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	<title>Bookkeeping Archives - A-Leg-Up</title>
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		<title>Here&#8217;s the Maximum Social Security Benefit in 2021 The Motley Fool</title>
		<link>https://a-leg-up.com/here-s-the-maximum-social-security-benefit-in-2021/</link>
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		<pubDate>Thu, 20 Apr 2023 07:18:24 +0000</pubDate>
				<category><![CDATA[Bookkeeping]]></category>
		<guid isPermaLink="false">http://a-leg-up.com/?p=563</guid>

					<description><![CDATA[<p>The key is just getting started as early in life as possible and tucking away as much as you possibly can, even when it&#8217;s a bit of a budgetary stretch to do so. To hit the max Social Security benefit, you&#8217;ll need to delay collecting retirement benefits until age 70. If you hoped to retire [&#8230;]</p>
<p>The post <a href="https://a-leg-up.com/here-s-the-maximum-social-security-benefit-in-2021/">Here&#8217;s the Maximum Social Security Benefit in 2021 The Motley Fool</a> appeared first on <a href="https://a-leg-up.com">A-Leg-Up</a>.</p>
]]></description>
										<content:encoded><![CDATA[<p>The key is just getting started as early in life as possible and tucking away as much as you possibly can, even when it&#8217;s a bit of a budgetary stretch to do so. To hit the max Social Security benefit, you&#8217;ll need to delay collecting retirement benefits until age 70. If you hoped to retire early and still make the highest benefit possible, you&#8217;re out of luck. Social Security benefits are based on work history, lifetime income, full retirement age or FRA, and claiming age. Those four variables come together in a two-step process to determine how much income a retired worker gets from Social Security.</p>
<ul>
<li>However, there is a maximum allowable Social Security retirement benefit.</li>
<li>Although you&#8217;ll no longer be subject to Social Security payroll taxes once you retire, you could owe income taxes on your benefits.</li>
<li>The Supplemental Security Income (SSI) program provides income support to needy persons aged 65 or older, blind or disabled adults, and blind or disabled children.</li>
<li>Sixty-five million beneficiaries were in current-payment status; that is, they were being paid a benefit.</li>
</ul>
<p>If you don’t have an account yet, you must create one by November 18, 2020 to receive the 2021 COLA notice online. Approximately 70 million Americans will see a 1.3 percent increase in their Social Security <a href="https://online-accounting.net/">https://online-accounting.net/</a> benefits and Supplemental Security Income (SSI) payments in 2021. Federal benefit rates increase when the cost-of-living rises, as measured by the Department of Labor’s Consumer Price Index (CPI-W).</p>
<p>The good news is that you&#8217;re allowed to hold a job and collect Social Security at the same time. Whether that impacts your benefits depends on your age and earnings level. Once all wages have been indexed, your average indexed monthly earnings (AIME) are computed by dividing the sum of all indexed wages by 420 (35 years expressed as months). If you worked fewer than 35 years, a zero is entered for years when you did not work.</p>
<h2>Social Security wage base increases to $142,800 for 2021</h2>
<p>To ensure that benefits maintain their buying power, the SSA adjusts them every year in accordance with changes in the cost of living.  For example, the&nbsp;cost-of-living adjustment (COLA) was increased by 8.7% for 2023, compared with a 5.9% increase in 2022 and a 1.3% increase for 2021. Although men historically were more likely than women to be insured, the gender gap is shrinking.</p>
<ul>
<li>People contribute to Social Security through payroll taxes or self-employment taxes, as required by the Federal Insurance Contributions Act (FICA) and the Self-Employment Contributions Act (SECA).</li>
<li>Making such a plan requires doing a little bit of math, although there are several tools available on the web that make this work much easier.</li>
<li>All else being equal, a worker who claims Social Security at age 70 in 2024 could receive 80% more than a retired worker who starts benefits at age 62.</li>
<li>You&#8217;ll need to earn the maximum taxable amount in each of the 35 years used in the calculation of your Social Security retirement benefit.</li>
</ul>
<p>In 2020, you could earn up to $18,240 without having it impact your benefits, assuming you hadn&#8217;t yet reached FRA. Once your income exceeds that point, you&#8217;ll have $1 in Social Security withheld for every $2 you earn. Furthermore, if you&#8217;ll be reaching FRA in 2021, that limit increases to $50,520 (up from $48,600 in 2020). From there, you&#8217;ll have $1 in Social Security withheld for every $3 you earn. However, they can affect both your income during your working years and your retirement income.</p>
<h2>Here&#8217;s the Max Social Security Benefit for Retirees in 2024, and the Salary You Need to Get It</h2>
<p>In 2020, around 74.2 percent of those receiving Social Security benefits were retirees, with the average benefit amount being $1,544. Those who chose to retire before 65 are penalized with lower benefits. Keep in mind that the benefits you&#8217;ve withheld for exceeding the earnings test limits aren&#8217;t lost on a permanent basis. Rather, they&#8217;ll be added  back into your monthly benefit once you reach FRA. The hit in benefits you&#8217;ll face for filing for Social Security before FRA will remain in effect on a permanent basis since that reduction applies regardless of whether you work. If you&#8217;re earning enough from a job to risk having benefits withheld, it may not be worth it to file.</p>
<h2>Social Security Benefits Increase in 2024</h2>
<p>Homeowners who have been paying down their mortgages may benefit from options like a home equity line of credit (HELOC), reverse mortgage or cash-out refinance. If high-interest debt is getting in the way of your retirement savings, you may consider a personal loan to help pay it off at a lower interest rate. At Credible, you can speak with a personal loan expert to see if <a href="https://accounting-services.net/">https://accounting-services.net/</a> this option is right for you. In addition to near-record inflation, Americans are also struggling with major debt. Household debt rose to $16.15 trillion in the second quarter of 2022, according to The Federal Reserve Bank of New York. Credit card balances alone increased by $46 billion to a total of nearly $1 trillion, marking the largest spike in more than 20 years.</p>
<h2>Basis for Eligibility and Age of Recipients, December 2020</h2>
<p>The US has been pushing for Gulf states to increase their oil output in an attempt to arrest the cost of gas. This has also been keenly felt in Europe, leading to soaring electricity costs in Spain and the United Kingdom. You might find that your benefit is lower than expected, because Social Security is designed to replace only 40% of pre-retirement income. It&#8217;s better to know that sooner rather than later, though, because you can plan accordingly when setting your retirement goals. There&#8217;s a maximum monthly Social Security benefit because of the way the program was designed.</p>
<h2>Credits &#038; Deductions</h2>
<p>The overall long-term growth of the SSI program occurred because of an increase in the number of disabled recipients, most of whom are under age&nbsp;65. “Medicare premiums are going down and Social Security benefits are going up in 2023, which will give seniors <a href="https://simple-accounting.org/">https://simple-accounting.org/</a> more peace of mind and breathing room. You can update your preferences to opt out of the mailed COLA notice, and any other notices that are available online. Did you know you can receive a text or email alert when there is a new message waiting for you?</p>
<p>Nevertheless, there are strategies you can use to make sure you get the biggest benefit possible even if you don&#8217;t qualify for the maximum Social Security amount. Find current and accurate answers to your&nbsp;tax questions with Tax Facts. It&#8217;s also possible to bowl a perfect game, hit a hole-in-one in golf, and get Wordle on the first try. There is a maximum amount of compensation subject to the OASDI tax, but no maximum for HI. To counter high inflation, the Federal Reserve could raise interest rates.</p>
<p>The post <a href="https://a-leg-up.com/here-s-the-maximum-social-security-benefit-in-2021/">Here&#8217;s the Maximum Social Security Benefit in 2021 The Motley Fool</a> appeared first on <a href="https://a-leg-up.com">A-Leg-Up</a>.</p>
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		<title>How to Calculate Credit and Debit Balances in a General Ledger</title>
		<link>https://a-leg-up.com/how-to-calculate-credit-and-debit-balances-in-a/</link>
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		<dc:creator><![CDATA[sullauadmin]]></dc:creator>
		<pubDate>Tue, 24 Jan 2023 14:38:47 +0000</pubDate>
				<category><![CDATA[Bookkeeping]]></category>
		<guid isPermaLink="false">http://a-leg-up.com/?p=559</guid>

					<description><![CDATA[<p>In essence, accountants have their own unique shorthand to portray the financial statement consequence for every recordable event. This means that as transactions occur, it is necessary to perform an analysis to determine (a) what accounts are impacted and (b) how they are impacted (increased or decreased). Then, debits and credits are applied to the [&#8230;]</p>
<p>The post <a href="https://a-leg-up.com/how-to-calculate-credit-and-debit-balances-in-a/">How to Calculate Credit and Debit Balances in a General Ledger</a> appeared first on <a href="https://a-leg-up.com">A-Leg-Up</a>.</p>
]]></description>
										<content:encoded><![CDATA[<p>In essence, accountants have their own unique shorthand to portray the financial statement consequence for every recordable event. This means that as transactions occur, it is necessary to perform an analysis to determine (a) what accounts are impacted and (b) how they are impacted (increased or decreased). Then, debits and credits are applied to the accounts, utilizing the rules set forth in the preceding paragraphs. Expenses normally have debit balances that are increased with a debit entry. Since expenses are usually increasing, think &#8220;debit&#8221; when expenses are incurred.</p>
<ul>
<li>Imagine that you want to buy an asset, such as a piece of office furniture.</li>
<li>Assume that Matthew made a deposit to his account at Monalo Bank.</li>
<li>Perhaps you need help balancing your credits and debits on your income statement.</li>
<li>After this transaction is recorded, the Cash account will have a debit balance of $4,000.</li>
<li>Payables appear on a company&#8217;s balance sheet as a current liability.</li>
</ul>
<p>In a manual processing system, imagine the general ledger as nothing more than a notebook, with a separate page for every account. Thus, one could thumb through the notebook to see the “ins” and “outs” of every account, as well as existing balances. The following example reveals that cash has a balance of $63,000 as of January 12.</p>
<p>A debit reduces the amounts in liability and owner&#8217;s (stockholders&#8217;) equity accounts. A debit balance is the amount of money a brokerage customer owes their broker for securities purchases they have made on margin. If the debit balance gets too high relative to the equity in the account, the investor may be subject to a margin call. For that reason, investors with margin accounts should regularly check how much equity they have in their accounts and be prepared to come up with additional cash if they need to.</p>
<h2>Debit Notes</h2>
<p>Assume that Matthew made a deposit to his account at Monalo Bank. Monalo’s balance sheet would include an obligation (“liability”) to Matthew for the amount of money on deposit. This liability  would be credited each time Matthew adds to his account.</p>
<p>The main differences between debit and credit accounting are their purpose and placement. Debits increase asset and expense accounts while decreasing liability, revenue, and equity accounts.  The two primary types of brokerage accounts used to buy and sell financial assets are a&nbsp;cash account&nbsp;and a&nbsp;margin account. In a cash account, the investor can only spend the cash balance they have on deposit and no more. For example, if a person has $2,000 in their cash account, they can only buy securities worth a total value of $2,000 unless they add more money to the account. Certain types of accounts have natural balances in financial accounting systems.</p>
<h2>The five accounting elements</h2>
<p>All accounts must first be classified as one of the five types of accounts (accounting elements) ( asset, liability, equity, income and expense). To determine how to classify an account into one of the five elements, the definitions of the five account types must be fully understood. Liabilities, <a href="https://quick-bookkeeping.net/">https://quick-bookkeeping.net/</a> conversely, would include items that are obligations of the company (i.e. loans, accounts payable, mortgages, debts). The complete accounting equation based on the modern approach is very easy to remember if you focus on Assets, Expenses, Costs, Dividends (highlighted in chart).</p>
<h2>Available Credit vs. Account Balance</h2>
<p>For example, if a restaurant owes money to a food or beverage company, those items are part of the&nbsp;inventory, and thus part of its trade payables. Meanwhile, obligations to other companies, such as the company that cleans the restaurant&#8217;s staff uniforms,&nbsp;fall into&nbsp;the accounts payable category. Both of these categories fall under the broader accounts payable category, and many companies combine both under the term accounts payable. Because these have the opposite effect on the complementary accounts, ultimately the credits and debits equal one another and demonstrate that the accounts are balanced. Every transaction can be described using the debit/credit format, and books must be kept in balance so that every debit is matched with a corresponding credit.</p>
<h2>Basic Accounting Debits and Credits Examples</h2>
<p>The balance is eliminated immediately after the transaction if the full payment is made. The reason is that one recently deposited a check through an ATM or mobile deposit. Some banking institutions will not add the deposit to the available balance until they verify that the check is valid and that the issuing bank has received cash.</p>
<h2>Examples of Debits and Credits in a Sole Proprietorship</h2>
<p>A general ledger acts as a record of all of the accounts in a company and the transactions that take place in them. Balancing the ledger involves subtracting <a href="https://kelleysbookkeeping.com/">https://kelleysbookkeeping.com/</a> the total number of debits from the total number of credits. In order to correctly calculate credits and debits, a few rules must first be understood.</p>
<p>It is accepted accounting practice to indent credit transactions recorded within a journal. Receivables represent funds owed to the firm for services rendered <a href="https://business-accounting.net/">https://business-accounting.net/</a> and are booked as an asset. Accounts payable, on the other hand, represent funds that the firm owes to others and are considered a type of accrual.</p>
<p>The post <a href="https://a-leg-up.com/how-to-calculate-credit-and-debit-balances-in-a/">How to Calculate Credit and Debit Balances in a General Ledger</a> appeared first on <a href="https://a-leg-up.com">A-Leg-Up</a>.</p>
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		<title>Amortization accounting Wikipedia</title>
		<link>https://a-leg-up.com/amortization-accounting-wikipedia/</link>
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		<pubDate>Mon, 01 Nov 2021 15:28:42 +0000</pubDate>
				<category><![CDATA[Bookkeeping]]></category>
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					<description><![CDATA[<p>The term amortization is used in both accounting and in lending with completely different definitions and uses. Explanations may also be supplied in the footnotes, particularly if there is a large http://openrussia.info/main/417-otkryta-vakansiya-shpiona-dlya-nalogovoy.html swing in the depreciation, depletion, and amortization (DD&#38;A) charge from one period to the next. To know whether amortization is an asset or [&#8230;]</p>
<p>The post <a href="https://a-leg-up.com/amortization-accounting-wikipedia/">Amortization accounting Wikipedia</a> appeared first on <a href="https://a-leg-up.com">A-Leg-Up</a>.</p>
]]></description>
										<content:encoded><![CDATA[<p><img decoding="async" class='wp-post-image' style='display: block;margin-left:auto;margin-right:auto;' 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" width="253px" alt="define amortization"/></p>
<p><p>The term amortization is used in both accounting and in lending with completely different definitions and uses. Explanations may also be supplied in the footnotes, particularly if there is a large <a href="http://openrussia.info/main/417-otkryta-vakansiya-shpiona-dlya-nalogovoy.html">http://openrussia.info/main/417-otkryta-vakansiya-shpiona-dlya-nalogovoy.html</a> swing in the depreciation, depletion, and amortization (DD&amp;A) charge from one period to the next. To know whether amortization is an asset or not, let’s see what is accumulated amortization.</p>
</p>
<ul>
<li>A higher percentage of the flat monthly payment goes toward interest early in the loan, but with each subsequent payment, a greater percentage of it goes toward the loan’s principal.</li>
<li>With the lower interest rates, people often opt for the 5-year fixed term.</li>
<li>Don’t worry, we put together this guide to explain everything about amortization.</li>
<li>Owing to this, the tangible assets are depreciated over time and the intangible ones are amortized.</li>
<li>For example, if a large piece of machinery or property requires a large cash outlay, it can be expensed over its usable life, rather than in the individual period during which the cash outlay occurred.</li>
<li>Assets that are expensed using the amortization method typically don&#8217;t have any resale or salvage value.</li>
</ul>
<p><p>But perhaps one of the primary benefits comes through clarifying your loan repayments or other amounts owed. Amortization helps to outline how much of a loan payment will consist of principal or interest. This information will come in handy when it comes to deducting interest payments for certain tax purposes. Like any type of accounting technique, amortization can provide valuable insights.</p>
</p>
<p><h2>Dictionary Entries Near amortization</h2>
</p>
<p><p>It can also get used to lower the book value of intangible assets over a period of time. Unlike intangible assets, tangible&nbsp;assets might have some value when the business no longer has a  use for them. For this reason, depreciation is calculated by subtracting the asset&#8217;s salvage value&nbsp;or resale&nbsp;value from its original cost. The difference is depreciated evenly over the years of the expected life of the asset. In other words, the depreciated amount expensed in&nbsp;each year is a tax deduction for the company until the useful&nbsp;life of the asset has expired.</p>
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<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. Amortized loans are generally paid off over an extended period of time, with equal amounts paid for each payment period.</p>
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<p><h2>amortization</h2>
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<p><p>The amount of principal paid in the period is applied to the outstanding balance of the loan. Therefore, the current balance of the loan, minus the amount of principal paid in the period, results in the new outstanding balance of the loan. This new outstanding balance <a href="http://www.news45.ru/index.php?dn=news&amp;to=art&amp;id=226">http://www.news45.ru/index.php?dn=news&amp;to=art&amp;id=226</a> is used to calculate the interest for the next period. An amortization table might be one of the easiest ways to understand how everything works. For example, if you take out a mortgage then there would typically be a table included in the loan documents.</p>
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<p><p>Depletion can be calculated on a cost or percentage basis, and businesses generally must use whichever provides the larger deduction for tax purposes. In the course of a business, you may need to calculate amortization <a href="https://www.growablegowns.com/how-to-dress-a-rectangle-body-shape/">https://www.growablegowns.com/how-to-dress-a-rectangle-body-shape/</a> on intangible assets. In that case, you may use a formula similar to that of straight-line depreciation. An example of an intangible asset is when you buy a copyright for an artwork or a patent for an invention.</p>
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<p><h2>Accounting Impact of Amortization</h2>
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<p><p>For example, a business may buy or build an office building, and use it for many years. The original office building may be a bit rundown but it still has value. The  cost of the building, minus its resale value, is spread out over the predicted life of the building, with a portion of the cost being expensed in each accounting year. Most lenders will provide amortization tables that show how much of each payment is interest versus principle. Amortized loans apply each payment to both interest and principal, initially paying more interest than principal until eventually that ratio is reversed.</p></p>
<p>The post <a href="https://a-leg-up.com/amortization-accounting-wikipedia/">Amortization accounting Wikipedia</a> appeared first on <a href="https://a-leg-up.com">A-Leg-Up</a>.</p>
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