{"id":808,"date":"2021-10-21T08:40:31","date_gmt":"2021-10-21T08:40:31","guid":{"rendered":"https:\/\/www.alaqsar.com\/?p=808"},"modified":"2022-07-13T23:29:45","modified_gmt":"2022-07-13T23:29:45","slug":"present-value-calculator","status":"publish","type":"post","link":"https:\/\/www.alaqsar.com\/index.php\/2021\/10\/21\/present-value-calculator\/","title":{"rendered":"Present Value Calculator"},"content":{"rendered":"<div id=\"toc\" style=\"background: #f9f9f9;border: 1px solid #aaa;display: table;margin-bottom: 1em;padding: 1em;width: 350px;\">\n<p class=\"toctitle\" style=\"font-weight: 700;text-align: center;\">Content<\/p>\n<ul class=\"toc_list\">\n<li><a href=\"#toc-0\">Future Value Fv Of A Single Amount: Definition, Formula, And How To Calculate It<\/a><\/li>\n<li><a href=\"#toc-1\">Introduction To The Present Value Of A Single Amount Pv<\/a><\/li>\n<li><a href=\"#toc-2\">Pv Formula And Calculation<\/a><\/li>\n<li><a href=\"#toc-3\">The General Formula<\/a><\/li>\n<li><a href=\"#toc-4\">Time Value Of Money<\/a><\/li>\n<li><a href=\"#toc-6\">Present Value Of Single Amount Intra<\/a><\/li>\n<\/ul>\n<\/div>\n<p><img decoding=\"async\" class='wp-post-image' style='display: block;margin-left:auto;margin-right:auto;' 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\" width=\"255px\" alt=\"Present value of a single amount\"\/><\/p>\n<p>If you\u2019re thinking about interviewing some prospective advisors, this new free tool will match you with highly-vetted local fiduciary investment advisors after a brief questionnaire. Please remember though, I do not give financial advice on this site. I will tell folks what calculator to use, and how to use a calculator. If you try it, scroll down the page and see tutorial #20 about PV calculations.<\/p>\n<p>A timeline can help us visualize what is known and what needs to be computed. The present time is noted with a &#8220;0,&#8221; the end of the first period is noted with a &#8220;1,&#8221; and the end of the second period is noted with a &#8220;2.&#8221; If you know any three of these four components, you will be able to calculate the unknown component. Accountants are often called upon to calculate this unknown component.<\/p>\n<p>But, before any interest or future value calculations can be done, the values for the principal , interest rate , and time are required. Notice that the interest for the second year is calculated on $1.12 &#8211; principle ($1) plus interest for the first year ($.12). When interest is computed not only on the principle but also on the interest, it is called compound interest. The calculation of present value is the reverse of compounding process. The $1 is the present value of $1.4049 and $1.4049 is the future value of $1 at 12% interest rate. Thus, if the rate of interest is 12%, you would be indifferent to either $1 today or $1.4049 after three years. The net present value calculator is easy to use and the results can be easily customized to fit your needs.<\/p>\n<h2 id=\"toc-0\">Future Value Fv Of A Single Amount: Definition, Formula, And How To Calculate It<\/h2>\n<p>You should select a discount rate equal to what you would expect to earn if you invested the money. You might choose 10-year treasuries, currently earning about 2.5% a year or you might select real estate, and then you might assume a rate-of-return exceeding 10%. If the interest on your investment is compounded monthly , the annual interest rate needs to be converted into a monthly interest rate and the number of years needs to be converted into months. Therefore, the present value of five $1,000 structured settlement payments is worth roughly $3,790.75 when a 10 percent discount rate is applied. Know the definition of the effective annual rate , see the formula for calculating the effective annual rate, and explore some examples on how to calculate the effective annual rate.<\/p>\n<ul>\n<li>As you know from the previous sections, to find the PV of a payment you need to know the future value , the number of time periods in question, and the interest rate.<\/li>\n<li>This is a presentation on the time value of money using single sum problem for different periods.<\/li>\n<li>This is because if $100 is deposited in a savings account, the value will be $105 after one year, again assuming no risk of losing the initial amount through bank default.<\/li>\n<li>As you know from the previous sections, to find the PV of a payment you need to know the future value, the number of time periods in question, and the interest rate.<\/li>\n<li>To account for money changing value over time, the value that two or more amounts would have at the same time is calculated.<\/li>\n<li>In this presentation, we\u2019ll cover the basic mechanics of understanding and calculating the time value of money.<\/li>\n<\/ul>\n<p>All and all, the difference from a time value of money perspective between single and multiple period investments is relatively straightforward. Normalizing expected returns in present value terms paints a clearer and more accurate picture of the actual worth of a given investment opportunity.<\/p>\n<p>Calculating present value involves assuming that a rate of return could be earned on the funds over the period. Present Value of a Single Amount is current value of a future amount of money evaluated at a given interest rate. Whenever there will be uncertainties in both timing and amount of the cash flows, the expected present value approach will often be the appropriate technique. With Present Value under uncertainty, future dividends are replaced by their conditional expectation. That it is not necessary to account for price inflation, or alternatively, that the cost of inflation is incorporated into the interest rate; see Inflation-indexed bond. Imagine someone owes you $10,000 and that person promises to pay you back after five years.<\/p>\n<h2 id=\"toc-1\">Introduction To The Present Value Of A Single Amount Pv<\/h2>\n<p>Before applying the formula above, let\u2019s go through the concept of compounding interest at the end of each year separately. So the future value at the end of each year comes from the principal plus interest at that given year. The principal and interest will become a new principal for next year and so on. You can also use the app to see the effect of small differences in interest rates on the future value over many years.<\/p>\n<p>The present value of an annuity is the cash value of all future annuity payments, which is directly impacted by the annuity\u2019s rate of return or discount rate. It\u2019s important to remember the time value of money when calculating the present value of an annuity because it incorporates inflation. The discount rate is the investment rate of return that is applied to the present value calculation. In other words, the discount rate would be the forgone rate of return if an investor chose to accept an amount in the future versus the same amount today. The discount rate that is chosen for the present value calculation is highly subjective because it&#8217;s the expected rate of return you&#8217;d receive if you had invested today&#8217;s dollars for a period of time. Sometimes the present value, the future value, and the interest rate for discounting are known, but the length of time before the future value occurs is unknown.<\/p>\n<h2 id=\"toc-2\">Pv Formula And Calculation<\/h2>\n<p>These elements are present value and future value, as well as the interest rate, the number of payment periods, and the payment principal sum. We are applying the concept to how much money we need to buy a business. Given our time frame of five years and a 5% interest rate, we can find the present value of that sum of money. The letter &#8220;i&#8221; refers to the percentage interest rate used to discount the future amount (in this case, 10%). Both and are stated within the context of time (e.g., two years at a 10% annual interest rate). Expected Present Value Approach \u2013 in this approach multiple cash flows scenarios with different\/expected probabilities and a credit-adjusted risk free rate are used to estimate the fair value.<\/p>\n<p><img decoding=\"async\" class='aligncenter' style='display: block;margin-left:auto;margin-right:auto;' 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\" width=\"258px\" alt=\"Present value of a single amount\"\/><\/p>\n<p>Learn what the holding period return of an investment is and how to calculate it using the holding period return formula. Also, learn how to calculate the annualized HPR and the holding period return for periodic payments. The time value of money is also related to the concepts of inflation and purchasing power. Both factors need to be taken into consideration along with whatever rate of return may be realized by investing the money.<\/p>\n<h2 id=\"toc-3\">The General Formula<\/h2>\n<p>For single sums, solving for any of the other TVOM variables is simply a matter of rearranging the basic formula to isolate <a href=\"https:\/\/accountingcoaching.online\/present-value-of-a-single-amount\/\">Present value of a single amount<\/a> the variable being sought. Simple interest is when interest is only paid on the amount you originally invested .<\/p>\n<ul>\n<li>An investor can decide which project to invest in by calculating each projects\u2019 present value and then comparing them.<\/li>\n<li>&#8220;i&#8221; is the interest rate for the period, and &#8220;n&#8221; represents the number of periods for which the interest will be added.<\/li>\n<li>The time value of money framework says that money in the future is not worth as much as money in the present.<\/li>\n<li>It\u2019s important to remember the time value of money when calculating the present value of an annuity because it incorporates inflation.<\/li>\n<li>Discount rate The interest rate used to discount future cash flows of a financial instrument; the annual interest rate used to decrease the amounts of future cash flow to yield their present value.<\/li>\n<li>I\u2019m trying to create something similar in vba but I can\u2019t figure out how to calculate irregular periods.<\/li>\n<\/ul>\n<p>Traditional Present Value Approach \u2013 in this approach a single set of estimated cash flows and a single interest rate will be used to estimate the fair value. That the likelihood of receiving the payments is high \u2014 or, alternatively, that the default risk is incorporated into the interest rate; see Corporate bond #Risk analysis. The interpretation is that for an effective annual interest rate of 10%, an individual would be indifferent to receiving $1000 in five years, or $620.92 today.<\/p>\n<h2 id=\"toc-4\">Time Value Of Money<\/h2>\n<p>If you want to calculate the present value of a stream of payments instead of a one time, lump sum payment then try our present value of annuity calculator here. If you would like to test the PV result for accuracy, you can use this future value calculator. Enter the calculated present value, the discount rate as the annual interest rate, and set the other options to match how you set this calculator. The calculated future value will match the future value you entered here. Let\u2019s assume you want to sell five years\u2019 worth of payments, or $5,000, and the factoring company applies a 10 percent discount rate.<\/p>\n<p><img decoding=\"async\" class='aligncenter' style='display: block;margin-left:auto;margin-right:auto;' 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width=\"255px\" alt=\"Present value of a single amount\"\/><\/p>\n<p>Present value of a future single sum of money is the value that is obtained when the future value is discounted at a specific given rate of interest. A rate of return is the gain or loss of an investment over a specified period of time, expressed as a percentage of the investment\u2019s cost. For example, if an investor receives $1,000 today and can earn a rate of return of 5% per year, the $1,000 today is certainly worth more than receiving $1,000 five years from now. If an investor waited five years for $1,000, there would be an opportunity cost or the investor would lose out on the rate of return for the five years. Discounting cash flows, like our $25,000, simply means that we take inflation and the fact that money can earn interest into account.<\/p>\n<p>Learn details of bonds, call dates, and yields, including the YTC formula, through examples. A comparison of present value with future value best illustrates the principle of the time value of money and the need for charging or paying additional risk-based interest rates. Simply put, the money today is worth more than the same money tomorrow because of the passage of time. Future value can relate to the future cash inflows from investing today&#8217;s money, or the future payment required to repay money borrowed today. In many cases, a risk-free rate of return is determined and used as the discount rate, which is often called the hurdle rate. The rate represents the rate of return that the investment or project would need to earn in order to be worth pursuing. A U.S. Treasury bond rate is often used as the risk-free rate because Treasuries are backed by the U.S. government.<\/p>\n<p><img decoding=\"async\" class='aligncenter' style='display: block;margin-left:auto;margin-right:auto;' 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\" width=\"252px\" alt=\"Present value of a single amount\"\/><\/p>\n<p>You can either calculate an investment&#8217;s future value or the present value of an amount to be received in the future. Always keep in mind that the results are not 100% accurate since it&#8217;s based on assumptions about the future. The calculation can only be as accurate as the input assumptions \u2013 specifically the discount rate and future payment amount. What that means is the discounted present value of a $10,000 lump sum payment in 5 years is roughly equal to $7,129.86 today at a discount rate of 7%. If you need help calculating your investment&#8217;s rate-of-return, I have several calculators on this site that will calculate it for you. This rate-of-return calculator solves for the ROR for one invested amount. While the IRR calculator solves for the return-on-investment when you have made a series of investments or withdrawals.<\/p>\n<p>The project with the highest present value, i.e. that is most valuable today, should be chosen. Another common name for finding present value isdiscounting.Discounting is the procedure of finding what a future sum of money is worth today. As you know from the previous sections, to find the PV of a payment you need <a href=\"https:\/\/accountingcoaching.online\/\">https:\/\/accountingcoaching.online\/<\/a> to know the future value, the number of time periods in question, and the interest rate. The interest rate, in this context, is more commonly called thediscount rate. Another common name for finding present value is discounting . Discounting is the procedure of finding what a future sum of money is worth today.<\/p>\n<p>Since $1,100 is 110% of $1,000, then if you believe you can make more than a 10% return on the money by investing it over the next year, you should opt to take the $1,000 now. Is an annuity in which the equal payments will begin at some future point in time.<\/p>\n<p>For example, net present value, bond yields, and pension obligations all rely on discounted or present value. Receiving $1,000 today is worth more than $1,000 five years from now. An investor can invest the $1,000 today and presumably earn a rate of return over the next five years. Present value takes into account any interest rate an investment might earn.<\/p>\n<h2 id=\"toc-8\">Comments On present Value Calculator<\/h2>\n<p>Now let\u2019s use the formula above to calculate the future value of a single amount. The compounding here can be annually, semi-annually, quarterly, monthly, weekly, daily, or even continuously. In this article, we cover the future value of a single amount. This includes the definition, formula, and example calculation. With a single investment like this, its expected value at the end of year 5 is called the future value of a single amount.<\/p>\n","protected":false},"excerpt":{"rendered":"<p>Content Future Value Fv Of A Single Amount: Definition, Formula, [&hellip;]<\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[51],"tags":[],"class_list":["post-808","post","type-post","status-publish","format-standard","hentry","category-bookkeeping"],"_links":{"self":[{"href":"https:\/\/www.alaqsar.com\/index.php\/wp-json\/wp\/v2\/posts\/808"}],"collection":[{"href":"https:\/\/www.alaqsar.com\/index.php\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/www.alaqsar.com\/index.php\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/www.alaqsar.com\/index.php\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/www.alaqsar.com\/index.php\/wp-json\/wp\/v2\/comments?post=808"}],"version-history":[{"count":1,"href":"https:\/\/www.alaqsar.com\/index.php\/wp-json\/wp\/v2\/posts\/808\/revisions"}],"predecessor-version":[{"id":809,"href":"https:\/\/www.alaqsar.com\/index.php\/wp-json\/wp\/v2\/posts\/808\/revisions\/809"}],"wp:attachment":[{"href":"https:\/\/www.alaqsar.com\/index.php\/wp-json\/wp\/v2\/media?parent=808"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.alaqsar.com\/index.php\/wp-json\/wp\/v2\/categories?post=808"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.alaqsar.com\/index.php\/wp-json\/wp\/v2\/tags?post=808"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}