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Construction Math . Section 2: Whole numbers. What is a whole number?. Complete units without fractions or decimals. Digits and place value . 5,316,247. Positive and negative numbers . Positive numbers are greater than zero Negative numbers are less than zero ZERO
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Construction Math Section 2: Whole numbers
What is a whole number? Complete units without fractions or decimals.
Digits and place value • 5,316,247
Positive and negative numbers • Positive numbers are greater than zero • Negative numbers are less than zero • ZERO Neither negative nor positive
Adding and Subtracting • Sum • Difference
Sum and word problems • Different key words in word problems to indicate addition • Total • Sum • Together • Altogether • Combine
Difference and Word Problems • Different key words in word problems to indicate subtraction • Minus • Difference • How much less • How much more • Amount of decrease • Amount of increase • How much is left
Test your skill • In calculating a bid for a roof restoration, the contractor estimates that he will need $847 for lumber, $456 for roofing shingles and $169 for hardware. What is his total cost? • What operator (+,-,*,/) do you need? • Addition— “total” • $1,472
Test your skill • A plumbing contractor allotted $4,265 in his bank account to complete three residential jobs. If he estimates Job 1 to cost $1032, Job 2 to cost $943, and Job 3 to cost $1,341, how much money will he have left in the account for unexpected change orders? • What operator (+,-,*,/) will we use? • Subtraction– “have left” • $949
Profit, the bottom line • If we are looking to make a profit, we must make sure that the cost of labor and parts is not more than the amount we charge. Therefore, it is vitally important to be able to estimate and calculate cost versus amount of money available
Multiplying and dividing • Product • Quotient
Product 24 x 16
Quotient • When dividing whole numbers, often they do not divide evenly. The left over part is called the remainder. • Why is remainder important? Useful for calculating supplies. If I need 45 feet of rope and I have a selection of 30 foot sections, I can divide and find that I need 1.5 (or 1 and a remainder of 15) sections of rope. One section is not going to cut it, I’m going to need 2 sections. When looking at supplies, I must round up, no matter my remainder.
Quotient 48 386
Multiplication and Word Problems • Look for key words to indicate the appropriate operation • Product • Times • When given a single quantity—determine multiple quantities
Division and Word Problems • Key words… do we detect the pattern here? KEY WORDS KEY WORDS KEY WORDS • Quotient • Divide • For 1 • For each • Separate • Per • A • When given multiple quantities—determine single quantity
Test your skill • Your supervisor sends you to the truck for 180 feet of electrical wire. When you get there, you find that the coils of wire come in 15ft lengths. How many coils of wire will you need to bring back? • What operator (+,-,*,/) will you use? • Division • 180/15=12
Test your skill, follow up • You get back to your supervisor and he tells you that for the next job, you will need 200 ft of the same wire that comes in 15 ft coils. How many coils will you need? • 200/15=13.33333333 • It is impossible to simply take 0.3333333 coils back. • When purchasing and calculating supplies, we must always round up to the nearest whole number. • You will need to take back 14 coils in order to get the job done
Test your skill • A crane rental company charges $383 per day, $1,224 a week (5 day week), and $3,381 a month. • How much would it cost to rent the crane for 3 days? • $1,149 (3x383) [3 x daily] • 12 days? • $4,596 (12 x 383) [12 x daily rate] • $3,214 ((2 x 1,224) + (2 x 383) [(2 x weekly)+(2 x daily)]
That pesky crane again • A crane rental company charges $383 per day, $1,224 a week (5 day week), and $3,381 a month. • How much would it cost to rent the crane for 17 days? • $6,511 (17 x 383) [17 x daily rate] • $4,438 ((3 x 1,224) + (2 x 383)) [(3 x weekly) + (2 x daily) • $3,381 (1 x 3,381) [1 x monthly]
Perimeter • The distance around the outside of any closed shape, such as a rectangle, circle, or square • Measure all sides and add them together 4m P=4+4+1+1=10 1m
Perimeter of irregular figures • Houses are not square boxes. 40 ft P=40+40+20+15+20+25=160 25 ft 40 ft 20 ft