{"id":1357,"date":"2019-10-03T19:06:52","date_gmt":"2019-10-04T00:06:52","guid":{"rendered":"https:\/\/ecupyme.ec\/?p=1357"},"modified":"2022-03-23T08:14:53","modified_gmt":"2022-03-23T13:14:53","slug":"about-the-processes-to-calculate-distribute-and","status":"publish","type":"post","link":"https:\/\/ecupyme.ec\/index.php\/2019\/10\/03\/about-the-processes-to-calculate-distribute-and\/","title":{"rendered":"About The Processes To Calculate, Distribute, And Invoice Joint Venture Overhead"},"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\">Role Of Overhead Expense In Manufacturing, Admin, And Retail<\/a><\/li>\n<li><a href=\"#toc-1\">Conclusions:\u00a0Activity Based Costing\u00a0Example<\/a><\/li>\n<li><a href=\"#toc-2\">Overhead Vs  Operating Expenses<\/a><\/li>\n<li><a href=\"#toc-3\">What Events Cause Debits To Be Recorded In A Factory Overhead Account?<\/a><\/li>\n<li><a href=\"#toc-4\">How To Calculate Overhead And Profit In Construction With Examples<\/a><\/li>\n<li><a href=\"#toc-6\">Where Is The Overhead In Operating Expenses?<\/a><\/li>\n<\/ul>\n<\/div>\n<p><img decoding=\"async\" class='wp-post-image' style='display: block;margin-left:auto;margin-right:auto;' src=\"data:image\/jpeg;base64,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\" width=\"250px%\" alt=\"contribution to overhead\"\/><\/p>\n<p>Certainly, Model A has a greater per-unit direct labor cost than Model B. However, per-unit product costs are still unknown. Ithout a doubt, cost accountants can measure some of the costs that go into product production or service delivery easily and directly on a per-unit basis. These are called\u2014not surprisingly\u2014direct costs when they appear under Cost of Goods Sold. On an automobile assembly line, for instance, the firm knows precisely the employee labor time required to install the windshield each car. To find the per-unit cost per unit, the analyst multiplies labor cost per minute by the number of minutes in each installation. Sellers also need to know their per-unit costs accurately even when using other pricing models, such as Market-based pricing. The seller still must decide whether or not even to bring a proposed product to market when it has to sell at market prices.<\/p>\n<p>Companies report this kind of overhead under significant headings below the Operating Profit line. These could include, for instance, &#8220;Extraordinary Items,&#8221; or &#8220;Financial Revenues and Expenses.&#8221; Secondly, all other overhead expenses from the firm&#8217;s core business appear below the Gross profit line, under Operating Expenses. The term overhead also refers to cost-objects that create overhead expense. Strategic planners evaluating the firm&#8217;s business model, for instance, may refer to maintenance personnel and managers as &#8220;overhead.&#8221; The contractor assumes the greatest cost risk in a closely priced firm-fixed-price contract under which it agrees to perform a complex undertaking on time and at a predetermined price. The contractor assumes the least cost risk in a cost-plus-fixed-fee level-of-effort contract, under which it is reimbursed those costs determined to be allocable and allowable, plus the fixed fee.<\/p>\n<h2 id=\"toc-0\">Role Of Overhead Expense In Manufacturing, Admin, And Retail<\/h2>\n<p>When you buy ingredients for the croissants at your bakery, that expense is included in COGS. When you pay insurance for your bakery\u2019s delivery van, that\u2019s COS. Both these expenses are directly related to your business\u2014you incur them in the process of making money.<\/p>\n<p>And since they all benefit from office rent or insurance, it makes sense that each one contributes to pay overhead costs. Learn the fixed cost definition and how to calculate it using the fixed cost formula. Compare fixed vs. variable costs and see fixed costs examples in business. To calculate the incremental break-even point, divide the direct selling expenses plus variable order processing expenses (S.G. &#038; A.) by 53 percent . This gives you the amount of net revenue needed to break even. This number must be factored up to include returns at 3.79 percent to give you the gross demand revenue break-even point.<\/p>\n<p>Now you\u2019re ready to discover the overhead percentage as a percentage of sales. It a rate that shows you how much your company spends on overhead and how much on building software or delivering IT services. Departmental contribution to overhead is the amount of money available to a single department after all of the direct expenses are paid to contribute to the overhead of your business. For example, if the price of your product is $20 and the unit variable cost is $4, then the unit contribution margin is $16.<\/p>\n<h2 id=\"toc-1\">Conclusions:\u00a0Activity Based Costing\u00a0Example<\/h2>\n<p>Total direct labor costs for this accounting period were $1,500,000 . Exhibit 4 shows that the analyst has produced product-specific direct costs on a per-unit basis. Line 9 of Exhibit 4 shows that Model A has a per-unit direct cost of $1.25 while Model B has a per-unit direct cost of $1.00. The per-unit direct costs will contribute later to product-specific gross margin calculations.<\/p>\n<p><img decoding=\"async\" class='aligncenter' style='display: block;margin-left:auto;margin-right:auto;' src=\"data:image\/jpeg;base64,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\" width=\"253px%\" alt=\"contribution to overhead\"\/><\/p>\n<p>Your goal as a business owner should be to keep your overhead proportion as low as possible. A small overhead proportion means that a high percentage of your expenses go directly toward the production of a good or service.<\/p>\n<h2 id=\"toc-2\">Overhead Vs  Operating Expenses<\/h2>\n<p>Although there are cases when the two physical buildings may overlap, it is the usage of the overheads that separates them. Let\u2019s say your business has a total overhead cost of $20,000 per month and a total labor cost of $5,000 per month. You can approach calculating the overhead at a more granular level by calculating the overhead rate per employee. By assigning employees to a project, you\u2019ll instantly know what the overhead costs are. If you\u2019re here, you probably want to get better at calculating your projects\u2019 profitability. Calculating your overhead correctly and adding it at the right moment when planning your project are both crucial. Anything that goes wrong will have an impact on your profit margin.<\/p>\n<p>Administrative overheads include items such as utilities, strategic planning, and various supporting functions. These costs are treated as overheads due to the fact that they aren&#8217;t directly related to any particular function of the organization nor does it directly result in generating any profits. Instead, these costs simply take on the role of supporting all of the business&#8217; other functions. Whether you need these numbers right now depends on where your business is in its lifecycle. But regardless of the size of your business or the number of employees, you can reduce overhead costs by reducing payroll. The sum of all your recurring monthly expenses makes up your overhead costs.<\/p>\n<p>Greater profit opportunity should be provided contractors that have displayed unusual initiative in these programs. You may think keeping track of your overhead\u2014the cost of staying in business\u2014is a pain. Your overhead rate is 12.3%, or about 12 cents overhead for every dollar earned. Overhead is either general, or falls into a specific category. General overhead affects the whole business\u2014rent is a good example of a type of general overhead.<\/p>\n<h2 id=\"toc-3\">What Events Cause Debits To Be Recorded In A Factory Overhead Account?<\/h2>\n<p>Learn more about the different types of tourists and which destinations they prefer to visit. Travelers are defined by psychographic and demographic definitions. The example is based on printing 1.2 million catalogs for a holiday mailing . The overall revenue per catalog is $2.10 per book, and the average order size is $60.<\/p>\n<p>Unfortunately, one of these goals comes at the expense of the other. Maintaining a balance of mailings to your customer file vs. mailings to prospects is critical to your bottom line success.<\/p>\n<ul>\n<li>Overhead costs are recurring expenses that sustain your business but don\u2019t contribute to income.<\/li>\n<li>People assigned to the project will work for 550 hours that month.<\/li>\n<li>Businesses consist of a number of different departments, some of which generate costs and others make money.<\/li>\n<li>This number must be factored up to include returns at 3.79 percent to give you the gross demand revenue break-even point.<\/li>\n<li>Understanding this role begins by understanding first the overhead implications of the firm&#8217;s possible strategic choices.<\/li>\n<li>Calculating and recording the overhead costs regularly will help you save money, get a better price for your products and services and allow you to streamline the business operations.<\/li>\n<li>Ideally, the price you charge for your product or service should cover your overhead costs and other expenses, as well as leave a bit left over as profit.<\/li>\n<\/ul>\n<p>Now that you know what you spend every month on electricity, insurance, wages, etc., add up those numbers to calculateyour monthly overhead costs. Other expenses \u2014 like electricity and natural gas \u2014 are pretty much the same from month to month, so you can base your overhead costs calculations off the bill they send you.<\/p>\n<h2 id=\"toc-4\">How To Calculate Overhead And Profit In Construction With Examples<\/h2>\n<p>This subfactor measures the contribution of direct engineering, manufacturing, and other labor to converting the raw materials, data, and subcontracted items into the contract items. Considerations include the diversity of engineering, scientific, and manufacturing labor skills required and the amount and quality of supervision and coordination needed to perform the contract task.<\/p>\n<div style=\"display: flex;justify-content: center;\">\n<blockquote class=\"twitter-tweet\">\n<p lang=\"en\" dir=\"ltr\">You don&#39;t think The Lincoln Project made a difference?<br \/>Biden is winning. <br \/>They made a HUGE difference, and their overhead for runnung ads was massive.<\/p>\n<p>We the People should ALL be thanking them for their contribution to saving our Democracy!<\/p>\n<p>AOC, please think before you tweet!<\/p>\n<p>&mdash; Linda Williams\u262f (@B14Freedom) <a href=\"https:\/\/twitter.com\/B14Freedom\/status\/1324883467289518082?ref_src=twsrc%5Etfw\">November 7, 2020<\/a><\/p><\/blockquote>\n<p><script async src=\"https:\/\/platform.twitter.com\/widgets.js\" charset=\"utf-8\"><\/script><\/div>\n<p>Contribution refers to sales of the product or service, it can also be interpreted as the business&#8217;s revenue stream. Fixed costs in this case serves the same purpose as business overheads, it will simply be shown as a straight horizontal line on the graph as shown. This will include company-paid business travels and arrangements.<\/p>\n<h2 id=\"toc-5\">Subtract Overhead And Direct Costs From Project Cost<\/h2>\n<p>However, gross profit might tell a different story, showing an increasing trend of profitability. For Tesla, we can see that although the company generated a gross profit, the company reported a loss in both periods. The loss is reflected in the net income line item whereby Tesla reported a -$389 million loss for Q and a -$742 million loss for Q2 2018. For most businesses, business overheads are calculated by accountants for budgeting purposes but also often so the business has an idea of how much they must charge consumers in order to make a profit. The following are common accounting tools which take account of business overheads. As you can see from that equation, eight dollars of that cost goes directly into paying overhead while the other $50 goes to pay variable expenses. Let\u2019s examine some of the more common metrics you can utilize once you have calculated your overhead costs.<\/p>\n<p>The lower your contribution margin, the more difficult it is for your business to cover your fixed costs. Cutting those costs, such as by relocating into less expensive space or eliminating non-essential positions, is one way to improve your financial position. However, that doesn\u2019t include what you spend to produce goods or provide services, typically on raw materials and direct labor. In simple terms, overhead is the cost of keeping your business afloat. Overhead is a summary of the costs you pay to keep your company running, and appears on your monthly income statement. The gross profit calculation already includes the above the line \u201cdirect\u201d variable expense.<\/p>\n<div style='border: black dotted 1px;padding: 10px;'>\n<h3>The Supreme Court Considers Defined-Contribution Plans &#8211; Morningstar.com<\/h3>\n<p>The Supreme Court Considers Defined-Contribution Plans.<\/p>\n<p>Posted: Thu, 09 Dec 2021 08:00:00 GMT [<a href='https:\/\/www.morningstar.com\/articles\/1071051\/the-supreme-court-considers-defined-contribution-plans' rel=\"nofollow\">source<\/a>]<\/p>\n<\/div>\n<p>The above provisions shall also be applicable to optional rights to earn acreage outside the Contract Area which are in support of well drilled inside Contract Area. Sling\u2019s labor costs featuregives you the ability to optimize your payroll as you schedule so that your spending doesn\u2019t get out of control. You can set wages per employee or position and see how much each shift is going to cost. This is how you keep your project profitable and achieve the profit margin your company needs. People assigned to the project will work for 550 hours that month. Let\u2019s say that you set the hourly rate of your employees at $55.<\/p>\n<p>The analyst can apply traditional cost allocation knowing only two items, total overhead cost, and a simple allocation rule. Turning <a href=\"https:\/\/xero-accounting.net\/what-is-departmental-contribution-to-overhead\/\">contribution to overhead<\/a> to overhead cost items (the so-called &#8220;indirect items&#8221;), note that each overhead cost contributor in ABC is called an activity pool.<\/p>\n<h2 id=\"toc-6\">Where Is The Overhead In Operating Expenses?<\/h2>\n<p>Using the previous example, assume the construction business calculates its fixed indirect costs. If the company pays $24,000 per month in administrative salaries, $4,000 in employee benefit coverage and $5,000 in vendor contracts, its total fixed indirect costs amount to $33,000.<\/p>\n<p>As well as refreshments, meals, and entertainment fees during company gatherings. Despite these costs occurring periodically and sometimes without prior preparation, they are usually one-off payments and are expected to be within the company&#8217;s budget for travel and entertainment. If not \u2014 if you estimate you\u2019ll only sell 250 units per month \u2014 you\u2019ll need to work to reduce overhead costs, variable costs, and other expenses in order to break even. \u201cSome companies spend a lot of time figuring out the contribution margin,\u201d he says. It requires that a managerial accountant dedicate time to carefully breaking out fixed and variable costs. Calculating and recording the overhead costs regularly will help you save money, get a better price for your products and services and allow you to streamline the business operations. A positive contribution to profit and overhead exists if there are excess funds available after the formula has been applied.<\/p>\n<p>Overhead costs are recurring expenses that sustain your business but don\u2019t contribute to income. These expenses are often called indirect costs because they are not part of business activitiesthat generate revenue. Next, include the organization overhead costs for the period when the project is running. You can keep on adding different overhead costs to arrive at different profit margin estimations. Let\u2019s start with defining direct labor costs &#8211; these are the wages and salaries of your employees involved in production.<\/p>\n<p>When business activity goes up, variable overhead costs will too. Just take the total overhead and divide it by the number of direct labor hours during a given period. Divide the total overhead cost by the total labor cost for the month and multiply by 100 to express it as a percentage. Indirect costs are not directly involved with the costs incurred in the creation of a product. Learn the definition of indirect costs, view examples, and explore how indirect costs vary for different companies. Like most catalogers, we strive to maximize the amount of contribution to profit and overhead generated from the mailings we make. Attempting to maximize profit contribution can conflict with trying to grow your business.<\/p>\n<div style=\"display: flex;justify-content: center;\">\n<blockquote class=\"twitter-tweet\">\n<p lang=\"en\" dir=\"ltr\">y r u taking others hardwork&#39;s credit.<br \/>as an indiviual player u r just an overhead to team.<br \/>no contribution frm u side other than dance.<\/p>\n<p>&mdash; \ud83c\uddee\ud83c\uddf3 Saurabh Bhattacharya \ud83c\uddee\ud83c\uddf3 (@saurabh_b82) <a href=\"https:\/\/twitter.com\/saurabh_b82\/status\/1476568742083452938?ref_src=twsrc%5Etfw\">December 30, 2021<\/a><\/p><\/blockquote>\n<p><script async src=\"https:\/\/platform.twitter.com\/widgets.js\" charset=\"utf-8\"><\/script><\/div>\n<p>Now that you understand what overhead costs are and why they\u2019re important, let\u2019s turn our attention to how to calculate and control them. For example, if you run a recording studio, you might categorize rent as a direct cost because it contributes to revenue. But if you run an ad agency, you might categorize rent as an overhead cost because the building in which you work doesn\u2019t affect your income. That\u2019s because overhead costs are something you always have to contend with whether you want to or not. They are part of the foundation of your businessand often mean the difference between success and failure.<\/p>\n<p><img decoding=\"async\" class='aligncenter' style='display: block;margin-left:auto;margin-right:auto;' src=\"data:image\/jpeg;base64,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\" width=\"257px%\" alt=\"contribution to overhead\"\/><\/p>\n<p>In the case of machine set up, the single CD is the labor cost per set up, which in this example is $1,500. Note that per-unit direct costs will be the same under both costing methods. When a firm produces different products, each with its product cost structure, managers usually take a keen interest in uncovering the actual profitability of each product.<\/p>\n","protected":false},"excerpt":{"rendered":"<p>Content Role Of Overhead Expense In Manufacturing, Admin, And Retail Conclusions:\u00a0Activity Based Costing\u00a0Example Overhead Vs Operating Expenses What Events Cause Debits To Be Recorded In A Factory Overhead Account? How To Calculate Overhead And Profit In Construction With Examples Where Is The Overhead In Operating Expenses? Certainly, Model A has a greater per-unit direct labor &hellip; <\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"closed","ping_status":"closed","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[7],"tags":[],"class_list":["post-1357","post","type-post","status-publish","format-standard","hentry","category-bookkeeping"],"yoast_head":"<!-- This site is optimized with the Yoast SEO plugin v27.3 - https:\/\/yoast.com\/product\/yoast-seo-wordpress\/ -->\n<title>About The Processes To Calculate, Distribute, And Invoice Joint Venture Overhead - EcuPyme<\/title>\n<meta name=\"robots\" content=\"index, follow, max-snippet:-1, max-image-preview:large, max-video-preview:-1\" \/>\n<link rel=\"canonical\" href=\"https:\/\/ecupyme.ec\/index.php\/2019\/10\/03\/about-the-processes-to-calculate-distribute-and\/\" \/>\n<meta property=\"og:locale\" content=\"es_ES\" \/>\n<meta property=\"og:type\" content=\"article\" \/>\n<meta property=\"og:title\" content=\"About The Processes To Calculate, Distribute, And Invoice Joint Venture Overhead - EcuPyme\" \/>\n<meta property=\"og:description\" content=\"Content Role Of Overhead Expense In Manufacturing, Admin, And Retail Conclusions:\u00a0Activity Based Costing\u00a0Example Overhead Vs Operating Expenses What Events Cause Debits To Be Recorded In A Factory Overhead Account? How To Calculate Overhead And Profit In Construction With Examples Where Is The Overhead In Operating Expenses? Certainly, Model A has a greater per-unit direct labor &hellip;\" \/>\n<meta property=\"og:url\" content=\"https:\/\/ecupyme.ec\/index.php\/2019\/10\/03\/about-the-processes-to-calculate-distribute-and\/\" \/>\n<meta property=\"og:site_name\" content=\"EcuPyme\" \/>\n<meta property=\"article:published_time\" content=\"2019-10-04T00:06:52+00:00\" \/>\n<meta property=\"article:modified_time\" content=\"2022-03-23T13:14:53+00:00\" \/>\n<meta name=\"author\" content=\"jorgecurlygp\" \/>\n<meta name=\"twitter:card\" content=\"summary_large_image\" \/>\n<meta name=\"twitter:label1\" content=\"Escrito por\" \/>\n\t<meta name=\"twitter:data1\" content=\"jorgecurlygp\" \/>\n\t<meta name=\"twitter:label2\" content=\"Tiempo de lectura\" \/>\n\t<meta name=\"twitter:data2\" content=\"12 minutos\" \/>\n<script type=\"application\/ld+json\" class=\"yoast-schema-graph\">{\"@context\":\"https:\\\/\\\/schema.org\",\"@graph\":[{\"@type\":\"Article\",\"@id\":\"https:\\\/\\\/ecupyme.ec\\\/index.php\\\/2019\\\/10\\\/03\\\/about-the-processes-to-calculate-distribute-and\\\/#article\",\"isPartOf\":{\"@id\":\"https:\\\/\\\/ecupyme.ec\\\/index.php\\\/2019\\\/10\\\/03\\\/about-the-processes-to-calculate-distribute-and\\\/\"},\"author\":{\"name\":\"jorgecurlygp\",\"@id\":\"https:\\\/\\\/ecupyme.ec\\\/#\\\/schema\\\/person\\\/28955533e9ebd8fd99f14fc8c8fef31c\"},\"headline\":\"About The Processes To Calculate, Distribute, And Invoice Joint Venture Overhead\",\"datePublished\":\"2019-10-04T00:06:52+00:00\",\"dateModified\":\"2022-03-23T13:14:53+00:00\",\"mainEntityOfPage\":{\"@id\":\"https:\\\/\\\/ecupyme.ec\\\/index.php\\\/2019\\\/10\\\/03\\\/about-the-processes-to-calculate-distribute-and\\\/\"},\"wordCount\":2478,\"articleSection\":[\"Bookkeeping\"],\"inLanguage\":\"es\"},{\"@type\":\"WebPage\",\"@id\":\"https:\\\/\\\/ecupyme.ec\\\/index.php\\\/2019\\\/10\\\/03\\\/about-the-processes-to-calculate-distribute-and\\\/\",\"url\":\"https:\\\/\\\/ecupyme.ec\\\/index.php\\\/2019\\\/10\\\/03\\\/about-the-processes-to-calculate-distribute-and\\\/\",\"name\":\"About The Processes To Calculate, Distribute, And Invoice Joint Venture Overhead - EcuPyme\",\"isPartOf\":{\"@id\":\"https:\\\/\\\/ecupyme.ec\\\/#website\"},\"datePublished\":\"2019-10-04T00:06:52+00:00\",\"dateModified\":\"2022-03-23T13:14:53+00:00\",\"author\":{\"@id\":\"https:\\\/\\\/ecupyme.ec\\\/#\\\/schema\\\/person\\\/28955533e9ebd8fd99f14fc8c8fef31c\"},\"breadcrumb\":{\"@id\":\"https:\\\/\\\/ecupyme.ec\\\/index.php\\\/2019\\\/10\\\/03\\\/about-the-processes-to-calculate-distribute-and\\\/#breadcrumb\"},\"inLanguage\":\"es\",\"potentialAction\":[{\"@type\":\"ReadAction\",\"target\":[\"https:\\\/\\\/ecupyme.ec\\\/index.php\\\/2019\\\/10\\\/03\\\/about-the-processes-to-calculate-distribute-and\\\/\"]}]},{\"@type\":\"BreadcrumbList\",\"@id\":\"https:\\\/\\\/ecupyme.ec\\\/index.php\\\/2019\\\/10\\\/03\\\/about-the-processes-to-calculate-distribute-and\\\/#breadcrumb\",\"itemListElement\":[{\"@type\":\"ListItem\",\"position\":1,\"name\":\"Portada\",\"item\":\"https:\\\/\\\/ecupyme.ec\\\/\"},{\"@type\":\"ListItem\",\"position\":2,\"name\":\"About The Processes To Calculate, Distribute, And Invoice Joint Venture Overhead\"}]},{\"@type\":\"WebSite\",\"@id\":\"https:\\\/\\\/ecupyme.ec\\\/#website\",\"url\":\"https:\\\/\\\/ecupyme.ec\\\/\",\"name\":\"EcuPyme\",\"description\":\"Software, Consultoria y Hardware\",\"potentialAction\":[{\"@type\":\"SearchAction\",\"target\":{\"@type\":\"EntryPoint\",\"urlTemplate\":\"https:\\\/\\\/ecupyme.ec\\\/?s={search_term_string}\"},\"query-input\":{\"@type\":\"PropertyValueSpecification\",\"valueRequired\":true,\"valueName\":\"search_term_string\"}}],\"inLanguage\":\"es\"},{\"@type\":\"Person\",\"@id\":\"https:\\\/\\\/ecupyme.ec\\\/#\\\/schema\\\/person\\\/28955533e9ebd8fd99f14fc8c8fef31c\",\"name\":\"jorgecurlygp\",\"image\":{\"@type\":\"ImageObject\",\"inLanguage\":\"es\",\"@id\":\"https:\\\/\\\/ecupyme.ec\\\/wp-content\\\/litespeed\\\/avatar\\\/340d8993a657aae21192856d62dc5575.jpg?ver=1775024520\",\"url\":\"https:\\\/\\\/ecupyme.ec\\\/wp-content\\\/litespeed\\\/avatar\\\/340d8993a657aae21192856d62dc5575.jpg?ver=1775024520\",\"contentUrl\":\"https:\\\/\\\/ecupyme.ec\\\/wp-content\\\/litespeed\\\/avatar\\\/340d8993a657aae21192856d62dc5575.jpg?ver=1775024520\",\"caption\":\"jorgecurlygp\"},\"sameAs\":[\"http:\\\/\\\/ecupyme.ec\"],\"url\":\"https:\\\/\\\/ecupyme.ec\\\/index.php\\\/author\\\/jorgecurlygp\\\/\"}]}<\/script>\n<!-- \/ Yoast SEO plugin. -->","yoast_head_json":{"title":"About The Processes To Calculate, Distribute, And Invoice Joint Venture Overhead - EcuPyme","robots":{"index":"index","follow":"follow","max-snippet":"max-snippet:-1","max-image-preview":"max-image-preview:large","max-video-preview":"max-video-preview:-1"},"canonical":"https:\/\/ecupyme.ec\/index.php\/2019\/10\/03\/about-the-processes-to-calculate-distribute-and\/","og_locale":"es_ES","og_type":"article","og_title":"About The Processes To Calculate, Distribute, And Invoice Joint Venture Overhead - EcuPyme","og_description":"Content Role Of Overhead Expense In Manufacturing, Admin, And Retail Conclusions:\u00a0Activity Based Costing\u00a0Example Overhead Vs Operating Expenses What Events Cause Debits To Be Recorded In A Factory Overhead Account? How To Calculate Overhead And Profit In Construction With Examples Where Is The Overhead In Operating Expenses? Certainly, Model A has a greater per-unit direct labor &hellip;","og_url":"https:\/\/ecupyme.ec\/index.php\/2019\/10\/03\/about-the-processes-to-calculate-distribute-and\/","og_site_name":"EcuPyme","article_published_time":"2019-10-04T00:06:52+00:00","article_modified_time":"2022-03-23T13:14:53+00:00","author":"jorgecurlygp","twitter_card":"summary_large_image","twitter_misc":{"Escrito por":"jorgecurlygp","Tiempo de lectura":"12 minutos"},"schema":{"@context":"https:\/\/schema.org","@graph":[{"@type":"Article","@id":"https:\/\/ecupyme.ec\/index.php\/2019\/10\/03\/about-the-processes-to-calculate-distribute-and\/#article","isPartOf":{"@id":"https:\/\/ecupyme.ec\/index.php\/2019\/10\/03\/about-the-processes-to-calculate-distribute-and\/"},"author":{"name":"jorgecurlygp","@id":"https:\/\/ecupyme.ec\/#\/schema\/person\/28955533e9ebd8fd99f14fc8c8fef31c"},"headline":"About The Processes To Calculate, Distribute, And Invoice Joint Venture Overhead","datePublished":"2019-10-04T00:06:52+00:00","dateModified":"2022-03-23T13:14:53+00:00","mainEntityOfPage":{"@id":"https:\/\/ecupyme.ec\/index.php\/2019\/10\/03\/about-the-processes-to-calculate-distribute-and\/"},"wordCount":2478,"articleSection":["Bookkeeping"],"inLanguage":"es"},{"@type":"WebPage","@id":"https:\/\/ecupyme.ec\/index.php\/2019\/10\/03\/about-the-processes-to-calculate-distribute-and\/","url":"https:\/\/ecupyme.ec\/index.php\/2019\/10\/03\/about-the-processes-to-calculate-distribute-and\/","name":"About The Processes To Calculate, Distribute, And Invoice Joint Venture Overhead - EcuPyme","isPartOf":{"@id":"https:\/\/ecupyme.ec\/#website"},"datePublished":"2019-10-04T00:06:52+00:00","dateModified":"2022-03-23T13:14:53+00:00","author":{"@id":"https:\/\/ecupyme.ec\/#\/schema\/person\/28955533e9ebd8fd99f14fc8c8fef31c"},"breadcrumb":{"@id":"https:\/\/ecupyme.ec\/index.php\/2019\/10\/03\/about-the-processes-to-calculate-distribute-and\/#breadcrumb"},"inLanguage":"es","potentialAction":[{"@type":"ReadAction","target":["https:\/\/ecupyme.ec\/index.php\/2019\/10\/03\/about-the-processes-to-calculate-distribute-and\/"]}]},{"@type":"BreadcrumbList","@id":"https:\/\/ecupyme.ec\/index.php\/2019\/10\/03\/about-the-processes-to-calculate-distribute-and\/#breadcrumb","itemListElement":[{"@type":"ListItem","position":1,"name":"Portada","item":"https:\/\/ecupyme.ec\/"},{"@type":"ListItem","position":2,"name":"About The Processes To Calculate, Distribute, And Invoice Joint Venture Overhead"}]},{"@type":"WebSite","@id":"https:\/\/ecupyme.ec\/#website","url":"https:\/\/ecupyme.ec\/","name":"EcuPyme","description":"Software, Consultoria y Hardware","potentialAction":[{"@type":"SearchAction","target":{"@type":"EntryPoint","urlTemplate":"https:\/\/ecupyme.ec\/?s={search_term_string}"},"query-input":{"@type":"PropertyValueSpecification","valueRequired":true,"valueName":"search_term_string"}}],"inLanguage":"es"},{"@type":"Person","@id":"https:\/\/ecupyme.ec\/#\/schema\/person\/28955533e9ebd8fd99f14fc8c8fef31c","name":"jorgecurlygp","image":{"@type":"ImageObject","inLanguage":"es","@id":"https:\/\/ecupyme.ec\/wp-content\/litespeed\/avatar\/340d8993a657aae21192856d62dc5575.jpg?ver=1775024520","url":"https:\/\/ecupyme.ec\/wp-content\/litespeed\/avatar\/340d8993a657aae21192856d62dc5575.jpg?ver=1775024520","contentUrl":"https:\/\/ecupyme.ec\/wp-content\/litespeed\/avatar\/340d8993a657aae21192856d62dc5575.jpg?ver=1775024520","caption":"jorgecurlygp"},"sameAs":["http:\/\/ecupyme.ec"],"url":"https:\/\/ecupyme.ec\/index.php\/author\/jorgecurlygp\/"}]}},"_links":{"self":[{"href":"https:\/\/ecupyme.ec\/index.php\/wp-json\/wp\/v2\/posts\/1357","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/ecupyme.ec\/index.php\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/ecupyme.ec\/index.php\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/ecupyme.ec\/index.php\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/ecupyme.ec\/index.php\/wp-json\/wp\/v2\/comments?post=1357"}],"version-history":[{"count":1,"href":"https:\/\/ecupyme.ec\/index.php\/wp-json\/wp\/v2\/posts\/1357\/revisions"}],"predecessor-version":[{"id":1358,"href":"https:\/\/ecupyme.ec\/index.php\/wp-json\/wp\/v2\/posts\/1357\/revisions\/1358"}],"wp:attachment":[{"href":"https:\/\/ecupyme.ec\/index.php\/wp-json\/wp\/v2\/media?parent=1357"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/ecupyme.ec\/index.php\/wp-json\/wp\/v2\/categories?post=1357"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/ecupyme.ec\/index.php\/wp-json\/wp\/v2\/tags?post=1357"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}