{"id":7135,"date":"2021-03-29T14:54:12","date_gmt":"2021-03-29T11:54:12","guid":{"rendered":"https:\/\/fournos-culture.gr\/el\/?p=7135"},"modified":"2023-02-23T16:54:31","modified_gmt":"2023-02-23T14:54:31","slug":"spread-option-calculator","status":"publish","type":"post","link":"https:\/\/fournos-culture.gr\/el\/spread-option-calculator\/","title":{"rendered":"Spread Option 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;\">Contents<\/p>\n<ul class=\"toc_list\">\n<li><a href=\"#toc-0\">Bear put spread<\/a><\/li>\n<li><a href=\"#toc-1\">ProbabilityCalc Online<\/a><\/li>\n<li><a href=\"#toc-2\">Debit Spread<\/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=\"https:\/\/forexarticles.net\/wp-content\/uploads\/2020\/10\/image-L0KplejNgGOM8bDd-400x260.jpg\" width=\"305px\" alt=\"strike\"\/><\/p>\n<p>Generally, interest rates have to be higher than 15%-20% for American commodity options to differ substantially in value from European options with the same terms. American options differ from European options because they can be exercised at any time. If there is a possibility that it will be more profitable to exercise the option than sell it, an American option will have more value than a corresponding European option.<\/p>\n<p><img decoding=\"async\" class='wp-post-image' style='display: block;margin-left:auto;margin-right:auto;' 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\" width=\"302px\" alt=\"loss\"\/><\/p>\n<p>MIS+ allows you to take your Intraday trading to newer heights! With the recently launched MIS+ in the Options segment, you get higher leverage for Intraday trading in NIFTY &#038; Bank NIFTY Options! Read up on MIS+ in the Options segment inthis blog article. The option chain API accepts the following query parameters. Forward Start provides the theoretical value, delta and gamma of an option using the Forward Start model.<\/p>\n<ul>\n<li>If the treasury curve is used for discountig, the bond performance is bencharked to Treasuries.<\/li>\n<li>Search a symbol to visualize the potential profit and loss for a bull call spread option strategy.<\/li>\n<li>The most liquid or widely traded securities tend to have the narrowest spreads, as long as there are no major supply and demand imbalances.<\/li>\n<li>The MPC calculator lets you compute the value of the marginal propensity to consume and shows you the corresponding consumption function.<\/li>\n<li>This documentation assumes that the reader is already familiar with options terminology.<\/li>\n<\/ul>\n<p>In practice, these assumptions are not particularly limiting. The primary limitation imposed by these <a href=\"https:\/\/bigbostrade.com\/\">https:\/\/bigbostrade.com\/<\/a>s is that it is possible to describe the dispersion of prices at some point in the future in a mathematical equation. Update the greek calculations for American Options &#8211; currently the Greeks are approximated by the greeks from GBS model. CEV provides the theoretical value and risk sensitivities of an option using the CEV and CEV Futures models. Binomial is an easy tool that can calculate the fair value of an equity option based on the Black-Scholes , Whaley and Binomial Models along with the Greek sensitivities.<\/p>\n<p>The rate considered is the weighted average of trade execution rate and not the net rate after transaction charges and statutory levy. The offer is open only for a limited period at the sole discretion of the company and applicable only to new accounts opened up to June 30, 2023. The offer is only for waiver of account opening charges of Rs 354. All other charges as well as taxes and other statutory\/Exchange charges continue to apply.<\/p>\n<h2 id=\"toc-0\">Bear put spread<\/h2>\n<p>While an exact closed form solution does not exist to value spread options, approximate solutions can give reasonably accurate results. Kirk\u2019s approximation uses a Black Scholes style framework to analyze the joint distribution that results from the ratio of two log-normal distributions. References to over-the-counter (\u201cOTC\u201d) products or swaps are made on behalf of StoneX Markets LLC (\u201cSXM\u201d), a member of the National Futures Association (\u201cNFA\u201d) and provisionally registered with the U.S. Commodity Futures Trading Commission (\u201cCFTC\u201d) as a swap dealer.<\/p>\n<p><img decoding=\"async\" class='aligncenter' style='display: block;margin-left:auto;margin-right:auto;' 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\" width=\"306px\" alt=\"black scholes equation\"\/><\/p>\n<p>You can change these defaults by selecting a specific date for any of the three lines. You can also view the numerical probability of reaching a specific target, above and below the current price, by expiration. To do this, move the vertical slider bars with your mouse or enter prices for the lower and upper targets . The Calendar Call Spread Calculator can be used to chart theoretical profit and loss (P&#038;L) for a calendar call position.<\/p>\n<p>From a mathematical perspective, valuing an Asian option is slightly complicated since the average of a set of log-normal distributions is not itself log-normally distributed. However, a reasonably good approximation of the correct answer is not too difficult to obtain. An important concept of Black Scholes models is that the actual way that the underlying asset drifts over time isn&#8217;t important to the valuation. This is why the primary limitation of the model is being able to describe the dispersion of prices at some point in the future, not that the dispersion process is simplistic. As a futures trader, it is critical to understand exactly what your potential risk and reward will be in monetary terms on any given trade. Use our Futures Calculator to quickly establish your potential profit or loss on a futures trade.<\/p>\n<p>In cases like this, your available capital will only have to cover the <a href=\"https:\/\/forex-world.net\/\">https:\/\/forex-world.net\/<\/a> loss, and that can be easily determined with the use of the credit spread calculator. However, many traders prefer to set up their own options spread calculations specifically designed for their trading style and goals. This can be done through the use of complex, algorithmic software, but in most cases an Excel spreadsheet is sufficient. Delta is often used as an instantaneous forecast of the approximate probability of an option contract expiring in the money. Just keep in mind that Delta is calculated continuously, so it will generally increase or decrease as the underlying stock price changes.<\/p>\n<h2 id=\"toc-1\">ProbabilityCalc Online<\/h2>\n<p>The slope of the yield curve provides an estimate of expected interest rate fluctuations in the future and the level of economic activity. InterpolationInterpolation is the mathematical procedure applied to derive value in between two points having a prescribed value. It approximates the value of a given function at a given set of discrete points. It can be applied in estimating varied concepts of cost, mathematics, statistics. Spread differs from OAS only to the tune of options cost.<\/p>\n<p>Two models are shown below, both created by Bjerksund and Stensland. The second model is a refinement of the first model, adding more complexity, in exchange for better accuracy. In the case of Asian options on futures, it is possible to use a modified Black-76 formula that replaces the implied volatility term with an adjusted implied volatility of the average price. As long as the first day of the averaging period is in the future, the following formula can be used to value Asian options .<\/p>\n<p>The code below is what I use on my charts, both for underlying and options&#8230; Feel free to use the whole script or strip out what you don&#8217;t need or modify it to better suit you needs&#8230; You are now leaving the TD Ameritrade Web site and will enter an unaffiliated third-party website to access its products and its posted services. The third-party site is governed by its posted privacy policy and terms of use, and the third-party is solely responsible for the content and offerings on its website. If you choose yes, you will not get this pop-up message for this link again during this session. For the examples below, remember to multiply the option premium by 100, the multiplier for standard U.S. equity option contracts.<\/p>\n<p>This will result in quote currency and respectively will be converted to account currency. Margin Calculator Use proper risk management by calculating your risk with just a few clicks. Document tracking is sometimes viewed as a back-office function that deserves minimal strategic thought. Banks that hold this opinion tend to struggle with inef &#8230; INVESTMENT BANKING RESOURCESLearn the foundation of Investment banking, financial modeling, valuations and more. Use of advanced models like Monte Carlo analysis in simulation.<\/p>\n<p>Select the desired futures market by clicking the drop-down menu. Charts, screenshots, company stock symbols and examples contained in this module are for illustrative purposes only. Prior to giving formulas for Greeks lets introduce a few helper equations which may help in implementing the formulas found across the section. To access the premium indicators, which are plug and play ready, sign up for VIP membership here. They will populate as soon as the option starts trading&#8230; After that we\u2019ll take it one step further and show you how to choose your trade size by looking at a trade\u2019s risk parameters in the context of your overall portfolio risk.<\/p>\n<p><img decoding=\"async\" class='aligncenter' style='display: block;margin-left:auto;margin-right:auto;' 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\" width=\"304px\" alt=\"cash flows\"\/><\/p>\n<p>The long call spread strategy has a setup of buying 1 call option, and selling one call option. This strategy is a  bullish strategy, and also is in the category of a vertical spread. The maximum profit is the difference between the two strike prices. A credit spread option strategy is where the premium received by being short in the contract is more significant than the price paid for being long. The two vertical spread options strategies with net credit spread are the bull put spread and bear call spread. Spread options are based on the spread between two commodity prices.<\/p>\n<h2 id=\"toc-2\">Debit Spread<\/h2>\n<p>Build option strategies with live quotes with Options Profit Calculator and visualize profit\/loss at various stock prices. Visually understand how your option trades are impacted by time decay, implied volatility, and more. Search a symbol to visualize the potential profit and loss for a bull put spread option strategy.<\/p>\n<p><img decoding=\"async\" class='aligncenter' style='display: block;margin-left:auto;margin-right:auto;' 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width=\"305px\" alt=\"market price\"\/><\/p>\n<p>For more information, see the developer\u2019s privacy policy. I wish I had the choice to make it show none moving indexes instead of my strategies. Finally, this removes a lot of emotion from the decision making process. Instead of entering the trade in the spur of the moment, further analyses of the trade is required. All expressions of opinion are subject to change without notice in reaction to shifting market conditions.<\/p>\n<h2 id=\"toc-3\">Trading profit\/loss visualizer<\/h2>\n<p>Shop around for the narrowest <a href=\"https:\/\/forexarticles.net\/\">https:\/\/forexarticles.net\/<\/a>s among the many forex brokers who specialize in retail clientele to improve your odds of trading success. AccuSystems, an Alogent company, helps financial institutions reduce risk and increase efficiency with document  management software. By combining bank document imaging, loan management workflows, and exception management, the company\u2019s products help banks and credit unions throughout the United States create control and accountability. Your financial institution has made a significant investment in its financial monitoring workflow. The latest credit spread software and a well-trained credit a &#8230;<\/p>\n<p>The Black Scholes genre options formulas assume that volatility is constant across the life of the option contract. Evaluate the spread to add to the zero coupon rates of all maturities to retrieve the market price. I like your idea about an option to show exchange quotes and I want to get more information on the crash you experienced. I will be waiting for your email and look forward to hearing from you.<\/p>\n<p>While these formulas may look complicated at first glance, most of the terms can be found as part of an options contract or are prices readily available in the market. The only term that is difficult to calculate is the implied volatility (\u03c3). Implied volatility is typically calculated using prices of other options that have recently been traded.<\/p>\n<h2 id=\"toc-4\">Futures Market Details<\/h2>\n<p>This is due to strike price not being present valued in immediate execution but the payoff of a European option is discounted (forward price &#8211; strike price). The call spread calculator is specifically targeting a bullish debit trade. As the stock price, and thus the option price increases, profit would increase as illustrated above, and as the price decreases, the put strike that can be bought to offset loss would result in a maximum loss. The following section will cover examples for the four vertical spread option strategies in our options spread calculator. For the bearish and bullish strategies, we will add a few fundamental recommendations to help you accomplish a better return on investment .<\/p>\n<p>Its broker-dealer subsidiary, Charles Schwab &#038; Co., Inc. , offers investment services and products, including Schwab brokerage accounts. Its banking subsidiary, Charles Schwab Bank, SSB , provides deposit and lending services and products. Access to Electronic Services may be limited or unavailable during periods of peak demand, market volatility, systems upgrade, maintenance, or for other reasons. Probability of the option expiring above the upper slider bar.If you set the upper slider bar to 145, this would equal the approximate Delta of the 145 call (.3762) or 37.62%. Since 145 is the call you&#8217;re considering for purchase, this is also the same as the probability of the option expiring in the money.<\/p>\n","protected":false},"excerpt":{"rendered":"<p>Contents Bear put spread ProbabilityCalc Online Debit Spread Generally, interest rates have to be higher than 15%-20% for American commodity options to differ substantially in value from European options with the same terms. American options differ from European options because they can be exercised at any time. If there is a possibility that it will be more profitable to exercise [&hellip;]<\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"closed","ping_status":"closed","sticky":false,"template":"","format":"standard","meta":{"inline_featured_image":false,"footnotes":""},"categories":[182],"tags":[],"class_list":["post-7135","post","type-post","status-publish","format-standard","hentry","category-forex-trading"],"yoast_head":"<!-- This site is optimized with the Yoast SEO plugin v27.4 - https:\/\/yoast.com\/product\/yoast-seo-wordpress\/ -->\n<title>Spread Option Calculator - \u0398\u03ad\u03b1\u03c4\u03c1\u03bf \u03a6\u03bf\u03cd\u03c1\u03bd\u03bf\u03c2<\/title>\n<meta name=\"robots\" content=\"noindex, follow\" \/>\n<meta property=\"og:locale\" content=\"el_GR\" \/>\n<meta property=\"og:type\" content=\"article\" \/>\n<meta property=\"og:title\" content=\"Spread Option Calculator - \u0398\u03ad\u03b1\u03c4\u03c1\u03bf \u03a6\u03bf\u03cd\u03c1\u03bd\u03bf\u03c2\" \/>\n<meta property=\"og:description\" content=\"Contents Bear put spread ProbabilityCalc Online Debit Spread Generally, interest rates have to be higher than 15%-20% for American commodity options to differ substantially in value from European options with the same terms. 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