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Chapter 16 -Math & Measurement Skills
Workforce EssentialsMs. Baumgartner
Chapter 16 Objectives• Identify occupations requiring math and
measurement skills• Apply math skills to computation of total
purchase amount, trade discount, cash discount, markup, sales tax, and markdown
• Calculate surface measures and volume measures
• Convert measures from one unit to another
Lesson 16.1 Basic Math• This lesson explains some common uses
of math at work• These uses are called ‘business math’• Many occupations require business math
skills• The following examples show some
common ways in which math is used on the job
• They are total purchase amount, trade discount, cash discount, markup, sales tax, and markdown
Lesson 16.1 Basic Math
Total Purchase Amount• Most of your purchases involve single
items• Ex) You buy a pair of running shoes for
$54.95, the total amount of your purchase is easy to figure:1 x $54.95 = $54.95 (plus tax, in most states)
• Businesses often buy large numbers of the same item
• A sporting goods store might buy dozens of pairs of running shoes
Lesson 16.1 Basic Math
Total Purchase Amount• To find the total amount of the purchase,
multiply the number of items by the price of one item (the unit price)
• PROBLEM: Figure the total amount of a purchase of 24 pair of shoes at $42.95 each, 15 pairs of socks at $1.85 each, and 3 dozen packages of shoelaces at $0.89 each…
Lesson 16.1 Basic Math• Total Purchase Amount• SOLUTION: Quantity x Unit price x =
AmountShoes: 24 x $42.95 = Socks: 15 x $1.85 = Laces: 36 x $0.89 = Total Amount = • This skill is important when preparing
invoices, a bill for goods, example on page 225
Lesson 16.1 Basic Math
Trade Discount• A trade discount is a deduction from the
catalog (list or suggested retail) price of an item
• Trade discounts are usually given to retailers to enable them to sell merchandise at a greater profit
• In some cases, buyers get special discounts when ordering large quantities
Lesson 16.1 Basic Math
Trade Discount• PROBLEM: An office desk is listed in a
catalog at $680. Business customers can buy the desk at a trade discount of 30%. How much will a business have to pay for the desk?
• SOLUTION: 30% = .30 $680 $680 x .30 - discount Net purchase
price
Lesson 16.1 Basic Math
Cash Discount• Every sale between a business buyer and
seller involves terms, these state the time limit within which the buyer must pay
• A common term of sale is “net due in 30 days”, this means that the buyer has 30 days in which to pay the bill
• After 30 days, the buyer must pay the price plus interest
Lesson 16.1 Basic Math
Cash Discount• To encourage prompt payment, the seller
may offer a cash discount• A cash discount is a reduction in price,
often several %, often to a buyer to encourage early payment on an account
• The buyer saves money, while the seller has a paid account
Lesson 16.1 Basic Math
Cash Discount• PROBLEM: An invoice for $510 has terms
of net due in 30 days with a 3% discount given for payment within 10 days. What is the sale price if the buyer pays within 10 days?
• SOLUTION: 3% = .03 $510 $510 x .03 - discount Net amount of
payment
Lesson 16.1 Basic Math
Markup• A retailer buys good from a supplier to
resell• Remember the running shoes? The price
the store paid is called the ‘cost price’• To make money, the retailer then added
an amount, the markup, to the cost price• Selling price = cost price + markup
Lesson 16.1 Basic Math
Markup• PROBLEM: An item costs $28; its selling
price is $45. How much is the markup?• SOLUTION: $ Selling price -$ Cost price Markup
Businesses mark up merchandise to
cover their expenses and make
a profit
Lesson 16.1 Basic Math
Percent Markup• PROBLEM: Based on the cost price, what
is the percent of markup? • Percent of markup = markup / cost price• SOLUTION:$7 / $28 = (convert answer to %)
Lesson 16.1 Basic Math
Markup• Businesses know how much markup will
give them enough money to cover expenses and make a fair profit, so they add the markup to an item before trying to sell it
• PROBLEM: A radio costs $42 and will be sold at a markup of 30% of the cost price. What is the selling price? (reverse the previous problem!)
Lesson 16.1 Basic Math
Percent Markup• SOLUTION: $42 cost pricex .30 markup
$42 cost price+ markup selling price
Lesson 16.1 Basic Math
Sales Tax• Most states and cities have sales tax on
goods and services• Sales tax usually range between 1-7 %• The sales tax is added on to the purchase
price of goods and services
Lesson 16.1 Basic Math
Sales Tax• PROBLEM: Someone buys a sweater for
$38 and a pair of slacks for $46. a 5% sales tax is added to the purchase price. What is the total amount of the purchase?
• SOLUTION: $38 + $46 purchase price
Lesson 16.1 Basic Math
Markdown• Most retail stores have periodic sales to
move slow-selling merchandise, clear out end-of-season goods, or attract customers to the store
• A reduction in the selling price of a product is called a markdown, it is usually expressed as a percent (25% off all women’s dresses)
Lesson 16.1 Basic Math
Markdown• PROBLEM: A merchant is having a sale on
all summer swimwear at 40% off (markdown). What is the sale price of a swimsuit that was originally priced at $55?
• SOLUTION: $55 original pricex .40 markdown
16.1 Checkpoint1. Why are these formulas called “business
math?”2. How does a cash discount benefit a buyer?
How does it benefit a seller?3. A company is billed $1,850 with a cash
discount of 5% if they pay within 10 days. How much will they save?
4. Explain the difference between cost price and selling price.
5. What is the selling price of a dress that costs $60 and marked up 40%?
6. Later, that same dress is put on sale for 25% off, what is price then?
Lesson 16.2 Basic Measurement• Measurement is the act of determining
the dimensions, quantity, or degree of something
• The object can be volume, area, distance, temperature, time, energy, or weight
• Measurement answers the question ‘how much?’
Lesson 16.2 Basic Measurement• The perimeter of an object is the distance
around it• Perimeter is measured in standard linear
units, including miles, feet, inches, km, meters, cm, and mm
• You find the perimeter by adding together the lengths of the outer edges of the figure for most shapes
• The perimeter of a circle is called the circumference
Lesson 16.2 Basic Measurement• To determine the circumference, you
must use a formula, the formula is as follows:
Circumference = 3.14 x diameter or C = 3.14 x D
• Using Figure 16-3, how wide of a piece of sheet metal will you need to roll it into a cylinder that is 16 inches in diameter?
C = 3.14 x DC = 3.14 x 16 inchesC =
Lesson 16.2 Basic Measurement• The area is the number of square units of
space on the surface of a figure enclosed by the perimeter
• Area = length x width or A = l x w• For example, the area of a rectangular
room that is 8 feet long and 12 feet wide is…
• A = 8 x 12 =
Lesson 16.2 Basic Measurement• To find the area of a circle, you again use
a formula that contains the constant 3.14, as well as the value of the radius
• The formula is written as follows:• A = 3.14 x r²• A = 3.14 x 8²• A = 3.14 x 64• A =
Lesson 16.2 Basic Measurement• Like perimeters and areas, volume
measures are often used on the job• Volume is the amount of space an object
takes up• It can be expressed in units of cubic
measure such as cubic inches, cubic yards, and cubic feet
• It can also be given in units such as gallons, quarts, ounces, and bushels
Lesson 16.2 Basic Measurement• Volume = length x width x height orV = l x w x h• For example, to find the volume of a
rectangular box that is 4 feet long, 2 feet wide, and 1 foot high, you multiply 4x2x1=8
• If the dimensions are in different units, they will have to be converted to the same unit of measurement before multiplying…
Lesson 16.2 Basic Measurement• Example) Let’s say that you are going to
lay a 6 inch gravel base in a ditch before installing a sewer pipe, the ditch is 30 inches wide and 150 feet long…
• V = l x w x h• V = 150 feet x 30 inches x 6 inches• Convert all measures to the same units,
in this case, use feet (12 inches = 1 foot)• V = 150 feet x 2.5 feet x 0.5 feet• V =
Lesson 16.2 Basic Measurement• To be effective on the job, you should be
able to work with the basic units of measure in the conventional (or English) and metric systems
• You should be familiar with procedures for converting measures from 1 unit to another within the same system
• You also need to be able to convert measures from the conventional system to the metric system and vice versa
Lesson 16.2 Basic Measurement• Most of the world, except for the United
States, uses the metric system of measure
• Congress passed a trade bill in 1988 that required all federal agencies to convert to the metric system by 1992
• This means, if the Dept. of Defense wants to buy gasoline, it must do so in liters, not gallons
• This law will not force private companies to convert to the metric system
• See conversion chart in Figure 16-6 on p 234
Any Questions??
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