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What Is Amortization

November 19, 2021
Bill Kimball
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" alt="amortization definition" class="wp-post-image" style="display: block;margin-left:auto;margin-right:auto;" width="362" height="203" /></p> <p>In general, to amortize is to write off the initial cost of a component or asset over a certain span of time. It also implies paying off or reducing the initial price through regular payments. The intangible assets have a finite useful life which is measured by obsolescence, expiry of contracts, or other factors. A company needs to assign value to these intangible assets that have a limited useful life. The scheduled payment is the payment the borrower is obliged to make under the note. The loan balance declines by the amount of the amortization, plus the amount of any extra payment. If such payment is less than the interest due, the balance rises, which is negative amortization.</p> <p>In mortgages,the gradual payment of a loan,in full,by making regular payments over time of principal and interest so there is a $0 balance at the end of the term. In accounting, refers to the process of spreading expenses out over a period of time rather than taking the entire amount in the period the expense occurred. An amortization schedule is a table detailing each periodic payment on an amortizing loan. Each calculation done by the calculator will also come with an annual and monthly amortization schedule above. Each repayment for an amortized loan will contain both an interest payment and payment towards the principal balance, which varies for each pay period. An amortization schedule helps indicate the specific amount that will be paid towards each, along with the interest and principal paid to date, and the remaining principal balance after each pay period. Amortization is an accounting technique used to lower or expense out the value of an asset over time.</p> <p>Likewise, you must use amortization to spread the cost of an intangible asset out in your books. The difference between amortization and depreciation is that depreciation is used on tangible assets. For example, vehicles, buildings, and equipment are tangible assets that you can depreciate.</p> <p>The purchase of a house, or property, is one of the largest financial investments for many people and businesses. This mortgage is a kind of amortized amount in which the debt is reimbursed regularly. The amortization period refers to the duration of a mortgage payment by the borrower in years. In the course of a business, you may need to calculate amortization on intangible assets. In that case, you may use a formula similar to that of straight-line depreciation. These assets can contribute to the revenue growth of your business. An example of an intangible asset is when you buy a copyright for an artwork or a patent for an invention.</p> <h2>What Is The Difference Between Depreciation And Amortization?</h2> <p>The cost of long-term fixed assets such as computers and cars, over the lifetime of the use is reflected as amortization expenses. When the income statements showcase the amortization expense, the value of the intangible asset is reduced by the same amount. Amortization is a technique to calculate the progressive utilization of intangible assets in a company. Entries of amortization are made as a debit to amortization expense, whereas it is mentioned as a credit to the accumulated amortization account. The amortization period is defined as the total time taken by you to repay the loan in full. Mortgage lenders charge interest over the loan or the mortgage amounts and therefore, it implies that the longer the loan period more is the interest paid on it.</p> <p>The loan schedule consists of a down payment and periodic payments of interest+principal. The borrower can extend the loan, but it can put you at the risk of paying more than the resale value of your vehicle. Amortization means paying off a loan with regular payments, so that the amount you owe goes down with each payment. Negative amortization means that even when you pay, the <a href="https://www.bookstime.com/articles/amortization">amortization definition</a> amount you owe will still go up because you are not paying enough to cover the interest. Straight line basis is the simplest method of calculating depreciation and amortization, the process of expensing an asset over a specific period. Amortization is an accounting technique used to periodically lower the book value of a loan or intangible asset over a set period of time.</p> <p><img 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" alt="amortization definition" class="aligncenter" style="display: block;margin-left:auto;margin-right:auto;" width="379" height="284" /></p> <p>The loan amortization process includes fixed payments each pay period with varying interest, depending on the balance. Negative amortization for loans happens when the payments are smaller than the interest cost, so the loan balance increases. Generally, amortization refers to the paying off of debt over a period of time. Most often, these are setup as a way of leveling out your monthly payment. To do this, the payments cover both interest and principal each month.</p> <h2>Learn More About Amortization</h2> <p>Having a great accountant or loan officer with a solid understanding of the specific needs of the company or individual he or she works for makes the process of amortization a simple one. Amortization means something different when dealing with assets, specifically intangible assets, which are not physical, such as branding, intellectual property, and trademarks. In this setting, amortization is the periodic reduction in value over time, similar to depreciation of fixed assets. The total payment stays the same each month, while the portion going to principal increases and the portion going to interest decreases. In the final month, only $1.66 is paid in interest, because the outstanding loan balance at that point is very minimal compared with the starting loan balance.</p> <p>In a conventional 15-year mortgage, the borrower pays a series of equal, amortized payments over the full 15-year term. The interest due for the period is calculated by applying the interest rate to the current loan balance. This amount is subtracted from the payment to determine the amount to be applied to the principal.</p> <ul> <li>Depreciation can be calculated in one of several ways, but the most common is straight-line depreciation that deducts the same amount over each year.</li> <li>The unpaid interest gets added to the amount you borrowed, and the amount you owe increases.</li> <li>Janet Berry-Johnson is a CPA with 10 years of experience in public accounting and writes about income taxes and small business accounting.</li> <li>The amortization rate can be calculated from the amortization schedule.</li> </ul> <p>When used in the context of a home purchase, amortization is the process by which loan principal decreases over the life of a loan, typically an amortizing loan. As each mortgage payment is made, part of the payment is applied as interest on the loan, and the remainder of the payment is applied towards reducing the principal. An amortization schedule, a table detailing each periodic payment on a loan, shows the amounts of principal and interest and demonstrates how a loan&#8217;s principal amount decreases over time. An amortization schedule can be generated by an amortization calculator.</p> <p>This information should not be considered complete, up to date, and is not intended to be used in place of a visit, consultation, or advice of a legal, medical, or any other professional. For example, if a 6% 30-year $100,000 loan closes on March 15, the borrower pays interest at closing for the period March 15-April 1, and the first payment of $599.56 is due May 1. On an ARM, the fully amortizing payment is constant only so long as the interest rate remains unchanged. For example, an ARM for $100,000 at 6% for 30 years would have a fully amortizing payment of $599.55 at the outset. But if the rate rose to 7% after five years, the fully amortizing payment would jump to $657.69.</p> <p>Businesses go toward debt financing when they want to purchase a plant, machinery, land, product research. In personal finance, bank loans are usually dedicated to real estate purchases, car purchases, etc. An interest percentage is paid to the bank until the loan is repaid. Depletion is another way the cost of business assets can be established. It refers to the allocation of the cost of natural resources over time. For example, an oil well has a finite life before all of the oil is pumped out. Therefore, the oil well&#8217;s setup costs are spread out over the predicted life of the well.</p> <h2>Amortize</h2> <p>Consider the following examples to better understand the calculation of amortization through the formula shown in the previous section. Learn accounting fundamentals and how to read financial statements with CFI’s free online accounting classes. Annual Percentage Rate is the interest charged for borrowing that represents the actual yearly cost of the loan, expressed as a percentage. Simple interest is a quick method of calculating the interest charge on a loan. The offers that appear in this table are from partnerships from which Investopedia receives compensation.</p> <p>Amortization and depreciation are two methods of calculating the value for business assets over time. The rate at which amortization is charged to expense in the example would be increased if the auction date were to be held on an earlier date, since the useful life of the asset would then be reduced. The best way to understand amortization is by reviewing an amortization table.</p> <p>Your last loan payment will pay off the final amount remaining on your debt. For example, after exactly 30 years , you’ll pay off a 30-year mortgage. Amortization tables help you understand how a loan works and they can help you predict your outstanding balance or interest cost at any point in the future. Record amortization expenses on the income statement under a line item called “depreciation and amortization.” Debit the amortization expense to increase the asset account and reduce revenue. A cumulative amount of all the amortization expenses made for an intangible asset is called accumulated amortization.</p> <p><img 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fvl/ro+FrV+c6T98v9dcNqbF2jMkRpZqVJATv30MjKRg4wAQfPHr8vZ56X1nTfa1PWUlTRVdLSxdy0dZC9PJIGZiuGTwjDIFbB8m7w5A2DPG3fQXwtavznSfvl/ro+FrV+c6T98v9dcBprF2uiZmq57S0ZEe1Y6CcFTvXfkk+IbN+BxzjnGp03TnWxrKmopap1gleEwwvSMe6Vdm8Z9e7En6sroO4fC1q/OdJ++X+uj4WtX5zpP3y/11wWrsfao9TG1D8HxQ7R3olppXJIk524A25Q+vOCuOc7h+qnp7tLFwkmt9TTilYQIIqikkcjaR3rggDBZSwC8gFVOeSNB3j4WtX5zpP3y/10fC1q/OdJ++X+uuHx2Lr/4KpEqngkuUe/0iSGkkhhdudjBCXbA4yueefEMDUVbB2qjv5DVUDM6KsMZoJdkbBxuYnOWyhYY45C+WToO9fC1q/OdJ++X+uj4WtX5zpP3y/wBdcJSydphliSRaNYCG75hBI0nKtgL4QPC20ZPmATx5a/KdO9psdXuFwpWpWnZzHJbpGkSNgx2BwQDtYqoJX4oyckYId4+FrV+c6T98v9dHwtavznSfvl/rr57n6d7Yqqiqab0y20sslJURxzQ0UrMkzRsInG7gBXKEgqc4Pl5HbT9O9q0dwMklVRNRMsSiFqSVnjAQ7vHgb2LkeIgDao8IOdB3/wCFrV+c6T98v9dHwtavznSfvl/rrh1PYu0FluSXCWACaNVoDT0UivCwDB2dmJDbjtYAKNuSp343NqWw9pZmQmSljgRl8ApZHd1ycgsR5gEDOOSpPhDbVDu3wtavznSfvl/ro+FrV+c6T98v9dcBSydrgpFWQWtqou+5xTzCIJgbAF25JzkE7gOM45wNMvSfawKmCqgvsPCss0Elucxtl5W3KR4gRmBRz8USZySpAfQnwtavznSfvl/ro+FrV+c6T98v9dcINj7TlWQK1C0hjdY3allChsMUYp5+ZUEbudpYEZ2CInTHazTVImiudLVRMIw0U9DIpGIlD4ZfW0gJHHhDHO/whQ+gvha1fnOk/fL/AF0fC1q/OdJ++X+uuCix9qzTsGktixKp2stBMSzb3xkFuBs7vjJOS3OADphFZOs2pFSs8NQ9Lsd4aVtqVHHjUMOVBycE/wCPAdq+FrV+c6T98v8AXR8LWr850n75f664PUWHtNY/9HJSQx/e8RvSyyuvkWzJgbh+SPCDgZzlsJ+orH2m94Hnei2r3o2LSSbXDSDuyeMgqgOcHDFsYXGSHdvha1fnOk/fL/XR8LWr850n75f664VaOn+0OCGL4YeKpqDE3eyRQSJGsneMRtj28rtKrktkbPXnIjiw9q0VTA6SUMkD1KNURyUspZIiw3qjAAEhdwGVGTgnHOg778LWr850n75f66Phe1fnOk/fL/XXzpb+lu2ilijSoutvmKRbcy0UrlnMmWZiAucKAFAAxk5zwdNaew9ood1uklLLCYgqej0EqOJu8BV+SQFC5BHOSN2QDsUO7fC1q/OdJ++X+uj4WtX5zpP3y/1188ydL9sNOEio7vQ1CLIGElTbZQ4XYdynacMN5wvkVVRkuSTrdL032ty3CF0uVDFQ99C80Qt0hlKKyb1R84AYB+CpI3Y3HhgH0B8LWr850n75f66Pha1fnOk/fL/XXAbZ072pUoMVdUU1VGyqqn0aQSRtghmLYAYEhSF2rjeRkhPGV9g7WjUCW3VNu7pVI7qWgly3I9YPBwDzjzPkfLQd++FrV+c6T98v9dHwtavznSfvl/rr5/p+ne1f0pKieppAkiU5niFPIyq6xffO78IIBl55Jyp/JI1ttdi7WYxD8MT2uY98hl7i3zIO6B8agFj4iPI5wCOQ27whYu0eaGo64pZoJUkjajXDIwIPMnrGjSKvp6mlr7NBVo6SrQcq6lSvjlwCD9GjUJdkpKqmpqChWoqIojMkccQdwu99mdq58zgE4HqB1+D1BYQoc3u37SocH0lMbTtwfPy8ac//ACHtGtclotl8sMFtvFDDWUkkURkgmXcj4AI3KeCMgHB9ml9b2cdCXKGSnuHStvqY5pe/kEsQbfJnO458znJyfadA6jutrmBaG5UrgZyVmU4woY+v2Mp/UwPr1oHUXT5LAX23kpnd/wBUnGASc8+wE/UdRz0b0saapoxYqRYKxZEqI1TCyo+S6MB5qxZiVPBLEkZOl0XZZ2e07s1P0lb4g6urrHHtV9xBJYDgnI4J8sn26B4b7ZAAxvNCAQGB9ITyIYg+flhHP/1b2HU7SA9A9FNLHO3TFuMkNPFSo3cDKwxnMcf/AOqkAgeQIB8xp7HGkUaxRKFRAFVR5ADyGg/Mf40p/wBjL/immeT8k6WR/jWn/Yy/4ppnzoIdqSCOlYUtW1XG000neGUSctIzFc5PCk7QPUAB6tTMn5J0t6ee3vbmNriljgFRUKRK5djIJn3tksSQzbmBzyCNMudAZPyToyfknRzo50Easudvtwja4VsFKJn7uMzSqm98E7Rk8nAJwPUDqBdr109JZ5zV3+hpqWpVqb0hqtEUM6kABtw8XnjBB440t7QqnpWnorcnVlBPVwzVbx00cRI+/ejTZzhl4MYkUZ43MvkcEVq6VfZfRWNJrj0rVtQCtjp4IFgaXNSGmVAqK52sArjnBCui+sKAZw9N26lktcdR13JI9PN3cavOi+lyusTbWUMAzbUV1AAwzbsEcatdytJuNXQ1XpUsIo2diqH8JuXGM54wcH3jyJzXaQdI19so6mmtdb6HTjuqdBUsIipeLJwJdj4LAc5PgdAM+E3MZxoKo3RNTLcoLrL1FWxyxStM0dNmOJ2JcnK7icZfyz5bh68iPNZrYtVURP1VTQSinEEtPGyoseBBzs35XJCAg/kui+wm586olXW9CjqC/Ry22qa4RlfT3WRlEx7umC7fvgyMNEBgAKyv5FssFq6fgp6W1xwUlwNfGsk2J+8D7iZGJBIJ5Ukr9WmOT8k6WdNTWyos8UlmhaGk7yZURjyCJWDes48Qbj1eWBjAZ86AyfknUO70LXS11VuWVoTURNGJMbtpI8yMjI9ozyONTOdHOg551dbumrxSVAre0w2iCkkanknprlHDJE4YkxySM/nkkEcHAA9XM34AtrVtE561keWBIWjRqhS1QqiLa8ni8bMEBLcZYoccYKK4zdlV1uF7ep6ZluE9NWzrcpXlUIssaIsrM0kqqqrGEyMjCjOMaZio6DoblbKMdPVsFQqQeh7gYxCMQiOMbnGxgCAI8bsRyAA85C1Wm1pQ11XVpW98agKDGoAWPDyHIGTyd/J9bbj68Btk/JOqx0jW9M1lZc16fo5oJYKiaOqMmcNItVULIQCx85UlO7AzkcnBC2fnQGT8k6Mn5J0c6OdAZPyTpJeqehe60FXWXoUTRAxpCZhGZi8sW0fGGQXVVwB4iyjOCQzvnSK9VViivluguUEklW0Upp2DeBBvjDZG4AnkEcE4R8esEK49lsVdPCKDrmnEtRTU6RQJULJGymF1Ro0MhIV0O4AHB2bhk7ibFabZbYb5WXKir4ZKiaMJVwwkY3943jK7jtOQy8YyVbduIGKlUdTdmQq5IVtFXPLVU1LPJJDExDqYG7nxhuW7ssoIPPlkleLD091F0feupK+ltJc3egEtJUd4rhtkUoViCThgXx4hny5weNBasn5J0ZPyTo50c6AyfknVC6t6ZtN4vE8tR2gVVmmYK5hpa1InQIgLHDE8bQrcjAwD623X3nXPup+pegbH1Saq8WytlulPJEvpEas6xnZlT8fCKEZiSQBgOTnB0Eio6Wts4paefrJl9Ho2plRZI/viYkUuQxIYqSwBIOAHByTuDG00Fuh6vuNZF1LFVVroRLb0lUmBCIiCU3EqcBeQACGXPkNV+53Hs5ipLeLta670apt3fQTPM8iLShHOTIshHIxzk7i8fJI8Liy3Toqt65ucFqomW+xRYq6kxkd5GvdqPETyPCuOPyc+TAsFwyfknRk/JOjnRzoDJ+SdQ7herTaSgulzpKMyglPSJ0j3AFQSNxGcFlH/ANh7RqZzqldpNx6FoxQRdbW2WuRlmlhiRGkG1TGJCYww34Dg4wx27uMZyDe8XCxX+yV9sp+pKKL0qN6Tv46lG7qRkBHkw5wytjIyCPbpZ8BW/wCF6Wubq+TdDNhKYTqEkYzs4BXdy5YMpPrK+QxjS30voKS007RdOV8lPBKksMSE94JDC7K4HeZLgI6g53Bhke3W+a49AR3ugFXb6iOtMwFJJKWwJGqgiqDvx8c5C+peMD4ugrXaX/33S/8Ahp/r0aO0v/vul/8ACT/Xo0Fwu1ovl3tVnWx9RSWh6aRJ52SISd/H3EiiIg+re8bH1+DAIJyFlL032kQ3Bqmp7QEnp3hVBD6BEuxwwIYnb4ht3BgApYngqAALZbvxfS/sU/yjUnQUS+9I9o1bDDPY+0YUFwiWJDNJQ97FIFM27dDuEeWEkIJxkd1wRnj81HS3arPb2hHaXBHU4jKSpa4wAyspORjkEAgjjlvWPCb7o0Cfpu39QW+CdOoL4lykkl3xskAiEakcrgerOcZJwPX6g40aNBrj/GtP+xl/xTTP69LI/wAaU/7GX/FNMvD7P5aCJaaqvrKRprjb2oZu+mQQs6ue7WRljbK5HiQK2PVux6tTPr1EtqV0dNsubxSTh38USnBXcdvmPPbjPqzx9OpXh9n8tBn69H16x4fZ/LR4fZ/LQJeq7rfrTTUklhsxuLzTtHMoyTFGIZGDgDGfGqDGRndjOSNKau+9fw2/02l6VpKipZ0QU7TNGYgXkEhLYbeFAh8sbgXKg4Clt1TSdT1dNSr0rcaejnSdnnadMq8fdSALjax/CGMnGDgHn1H8UlD1QtO8NddIZZdyyLPGoTJErMU2bDtQpsTzZgMnOcNoFq9S9btNTxf8luiPJiaR5RlI9sJDhVJGWZ5V27vDsBY4yTcB5eeqo1t6/FdTyR3yh9FheZZY3jy06MqLGxIQbWUqz4GQdxTOMMLUNuPL+Wgz9eqzUX7qiO6XOki6dZqamOKSowSJ/BCSfqLy/r2gA5B1ZfD7P5arVRQdbtdLjNT3ekWhkI9BiKgNGAsWd57s5yyzDz4DA8kgIDqz1NfWUCVFyo/RagvIGiznaA7BTn6VAP16mfXqFaILhT0CRXapWpqg8haVVABUuxUYAGMKVHl6vM+ZmeH2fy0Gfr0fXrHh9n8tHh9n8tBTpuo+uTcqujj6TMUENY0EVQR3qvD4dswAZcjDHK8EFW88DdKqL11fTXKKlh6cWtpwyJNNFmLBPdb3XeeVXdKfWWIQAEb2WFW2ftNeqrzQ9UUKUstdHNSq8K97HTB4meHcItoJUTKGKuQGXkkFiwprf1tHR061d3oqiqiECSskZiWYKsYkkI2thmPfMFAwPvY9TFgYWquu1VX1kNfRCKni29xIEZTJ4n3Zz7MKPpwW4DKNNfr0ut8N3SsmkuE0LQMirEiHOGDPlvijGV2HGTzkDgZZh4fZ/LQZ+vR9eseH2fy0eH2fy0Gfr0suFddqe50lNRW30mnmRzNJu292Q8YHPl8VnOPMkDyAYhl4fZ/LSy50l5qK6ka23BaWlTxVA2qzOQ6EKAUPDKHVjkEA8YJ3KCuuv3WMBpxR9IrKZKFp5R6SMR1Ajdu5zjnLBVDeXPq1Otd2vFdeK2krLLNR0kH/AKeWQD78uRhwQSOfF4TtZcDIOTtVm1doUVwhlh6gpZqSGliieKoVd08wXxSEpEuzLAcDI5YjbwAxs9D1RBebjV3i6wz2+dgaOlRATTjC5BYIpbkMcnPxgPyckHv16Pr1jw+z+Wjw+z+Wgz9eqreuoOsaC7y0tq6Qa5UiKCsqTLGTlM+bkA4YEEDnBGM8gWnw+z+WqrfrZ15U3OSaxXympaEqFWFgu/JXDMGMLhdpwwBDAkEHgjaH7qLt1YkK1UFsjKLDulX0V2dn2ynKrvBwdkXhPI34JyDiZbrr1DU3ueirrH6NRIZu7n35yFMYj/XvDO30YAPIOoHwd2gmOlU3u2q8cDCdhCxEkxV9pAxwoJQHkFsZ8OCrMqSj6ijv89VV3SKS1MriGm7sb1Y91glgo4G2XA/+eSW4Cg5+vR9eseH2fy0eH2fy0Gfr1Xurrz1RaPRf+Wum/hdpg/eL3oj2sCm0FjwoYF/FzggZGCSLB4fZ/LVe6ut3V9wFKvSN9gtbLvE7zQrKCCV2kKVOSMH8pRgkeZDKEWW/9XKST0uUYyleAZTFH3eSSQQHIfBwp5UYGWOBsW/dWm6UtGemc0sjsJ6kMQIx3xUAA8nCYJbyJORwNZktvW1Rbmh+G6ekq5VkzLCgkERMTBNu+PDESMGyV5Eagg5bO2Oi6yNVBJNcaRYklk71E5DR9+rJ5x53CEMp5ALHIxoKB2l/990v/hJ/r0aO0v8A76pcf/hJ/r0aDpNu/F9L+xT/ACjUnUa3fi+l/Yp/lGpOgNGjRoDRo0aDXH+Naf8AYy/4ppppXH+Naf8AYy/4ppnz7R7tAs6bp7fSWtaa2T1E0Ec0w31G7vC/eNvzuAJ8e7n/AB000tsNxprrbxWUdNJTxtLKpjkTawYSMGyAeDuzn15znnTHn2j3aDOjWOfaPdo59o92grHXlD03X0tuTqS7T0MaVbtT9ywBml9HmBjI2tu+9mQ4HmVH6imr7B0JPaayF+p6mCkpDHUVdRHUKACGlxlypU5LSZXnkA4HBLjr+49OW2hoZOprU1fBJVOkSogbu3FPMzPjIJAjWTyyRnOOMiPS3/p6tttVWQ2iSOPbG09PMVhYRmRgXZCwC7CGLE4I2sPMY0EQ2zpCSCjgo79c6SWmnaYGCLbUTnEQbeDEWZNrQZwACMFieTq9jy1S7eejL1FQVEXS8UqWsCoo2McT+iNmJ1KYc7GJfzX5pwTwAboM48x7tBnVIq7X0c17vlTPfqr0qY/9dBuVlhISm4UbCRlVg4yd24+ZHhu3PtHu1Rqy8dHR3+9U81jdq2nIFZPhQJT3dO2Ad3O1HiYj8nbngsNwWfpyC3U1pjhtVW9TTCSYrK5BJJlYtyAM4YkZ9eOSfMs9LOnZ6KqtMc1tozSU5kmCwsoBBErBjgE4ywJx5884PGmXPtHu0GdGsc+0e7Rz7R7tBzK6WDszcdQz3jqyoaFp6mquJeoVEpsFd6BlQbQjLnz3fGBJXK6Yf8u9F26otVJLeLlLUQRQd1HIWqJZVi9HQNKCjNkgQBi2OW3cNhgrvHWXQ9jq78D0Jc6isWseKtSjo0d6l9sTGUMH2YKiE7iwI2gEBlIDdb70Uq2umWx9zHTpF6JDJCITS7ViYIsbEYZO9iQKgJBfYvk4UGvTlHYI+oLrXWi51k888UaT08gPcxBaipO5MqPjSvOD4iPCMYAGrNqudL9SUN6rrhQ0douFG9CzrI9VGAsm2qqYfAQxJGadnHqCSR+Ryq2Ln2j3aDOjWOfaPdo59o92gzpFeKSzT3uglr7jJBVxxP3EYKhXXvYsk5U87+5xyDny9ennPtHu0jvdZa6e726KstT1lXKG7goqsY17yNXfBYcLvUk+eMgZLbSFZr7L0P3sJresqpRFbqckCeJUkp0jn7qVsJjkCZgwxnYR5Dbpz0pb+m6W7XWqtN8luFTUVVQZUmZGMDCY96iEIG2CTK4JYAoQMEHSevquhEj9IreiMtLS06VMZo4mMURhkMayAMVYKveoNpfB3AerLbpOrsFfdrtPaelpqCeKqlgmuEtPGorWUpudJAxaRSO78R44x5qwAWzRrHPtHu0c+0e7QZ1RL5B0HTdVm7Xrqd6OvjkUmGSoWOIHu1XByvPDI3JODg8DOb1z7R7tc4666j6ItF5mhvfRVXeqwCJ39HpEqDjHg4LcHkgDz5PGGBIbqyzdBeiQQVF4r0p4qBUhxvIWAJUKuTsOWCvMvi5yF43YzYLTbemaHqCsejrRNdJJJ3lWSUPJGG7hnQesKA0GFzgBlx56RSdTdF5oYBa5svS9+MNs9Hj2Sgb23jggSkEZ4LN5HJaWi5dNVnVtXDQWRI7lGskc1cIo8sEWnyhYMW8mh4Ix4COCpGgtejWOfaPdo59o92gzqndoFo6Uuz0MfU1/qbbtSVYhBOIi4Z4gWLbSy7X7rDArgsAc5xq4c+0e7VK7Srl0nbYre3VXSst8Ds4p4oqVKhlfKAgIzA8g+eMcYJyVDBHgougVtzQxXyokp59qMoYlmYQso2qFyCUZlwo8wFGCNuv3DbOh3vNHNFfq1qunkbuoDMx8Yq2DMylc8zbkyeDjjyBGmW6dA90KR7Opi3gnHhUZh3h2ywI+9sGyRkByeDuxLq7700OpaGiqenqv00ysIKnutqRk1BU87gQGZQ5GOQynncNBU+0v/vul/wDCT/Xo0dpf/fdL/wCEn+vRoOk278X0v7FP8o1J1Gt34vpf2Kf5RqToDRo0aA0aNGg1x/jWn/Yy/wCKaZ4H0+/SyP8AGtP+xl/xTUm6wVdXa6ykoK1qOqmp5I4agJuMMhUhXwfPBwcfRoPxaJLpNR77zTRQVPeONkT7l2BiFPmfNcH+nkJuB9Pv1Cs9NWUdCtPX1xrJw8jNMVxuBdiOPVgEDHkMYHGpuR9Pu0BgfT79GB9Pv0ZH0+7RkfT7tAl6pq+qKOnpW6VtUFdNJOyTiaQKI4+6kKvyy5++CMEDJwTx69LHuXaKbbJKnT1EtcWQwxGQMmzc5fee8GDtCAYJyx+TkrP6vtl4utJSxWa/m1NHM7TuMgyRmCVNoI8iGZXB9RQHBxgqqvprqeaKWGk65khRnjbwhsoRNUMwDFiw3CSJeSQO4AwVJXQT0rety0KvZ6VSWZpSGBUIEjwAe8zuLtIBwRhcnBwrWQAY9fv1Uo7D1BHRUdL/AM4uzJKstW5Lbp3DR4CksTGnh8SDIbvGA2Agi2gjHr92gMD6ffquT13WwudxhgslMaKLHoMxkBMvhiyWHeAjBM3qGQo8vyrHkfT7tVaps3UL3S61CdUbKWq/AQZYGmGyANgg8Z2P9K94SD4iNA9tElymoEku9MlPVF5A0aNlQodguCCc5XafP1+Q8hMwPp9+oVmp6ukt6U9dXGsmV5C02D4gXYgfUCB9WpuR9Pu0BgfT79GB9Pv0ZH0+7RkfT7tBRrnee1eOS4LaekKGVYqqSOjaWoQd9AACsh++8Z5GDg55wBpmLh1w8lK6WGnSKRENQkki74m2xlwCJCDyZFH6s+QG+ND07fvhmrqrn1pNJStVvNSQws0TQISpWNgG2vggjkYKnBGfFrdcLFeaq8JWRdTy09MJ0eWmEz4kQd0Ng2ldmdueM8sQchiNA3t8t8krqhLlSwR0qqDA6N4mbfJkMNx/IER/WW+jTLA+n36UWmiuNPX1dTXXr01ZgBHGF2rEoklIAXJGQGClvNtg8sct8j6fdoDA+n36MD6ffoyPp92jI+n3aAwPp9+ltxnvkdwpYrdRRy0jqxqJWYZRg6YA8Q817z1HB2/SNMsj6fdpXcKO41F1o6mkuxpoYopFkh2k95l4znHl+SRn1BiB8bIBH8K9pTVQROl6FYBBG296kbjKYwXUgP4cOWUAbhhc7ueHVHL1Eb1UQ11NT/Bhi3wSoNsivvx3b+Nt3hG7cABzjgjVeqOn+rGrhLL17vXuY42g29wDiIqzDachi+ZAefPBBCjVmpaSoS6zV09e0itEqJCHbCHcScrnaccAHaG88k8YBjgfT79GB9Pv0ZH0+7RkfT7tAYH0+/VauNb10L+KK12ikFsYgemykOUyg52CVWOGz6hx5Z1Zcj6fdqm9R9N9WXO7S1Fo62a20zFHFOEZiCoXg4YYQlckDDEMw3LkFQm3es67gmWOzWigqoxBlpJJCmZgH4A38KfvePP8oE+sbrbXdXT9SXGkudjgp7LEcUVUswMk2Fi5ZQxwCxlxwDhRn2lVV9N9TVENIqdaywRx0fcSlHIaoba+JN5+KwB+MAc/G4KqA1oLbfIupqq5VV/EtBJGVS3gEiNz3fjyfLhfi+osTnxcA/wPp9+jA+n36Mj6fdoyPp92gMD6ffqu9W1/WVB6L/ylYoblvD9/3sirswybfjSL5qZPLPIHl67FkfT7tVzq+09R3R6I9PdUJZzEW7zfAZBISyFTtDLnG1hgnBDn14ICOly7QGo3D9PUiViKAuJQ0Ujd22SPvgIHebBg84z+sbpK/roXalgjsNJ6C7kVExmGUXviBgb857rBPHxj9WoFT071CaaSnTrKaDdMGZu/YuiCIr3YYjIyPyjyDmTk7Qsg2bqF7rS1EvWRamhnlkNOq7DKrVTOqsQeQqFYsf8Aw5zuI0FK7S/++qX/AMJP9ejTrrvpp6++C+irCLTwJF3RTJbz5zn/AOf8tGgt9u/F9L+xT/KNSdRrd+L6X9in+Uak6A0aNGgNGjRoNcf41p/2Mv8Aimtt9a2pZLg17CfBwpZTV7lLDudh35UA5G3PGDrVH+Naf9jL/imt97njpbLX1M1vevjipZXakRA7TgISYwp4Jbyx686DVYIbZTW8w2dcUy1FQSCpUiQzOZOCAfjltMefYPfqBY5o56EtFbhQok00awhQBhZWUMAAPjAbvo3YPOmGgxz7B79HPsHv1nRoKn2hUnS9XQ28dVXKeihjq3kp3hGS0op5uD4G4CGRseRKAHIJVlk/TfQl6tk1BUV9VW0cU0UmwguY5FkliQo2zd6ni4Jyq4OdzFnPXVxo7bR0MlX0qL6ZKl1ijMIcQyCnlZXOVbaCV7vd6hISTgHSqe801Faas03Z9BLSzFVhpou7QVheWUOrI6KFZVRXIf5zaCW4IaY7d0bXU9ueDqG4TUkVQ60yCFZFEoC7huMJaM7cjIZThn5ySddAGceQ9+qOlzSsiprgnZ/QtIkwEglISWFC8B7xN0Xi5Ibb4WJhAALDAvA8tAc+we/VErLd0U/UF9nmvFWK52X06NV3LB97ptgX72ceUTjklizZ3BQEvmqZVXe3LerzTt0Qkk1McGqaAYqyUpyPFsOfjgNkkgQqcEfFB/01FbIbPFHZZGko+8mKOwIJJlYt5gZ8Rbn1+eTnJZ8+we/S+wVEVVa0nhtnwerSTf8ATlNhUiRgSRgcsQW/+3mfMsdBjn2D36OfYPfrOjQcsu1p7LJqu/R1t6rYmuFcYLhTQ94gM8pjhMaKke7xllBC53GRmOck6YCzdCUrW2Y3q5oWFPHQvI8jHZshEYDshY+BV8RO7LOxO9Qy6K+42GtrLtbW7K6SoIr3jlNbSJGlXMGT78S0ZDgrh943EhMDL4TTa43w01wpqSo6Jp6sqBG80LiUQOe5ZoxmMHzY4OAhMaAsrNhQY9N0dmpLlcTb7pWVlVIxeoFSxYpmabhSVHhDB0CgkKsYAA5JsXPsHv0i6fr5qqvroJumhazESBJlSagCaZFbgDgqiOCfnSPNTp9oMc+we/Rz7B79Z0aDHPsHv0hvtNYJ7vbmu8j9/GC1PCEJVyJYSHJCk5R9hHIA3FiPCCr/AElutXSw3qhgmsRq2kilZakRb2hw8Y2+RwCGLE5HxAOSw0Far6vs1MMVkmuYpClFTLCkcbRNFCFbudvg8JAkbA8xu8gcaY9LdP8ASdo6gutTYqieSvqZJGr8uzRmZnDuTxsDZYcDy5wB4tKKzqK00NSGj7K6uSNKFKjvVt678dySsSoqltw2hNpxt2tkAbN9g6euFrm6gu9Hbel3t5RwZ600fcCrcH42do3jxHa2SDzoLJz7B79HPsHv1nRoMc+we/XPuqrd2eVHU71XUFyq1uKxECGISBVUReJgI05Ow8kk8DB4GNdC1TLnXWh+r/g2s6DFZNvRhcPQ1kAKoHVi5XjBGB4s5Xy8sgtuVs6FiSjluXUNbHLJTpsqHiUSVEcffMhY91g4aSWTyGWweQQC0sdF0zD1ncJqG8VE917tmmppY1VURxD4lbuwzDCR87iMsx5JJ1Erb7SUsFGtP0BDWd7Qq0Swqvdx7FfbESyDu1AC7dwXws/hBUqXFBehWdXVdsPTEsHokJEdzdBiZcRHYpxkcscgkfEBAIPAWPn2D36OfYPfrOjQY59g9+qf2gWHpHqF7fQ9VPV5++tBFTLIWmUFC6kxqWxwh2gjJAPJUEXHVb6prYaW6WiIdMQ3OrlaQ0tRNG2ymcNHx3ixuYy2cg4A+98kcaBPnoC40JahvM0VHE7BlpC8YQGBgEBC7o1CK5AUqN24esqZ3f8AS9RX0qvfKmSrp6p3gypDJmp7po8hB4O8XuznzxyTkkxaa/rPQrUU/Q8MLyMFeKbMYUGFmJJERyARtJxja4IJ3bdSJL2Phqjgq+hW9J751WqCK6wr6Q0SuH25yygSEDBAcZ9ZAbuqvwFT+qP/AE6NHVX4Cp/VH/p0aBjbvxfS/sU/yjUnUa3fi+l/Yp/lGpOgNGjRoDRo0aDXH+NKf9jL/imt93NxFprTZe5NwFPIaQT5MZm2nZuwQdu7GeRxrRH+Naf9jL/imt96pnrbPXUaV8lA09NLGKpG2tAWUjvAcjBXOfMeXnoC1tcWpSbuIFqO9l4gYlBH3jd3yeSdm3J45zwPLUvw+3+eoVliaGi7t7obiVllBnJBOe8bKHBPKnK//X1eWp31aDHh9v8APR4fb/PWfq0fVoEXVk/VMFNSN0nSQVMzTsKlZWUbYe5kOV3MBu3iMAesnnaMsq+vqe0QU9XDb6K3mrQwtTzPgwOpmfvF294HBWLuzuPmxOANTusKdZqWjkl6qFiignd5JTL3YmXuJRs3b1xjPeev8FnHrCqez+n2yopaPtEnXuyrS1KVRLQIsspXBWQYJJKMWJBEWMAjICQ1Z17so1jtUPeCcellpI9hh8P4Px5DbuDkfE3sMsFja1jbjz/nqlR0kVPV2xq7tKDN3ksYh9JEYrGPdAKB3hJKsqHAzzI4wA+NXYeXloMeH2/z1WKmr65W63OOnt1O1AhxQvvTfJ4ISSQXGOTMq59Y5AUKWtH1aqVXbZjd7vUt153McuSKUyYFEFSnLeUgx5BjkDAnGMbjuCwWhrk9AjXlYkq98m9Yz4Qu9tmOT+Tt/oPLUzw+3+eoNjgamtqQtczcSskuagtuLZkY4Jyfi/F8/wAnyHkJ/wBWgx4fb/PR4fb/AD1n6tH1aCpNVdoaVt2DUNG9LDKxt7RbQ88XgIUhpMLJzIASdp2gnbuwMms69MlI0duhaPu4vSg4jjYyfe9+wCVwqnLcEsQA+CxCB19XbBFcK16rtQ7h1uDVyQGpKCCDwB4HUzcrkcHw7d5wPIaY19oqI7nSyp1q9HGCgjpJJWbvYgYkAJaQFmLYG7nJlAIJPiBzbprpJV1C11M8cC/gXdky3jceSsfUFPP5JX8rcFY+H2/z0mskSfCVbVRdS/CKPEkXo4kDLAUmqMtgMcElu7PA/AY9WA6+rQY8Pt/no8Pt/nrP1aPq0GPD7f56V3R78K6ljtCwejsrGoklGQuHj4A3AlipfHqGCSeArNfq0nu1G1XdKPF+ajCRuxpkkKtOA8Z3cMOFO0Hg/hMHg4IKaqs7RVaeWltlE9OIIWgjaRfSS5jber+Luwe82ZIYgKDjcT4Z/T03WctXWt1NTW2GkNTP6EKd2Mvcbl7rvckqHxuztJHl5agVlHFcY4Y6fr7uWkoAFeKp5kUxShZ1xIBg7g+cHPdDnGdTemra9vrrk0/VUl1lqKuao7ppSRTRs4CxKhdtoQq6g4HmR6tBYPD7f56PD7f56z9Wj6tBjw+3+eqxf5Ove/rV6ajoAIxC1I1X+DlY8OjbW3AD42/zxkBWODq0fVql9TWwXCvrKNe0RrTU1XdGlp46ko8LKBuO0SAuGXPGAPEDyedBsuFw7QozD8H2OOULRiSYNUxZacq57tWyPikKpYrhiQQAA2nlHJfHuMorIoY6IFwnILsfvZQjB4HMgIIzkcHGMoKqg7yCKVu0NYCKaF2kWoIR0UTOZAO94VgX5yTth+N4chtS2toeqqq5p1LUzJNB3bWx5t0cTju8yKufDxt4xjx54zyDzw+3+ejw+3+es/Vo+rQY8Pt/npRe36iFbQR2VYjTSGRayRiN0XlscZPiAOcrjkHhlIAZx9Wq91VHCKq31tZ1XHZ6SEyLPFJOYRUhigwGEibSMcHkgtxjyILTdO0SOjO/p3vaoeQhngCNiEnOWkG3L7Vxg7SC2WXAM1qnrlKqmV6CikpzVSLM0TgMIjUDu2wzeSwZ3EZLP5Ko840VKZ6OWpbr6OaKLbNNOkxVFXumYFisuFUqwc4IGFBGPPW026qNwoa1euyKaGomj7jIxO5nGYy2/krtMeMEgk4xyCB1V+AqceyP/To1nqr8BU/qj/06NAxt34vpf2Kf5RqTqNbvxfS/sU/yjUnQGjRo0Bo0aNBrj/GtP+xl/wAU1+upWtS9O3Rr6rG2iinNYFDE9xsPeYC+Inbny59mvzH+NKf9jL/imt16mnpLPXVVPQNcJYaaWRKQcekMFJEfkfjHjyPn5HQa+n6a30dtWltVM8FNDLKixueVYSMGxyeNwP6/PTHnUCy1lRX0Aqai3S0DmSRTA/mMOQG8h54z5ev1+ep+D8o6A50c6MH5R0YPyjoK31sOmu5tr9SxTOq1UnooiLAmU00wYEgjziMowTgkgevGlBvvQdmsslU0lZFbnnjQssUj7ZWd5EOVBZctk5JwS4zlmwX/AFTWSUSW94unGvDvUuqgJu9HPo8p7zOxtucd3nj8LjJzgpaq9VNK87x9m88zMkRBSJcyM8tRuB8HkrIrk8/+oDY9ofu01fRMFFDTWyefu5JDHHF3jljt7oscE5wF7vJPqJ9pzcxnGqPS36pk9Ajfs1qoFrZR3waEH0Z1aIxu+EwRvkbxAnbsLcjJW7gHHxjoM86pFV/yIt/vneip+ECUa4BTJgnbThDjy8u6wfoYHgHV3wflHVQqrhi8XanPQbzCFifSzT5FYWjgDEHuznwnack57kAZwdoPOmzajZ4vgQOKPfL3e8tnPeNu+NzjdnH0YxxpnzqBY5pKm2pNJbWt7NJKDTkYK4kYZ+KPjY3eWPFwT5mfg/KOgOdHOjB+UdGD8o6Dld7qOyO3G6y3SW4U/dXeeWpmWapVqeuEYkfZg7o9ybZAFAV9oZckA6cTXfs4c2oipHdRJA9DJTZSHu2RDHju8LsMbLhTwQOASF1J+Gqx624QDs/lYJcjTGYxkLUHC93UEmIbk5ILDdt2nzBB1su1zNFc46am6Amro5Zx3tUkC7UP3pt58GW8Sr5euNT5DKhP6bPTHwhch0/AYpe9Y1YEbohlM0pdgGABYvvYsPjAqckEHVg50ut8s09ZO72xaddiAT8h5CHkBUgoDhfMHJB7w445LHB+UdAc6OdGD8o6MH5R0Bzqu9RVPTNLerX8N96KyoWWKk2rIVYb4yynbx5lGwfUpbyQlbFg/KOk13qpoLnRRwWH052RyKgjAgG+MMN2w4yCSBkZKY+kAguadD0lMJ7rBVR09RbXi7sQsVFOkMgdNsY8BRBJwMbS5AxuILGwjpcdT3dra9Q12MjJWmaSRgHVYiQoY7VGx4DhQBhlPmTpfNfaukr5aC29nE8kMdpjmE3dCNHZUlK0oxGfigbQPUZcbR65fS12qq693Ohk6Hls0NI8kUNY0e1aqNZMKR4FwGyWAyfM/r0Fs50c6MH5R0YPyjoDnVF6qPQcdZc06ggqt0ppmrHSSRFiwV7ubcrDu1BUAyjAG0gsMavWD8o6qt5udXSVlz9E6LNe1PHHK0u0g1WBlVU92dzhwoAzgeZIxjQKLxD2dW97YbpT1SNHTiOg3JIrBWJxGFODu3KvhIyp2cADhj07bOio+rrpebFSVDXSqLw1lU0srRsYxCpQB2IXA7oAKAODjyOtFfeat1jqpOzaSrapgi77KKZFLCZWRgY+QqfTkiYjGThnFBdbhJ1PWWl+l5qWkVBItyyNk7BIeCNo58ZUcn8EfZoH/OjnRg/KOjB+UdAc6rnUz9Pw3mz1F1WqNevfihEEjp3n4NpIzghXztQ7DkttOAcHVjwflHVZ6xvFXZprfJSdH1F9d2bDQplqfDJznYQMgk+YOUGM+YBTHU9BGik+9zypPKiyiRMtLM0RVWfPxnYZTc2SzEA54wzNZ0zJWUKg1Es/fy9yy8hiKhEcMfJsSbDg5YYzwVOF7XJ3tkdS/ZkzsxaP0XuU3gdxhjhkA2lcR84zyMcYLKKqaiqqL0Povu1qKmWKWWGIK1PmQAyEbBkNncSDzg8keLQfnqr8BU/qj/06NY6q/AVP/wDX/p0aBlbvxfS/sU/yjUnUa3fi+l/Yp/lGpOgNGjRoDRo0aDXH+Naf9jL/AIpqTdVuD2ysS0SQpXtBIKVph4Fl2nYW+jdjOo0f40p/2Mv+Ka23uE1VorKYVa0fewunpDqGWLIxuIJAOPYTjQFnjukVFsvVRDNVd5IS8S7V2ljtGP1Y/wD9JPJncfRpX03TwUlojp6W5tco0klHpJlEhY942QWyckHKnnzB8vLTTJ+SdAcfRo4+jRk/JOjJ+SdAl6op+p6mClj6XroKR++f0mSQKT3ZgkC7dysMiUxN5chSPXqLFR9apTXBHu9M88nFCzQriId45y2ANx2Mg8gPBngsdb+q7RDeIqGOou7W+OGpd2wwHfgwSp3fJA/L3ev4nGD4glFrsktkrmq+r6R6KokVRVxzLH6PKZ3EYSTvCFO5wgHmWyPysaBpb6TrUWkxXO60jXDfuEsMIEfmhC4P5PEgPrw3BBxixjGPVqlU1utkdVRb+tKd4w7tGiVJSSZ9kS8MsviHCFkIKkyAkZK4ugJx8U6DPH0arU9P1w1zuZhrqNaGQ/8AQAY3xArCDuyhyQVmIOfy8EEYIsuT8k6plZZ6N71eKl+tFiaqPipGlXFMAlOvlvBGSqFs4BEqjAzlgs9oS5x0CLeZYpKvfJvaP4pXe2zHA/J2/wBT5mZx9Gl3T8MNLa44Ka4GvRZJv+o3h9xMjEgkE8qSV/8Ar6vLTHJ+SdAcfRo4+jRk/JOjJ+SdBSa+j7V5Bc5rddLRFKKpxbopDuiemLIVMn3rcjhQ64BYEsDxjBZVsHXU8lqmoqy30qrsNygP30NjaXWOQqDywIDFR4WY7Q23CO89HUFd8KQP11PTPcK2SZWFVtlpVIQPFE6yKww6qwzkLuK42tjUp7Lboa2Cnk64zWU6owWaaPvZEUQIrOAw3nKhtzA5eVfyQEIPbFD1RHVVj9Q1dHLC00voqwLjZF30pjDZAJbujEGOcZHA4LM54+jSKxW9KO6V05vhrZ5o0DU6lVSFO/qHRggPBIlKFvNu5BOTnT3J+SdAcfRo4+jRk/JOjJ+SdAcfRpZcI781ypXts9OlEIpFnV/jFyyFWHB8lDjGRnfn1DLPJ+SdI77TUUtyoqmtvnoAiUoIu/ERmLSxbedw43BVIA8RZRnGQwKpKPtNNxhjS7W4W6OhgiklCKKmap2yCWYqVKIMmIhATnDDK6n2GDriK+XOTqKvts9qeRzbkp4yksce7KiTOQzYJBIOMKvGSdJrj0tR1VSpl66moSKMUZipZkiALQsoK5YsOCWUEkjxHJJyHPTlDR2243GAdU1F0rZKiWomp5qlXNKJGVu7WMHKIpPh3ZOGAyQFACxcfRo4+jRk/JOjJ+SdAcfRqs3Si62muVVNbbvDBSgx+ix7Y2ByFD94GQkgHc2A67vi5TO4WbJ+SdUfquz2OrrrlUXLrp7T30MKBVrUhaldQ4LhmbKhllUFeB5HzOdBNqaDr51hNNfKeMimEUgaONvvu2X76PByeYuPCCVPAHBc0kV5W4TS1dRE1G7OY4to3R8RhQGA8QyJWOeQWA5AGqw9ktFJZaWiqeumVaSmlCTyVoVZIisnikAcBwo7zLE7iEyzFl3an2a00VH1ZW10fV1RXVMsbq9vepRhF4kJbYDkEcLnHClB6ssFq4+jRx9GjJ+SdGT8k6A4+jVf6oj60eeibpKW3rEu/wBKWqkKbvFGVwRG/G0Sg+WCynnGDYMn5J1Vut7PS3Vre9T1fUWAwO21oZ0jablGx4ztOCg9RPJHkWBDEVJ18KVY6i507S5Xc8QjU47plbGUIHiKSDg8gqTtOpMUPWyVkKPVW6SkDSvNI2VkOalGRFULjasHeLuLZLbSRycIobNaPRI417QwsEcggZ4KpEIbumQIG3nD43cnLYHnuG/Uk2a3i7UNa/W5B74tDTCoURz/APUByNu/xNukVWI4JZOAMLoJnVX4Cp/VH/p0ax1V+AqePVH/AKdGgZW78X0v7FP8o1J1Gt34vpf2Kf5RqToDRo0aA0aNGg1x/jWn/Yy/4prde0pXs9alfTvUU7QOJYY22tKuDlAcjk+XmPPWmP8AGtP+xl/xTUi7VE1Ja6uqp6dqiWKFnSJYy5dgOAFHJ/V/hoNdimo6i3ia300kEDSzEK45J7xtzeZ4ZssOfIjy8tT+dQbNUVlVRd7XUYpZe9lXu1BA2h2CkZAPIAPkPo4xqd9egOdHOj69H16Cs9eXbpq10VCOp6WephqqswwRwgktN3MrAEBhkFVZQDxuZf1hHP1L2bUNrqLzX070tDPcqPMsxIWeparPcOo3EsBIocEcbAuMhdosvVt1vVppqOSyWM3N56hopVAJ7mPuZG7zA8wGVQR5ndgZYgFfU33quAxiLpYzPJUpE7KmDBCZJgZSN2H4SHwq+774ScAaBL8JdmEdws6xUbGpqZmNtZZyoZ3jgdu7JkAYtHLGdoyWVWAB8j0cZxqqN1B1FGYI5enZZZGqe4qGipn2xKNn33xEbk37l8JY4KvghWGrWPLz0Bzqi1Vb0KOoL9HLbaprjGV9PZZGXvjspgm0d4AeGiUEAAMr+RPivX16q9Tfeoo7rdKSPpl2p6Y4pqjYxE/ghJ8h6t8n69gAOQcA16amtc9nikssTRUneTKiMckESsG9Zx4g3Hq8sDGAz51Cs9TW1lvSouFF6JOzyBofPaA7BT9YAP16m/XoDnRzo+vR9eg5neOt+zNKm6msoa2rmp62ahqjCGdmnAQPEoD55VE8AxkLnGDzKtt37L7lJbbZQ75ZpKKl9EjkaVJlp5DHLEuHYOAA8ZIPIHB8iNNBfOsJ7hcqT/liOmipKh1gnlVpUqoQFO9duCCQSMYJLKQOPHrZFf8AqeQRTy9NtSRnuO9haNpZI2cRb0yhwdjPICy7lwuQT5EJnTz2iStrmttrq6WTP355gQshEkqjALH5O4HAyjx+rAD7nSm0V9dVXCtpqqh7qODHdyiB4xJmSQYBYDOFVM44ycgkEabfXoDnRzo+vR9egOdIb3VWGK92+G5U8slW0MrU7Kx2qN8YYY3DLHII4Jwj+w5ffXpXc66601xpKegtYqopY3MkhJURkPGOTgj4rMceZIHkAxAU+trOhKGUJX9K18Ul0pIKo94njkCRkDcO83LJGq7WJwRxyQCQ76evfTN46juMVtpqlblbRJRVEk5OdqSnIwWJALHcCQNyspGQRqJUdT9XQVXcJ0dJJSLSxuKtEYh5TGSQIvjqu7w8+IYOQMrqwW+e6y3CoSohjWkC74XEDRsQWIAOWOSMNkYHBU+sgA050c6Pr0fXoDnXOuq37Orh1TLar107UXO8OEjCK+N42owVS0iqOGXjjdg+eDrov16qPUHUXV9vu8lJaOj3uFMvdkVCkDIO3IG4gFvj45C5C5YAkqCySXoWmkoYU6Zqy6Ux7iMOqCNSs4ePxShSw2yBsE8uOec6c2ebpp+rblT2ygqkuMBf0mYsxiywhZiBuIBbKjO0ZMTjOUOo1Z1D1ZTinFL0k1QstGs87d0UaKTa57spkhmwF4DEZBXd4lOmVvut9qeo6q31nTrU1BHFvirdwId8p4PPPkc5xg5x5o2gf86OdH16Pr0Bzql9pFf0FCLZQdd0wnjmkeWmVn2orKUQsfEucd8D68DLcbci6fXqv9V3jqG1SUQsfTzXRZmYTFSN0WGTHBIHKl8ZYDcFBwpZlBXVQdHPFLSzWSskNJUCRYwzb3mPeyiRW3+e4y4YkYbPIHOtUd+7PLbVW20yReiVNTM60VPNuVyRVxRhgC3CtKImX2qBgerUtOpOqDQ+k1PRc8cpUnK4kOzu2JbZkHJZY17skHxefGpcV56jevWnXpr/AKfPjnLlME1AQgAjnbGd+fJscaDT1V+Aqf1R/wCnRo6q/AVP6o/9OjQMbd+L6X9in+Uak6h26eAW+l+/R/gU/KHyRqR6RB89H9oaDZo1r9Ig+ej+0NHpEHz0f2hoNmjWv0iD56P7Q0ekQfPR/aGgI/xpT/sZf8U1JucddJbqlLU0UdY0TCB5R4Fkx4S3B4z58aT3G5+gzx1VMi1DpBMRGrDLnwnAyQMnHrOqv1F2hXHfW2Rulnqqd1aFpEZsSKRz+SR68aC+WaC5wUIjvVTFU1XeSsZI0AXYZGKDGB5IVXy9XmfPU3avyR7tcls3aHc7HQLbqPo+reJHkcGWZ3bLuXbJ2ZPLHU77rV8/9mS/bf8As0HTNq/JHu0bV+SPdrmf3Wr5/wCzJftv/Zo+61fP/Zkv23/s0Fz6npOp6mGjHStfSUkqVO6pNQm4PD3bjaPC3O8xnPGACefilZdrV2h1VuhitfUdBR1glTvZBTKytGpk3Y3I2CwaL1cbCATuzqi9U9X13VkFJT1/S9xgSjqDUD0adk7wmJ4yrZjOVKyNxx6tJqyqqLhBJTVtr6hmSeSOSbNZtMgSWolCkrCMDdUsPDg4jjGRg5DqgtvaKJKU/DtsKI7+kZg/CIe7K48PBUrJ68EORjOHW1hVx8Ue7XBprg05tbN01dVe1z9+pWfC1GdgKTJ3Wx1IjQfFByAwIfxa6H072gXK9VEsNVYvQFjQMHkZiGOcY5A0F22r8ke7VbqKDrdrpcZae60S0MhHoMRUboxtizvPdnOWWYeZwGB5JASZ8Oye2D/f16rc9ioJ7ncrm9fNvumO+j3oUXwwqdoIyARAgIzg855wQFwtEFwgoEiu9RHUVQeQtIigAqXYqAABjC7R5erzPmZm1fkj3ardoqVs1Alvp5lkRHkcNKQWJd2c5Ixnlj9PtyedTPh2T2wf7+vQONq/JHu0bV+SPdpP8Oye2D/f16Ph2T2wf7+vQLYrf2hQ3Otl+GLZPQyVu+liljw8dNhcoWWMeLO/BOcALktyTsrbb1y1ajW2+UcdNGVXbPCrtIo2As21Bhj4zwQPIY5ytZn6Lt9RV1VZJ1Bc91Xc0uUirPGF8MqS9wPB+CLRrkfGxkbsaZVljttZeVvslTItQHVyBICjBe742tnGe5jORhgV4IychabdDe0q6lrpNSvTNj0ZIlO5Rk53EgZJG08e0jHG5mO1fkj3aq9v9BtlXUV1JDTpNVKqyt8oBnYev2yOSfXnTD4dk9sH+/r0DjavyR7tG1fkj3aT/Dsntg/39ej4dk9sH+/r0DjavyR7tLLpSXuorKU2yvSlpVBNR4VLsQ6EABkIwVDqTkHB455Gr4dk9sH+/r0suKw3O4U1ymqdklLG8SqjAKVZkY5zk+caHII8v16DNVbu0Jrh6TRXu3R0zwxhqaSHcEkAG/awQHBKjGc/HY44UCZZaLq+C7Vk19ulFUW5zJ6LDDFh0DSblDttG7ap25GMgDIzljVZ+jLLNXCu+EKxCsEVNHEKndFFGiFAFVs+Y8855yfymywsVooen7zc73R19TLLdZXmljqKgyRxliGIjB5Rc5O0HGWb26C8bV+SPdo2r8ke7Sf4dk9sH+/r0fDsntg/39egcbV+SPdqsXi39ezXeSax3m3U9vMeEhnh3vv2gZyF4AI4yW8/Z4dT/h2T2wf7+vVWu/TNuvV5kvVTc6pHl2h4Y5UETKAqkYIJGQg8QIZSSVKk50Dy42/rhZIxZ7xRNFFT92TVoN80uG++NsjwPychcDz4HkWNBR3qKvnmuFxSalLv3ESxqCFbuyu4hQcqRIBg8hhnJ8qfJ0pZ3aj21k6R0VL6HHF3qsjRDeFDBgSSBIwznJB5J50yttFS2y81d8jqnlnqy5xK4Kx79m4LjBI+9pgMTjGFwMjQXLavyR7tG1fkj3aT/Dsntg/39ej4dk9sH+/r0DjavyR7tJupaXqidaU9K1tFTSJIxnFUm5HTadowFJ+NtzgjjPmcaz8Oye2D/f16r/VNppOrJaOWtuM9N6Fv2CmkVQzFkYM24HlWiUjGAeQwYEjQM6y2dbyloaS/U0Eb1Ik74wq0scJVg0agptyCVKkgnw+LOcamUtB1IhQVV3jcLVVDsREvigao3xJjYMFYsRZzzksSSM6qqdJWKO2yWkSu1O/kHkDlPvDQjaWBIwjDB88qCcnOf3UWSgSuhvK1VVJJQ5lip45lCOwkaXleMkseTnnAzzzoG/VWO4qcf/x/4ro1V+p7qtVOblNa6aOrSBY0aRVM0KvsZo9ysR5qM4JGR5nRoKxTf+mi/wD0X/DWzSy5SyRXCpiikZESZ1VVOAACcADUb0io+fk+0dA80aR+kVHz8n2jo9IqPn5PtHQPNGkfpFR8/J9o6PSKj5+T7R0DzRpH6RUfPyfaOj0io+fk+0dA80aR+kVHz8n2jo9IqPn5PtHQPNGkfpFR8/J9o6PSKj5+T7R0DzRpH6RUfPyfaOj0io+fk+0dA80aR+kVHz8n2jo9IqPn5PtHQPNGkfpFR8/J9o6PSKj5+T7R0DzRpH6RUfPyfaOj0io+fk+0dA80aR+kVHz8n2jo9IqPn5PtHQPNGkfpFR8/J9o6PSKj5+T7R0DzRpH6RUfPyfaOj0io+fk+0dA80aR+kVHz8n2jo9IqPn5PtHQPNGkfpFR8/J9o6PSKj5+T7R0DzRpH6RUfPyfaOj0io+fk+0dA80aR+kVHz8n2jo9IqPn5PtHQPNGkfpFR8/J9o6PSKj5+T7R0DzRpH6RUfPyfaOj0io+fk+0dA80aR+kVHz8n2jo9IqPn5PtHQPNGkfpFR8/J9o6PSKj5+T7R0DqUsInKfGCkj9eNedvTvbNfLnZ93U//ABE9XWO77JGlU9/MiyiXiMRJHjBj5Dd6PHlSiqA7ffHpFR8/J9o6PSKj5+T7R138FxlHCxVFVHNjh6fthj6xLnv2ar2GFWGH56w+XP8Ahz696ivnarLYl7Yrt11aG6ZasqjU000MdLWekxr3YEvLYXkOAMh8YBBANfWVkZqi5xQ1DGVG3ZVzuB8J9R0ax4viKeJuc9NPL+fwiP7L2bc2qeWZx/P5v//Z" alt="amortization definition" class="aligncenter" style="display: block;margin-left:auto;margin-right:auto;" width="359" height="218" /></p> <p>You can even automate the posting based on actual amortization schedules. With this, we move on to the next section which clears out if amortization can be considered as an asset on the balance sheet. With the negative amortization, you will owe the lender an amount much greater than $300,000. With partial type, you would have some outstanding balance which would be a bit less than the principal, $300,000. Here we shall look at the types of amortization from the homebuyer’s perspective. If you are an individual looking for various amortization techniques to help you on your way to repay the loan, these points shall help you.</p> <h2>Amortization Explained</h2> <p>A part of the payment covers the interest due on the loan, and the remainder of the payment goes toward reducing the principal amount owed. Interest is computed on the current amount owed and thus will become progressively smaller as the principal decreases. ABC Corporation spends $40,000 to acquire a taxi license that will expire and be put up for auction in five years. This is an intangible asset, and should be amortized over the five years prior to its expiration date.</p> <h2>Loan Amortization: Definition, Example, Calculation, How Does It Work?</h2> <p>In other words, the depreciated amount expensed in each year is a tax deduction for the company until the useful life of the asset has expired. Amortization is almost always calculated on a straight-line basis. Accelerated amortization methods make little sense, since it is difficult to prove that intangible assets are used more quickly in the early years of their useful lives. The accounting for amortization expense is a debit to the amortization expense account and a credit to the accumulated amortization account.</p> <h2>Amortization</h2> <p>While borrowers pay more each month with a 15-year loan, they’ll end up paying less overall than they would if paying the same loan over 30 years. You must use depreciation to allocate the cost of tangible items over time.</p> <h2>Amortization Calculator</h2> <p>It gets placed in the balance sheet as a contra asset under the list of the unamortized intangible. When these intangible assets get consumed completely or are eliminated, then their accumulated amortization amount is also deleted from the balance sheet. The IRS requires businesses to follow specific regulations in order to be able to deduct the costs of business assets (the IRS calls them &#8220;property&#8221;). When the principal balance hits the limit, payments are recalibrated so the loan amortizes on schedule. It’s important to note that the loan term and amortization schedule may not always be aligned.</p> <p>Negative amortization occurs when a scheduled payment isn’t enough to cover the interest due for that period. As a result, the borrower ends up paying interest on unpaid interest. Amortization, on the other hand, is used to expense out intangible assets.</p> <p>Most businesses file IRS Form 4562 Depreciation and Amortization to do the calculations for depreciation and amortization for the year. The information for all property depreciated and amortized is accumulated and totaled on this form. An amortized loan is one in which regularly scheduled payments are applied to both principal and interest. Most business and consumer loans—mortgages, car loans, student loans, and personal loans—follow an amortization schedule. In each period, the fixed rate of interest is deducted from the pre-scheduled installment. At the end of the amortization schedule, there is no amount due on the borrower. Sometimes it’s helpful to see the numbers instead of reading about the process.</p> <p>Similarly, depletion is associated with charging the cost of natural resources to expense over their usage period. First, amortization is used in the process of paying off debt through regular principal and interest payments over time. An amortization schedule is used to reduce the current balance on a loan—for example, a mortgage or a car loan—through installment payments. Another definition of amortization is the process used for paying off loans.</p> "

amortization definition

In general, to amortize is to write off the initial cost of a component or asset over a certain span of time. It also implies paying off or reducing the initial price through regular payments. The intangible assets have a finite useful life which is measured by obsolescence, expiry of contracts, or other factors. A company needs to assign value to these intangible assets that have a limited useful life. The scheduled payment is the payment the borrower is obliged to make under the note. The loan balance declines by the amount of the amortization, plus the amount of any extra payment. If such payment is less than the interest due, the balance rises, which is negative amortization.

In mortgages,the gradual payment of a loan,in full,by making regular payments over time of principal and interest so there is a $0 balance at the end of the term. In accounting, refers to the process of spreading expenses out over a period of time rather than taking the entire amount in the period the expense occurred. An amortization schedule is a table detailing each periodic payment on an amortizing loan. Each calculation done by the calculator will also come with an annual and monthly amortization schedule above. Each repayment for an amortized loan will contain both an interest payment and payment towards the principal balance, which varies for each pay period. An amortization schedule helps indicate the specific amount that will be paid towards each, along with the interest and principal paid to date, and the remaining principal balance after each pay period. Amortization is an accounting technique used to lower or expense out the value of an asset over time.

Likewise, you must use amortization to spread the cost of an intangible asset out in your books. The difference between amortization and depreciation is that depreciation is used on tangible assets. For example, vehicles, buildings, and equipment are tangible assets that you can depreciate.

The purchase of a house, or property, is one of the largest financial investments for many people and businesses. This mortgage is a kind of amortized amount in which the debt is reimbursed regularly. The amortization period refers to the duration of a mortgage payment by the borrower in years. In the course of a business, you may need to calculate amortization on intangible assets. In that case, you may use a formula similar to that of straight-line depreciation. These assets can contribute to the revenue growth of your business. An example of an intangible asset is when you buy a copyright for an artwork or a patent for an invention.

What Is The Difference Between Depreciation And Amortization?

The cost of long-term fixed assets such as computers and cars, over the lifetime of the use is reflected as amortization expenses. When the income statements showcase the amortization expense, the value of the intangible asset is reduced by the same amount. Amortization is a technique to calculate the progressive utilization of intangible assets in a company. Entries of amortization are made as a debit to amortization expense, whereas it is mentioned as a credit to the accumulated amortization account. The amortization period is defined as the total time taken by you to repay the loan in full. Mortgage lenders charge interest over the loan or the mortgage amounts and therefore, it implies that the longer the loan period more is the interest paid on it.

The loan schedule consists of a down payment and periodic payments of interest+principal. The borrower can extend the loan, but it can put you at the risk of paying more than the resale value of your vehicle. Amortization means paying off a loan with regular payments, so that the amount you owe goes down with each payment. Negative amortization means that even when you pay, the amortization definition amount you owe will still go up because you are not paying enough to cover the interest. Straight line basis is the simplest method of calculating depreciation and amortization, the process of expensing an asset over a specific period. Amortization is an accounting technique used to periodically lower the book value of a loan or intangible asset over a set period of time.

amortization definition

The loan amortization process includes fixed payments each pay period with varying interest, depending on the balance. Negative amortization for loans happens when the payments are smaller than the interest cost, so the loan balance increases. Generally, amortization refers to the paying off of debt over a period of time. Most often, these are setup as a way of leveling out your monthly payment. To do this, the payments cover both interest and principal each month.

Learn More About Amortization

Having a great accountant or loan officer with a solid understanding of the specific needs of the company or individual he or she works for makes the process of amortization a simple one. Amortization means something different when dealing with assets, specifically intangible assets, which are not physical, such as branding, intellectual property, and trademarks. In this setting, amortization is the periodic reduction in value over time, similar to depreciation of fixed assets. The total payment stays the same each month, while the portion going to principal increases and the portion going to interest decreases. In the final month, only $1.66 is paid in interest, because the outstanding loan balance at that point is very minimal compared with the starting loan balance.

In a conventional 15-year mortgage, the borrower pays a series of equal, amortized payments over the full 15-year term. The interest due for the period is calculated by applying the interest rate to the current loan balance. This amount is subtracted from the payment to determine the amount to be applied to the principal.

  • Depreciation can be calculated in one of several ways, but the most common is straight-line depreciation that deducts the same amount over each year.
  • The unpaid interest gets added to the amount you borrowed, and the amount you owe increases.
  • Janet Berry-Johnson is a CPA with 10 years of experience in public accounting and writes about income taxes and small business accounting.
  • The amortization rate can be calculated from the amortization schedule.

When used in the context of a home purchase, amortization is the process by which loan principal decreases over the life of a loan, typically an amortizing loan. As each mortgage payment is made, part of the payment is applied as interest on the loan, and the remainder of the payment is applied towards reducing the principal. An amortization schedule, a table detailing each periodic payment on a loan, shows the amounts of principal and interest and demonstrates how a loan’s principal amount decreases over time. An amortization schedule can be generated by an amortization calculator.

This information should not be considered complete, up to date, and is not intended to be used in place of a visit, consultation, or advice of a legal, medical, or any other professional. For example, if a 6% 30-year $100,000 loan closes on March 15, the borrower pays interest at closing for the period March 15-April 1, and the first payment of $599.56 is due May 1. On an ARM, the fully amortizing payment is constant only so long as the interest rate remains unchanged. For example, an ARM for $100,000 at 6% for 30 years would have a fully amortizing payment of $599.55 at the outset. But if the rate rose to 7% after five years, the fully amortizing payment would jump to $657.69.

Businesses go toward debt financing when they want to purchase a plant, machinery, land, product research. In personal finance, bank loans are usually dedicated to real estate purchases, car purchases, etc. An interest percentage is paid to the bank until the loan is repaid. Depletion is another way the cost of business assets can be established. It refers to the allocation of the cost of natural resources over time. For example, an oil well has a finite life before all of the oil is pumped out. Therefore, the oil well’s setup costs are spread out over the predicted life of the well.

Amortize

Consider the following examples to better understand the calculation of amortization through the formula shown in the previous section. Learn accounting fundamentals and how to read financial statements with CFI’s free online accounting classes. Annual Percentage Rate is the interest charged for borrowing that represents the actual yearly cost of the loan, expressed as a percentage. Simple interest is a quick method of calculating the interest charge on a loan. The offers that appear in this table are from partnerships from which Investopedia receives compensation.

Amortization and depreciation are two methods of calculating the value for business assets over time. The rate at which amortization is charged to expense in the example would be increased if the auction date were to be held on an earlier date, since the useful life of the asset would then be reduced. The best way to understand amortization is by reviewing an amortization table.

Your last loan payment will pay off the final amount remaining on your debt. For example, after exactly 30 years , you’ll pay off a 30-year mortgage. Amortization tables help you understand how a loan works and they can help you predict your outstanding balance or interest cost at any point in the future. Record amortization expenses on the income statement under a line item called “depreciation and amortization.” Debit the amortization expense to increase the asset account and reduce revenue. A cumulative amount of all the amortization expenses made for an intangible asset is called accumulated amortization.

amortization definition

You can even automate the posting based on actual amortization schedules. With this, we move on to the next section which clears out if amortization can be considered as an asset on the balance sheet. With the negative amortization, you will owe the lender an amount much greater than $300,000. With partial type, you would have some outstanding balance which would be a bit less than the principal, $300,000. Here we shall look at the types of amortization from the homebuyer’s perspective. If you are an individual looking for various amortization techniques to help you on your way to repay the loan, these points shall help you.

Amortization Explained

A part of the payment covers the interest due on the loan, and the remainder of the payment goes toward reducing the principal amount owed. Interest is computed on the current amount owed and thus will become progressively smaller as the principal decreases. ABC Corporation spends $40,000 to acquire a taxi license that will expire and be put up for auction in five years. This is an intangible asset, and should be amortized over the five years prior to its expiration date.

Loan Amortization: Definition, Example, Calculation, How Does It Work?

In other words, the depreciated amount expensed in each year is a tax deduction for the company until the useful life of the asset has expired. Amortization is almost always calculated on a straight-line basis. Accelerated amortization methods make little sense, since it is difficult to prove that intangible assets are used more quickly in the early years of their useful lives. The accounting for amortization expense is a debit to the amortization expense account and a credit to the accumulated amortization account.

Amortization

While borrowers pay more each month with a 15-year loan, they’ll end up paying less overall than they would if paying the same loan over 30 years. You must use depreciation to allocate the cost of tangible items over time.

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It gets placed in the balance sheet as a contra asset under the list of the unamortized intangible. When these intangible assets get consumed completely or are eliminated, then their accumulated amortization amount is also deleted from the balance sheet. The IRS requires businesses to follow specific regulations in order to be able to deduct the costs of business assets (the IRS calls them “property”). When the principal balance hits the limit, payments are recalibrated so the loan amortizes on schedule. It’s important to note that the loan term and amortization schedule may not always be aligned.

Negative amortization occurs when a scheduled payment isn’t enough to cover the interest due for that period. As a result, the borrower ends up paying interest on unpaid interest. Amortization, on the other hand, is used to expense out intangible assets.

Most businesses file IRS Form 4562 Depreciation and Amortization to do the calculations for depreciation and amortization for the year. The information for all property depreciated and amortized is accumulated and totaled on this form. An amortized loan is one in which regularly scheduled payments are applied to both principal and interest. Most business and consumer loans—mortgages, car loans, student loans, and personal loans—follow an amortization schedule. In each period, the fixed rate of interest is deducted from the pre-scheduled installment. At the end of the amortization schedule, there is no amount due on the borrower. Sometimes it’s helpful to see the numbers instead of reading about the process.

Similarly, depletion is associated with charging the cost of natural resources to expense over their usage period. First, amortization is used in the process of paying off debt through regular principal and interest payments over time. An amortization schedule is used to reduce the current balance on a loan—for example, a mortgage or a car loan—through installment payments. Another definition of amortization is the process used for paying off loans.