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Sales Tax Calculator And Rate Lookup Tool

November 10, 2021
Bill Kimball
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" alt="how to calculate sales tax" class="aligncenter" style="display: block;margin-left:auto;margin-right:auto;" width="350" height="320" /></p> <p>To get started, update sales prices for your items to add the relevant tax amount, and organize items into departments that represent each tax rate. Because ShopKeep does not officially support tax-inclusive pricing or VAT, you will need to manually calculate the estimated amount of tax collected at the register. A sales tax decalculator will tell you the pre-tax price of a good or service when the total price and tax rate are known. One of the best ways to avoid a sales tax audit is by registering in any state where you have a nexus.</p> </p> <ul> <li>Businesses and their employees need to know what sales tax is, why they must collect it and how to calculate the correct sales tax amount on each purchase.</li> <li>Last, we can check this answer by calculating the sales tax percentage of the total as seen previously.</li> <li>Here are the most common exemptions where sales tax won&rsquo;t apply.</li> <li>Therefore 7% is the total amount of tax rate you have paid on purchasing the two items.</li> <li>You can also determine the sales tax by dividing the total amount of tax you have paid as a buyer by the item&rsquo;s price before the tax.</li> <li>Postal Service with the delivery of mail and are independent of any state revenue systems.</li> </ul> <p>Intuit Inc. does not warrant that the material contained herein will continue to be accurate nor that it is completely free of errors when published. Attorneys who specialize in tax law can review your records and identify areas that increase your risk of fines because of sales tax errors. Work with an experienced tax law firm to maintain accurate records and to prepare for a possible audit. Online transactions are trickier when it comes to sales tax collection for small businesses, especially in this past year. Use QuickBooks&rsquo; guide to learn everything you need to know about sales tax.</p> </p> <p><h2>Connect With Avalara For More Accurate Rates To Help You Do Tax Compliance Right</h2> </p> <p>Businesses should learn what products are exempt from the sales tax in their area and regularly check for changes. The cost a customer pays when purchasing goods or services from a business includes both the company&#8217;s sales price and the cost of applicable sales taxes.</p> </p> <p><img 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" alt="how to calculate sales tax" class="aligncenter" style="display: block;margin-left:auto;margin-right:auto;" width="396" height="299" /></p> <p>Both of these errors increase your company&rsquo;s risk of audit penalties, fines, and fees. Check out this article formore information on how to correctly determine sales tax. Avalara simplifies sales tax registration by letting you use one form to register in all your states.</p> </p> <p><h2>Resale Products</h2> </p> <p>In this case, you can calculate the total amount of tax paid by adding 100% to the total sales tax rate. This hundred percent is synonymous with the pre-tax amount of the product purchased.</p> </p> <div itemScope itemProp="mainEntity" itemType="https://schema.org/Question"> <div itemProp="name"> <h3>How do you calculate 5.5 sales tax?</h3> </div> <div itemScope itemProp="acceptedAnswer" itemType="https://schema.org/Answer"> <div itemProp="text"> <p>If you&#8217;re using ​5.5 percent​, you&#8217;ll get a new representation of ​0.055​ after dividing by ​100​. The next step is to add a value of ​&#8221;1&#8243;​ to the decimal form of your sales tax. Using the ​0.055​ carried over from the previous step, you should now have a value of ​1.055​ on your calculator screen.</p> </div></div> </div> <p>Therefore 7% is the total amount of tax rate you have paid on purchasing the two items. A small but significant monetary compensation paid to the government as a response for the items and goods purchased is called a sales tax. This amount of money is usually collected by the sellers responsible for collecting funds as part of the customers&rsquo; tax when an item is purchased. The governments impose this rule in most countries, especially on services, facilities, and goods. These are known as conventional or retail sales tax and are only applicable to the end-user who obtains the good.</p> </p> <p>Then, you can multiply that resulted amount by the tax rate and get yourself a total sales tax dollar amount. It has now become easier to understand and determine the cost margin for consumers and the buyer.</p> </p> <p>However, the socks are not exempt, so the customer must still pay a sales tax on those items. In the end, Maggie&#8217;s General Store charges the customer $12.78 for the socks (a 6.5% sales tax applied), bringing the total purchase amount to $100.78. Enter your city and zip code below to find the combined sales tax rate for a location.</p> </p> <p><h2>What Is The Sales Tax Formula?</h2> </p> <p>Input the amount and the sales tax rate, select whether to include or exclude sales tax, and the calculator will do the rest. If you don&rsquo;t know the rate, download the free lookup tool on this page to find the right combined NYC rate.</p> </p> <p>Because it is in lieu of your having to add all of your general sales tax payments from your receipts, which you are always entitled to do. In addition to sales tax, you pay the fees for vehicle registration and licensing. When buying through a typical dealership, you pay these fees directly to the dealer as part of your sales agreement, and the dealership processes the paperwork. On a private sale, you file these documents with your local vehicle tax office and pay the tax, title and registration fees at that point. Certain factors reduce the net sales price on which your tax is calculated. If you trade a vehicle in, for instance, the trade-in allowance is subtracted from the agreed-upon price in some states. Thus, when negotiating your deal, it is usually better to have the value of your car factored as a trade-in rather than selling it separately where the allowance isn&#8217;t applied.</p> </p> <p><img 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" alt="how to calculate sales tax" class="aligncenter" style="display: block;margin-left:auto;margin-right:auto;" width="480" height="360" /></p> <p>Input the total cost of the product or service being sold, and the total sales tax rate from step one. Many state and local governments impose a sales tax to raise revenues to offset the cost of services these governments provide. The seller must calculate the tax, and add it to the price of the goods sold. This assumes residents purchase taxable items throughout the locality, not just in <a href="https://www.bookstime.com/articles/how-to-calculate-sales-tax">how to calculate sales tax</a> the taxing jurisdiction where they reside. It&#8217;s important for businesses to know which of their items are subject to sales taxes and which ones are not, especially if you sell different kinds of things. For example, New Jersey does not charge a sales tax on any clothing. If your New Jersey business sells both t-shirts and toys, you should charge a sales tax on the toys and not the shirts.</p> </p> <p>Do not collect tax on tax-free items during a sales tax holiday. You must collect sales tax if your business has a presence in a state that imposes sales tax. To find the tax, multiply the pre-tax total times .11 (the decimal form of 11%).</p> </p> <p>Isolate the sales tax percentage to the left side of the equation by dividing each side by the pre-tax value. Next, create a ratio of the sales tax to the pre-tax cost of the items. Multiple the pre-tax value by the newly calculated decimal value in order to find the cost of the sales tax.</p> </p> <p><h2>How To Calculate Sales Tax Backwards From Total?</h2> </p> <p>Alaska, Delaware, Montana, New Hampshire, and Oregon do not enforce sales tax. Although there is no state-mandated sales tax in these five states, keep in mind that there might be local sales tax laws that require you to collect.</p> </p> <p>This is important to know for businesses that operate by distributing their products in bulk to other outlets. Check with the laws in your area to ensure you do not unnecessarily charge a sales tax. If your business consists of mostly selling products to others who will then resell them, you may not need to pay sales tax.</p> </p> <p><h2>Pay</h2> </p> <p>As a member, you&#8217;ll also get unlimited access to over 84,000 lessons in math, English, science, history, and more. Plus, get practice tests, quizzes, and personalized coaching to help you succeed. Review sales tax updates and trends with your 2021 sales tax changes report, and get a forecast of what&rsquo;s to come. These are the current rates for the date and time you submitted the address, but may change at any time with new tax legislation. The easier way to connect with customers, suppliers and staff, and watch your business grow. Set up recurring direct debits from your Wise account, where payments will be automatically taken out on schedule.</p> </p> <div itemScope itemProp="mainEntity" itemType="https://schema.org/Question"> <div itemProp="name"> <h3>How much taxes do they take out of a 900 dollar check?</h3> </div> <div itemScope itemProp="acceptedAnswer" itemType="https://schema.org/Answer"> <div itemProp="text"> <p>The amount your employer deducts from your check for federal income tax is based on your filing status and the amount of money you make. For example, in 2018, suppose you were single and earning $9,000 per year. You would be taxed 10 percent or $900, which averages out to $17.31 out of each weekly paycheck.</p> </div></div> </div> <p>Origin-based states are Arizona, Illinois, Mississippi, Missouri, New Mexico, Ohio, Pennsylvania, Tennessee, Texas, Utah, and Virginia. California is considered a &ldquo;mixed-sourcing state&rdquo; since the state, city, and county taxes are origin-based, but the district sales taxes are destination-based. To try to make sales taxes affect everyone more equally, laws often exempt particular goods and services from these taxes. That means that you don&rsquo;t have to pay sales taxes when you buy certain things — usually items that are considered necessities of life.Exemptions vary among states and local areas. In many states, food, medical expenses, and educational expenses are exempt from sales tax. For example, a boutique that buys shirts from a wholesaler will be exempt from sales tax on that purchase.</p> </p> <p>Add those three different taxes up, and you get the Atlanta total sales tax rate of 8.9%. The good news is that you are only required to collect sales tax in a state where you have &ldquo;sales tax nexus.&rdquo; Nexus just means that you are subject to a state&rsquo;s sales tax laws. You&rsquo;ll always have sales tax nexus in the state where you operate your business. Employees, a physical store, a warehouse presence and other business activities create sales tax nexus. If you have nexus in a state, then that state generally requires you to collect sales tax from buyers in the state. It only applies to the purchase of goods or services that are eligible for taxation but on which the consumer did not pay sales tax for some reason.</p> </p> <p>Once the sales tax has been calculated it needs to be added to the pre-tax value in order to find the total cost of the item. If a magazine costs $2.35 and has a 6% sales tax, then what is the total cost of the item. First, we need to convert the sales tax percentage into a decimal by moving the point two spaces to the left.</p> </p> <p><h2>Calculating Sales Tax During A Tax Holiday</h2> </p> <p>Online retailers are responsible for collecting sales tax on sales only in states where they have nexus. This can be a lot of work if they sell in many places; automated services can help keep everything straight. For example, some point-of-sale platforms track tax liabilities. Sourcing rules indicate the location at which the state believes sales should be taxed. Some states (called &ldquo;origin-based&rdquo;) tax the sale at the seller&rsquo;s location, while others (&ldquo;destination-based&rdquo;) tax the sale at the buyer&rsquo;s location.</p> </p> <p>Last, create a proportion where the pre-tax value is proportional to 100% and solve for the percentage of sales tax. Last, add this value to the pre-tax value of the item to find the total cost. It is an indirect sales tax applied to certain goods and services at multiple instances in a supply chain. Taxations across multiple countries that impose either a &#8220;GST&#8221; or &#8220;VAT&#8221; are so vastly different that neither word can properly define them.</p> </p> <p>First, subtract the pre-tax value from the total cost of the items to find the sales tax cost. Add the sales tax value to the pre-tax value to calculate the total cost. Some states may have another type of rate — as a special taxing district.</p> </p> <p><h2>Price Discount Factors</h2> </p> <p>Sales tax is a direct tax on the purchase of goods and services. Residents in more than 160 countries around the world pay VAT, including all countries in Europe. Suppose your total sales tax rate is 7.25 percent, and you sold ​$15,000​ worth of goods over the last month. You haven&#8217;t tracked sales tax, but now it&#8217;s time to pay your collected tax to the state. First, you go over your receipts and discover ​$1,000​ of goods was, under state law, exempt from tax.</p> "

how to calculate sales tax

To get started, update sales prices for your items to add the relevant tax amount, and organize items into departments that represent each tax rate. Because ShopKeep does not officially support tax-inclusive pricing or VAT, you will need to manually calculate the estimated amount of tax collected at the register. A sales tax decalculator will tell you the pre-tax price of a good or service when the total price and tax rate are known. One of the best ways to avoid a sales tax audit is by registering in any state where you have a nexus.

  • Businesses and their employees need to know what sales tax is, why they must collect it and how to calculate the correct sales tax amount on each purchase.
  • Last, we can check this answer by calculating the sales tax percentage of the total as seen previously.
  • Here are the most common exemptions where sales tax won’t apply.
  • Therefore 7% is the total amount of tax rate you have paid on purchasing the two items.
  • You can also determine the sales tax by dividing the total amount of tax you have paid as a buyer by the item’s price before the tax.
  • Postal Service with the delivery of mail and are independent of any state revenue systems.

Intuit Inc. does not warrant that the material contained herein will continue to be accurate nor that it is completely free of errors when published. Attorneys who specialize in tax law can review your records and identify areas that increase your risk of fines because of sales tax errors. Work with an experienced tax law firm to maintain accurate records and to prepare for a possible audit. Online transactions are trickier when it comes to sales tax collection for small businesses, especially in this past year. Use QuickBooks’ guide to learn everything you need to know about sales tax.

Connect With Avalara For More Accurate Rates To Help You Do Tax Compliance Right

Businesses should learn what products are exempt from the sales tax in their area and regularly check for changes. The cost a customer pays when purchasing goods or services from a business includes both the company’s sales price and the cost of applicable sales taxes.

how to calculate sales tax

Both of these errors increase your company’s risk of audit penalties, fines, and fees. Check out this article formore information on how to correctly determine sales tax. Avalara simplifies sales tax registration by letting you use one form to register in all your states.

Resale Products

In this case, you can calculate the total amount of tax paid by adding 100% to the total sales tax rate. This hundred percent is synonymous with the pre-tax amount of the product purchased.

How do you calculate 5.5 sales tax?

If you’re using ​5.5 percent​, you’ll get a new representation of ​0.055​ after dividing by ​100​. The next step is to add a value of ​”1″​ to the decimal form of your sales tax. Using the ​0.055​ carried over from the previous step, you should now have a value of ​1.055​ on your calculator screen.

Therefore 7% is the total amount of tax rate you have paid on purchasing the two items. A small but significant monetary compensation paid to the government as a response for the items and goods purchased is called a sales tax. This amount of money is usually collected by the sellers responsible for collecting funds as part of the customers’ tax when an item is purchased. The governments impose this rule in most countries, especially on services, facilities, and goods. These are known as conventional or retail sales tax and are only applicable to the end-user who obtains the good.

Then, you can multiply that resulted amount by the tax rate and get yourself a total sales tax dollar amount. It has now become easier to understand and determine the cost margin for consumers and the buyer.

However, the socks are not exempt, so the customer must still pay a sales tax on those items. In the end, Maggie’s General Store charges the customer $12.78 for the socks (a 6.5% sales tax applied), bringing the total purchase amount to $100.78. Enter your city and zip code below to find the combined sales tax rate for a location.

What Is The Sales Tax Formula?

Input the amount and the sales tax rate, select whether to include or exclude sales tax, and the calculator will do the rest. If you don’t know the rate, download the free lookup tool on this page to find the right combined NYC rate.

Because it is in lieu of your having to add all of your general sales tax payments from your receipts, which you are always entitled to do. In addition to sales tax, you pay the fees for vehicle registration and licensing. When buying through a typical dealership, you pay these fees directly to the dealer as part of your sales agreement, and the dealership processes the paperwork. On a private sale, you file these documents with your local vehicle tax office and pay the tax, title and registration fees at that point. Certain factors reduce the net sales price on which your tax is calculated. If you trade a vehicle in, for instance, the trade-in allowance is subtracted from the agreed-upon price in some states. Thus, when negotiating your deal, it is usually better to have the value of your car factored as a trade-in rather than selling it separately where the allowance isn’t applied.

how to calculate sales tax

Input the total cost of the product or service being sold, and the total sales tax rate from step one. Many state and local governments impose a sales tax to raise revenues to offset the cost of services these governments provide. The seller must calculate the tax, and add it to the price of the goods sold. This assumes residents purchase taxable items throughout the locality, not just in how to calculate sales tax the taxing jurisdiction where they reside. It’s important for businesses to know which of their items are subject to sales taxes and which ones are not, especially if you sell different kinds of things. For example, New Jersey does not charge a sales tax on any clothing. If your New Jersey business sells both t-shirts and toys, you should charge a sales tax on the toys and not the shirts.

Do not collect tax on tax-free items during a sales tax holiday. You must collect sales tax if your business has a presence in a state that imposes sales tax. To find the tax, multiply the pre-tax total times .11 (the decimal form of 11%).

Isolate the sales tax percentage to the left side of the equation by dividing each side by the pre-tax value. Next, create a ratio of the sales tax to the pre-tax cost of the items. Multiple the pre-tax value by the newly calculated decimal value in order to find the cost of the sales tax.

How To Calculate Sales Tax Backwards From Total?

Alaska, Delaware, Montana, New Hampshire, and Oregon do not enforce sales tax. Although there is no state-mandated sales tax in these five states, keep in mind that there might be local sales tax laws that require you to collect.

This is important to know for businesses that operate by distributing their products in bulk to other outlets. Check with the laws in your area to ensure you do not unnecessarily charge a sales tax. If your business consists of mostly selling products to others who will then resell them, you may not need to pay sales tax.

Pay

As a member, you’ll also get unlimited access to over 84,000 lessons in math, English, science, history, and more. Plus, get practice tests, quizzes, and personalized coaching to help you succeed. Review sales tax updates and trends with your 2021 sales tax changes report, and get a forecast of what’s to come. These are the current rates for the date and time you submitted the address, but may change at any time with new tax legislation. The easier way to connect with customers, suppliers and staff, and watch your business grow. Set up recurring direct debits from your Wise account, where payments will be automatically taken out on schedule.

How much taxes do they take out of a 900 dollar check?

The amount your employer deducts from your check for federal income tax is based on your filing status and the amount of money you make. For example, in 2018, suppose you were single and earning $9,000 per year. You would be taxed 10 percent or $900, which averages out to $17.31 out of each weekly paycheck.

Origin-based states are Arizona, Illinois, Mississippi, Missouri, New Mexico, Ohio, Pennsylvania, Tennessee, Texas, Utah, and Virginia. California is considered a “mixed-sourcing state” since the state, city, and county taxes are origin-based, but the district sales taxes are destination-based. To try to make sales taxes affect everyone more equally, laws often exempt particular goods and services from these taxes. That means that you don’t have to pay sales taxes when you buy certain things — usually items that are considered necessities of life.Exemptions vary among states and local areas. In many states, food, medical expenses, and educational expenses are exempt from sales tax. For example, a boutique that buys shirts from a wholesaler will be exempt from sales tax on that purchase.

Add those three different taxes up, and you get the Atlanta total sales tax rate of 8.9%. The good news is that you are only required to collect sales tax in a state where you have “sales tax nexus.” Nexus just means that you are subject to a state’s sales tax laws. You’ll always have sales tax nexus in the state where you operate your business. Employees, a physical store, a warehouse presence and other business activities create sales tax nexus. If you have nexus in a state, then that state generally requires you to collect sales tax from buyers in the state. It only applies to the purchase of goods or services that are eligible for taxation but on which the consumer did not pay sales tax for some reason.

Once the sales tax has been calculated it needs to be added to the pre-tax value in order to find the total cost of the item. If a magazine costs $2.35 and has a 6% sales tax, then what is the total cost of the item. First, we need to convert the sales tax percentage into a decimal by moving the point two spaces to the left.

Calculating Sales Tax During A Tax Holiday

Online retailers are responsible for collecting sales tax on sales only in states where they have nexus. This can be a lot of work if they sell in many places; automated services can help keep everything straight. For example, some point-of-sale platforms track tax liabilities. Sourcing rules indicate the location at which the state believes sales should be taxed. Some states (called “origin-based”) tax the sale at the seller’s location, while others (“destination-based”) tax the sale at the buyer’s location.

Last, create a proportion where the pre-tax value is proportional to 100% and solve for the percentage of sales tax. Last, add this value to the pre-tax value of the item to find the total cost. It is an indirect sales tax applied to certain goods and services at multiple instances in a supply chain. Taxations across multiple countries that impose either a “GST” or “VAT” are so vastly different that neither word can properly define them.

First, subtract the pre-tax value from the total cost of the items to find the sales tax cost. Add the sales tax value to the pre-tax value to calculate the total cost. Some states may have another type of rate — as a special taxing district.

Price Discount Factors

Sales tax is a direct tax on the purchase of goods and services. Residents in more than 160 countries around the world pay VAT, including all countries in Europe. Suppose your total sales tax rate is 7.25 percent, and you sold ​$15,000​ worth of goods over the last month. You haven’t tracked sales tax, but now it’s time to pay your collected tax to the state. First, you go over your receipts and discover ​$1,000​ of goods was, under state law, exempt from tax.