{"id":3807,"date":"2020-08-07T10:50:13","date_gmt":"2020-08-07T10:50:13","guid":{"rendered":"https:\/\/hiper.ao\/mideamodocacimbo\/?p=3807"},"modified":"2022-08-30T16:22:42","modified_gmt":"2022-08-30T16:22:42","slug":"solved-martinez-companys-relevant-range-of","status":"publish","type":"post","link":"https:\/\/hiper.ao\/mideamodocacimbo\/2020\/08\/07\/solved-martinez-companys-relevant-range-of\/","title":{"rendered":"Solved Martinez Companys relevant range of production is"},"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\">AccountingTools<\/a><\/li>\n<li><a href=\"#toc-1\">Factors Influencing Incremental Cost<\/a><\/li>\n<li><a href=\"#toc-2\">What is the total amount of conversion costs?<\/a><\/li>\n<li><a href=\"#toc-3\">Relationship between marginal cost and average total cost<\/a><\/li>\n<li><a href=\"#toc-4\">Additional Cost Calculators and Cost Consulting Support to Maximize Financial Impact\u200b<\/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=\"254px\" alt=\"how to find incremental manufacturing cost\"\/><\/p>\n<p>In other words, a ZNEH produces as much energy as it uses on an annual basis. Example of a state-based model used to estimate health and costs over a lifetime. For pelletized biomass, two scenarios were considered, one with pellet transportation costs and the other without.<\/p>\n<div style='border: black solid 1px;padding: 12px;'>\n<h3>Emg Equipment Market Size In 2022 : Top Countries Data, Key Indicators, Defination, Share, Industry Analysis by Top Manufactures, Growth Insights and Forecasts to 2029  106 Report Pages &#8211; Digital Journal<\/h3>\n<p>Emg Equipment Market Size In 2022 : Top Countries Data, Key Indicators, Defination, Share, Industry Analysis by Top Manufactures, Growth Insights and Forecasts to 2029  106 Report Pages.<\/p>\n<p>Posted: Tue, 23 Aug 2022 10:43:49 GMT [<a href='https:\/\/www.digitaljournal.com\/pr\/emg-equipment-market-size-in-2022-top-countries-data-key-indicators-defination-share-industry-analysis-by-top-manufactures-growth-insights-and-forecasts-to-2029-106-report-pages' rel=\"nofollow\">source<\/a>]<\/p>\n<\/div>\n<p>Incremental cost is also useful for choosing between certain alternatives. C) A  shutdown should result in savings in annual operating costs for a number of years in the future.<\/p>\n<h2 id=\"toc-0\">AccountingTools<\/h2>\n<p>Pellet transportation is considered when the pellet plant is far away from the power plant, and in this study we used a distance of 150km. Power costs, when transportation costs are included, range from 139 to 147$MWh\u22121 for regular pellets and 173 to 187.50$MWh\u22121 for steam pretreated pellets. Moreover, pellet transportation costs have a small effect on the power cost; without transportation costs, pelletized biomass power costs were no more than 7.7$MWh\u22121 than for the transportation scenario. In all cases, however, the power costs are considerably higher than that for the raw biomass . Incremental cost of electricity and levelized cost of electricity for pelletized biomass at different cofiring levels.<\/p>\n<ul>\n<li>The incremental cost is based on the economy of scale, which shows that producing more items may decrease the cost of making each item.<\/li>\n<li>Such companies are said to have economies of scale, whereby there is some scope available to optimize the utility of production.<\/li>\n<li>In this case, the company would likely choose to purchase part #56 and produce the other product.<\/li>\n<li>Bulk orders are often at a reduced rate, creating a variable to factor into your incremental calculation.<\/li>\n<li>A &#8216;quantitative&#8217; decision, on the other hand, is possible when the various factors, and relationships between them, are measurable.<\/li>\n<li>Incremental analysis is a decision-making technique used in business to determine the true cost difference between alternatives.<\/li>\n<\/ul>\n<p>The distance of the beginning point of the SRTC above the origin represents the fixed cost \u2013 the vertical distance between the curves. This distance remains constant as the quantity produced, Q, increases. A change in fixed cost would be reflected by a change <a href=\"https:\/\/business-accounting.net\/incremental-cost\/\">how to find incremental manufacturing cost<\/a> 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<h2 id=\"toc-1\">Factors Influencing Incremental Cost<\/h2>\n<p>To reduce the size of the graph, we represent five activity centers instead of the detailed activities. Accelerated in favor of accelerating future, less costly work, such  as Activity C in the previous example. By applying a reasoned plan to accelerate, the project will avoid unnecessary expenses and wasted effort.<\/p>\n<p><img decoding=\"async\" class='aligncenter' style='display: block;margin-left:auto;margin-right:auto;' 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width=\"257px\" alt=\"how to find incremental manufacturing cost\"\/><\/p>\n<p>Therefore, knowing the incremental cost of additional units of production and comparing it to the selling price of these goods assists in meeting profit goals. Determine the total cost of normal production and then compute what the total cost will be if one or more additional units are produced.<\/p>\n<h2 id=\"toc-2\">What is the total amount of conversion costs?<\/h2>\n<p>If $300,000 of the fixed expenses are avoidable costs and $200,000 are unavoidable costs, the company&#8217;s operating income would remain unchanged at $170,000. On a per unit basis, the incremental analysis shows that DGK should process further and assemble the gyms. Qualitative factors such as loss of business if unassembled gyms were not offered and customers&#8217; willingness to pay the additional $500 for an assembled gym need to be considered.<\/p>\n<p>Not the total capital employed, in order to obtain a true picture. Ultimately, for convenience, all the capital can be allocated to this duty, but the financial mechanics should be appreciated in the costing presentation by noting that standby security is then \u2018free\u2019. Strategies for decreasing <a href=\"https:\/\/business-accounting.net\/\">https:\/\/business-accounting.net\/<\/a> regulation and load-following integration costs are less extensively documented than those of unit commitment. Utilizing DR to firm VERs through ancillary services provides such a strategy. Represents such a graph in which the project consists of manufacturing a type of product.<\/p>\n<h2 id=\"toc-3\">Relationship between marginal cost and average total cost<\/h2>\n<p>One of the formulas that many manufacturing businesses use is incremental cost. Business owners can use this to determine special pricing, such as when they&#8217;re conducting special promotions or sales.<\/p>\n<div itemScope itemProp=\"mainEntity\" itemType=\"https:\/\/schema.org\/Question\">\n<div itemProp=\"name\">\n<h3>Is cash flow a relevant cost?<\/h3>\n<\/div>\n<div itemScope itemProp=\"acceptedAnswer\" itemType=\"https:\/\/schema.org\/Answer\">\n<div itemProp=\"text\">\n<p>Anything that has occurred in the past is referred to as a sunk cost and should be excluded from relevant cash flows. Only cash flows that arise because of the decision being made should be included; any cash flow that would have arisen anyway, sometimes referred to as a committed cost, should be excluded.<\/p>\n<\/div><\/div>\n<\/div>\n","protected":false},"excerpt":{"rendered":"<p>Content AccountingTools Factors Influencing Incremental Cost What is the total amount of conversion costs? Relationship between marginal cost and average total cost Additional Cost Calculators and Cost Consulting Support to<\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"open","ping_status":"closed","sticky":false,"template":"","format":"standard","meta":{"_monsterinsights_skip_tracking":false,"_monsterinsights_sitenote_active":false,"_monsterinsights_sitenote_note":"","_monsterinsights_sitenote_category":0,"spay_email":"","footnotes":""},"categories":[138],"tags":[],"class_list":["post-3807","post","type-post","status-publish","format-standard","hentry","category-bookkeeping"],"jetpack_featured_media_url":"","_links":{"self":[{"href":"https:\/\/hiper.ao\/mideamodocacimbo\/wp-json\/wp\/v2\/posts\/3807","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/hiper.ao\/mideamodocacimbo\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/hiper.ao\/mideamodocacimbo\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/hiper.ao\/mideamodocacimbo\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/hiper.ao\/mideamodocacimbo\/wp-json\/wp\/v2\/comments?post=3807"}],"version-history":[{"count":1,"href":"https:\/\/hiper.ao\/mideamodocacimbo\/wp-json\/wp\/v2\/posts\/3807\/revisions"}],"predecessor-version":[{"id":3808,"href":"https:\/\/hiper.ao\/mideamodocacimbo\/wp-json\/wp\/v2\/posts\/3807\/revisions\/3808"}],"wp:attachment":[{"href":"https:\/\/hiper.ao\/mideamodocacimbo\/wp-json\/wp\/v2\/media?parent=3807"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/hiper.ao\/mideamodocacimbo\/wp-json\/wp\/v2\/categories?post=3807"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/hiper.ao\/mideamodocacimbo\/wp-json\/wp\/v2\/tags?post=3807"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}