{"id":22853,"date":"2020-11-02T17:58:01","date_gmt":"2020-11-02T17:58:01","guid":{"rendered":"https:\/\/alrashedin.com\/?p=22853"},"modified":"2022-05-31T18:31:29","modified_gmt":"2022-05-31T18:31:29","slug":"marginal-cost-of-production-definition","status":"publish","type":"post","link":"https:\/\/alrashedin.com\/index.php\/2020\/11\/02\/marginal-cost-of-production-definition\/","title":{"rendered":"Marginal Cost Of Production Definition"},"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\">Functions<\/a><\/li>\n<li><a href=\"#toc-1\">Marginal Benefit Vs Marginal Cost<\/a><\/li>\n<li><a href=\"#toc-2\">The Marginal Cost Formula<\/a><\/li>\n<li><a href=\"#toc-3\">How Do You Calculate The Marginal Cost?<\/a><\/li>\n<li><a href=\"#toc-4\">How Is The Marginal Cost Of Production Calculated?<\/a><\/li>\n<li><a href=\"#toc-5\">Want More Helpful Articles About Running A Business?<\/a><\/li>\n<li><a href=\"#toc-6\">Marginal Cost Calculator<\/a><\/li>\n<li><a href=\"#toc-7\">What Is The Formula For Marginal Cost<\/a><\/li>\n<\/ul>\n<\/div>\n<p><img class='wp-post-image' style='display: block;margin-left:auto;margin-right:auto;' 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\" width=\"252px\" alt=\"How to Calculate Marginal Cost\"\/><\/p>\n<p>Beyond that point, the cost of producing an additional unit will exceed the revenue generated. The marginal cost of production includes all the expenses that change with that level of production. If the marginal cost of producing additional items is lower than the price per unit, then the manufacturer may be able to gain a profit. The practice of setting the price of a product to equal the extra cost of producing an additional unit of output is known as marginal-cost pricing. This policy allows a producer to charge only the added costs of materials and direct labor for each product unit sold.<\/p>\n<p><img class='aligncenter' style='display: block;margin-left:auto;margin-right:auto;' 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\" width=\"253px\" alt=\"How to Calculate Marginal Cost\"\/><\/p>\n<p>If you graphed both total and average cost on the same axes, the average cost would hardly show. When considering the marginal cost of producing one additional unit, you\u2019ll need to consider specific cost factors, like labor and materials. However, you won\u2019t need to account for fixed costs unless the additional unit requires increasing certain fixed expenses like overhead or administrative support. (i.e., cost efficiencies resulting in a decreased cost-per-unit). The quicker you can reach an optimum production level, the better for your business. Put simply, if the marginal cost of producing one additional unit is lower than the purchase price, the company can make a profit. Variable costs are things that can change over time, such as costs for labor and raw materials.<\/p>\n<h2 id=\"toc-0\">Functions<\/h2>\n<p>Therefore, the marginal cost is \u00a310 to produce the extra pair of shoes (\u00a310 change in cost \/ 1 change in quantity). Cost per unit for every additional unit when a company increases <a href=\"https:\/\/www.bookstime.com\/articles\/how-to-calculate-marginal-cost\">How to Calculate Marginal Cost<\/a> production of an item. This helps them to gauge if the change will increase or decrease their profits. The marginal cost function is the derivative of the total cost function, C.<\/p>\n<ul>\n<li>According to economic theory, a firm should expand production until the point where marginal cost is equal to marginal revenue.<\/li>\n<li>Marginal Cost Formula is the way to show an increase or decrease in the total cost a business will incur by producing one more unit of a product or serving one more customer.<\/li>\n<li>If, after the calculation procedure, which we will talk more about below, we get an amount equal to the marginal revenue, then we have achieved profit maximization.<\/li>\n<li>Synder provides the support you need to achieve profit maximization and simplifies your current accounting system.<\/li>\n<li>At a certain level of production, the benefit of producing one additional unit and generating revenue from that item will bring the overall cost of producing the product line down.<\/li>\n<\/ul>\n<p>The marginal cost of production can help businesses optimize their production levels. Producing too much too quickly could negatively impact profitability, whereas producing too little can also lead to suboptimal results. Generally speaking, a company will reach optimal production levels when their marginal cost of production is equal to their marginal revenue. Put simply, it is the cost incurred by producing additional products or services.<\/p>\n<h2 id=\"toc-1\">Marginal Benefit Vs Marginal Cost<\/h2>\n<p>When marginal costs are declining, it means that the company is reducing its average cost per unit because of economies of scale or learning curve benefits. It is often calculated when enough items have been produced to cover the fixed costs and production is at a break-even point, where the only expenses going forward are variable or direct costs. When average costs are constant, as opposed to situations where material costs fluctuate because of scarcity issues, marginal cost is usually the same as average cost. \u2013 At any level of production, your costs can increase or decrease. If you need to hire an extra worker or purchase more raw materials to make additional units, for example, your production costs will increase. To find out how much your production costs have changed, you can deduct the production cost of batch one from the production cost of batch two. If this is the case, the company should plan for this by allocating money toresearch and development (R&#038;D), so it can keep its product line fresh.<\/p>\n<p>ABC International has designed a product that contains $5.00 of variable expenses and $3.50 of allocated overhead expenses. ABC has sold all possible units at its normal price point of $10.00, and still has residual production capacity available. A customer offers to buy 6,000 units at the company&#8217;s best price. To obtain the sale, the sales manager sets the price of $6.00, which will generate an incremental profit of $1.00 on each unit sold, or $6,000 in total. The sales manager ignores the allocated overhead of $3.50 per unit, since it is not a variable cost.<\/p>\n<h2 id=\"toc-2\">The Marginal Cost Formula<\/h2>\n<p>Of great importance in the theory of marginal cost is the distinction between the marginal private <a href=\"https:\/\/www.bookstime.com\/\">https:\/\/www.bookstime.com\/<\/a> and social costs. The marginal private cost shows the cost borne by the firm in question.<\/p>\n<p><img class='aligncenter' style='display: block;margin-left:auto;margin-right:auto;' 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\" width=\"255px\" alt=\"How to Calculate Marginal Cost\"\/><\/p>\n<p>That&#8217;s because the company is buying raw materials on an as-needed basis, as well as paying staff and investing in large-scale machinery to satisfy a relatively small number of contracts. As the volume of production increases, the manufacturing cost will decrease. This is due to economies of scale \u2013 Widget Corp is now producing more and can take advantage of discounts for bulk purchases of raw materials.<\/p>\n<h2 id=\"toc-3\">How Do You Calculate The Marginal Cost?<\/h2>\n<p>If you know the current cost, future cost, and quantity data, you have everything you need to enter in the calculator and calculate the marginal cost. If you are interested in how the calculator works and which formula is used, continue reading the article. The first scenario is one in which a company is more likely to be financially healthy &#8211; it simply wishes to maximize its profitability with a few more unit sales. The second scenario is one of desperation, where a company can achieve sales by no other means. Costs are lower because you can take advantage of discounts for bulk purchases of raw materials, make full use of machinery, and engage specialized labor. However, production will reach a point where diseconomies of scale will enter the picture and marginal costs will begin to rise again.<\/p>\n<ul>\n<li>As you increase the number of purchases you make, the more each subsequent purchase will cost you in terms of opportunity.<\/li>\n<li>The portion of the marginal cost curve above its intersection with the average variable cost curve is the supply curve for a firm operating in a perfectly competitive market .<\/li>\n<li>You can calculate it by dividing change in costs by change in quantity.<\/li>\n<li>Let\u2019s say there\u2019s a small company called ABC Wallets that produces 5,000 high-quality, artisanal leather wallets every year.<\/li>\n<li>Fortunately, Synario solves this challenging problem for CFOs and their finance teams.<\/li>\n<li>For example, if it costs you $500 to produce 500 widgets and $550 to produce 600 widgets, your change in cost would be $50.<\/li>\n<\/ul>\n<p>The Contribution Margin Ratio is a company&#8217;s revenue, minus variable costs, divided by its revenue. The ratio can be used for breakeven analysis and it+It represents the marginal benefit of producing one more unit.<\/p>\n<h2 id=\"toc-4\">How Is The Marginal Cost Of Production Calculated?<\/h2>\n<p>Short-run marginal cost is an economic concept that describes the cost of producing a small amount of additional units of a good or service. Marginal cost is a key concept for making businesses function well, since marginal costs determine how much production is optimal. If the revenue gained from producing more units of a good or service is less than the marginal cost, the unit should not be produced at all, since it will cause the company to lose money. To calculate marginal cost, you need to know the total cost to produce one unit of whatever product or service you sell. Fixed costs should stay the same throughout your cost analysis, so you need to find the output level at which you would have to increase those fixed expenses. The term marginal cost defines the additionally realized production cost for each additional unit.<\/p>\n<p><img class='aligncenter' style='display: block;margin-left:auto;margin-right:auto;' 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\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\" width=\"259px\" alt=\"How to Calculate Marginal Cost\"\/><\/p>\n<p>If massive capital investment is required in an industry and it shows high average costs, then the marginal cost will be meager. For businesses, tracking the cost to produce an item is important from the start. If a business spends too much money on production and that money can&#8217;t be recouped from sales, the company will quickly go out of business. However, running out of inventory can be problematic, since customers will simply take their business elsewhere. For this reason, businesses are constantly juggling the need to invest in more resources against the ability they have to sell those goods. Often cutting back on production can seem like a cost-effective solution, but in some cases, the cost to manufacture a small amount is more than the cost to produce a standard run. The marginal cost is the change in the total cost that occurs when a quantity is increased, the cost of producing a second quantity.<\/p>\n<h2 id=\"toc-5\">Want More Helpful Articles About Running A Business?<\/h2>\n<p>A change in fixed cost would be reflected by a change in the vertical distance between the SRTC and SRVC curve. Any such change would have no effect on the shape of the SRVC curve and therefore its slope MC at any point. The changing law of marginal cost is similar to the changing law of average cost.<\/p>\n<p>CD Limited produces 100 face masks daily, and the cost of production is estimated at 1000 dollars. Because of high demand, the company decided to increase its production to 150 units daily. Armed with your calculations, you can now plot a marginal cost curve. Use a simple XY graph where the production quantity is the X-value on the horizontal axis and marginal cost is the Y value on the vertical axis. Marginal benefit is the maximum amount of money a purchaser would pay for an additional good or service. On the contrary, the marginal cost is the change in overall costs when the additional good or service is produced. The marginal cost has many applications in business pertaining to the cost of production, especially when deciding how much a company is willing to produce.<\/p>\n<h2 id=\"toc-6\">Marginal Cost Calculator<\/h2>\n<p>Consider the situation that 850 pieces are produced monthly and that each product requires $2 of fixed costs. Marginal costs are an essential element of calculation in companies, as they can help maximize profits. By including marginal costs in the calculation formula, materials and labor need to be considered.<\/p>\n<h2 id=\"toc-7\">What Is The Formula For Marginal Cost<\/h2>\n<p>Marginal cost represents the incremental costs incurred when producing additional units of a good or service. It is calculated by taking the total change in the cost of producing more goods and dividing that by the change in the number of goods produced. The usual variable costs included in the calculation are labor and materials, plus the estimated increases in fixed costs , such as administration, overhead, and selling expenses. The marginal cost formula can be used in financial modeling to optimize the generation of cash flow. Since fixed costs do not vary with changes in quantity, MC is \u2206VC\/\u2206Q. Thus if fixed cost were to double, the marginal cost MC would not be affected, and consequently, the profit-maximizing quantity and price would not change. This can be illustrated by graphing the short run total cost curve and the short-run variable cost curve.<\/p>\n<p>It is often seen that education is a positive for any whole society, as well as a positive for those directly involved in the market. Much of the time, private and social costs do not diverge from one another, but at times social costs may be either greater or less than private costs. When the marginal social cost of production is greater than that of the private cost function, there is a negative externality of production. Productive processes that result in pollution or other environmental waste are textbook examples of production that creates negative externalities.<\/p>\n","protected":false},"excerpt":{"rendered":"<p>Content Functions Marginal Benefit Vs Marginal Cost The Marginal Cost Formula How Do You Calculate The Marginal Cost? How Is The Marginal Cost Of [&hellip;]<\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"closed","ping_status":"open","sticky":false,"template":"","format":"standard","meta":[],"categories":[5828],"tags":[],"_links":{"self":[{"href":"https:\/\/alrashedin.com\/index.php\/wp-json\/wp\/v2\/posts\/22853"}],"collection":[{"href":"https:\/\/alrashedin.com\/index.php\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/alrashedin.com\/index.php\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/alrashedin.com\/index.php\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/alrashedin.com\/index.php\/wp-json\/wp\/v2\/comments?post=22853"}],"version-history":[{"count":1,"href":"https:\/\/alrashedin.com\/index.php\/wp-json\/wp\/v2\/posts\/22853\/revisions"}],"predecessor-version":[{"id":22854,"href":"https:\/\/alrashedin.com\/index.php\/wp-json\/wp\/v2\/posts\/22853\/revisions\/22854"}],"wp:attachment":[{"href":"https:\/\/alrashedin.com\/index.php\/wp-json\/wp\/v2\/media?parent=22853"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/alrashedin.com\/index.php\/wp-json\/wp\/v2\/categories?post=22853"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/alrashedin.com\/index.php\/wp-json\/wp\/v2\/tags?post=22853"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}