1+ped2JhcZWubnwuYow5kyZBL8xdlKuKoeGS2xlkcvC6rJKwjEcqB0JVtWGZ63bbx8GTs4vbO58wmJsx1Z1qWwZZJHh8Tsgj8bvmYESIwUHtME5PAj5bplurSYzZmI3lFsXcl5cmb8b0Kt2Q3IJqqTO0JhYq5crXm5XgFSnaR3EKaHbppDnq+ycdBuWtPBkI/GV1sTyTStGJn8J3aSSRwzR9jFWkcoWK9x7edXkf8K2P6PD+lJqk2bkaO8Nt09wxRXqvrXiK9d70peCRJGjeN/MFXVkZWUgMrAqQCCNWMeNrnJzp4tvgQRH99y8/Kk+fu+rUFrr52s1ev2Qp5k3LW6nhr7ouxJFA1SrJYxbCMxND4fbIoQgqpEpLBnYk8hU332XW/wAbc/tkv3tZLY667c7LXs/ae6rMlbNWsDw91IgbUHhntYNP3p3q5Ze5QeEPcF7k76FKrQ9JIbWvVMt7dkyE08UtloLcAdp1FvuNdlYeHCWbGHsUqpEc/u+cgfUujdbflbDX13+b/r72gzG3MsndL4a+M0XaSFhL89ijgAfBQNKNT0hdn5DAT56lgdxSL3xtUha72tZrutpvF58XhOFoWz2k8+4v5Y4d+ne7sR1FxtjK0KWVpwxyL4IsXXJmhdA8cvuue3uU/JPmPn0DbH/Ctj+jw/pSa63PHNSf1ViJvDbwyFDENx5cAkA+fzEgfXqBHja5yc6eLb4EER/fcvPypPn7vq11sUalavLYd8gyxIzlY7M7uQBzwqhuWP4gPM6D5u23S9ICbAR5PdcO9b+Rs4lqcsK2FpvFILjhbA8CdY+4qUYxiESCNSBM3ztWC2t1Wm21uXbWbyO5bVy7kYZKObe9JRnQSWSsjCOOy6okMMiSBYyiSdjKY1K8HphfSDwm4qJyuJ2TuhKJxb5KOxdvCvFIUmeN4BMZDCZFWN3ZBIXAHBXkECxx3WSplNq5/csGydyVZ8DaEDYrIXXp3po2leKORY5WHlI6FY+OQ7cqpJBABk6QYvd2HxmYpbvtZK5MMpK0Fu+7+JNGVXzCGeZUQHkDsKIfiI0+dzj/AIVsf0eH9KTSl053VW6g429fbB5zCSUrr1DVyFiaOcqACshUkcKwPII5BA5BI0xx42ucnOni2+BBEf33Lz8qT5+76tBa6+cEr9d5c3kcll4d3ZCvQzOYjqVIZIqQs0mjjMJjaKdETtHesfipY7m94NGTwu/2KNStBJYd77LEjOVjszuxAHPAUNyT+IDzOscwvpB4TcVE5XE7J3QlE4t8lHYu3xXikKTPG8AmMhhMirG7sgkLgDgryCAFbk8T15gw0tWjkdzXorFPHSR8ywRWIHRLoeFHDCQ8THHszuxeRFk7mILJrQOitXqHVw+XXqO1xrz5OR4jYlD8oUXuKcMwCd3dwF7U/JRB5apcz1nwuAweVzeU2ruWuuMt16piku8E+LE0oDsJSscgReWiY96+JCCAZBw5bPzVXdqZI+zcpQbG3DUKy5Ayd/uK4bmORgDw45XnlT5HQMUf8K2P6PD+lJqXqqjxtc5OdPFt8CCI/vuXn5Unz931ak+y63+Nuf2yX72oML6iP6SMnUreFLYEWQlwT4XDSYx5JKtatDMJ5zaSFmR2kldVjUligVHY8AiFmm38H1fz+/c7Wte3qeEv5ShLi7tXKGstCokUZkDxpJ+EJJtqQAB3mIyCVQhju9y9X8Dt/de5NnQ7b3LevbYx2Pylpkt+FHLDbkmRBCZJVaVuYSoCqe+RhGpLK/Zz3H1jwm3NyZfbljbe4JJMPElmWQ3vDElf8EHlRXkBYBrESKB5u5YDjtJ1Rrmokf8ACtj+jw/pSa/PZdb/ABtz+2S/e1Gjxtc5OdPFt8CCI/vuXn5Unz931agn3PHNSf1ViJvDbwyFDENx5cAkA+fzEgfXr5l2xivSMz+Irw7qbdSWrOKNOSd7yUnSc3WVbDCvIip2KY5SgXxDGhQSOCQ/0hYo1K0Elh3vssSM5WOzO7EAc8BQ3JP4gPM6xw+kHhZ9tYvdWL2Lu25VzMEklSKO54tgtHZEMoaKGSRgqBg7MAQvPB4IYCipyO3Oui0tz42LM7ms1o8pDZxjkhZ7SL46vCzxWo3jjYPT4eN1H4J2MQJlDaV0erb5r4nIjfSZBLj2+7i5YE3MhRfFMRDHiEvz2KOAB8FA0pQekJsW1tafdVeC5JWTM+xYeM5F2ySfhOXZzNxEv4CUgvwG4Xg+Z7XTp9u/D9QYsu9OnlaL4e+1CaKxdcvyFVgSFc9pIYcqfMaBX9Kv+9y6zf8A49y//J2tGo3pUY+BPRz6yESWT2dP8ww5syHz9TtfHlvMeXwPlo0D7PvJqAirjHh+IlPPi8fN/m+rXL9n7/yWv23/AMdGjWbtWVq5rDJn23Qu2ofajQmv6x47EhD293A47QW8OMMwHLCOMEkIoFl+z9/5LX7b/wCOjRpcs4Jvtxfml9mD3oY148b8TP8AV9eo+c3DjNyUGxea2+lmszBivrLIQR+JlAI5BIPB8wSDyCRo0aXLKH2L09SzXuV9g06s9WvSqQyVLD12WvUSZK0PMfbzGiWbChD7vErAgg6/MfhOn+Ke2+P2NDCL9P1C4i3ZfDtV+HASVCe2QKsjqvcCVU9q8KAAaNLljd+z9/5LX7b/AOOuFLfbxVlQYwHgsf7t+Nj9WjRpcs6y76E8TwTYeOSORSjo0vIZT5EEdvmNJ2F21022/FXgxXT+rGlZkkjD2pJfwiTCZJD3890iyAEOeWAAUHt8tGjS5ZMsUtk2hdWfZcDe0HMlji3IC55J45HwXlpPdHC/hZhxxLJ3WeAy+D2tBNV2/teClDYlMzxxzN288AAKCPdUAABV4VR5ADRo0uWTU324vzS+zB70Ma8eN+Jn+r69Q9zZrE7w2/f2vuLb4tY3JwNXsxC08ZZD+J04ZCPiGUgggEEEaNGlyylGD6dR3Y8jV6dY2nYSIVy9NzW8WEKq+FIIwolj7VUdj8qQOCNTqp2pTrJVi2hC6Rw2q6may8r+HZKtYHe/LHxGRWc88sw7jySTo0aXLLPD7moYDHRYrEYCOvVhLMqCcsSzMXd2YgszszMzMxLMzEkkknXVN9uL80vswe9DGvHjfiZ/q+vRo0uWd/2fv/Ja/bf/AB0orhOnyQXoF2JWAyN58jOwtSd/rDfF0f5Uf1KhAHJ4A5PJo0uWfgwXTpastKPp7QirzP3mKKZ0VflcKgXjsX35R2rwvE0w44lkDXeAy+D2tBNW2/teCjDYlMzxxzHt54AAUEe6oAACjhVHkANGjS5ZNTfbi/NL7MHvQxrx434mf6vr11l30J4ngmw8ckcilHRpeQynyII7fMaNGlyxJo7S6a43Hw4yhsVYIIODH4eSsK6OJfFEgcN3eIH+EnPeF90Ht8tXNI7UoSzTVtoQh7E0U8rPZd+54pRLGT3c/IlHeo+CszsOC7ljRpcsnYbO4nb62Vw+3Y6wtzGxNxYZu5yAPLuB7VAAAUcKB5ADUpN9uL80vswe9DGvHjfiZ/q+vRo0uWdZd9CeJ4JsPHJHIpR0aXkMp8iCO3zGkmltLprjcfFjKGxVggg4Mfh5Kwro4l8USBw3d4gf4Sc94X3Qe3y0aNLlk5sZsmShLi5tomapLYktmGXJTyIs0jFpHQMx7CxZ+7t47hJIDyHYG229mcRtSlJjsBgDVqyTPP4PrkjojMeWCB+Qi8+favCgk8DzOjRpcsmpvtxfml9mD3oY148b8TP9X167/s/f+S1+2/8Ajo0aXLE/KYHp9mN2T76v7HiO4LENeu2RivTQzqkJk7OxkIKH8KwYrwXAQMWCIFlXqeysnakuZHZkNmaUKHeW3IxYBQjA8/M6BVkHwlVVEncAADRpcsZv2fv/ACWv23/x1wTfbi9NN7MHvQxLx434mf6vr0aNLlnWXfQnieCbDxyRyKUdGl5DKfIgjt8xpMx21um+JoJjMdsVIK8cbRqFyE/cO5y5fu7u7v5JHfz3BT289vlo0aXLOwwPTpastKPp7QirzN3mKKZ0VflcKgXjsX35R2rwvE0w44lkDXuDzeH23HYhwe24qiWZTNIqzsR3cAADkHtUAABRwqjyAGjRpcszz0nt5Nb9Hjq9EceF8fYeYi58Xnj9xWfP4fXo0aNWJSX/2Q==" alt="amortization definition" class="aligncenter" style="display: block;margin-left:auto;margin-right:auto;" width="360" height="277" /></p> <p>You would then divide this by 12, giving you £12,500 which you would need to repay each month until the debt was fully amortised. Accounting for a 5% interest rate, your final total to be repaid each month would be £13,125. As another example, let&rsquo;s say that you had been given ten years to repay £1.5 million in business loans to a bank on a monthly basis. In order to work out your monthly amortisation obligations, you would divide £1.5 million by ten, giving you £150,000 per year. We can work out the estimated amortization expense for each of the next five years. This number represents the company&rsquo;s value before depreciation and amortization.</p> </p> <p><h2>What Is A Subprime Mortgage?</h2> </p> <p>A write-off schedule is employed to reduce an existing loan balance through installment payments, for example, a mortgage or a car loan. The deduction of certain capital expenses over a fixed period of time. Amortizable expenses not claimed on Form 4562 include amortizable bond premiums of an individual taxpayer and points paid on a mortgage if the points cannot be currently deducted. For the next month, the outstanding loan balance is calculated as the previous month&rsquo;s outstanding balance minus the most recent principal payment.</p> </p> <p><h2>The First Known Use Of Amortization Was</h2> </p> <p>We have also discussed which types of loans are amortized and the types that are unamortized. However, it is also important to note that loan amortization is common in personal finance. Incorporate finance; the amortization principle is generally applicable to intangible assets. Amortization refers to how loan payments are applied to certain types of loans. Typically, the monthly payment remains the same and it&#8217;s divided between interest costs , reducing your loan balance , and other expenses like property taxes. Amortization and depreciation are similar concepts, in that both attempt to capture the cost of holding an asset over time.</p> </p> <p>One such example is a loan amortization, which is the process of paying down debt by making regularly scheduled principal and interest payments. Amortization is also used, along with depreciation, to spread out the cost of a capital expense for accounting and tax purposes.</p> </p> <p>This write-off results in the residual asset balance declining over time. To see the full schedule or create your own table, use aloan amortization calculator. Justin Pritchard, CFP, is a fee-only advisor and an expert on personal finance.</p> </p> <p>Teresa has a 30-year, fixed-rate mortgage on her new home in the amount of $700,000, meaning that, including interest, her monthly payment is $3,758. Her first payment this year is $2,917 against the interest and $841 against the principal, leaving her a balance of $699,159. The following month, her interest payment has gone down just a little bit, to $2,913, while the principal payment has gone up, to $845, leaving her with a balance of $698,314. The payment schedule of the loan, or term, determines how quickly it amortizes each month, with payments divided into equal amounts over the life of the loan.</p> </p> <p>He covers banking, loans, investing, mortgages, and more for The Balance. He has an MBA from the University of Colorado, and has worked for credit unions and large financial firms, in addition to writing about personal finance for more than two decades. The expense would go on the income statement and the accumulated amortization will show up on the balance sheet. Within the framework of an organization, there could be intangible assets such as goodwill and brand names that could affect the acquisition procedure. As the intangible assets are amortized, we shall look at the methods that could be adopted to amortize these assets. Let&rsquo;s say, it&#8217;s the 25-year loan you can take, but you should fix your 20-year loan payments .</p> </p> <p>The concept of both depreciation and amortization is a tax method designed to spread out the cost of a business asset over the life of that asset. Business assets are property owned by a business that is expected to last more than a year. Let&rsquo;s suppose Marina has taken a personal loan of 14,000 USD for two years at the annual interest rate of 6%. Every monthly payment will consist of monthly interest and a part of the principal amount. You can find an online calculator that will find a complete amortization schedule for you with periodic payments and writing off the principal amount. However, you can also prepare your loan amortization schedule by hand or in MS excel. Let&rsquo;s look at the formula periodic payments in the loan amortization.</p> </p> <p>Personal loans were taken from online lenders, credit unions, and other financial institutions like banks fall in the category of personal loans and are usually amortized. However, most typically, such loans are spread over three to five years. Amortization is the practice of spreading an intangible asset&#8217;s cost over that asset&#8217;s useful life. Amortization expense is the write-off of an intangible asset over its expected period of use, which reflects the consumption of the asset.</p> </p> <p>The amortization table also helps the borrower prioritize their strategy for paying the loan. A borrower can estimate how much <a href="https://www.bookstime.com/articles/amortization">amortization definition</a> money he can save by paying more as a down payment or rescheduling the amortization table for a smaller period of time.</p> </p> <p>The amount of an amortization expense write-off appears in the income statement, usually within the &#8220;depreciation and amortization&#8221; line item. The accumulated amortization account appears on the balance sheet as a contra account, and is paired with and positioned after the intangible assets line item. In some balance sheets, it may be aggregated with the accumulated depreciation line item, so only the net balance is reported. In real estate, the term also describes how one repays certain types of loans. Within the amortization schedule, one will receive a breakdown of exactly how much of each payment is going towards interest and the principal. In addition to this, the schedule will show the time period in which the loan should be paid in full. From the above discussion, you will have got a clear idea of how the loan amortization works and how to make the loan amortization table for your convenience.</p> </p> <p>Financially, amortization can be termed as a tax deduction for the progressive consumption of an asset&#8217;s value, in particular an intangible asset. It is often used with depreciation synonymously, which theoretically refers to the same for physical assets. Like the wear and tear in the physical or tangible assets, the intangible assets also wear down. Owing to this, the tangible assets are depreciated over time and the intangible ones are amortized. A term that refers either to the gradual paying off of a debt in regular installments over a period of time or to the depreciation of the &ldquo;book value&rdquo; of an asset over a period of time. Interest costs are always highest at the beginning because the outstanding balance or principle outstanding is at its largest amount.</p> "

amortization definition

Amortization is important because it helps businesses and investors understand and forecast their costs over time. In the context of loan repayment, amortization schedules provide clarity into what portion of a loan payment consists of interest versus principal. This can be useful for purposes such as deducting interest payments for tax purposes. For example, a mortgage lender often provides the borrower with a loan amortization schedule. The loan amortization schedule allows the borrower to see how the loan balance will be reduced over the life of the loan.

Save money and don’t sacrifice features you need for your business. Patriot’s online accounting software is easy-to-use and made for the non-accountant. The accountant, or the CPA, can pass this as an annual journal entry in the books, with debit and credit to the defined chart of accounts. Since a license is an intangible asset, it needs to be amortized over the five years prior to its sell-off date. To understand the accounting impact of amortization, let us take a look at the journal entry posted with the help of an example.

At first, payments will mainly go to interest and very little to principal. Then, as the loan is closer to being paid off, the payment goes more towards principal than interest. They are an example of revolving debt, where the outstanding balance can be carried month-to-month, and the amount repaid each month can be varied. Examples of other loans that aren’t amortized include interest-only loans and balloon loans. The former includes an interest-only period of payment, and the latter has a large principal payment at loan maturity.

The percentage depletion method allows a business to assign a fixed percentage of depletion to the gross income received from extracting natural resources. The cost depletion method takes into account the basis of the property, the total recoverable reserves, and the number of units sold. Unlike depreciation, amortization is typically expensed on a straight line basis, meaning the same amount is expensed in each period over the asset’s useful life. Additionally, assets that are expensed using the amortization method typically don’t have any resale or salvage value, unlike with depreciation. At this point 10 years later, her interest payment is $2,367 and her principal payment is $1,385, after which her balance is $568,009. At the very end of her amortization schedule, 30 years later, her interest payment has dropped to just $16, but her payment against the principal, her last one, is $3,742. The rate at which the balance decreases is called an amortization schedule.

Free Accounting Courses

In the first month, $75 of the $664.03 monthly payment goes to interest. Intangibles amortized over time help tie the cost of the asset to the revenues generated by the asset in accordance with the matching principle of generally accepted accounting principles . Amortization schedules are used by lenders, such as financial institutions, to present a loan repayment schedule based on a specific maturity date. In addition to Investopedia, she has written for Forbes Advisor, The Motley Fool, Credible, and Insider and is the managing editor of an economics journal. Using each company’s earnings before interest, taxes, depreciation and amortization in 2020, UMG and WMG have multiples of 35.9 and 31.5 of value to EBITDA, respectively.

  • Consumers often make decisions based on an affordable monthly payment, but interest costs are a better way to measure the real cost of what you buy.
  • Amortization is an accounting technique used to lower or expense out the value of an asset over time.
  • A business will calculate these expense amounts in order to use them as a tax deduction and reduce their tax liability.
  • In this case, if we suppose that the interest rate is set at 10%, then company A would actually need to repay £275,000 per year for the debt to be fully amortised.
  • The loan amortization process includes fixed payments each pay period with varying interest, depending on the balance.
  • If you only pay some of the interest, the amount that you do not pay may get added to your principal balance.

In general, longer depreciation periods include smaller monthly payments and higher total interest costs over the life of the loan. In a loan amortization schedule, this information can be helpful in numerous ways. It’s always good to know how much interest you pay over the lifetime of the loan. Your additional payments will reduce outstanding capital and will also reduce the future interest amount. Therefore, only a small additional slice of the amount paid can have such an enormous difference. The second situation, amortization may refer to the debt by regular main and interest payments over time.

What Is Negative Amortization?

With depreciation, amortization, and depletion, all three methods are non-cash expenses with no cash spent in the years they are expensed. Also, it’s important to note that in some countries, such as Canada, the terms amortization and depreciation are often used interchangeably to refer to both tangible and intangible assets. The two basic forms of depletion allowance are percentage depletion and cost depletion.

It demonstrates how each payment affects the loan, how much you pay in interest, and how much you owe on the loan at any given time. This amortization schedule is for the beginning and end of an auto loan.

amortization definition

Your lender may offer you the choice to make a minimum payment that doesn’t cover the interest you owe. The unpaid interest gets added to the amount you borrowed, and the amount you owe increases. Operating Income Before Depreciation and Amortization shows a company’s profitability in its core business operations. If you haven’t refinanced your mortgage in the last year, now is the time. If the asset has no residual value, simply divide the initial value by the lifespan. For clarity, assume that you have a loan of $300,000 with a 30-year term. To learn about the types of amortization, we shall consider the two cases where amortization is very commonly applied.

This can put you at risk of foreclosure if you run into trouble making your mortgage payments. Certain businesses sometimes purchase expensive items that are used for long periods of time that are classified as investments. Items that are commonly amortized for the purpose of spreading costs include machinery, buildings, and equipment. From an accounting perspective, a sudden purchase of an expensive factory during a quarterly period can skew the financials, so its value is amortized over the expected life of the factory instead.

You may need a small business accountant or legal professional to help you. When an asset brings in money for more than one year, you want to write off the cost over a longer time period. Use amortization to match an asset’s expense to the amount of revenue it generates each year.

Statistics For Amortize

In lending, amortization is the distribution of loan repayments into multiple cash flow installments, as determined by an amortization schedule. Unlike other repayment models, each repayment installment consists of both principal and interest, and sometimes fees if they are not paid at origination or closing. Amortization is chiefly used in loan repayments and in sinking funds. Payments are divided into equal amounts for the duration of the loan, making it the simplest repayment model. A greater amount of the payment is applied to interest at the beginning of the amortization schedule, while more money is applied to principal at the end.

It also serves as an incentive for the loan recipient to get the loan paid off in full. As time progresses, more of each payment made goes toward the principal balance of the loan, meaning less and less goes toward interest. The amortization of a loan is the process to pay back, in full, over time the outstanding balance. In most cases, when a loan is given, a series of fixed payments is established at the outset, and the individual who receives the loan is responsible for meeting each of the payments. The payment is allocated between interest and reduction in the loan balance. The interest payment is calculated by multiplying 1/12 of the interest rate times the loan balance in the previous month. The interest due May 1, therefore, is .005 times $100,000 or $500.

amortization definition

You would then divide this by 12, giving you £12,500 which you would need to repay each month until the debt was fully amortised. Accounting for a 5% interest rate, your final total to be repaid each month would be £13,125. As another example, let’s say that you had been given ten years to repay £1.5 million in business loans to a bank on a monthly basis. In order to work out your monthly amortisation obligations, you would divide £1.5 million by ten, giving you £150,000 per year. We can work out the estimated amortization expense for each of the next five years. This number represents the company’s value before depreciation and amortization.

What Is A Subprime Mortgage?

A write-off schedule is employed to reduce an existing loan balance through installment payments, for example, a mortgage or a car loan. The deduction of certain capital expenses over a fixed period of time. Amortizable expenses not claimed on Form 4562 include amortizable bond premiums of an individual taxpayer and points paid on a mortgage if the points cannot be currently deducted. For the next month, the outstanding loan balance is calculated as the previous month’s outstanding balance minus the most recent principal payment.

The First Known Use Of Amortization Was

We have also discussed which types of loans are amortized and the types that are unamortized. However, it is also important to note that loan amortization is common in personal finance. Incorporate finance; the amortization principle is generally applicable to intangible assets. Amortization refers to how loan payments are applied to certain types of loans. Typically, the monthly payment remains the same and it’s divided between interest costs , reducing your loan balance , and other expenses like property taxes. Amortization and depreciation are similar concepts, in that both attempt to capture the cost of holding an asset over time.

One such example is a loan amortization, which is the process of paying down debt by making regularly scheduled principal and interest payments. Amortization is also used, along with depreciation, to spread out the cost of a capital expense for accounting and tax purposes.

This write-off results in the residual asset balance declining over time. To see the full schedule or create your own table, use aloan amortization calculator. Justin Pritchard, CFP, is a fee-only advisor and an expert on personal finance.

Teresa has a 30-year, fixed-rate mortgage on her new home in the amount of $700,000, meaning that, including interest, her monthly payment is $3,758. Her first payment this year is $2,917 against the interest and $841 against the principal, leaving her a balance of $699,159. The following month, her interest payment has gone down just a little bit, to $2,913, while the principal payment has gone up, to $845, leaving her with a balance of $698,314. The payment schedule of the loan, or term, determines how quickly it amortizes each month, with payments divided into equal amounts over the life of the loan.

He covers banking, loans, investing, mortgages, and more for The Balance. He has an MBA from the University of Colorado, and has worked for credit unions and large financial firms, in addition to writing about personal finance for more than two decades. The expense would go on the income statement and the accumulated amortization will show up on the balance sheet. Within the framework of an organization, there could be intangible assets such as goodwill and brand names that could affect the acquisition procedure. As the intangible assets are amortized, we shall look at the methods that could be adopted to amortize these assets. Let’s say, it’s the 25-year loan you can take, but you should fix your 20-year loan payments .

The concept of both depreciation and amortization is a tax method designed to spread out the cost of a business asset over the life of that asset. Business assets are property owned by a business that is expected to last more than a year. Let’s suppose Marina has taken a personal loan of 14,000 USD for two years at the annual interest rate of 6%. Every monthly payment will consist of monthly interest and a part of the principal amount. You can find an online calculator that will find a complete amortization schedule for you with periodic payments and writing off the principal amount. However, you can also prepare your loan amortization schedule by hand or in MS excel. Let’s look at the formula periodic payments in the loan amortization.

Personal loans were taken from online lenders, credit unions, and other financial institutions like banks fall in the category of personal loans and are usually amortized. However, most typically, such loans are spread over three to five years. Amortization is the practice of spreading an intangible asset’s cost over that asset’s useful life. Amortization expense is the write-off of an intangible asset over its expected period of use, which reflects the consumption of the asset.

The amortization table also helps the borrower prioritize their strategy for paying the loan. A borrower can estimate how much amortization definition money he can save by paying more as a down payment or rescheduling the amortization table for a smaller period of time.

The amount of an amortization expense write-off appears in the income statement, usually within the “depreciation and amortization” line item. The accumulated amortization account appears on the balance sheet as a contra account, and is paired with and positioned after the intangible assets line item. In some balance sheets, it may be aggregated with the accumulated depreciation line item, so only the net balance is reported. In real estate, the term also describes how one repays certain types of loans. Within the amortization schedule, one will receive a breakdown of exactly how much of each payment is going towards interest and the principal. In addition to this, the schedule will show the time period in which the loan should be paid in full. From the above discussion, you will have got a clear idea of how the loan amortization works and how to make the loan amortization table for your convenience.

Financially, amortization can be termed as a tax deduction for the progressive consumption of an asset’s value, in particular an intangible asset. It is often used with depreciation synonymously, which theoretically refers to the same for physical assets. Like the wear and tear in the physical or tangible assets, the intangible assets also wear down. Owing to this, the tangible assets are depreciated over time and the intangible ones are amortized. A term that refers either to the gradual paying off of a debt in regular installments over a period of time or to the depreciation of the “book value” of an asset over a period of time. Interest costs are always highest at the beginning because the outstanding balance or principle outstanding is at its largest amount.