Consecutive Decades 35 x 45

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Transcript Consecutive Decades 35 x 45

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NUMBER SENSE AT A FLIP
NUMBER SENSE AT A FLIP
Number Sense
Number Sense is memorization and
practice. The secret to getting good
at number sense is to learn how to
recognize and then do the rules
accurately . Then learn how to do
them quickly. Every practice should
be under a time limit.
The First Step
The first step in learning number
sense should be to memorize the
PERFECT SQUARES from 12 = 1 to
402 = 1600 and the PERFECT CUBES
from 13 = 1 to 253 = 15625. These
squares and cubes should be learned
in both directions. ie. 172 = 289
and the 289 is 17.
The Rainbow Method
2x2 Foil (LIOF)
Work Backwards
23 x 12
Used when you forget a rule about 2x2 multiplication
1.
3.
The last number is the units digit of the
product of the unit’s digits
2.
Multiply the outside, multiply the inside
Add the outside and the inside together plus any
carry and write down the units digit
4.
Multiply the first digits together and add
and carry. Write down the number
2(1) 2(2)+3(1) 3(2)
2
7
6
276
The Rainbow Method
2x2 Foil (LIOF)
Work Backwards
23 x 12
Used when you forget a rule about 2x2 multiplication
1. 45 x 31=
2. 31 x 62=
3. 64 x 73=
4. 62 x 87=
5. 96 x74=
Squaring Numbers Ending In 5
2
75
1. First two digits = the ten’s digit times one
more than the ten’s digit.
2. Last two digits are always 25
7(7+1) 25
=56 25
Squaring Numbers Ending In 5
2
75
1. 45 x 45=
2. 952=
3. 652=
4. 352=
5. 15 x 15=
Consecutive Decades
35 x 45
1. First two digits = the small ten’s digit times
one more than the large ten’s digit.
2. Last two digits are always 75
3(4+1) 75
=15 75
Consecutive Decades
35 x 45
1. 45 x 55=
2. 65 x 55=
3. 25 x 35=
4. 95 x 85=
5. 85 x75=
Ending in 5…Ten’s Digits Both Even
45 x 85
1. First two digits = the product of the ten’s
digits plus ½ the sum of the ten’s digits.
2. Last two digits are always 25
4(8) + ½ (4+8) 25
=38 25
Ending in 5…Ten’s Digits Both Even
45 x 85
1. 45 x 65=
2. 65 x 25=
3. 85 x 65=
4. 85 x 25=
5. 65 x65=
Ending in 5…Ten’s Digits Both Odd
35 x 75
1. First two digits = the product of the ten’s
digits plus ½ the sum of the ten’s digits.
2. Last two digits are always 25
3(7) + ½ (3+7) 25
=26 25
Ending in 5…Ten’s Digits Both Odd
35 x 75
1. 35 x 75=
2. 55 x 15=
3. 15 x 95=
4. 95 x 55=
5. 35 x 95=
Ending in 5…Ten’s Digits Odd&Even
35 x 85
1. First two digits = the product of the ten’s digits
plus ½ the sum of the ten’s digits. Always drop
the remainder.
2. Last two digits are always 75
3(8) + ½ (3+8) 75
=29 75
Ending in 5…Ten’s Digits Odd&Even
35 x 85
1. 45 x 75=
2. 35 x 65=
3. 65 x 15=
4. 15 x 85=
5. 55 x 85=
(1/8 rule)
Multiplying By 12 ½
32 x 12 ½
1. Divide the non-12 ½ number by 8.
2. Add two zeroes.
32
4+00
=
8
=4 00
(1/8 rule)
Multiplying By 12 ½
32 x 12 ½
1. 12 ½ x 48=
2. 12 ½ x 88 =
3. 888 x 12 ½ =
4. 12 ½ x 24 =
5. 12 ½ x 16=
(1/6 rule)
Multiplying By 16 2/3
42 x 16 2/3
1. Divide the non-16 2/3 number by 6.
2. Add two zeroes.
42
7+00
=
6
=7 00
(1/6 rule)
Multiplying By 16 2/3
42 x 16 2/3
1. 16 2/3 x 42 =
2. 16 2/3 x 66 =
3. 78 x 16 2/3 =
4. 16 2/3 x 48=
5. 16 2/3 x 120=
(1/3 rule)
Multiplying By 33 1/3
24 x 33 1/3
1. Divide the non-33 1/3 number by 3.
2. Add two zeroes.
24
3
= 8+00
=8 00
(1/3 rule)
Multiplying By 33 1/3
24 x 33 1/3
1. 33 1/3 x 45=
2. 33 1/3 x 66=
3. 33 1/3 x 123=
4. 33 1/3 x 48=
5. 243 x 33 1/3=
(1/4 rule)
Multiplying By 25
32 x 25
1. Divide the non-25 number by 4.
2. Add two zeroes.
32 = 8 +00
4
=8 00
(1/4 rule)
Multiplying By 25
32 x 25
1. 25 x 44=
2. 444 x 25=
3. 25 x 88=
4. 25 x 36=
5. 25 x 12=
(1/2 rule)
Multiplying By 50
32 x 50
1. Divide the non-50 number by 2.
2. Add two zeroes.
32 = 16 +00
2
=16 00
(1/2 rule)
Multiplying By 50
32 x 50
1. 50 x 44=
2. 50 x 126=
3. 50 x 424=
4. 50 x 78=
5. 50 x 14=
(3/4 rule)
Multiplying By 75
32 x 75
1. Divide the non-75 number by 4.
2. Multiply by 3.
3. Add two zeroes.
32
4
= 8x3=24+00
=24 00
(3/4 rule)
Multiplying By 75
32 x 75
1. 75 x 44=
2. 75 x 120=
3. 75 x 24=
4. 48 x 75=
5. 84 x 75=
(3/8 rule)
Multiplying By 37 1/2
37 1/2 x 24
=9 00
(3/8)24 00
(5/8 rule)
Multiplying By 62 1/2
62 1/2 x 56
=35 00
(5/8)56 00
(7/8 rule)
Multiplying By 87 1/2
87 1/2 x 48
=42 00
(7/8)48 00
(5/6 rule)
Multiplying By 83 1/3
83 1/3 x 36
=30 00
(5/6)36 00
(2/3 rule)
Multiplying By 66 2/3
66 2/3 x 66
=44 00
(2/3)66 00
(1/8 rule)
Multiplying By 125
32 x 125
1. Divide the non-125 number by 8.
2. Add three zeroes.
32
8
= 4+000
=4 000
(1/8 rule)
Multiplying By 125
32 x 125
1. 125 x 48=
2. 125 x 88=
3. 125 x 408=
4. 125 x 24=
5. 125 x 160=
Multiplying When Tens Digits Are
Equal And The Unit Digits Add To 10
32 x 38
1. First two digits are the tens digit
times one more than the tens digit
2. Last two digits are the product
of the units digits.
3(3+1) 2(8)
=12 16
Multiplying When Tens Digits Are
Equal And The Unit Digits Add To 10
32 x 38
1. 34 x 36=
2. 73 x 77=
3. 28 x 22=
4. 47 x 43=
5. 83 x 87=
Multiplying When Tens Digits Add To
10 And The Units Digits Are Equal
67 x 47
1. First two digits are the product of the tens
digit plus the units digit
2. Last two digits are the product
of the units digits.
6(4)+7 7(7)
=31 49
Multiplying When Tens Digits Add To
10 And The Units Digits Are Equal
67 x 47
1. 45 x 65=
2. 38 x 78=
3. 51 x 51=
4. 93 x 13=
5. 24 x 84=
Multiplying Two Numbers in the 90’s
97 x 94
1. Find out how far each number is from 100
2. The 1st two numbers equal the sum of the
differences subtracted from 100
3. The last two numbers equal the
product of the differences
100-(3+6) 3(6)
=91 18
Multiplying Two Numbers in the 90’s
97 x 94
1. 98 x 93=
2. 92 x 94=
3. 91 x 96=
4. 96 x 99=
5. 98 x 98=
Multiplying Two Numbers Near 100
109 x 106
1. First Number is always 1
2. The middle two numbers =
the sum on the units digits
3. The last two digits = the
product of the units digits
1 9+6 9(6)
= 1 15 54
Multiplying Two Numbers Near 100
109 x 106
1. 106 x109=
2. 103 x 105=
3. 108 x 101=
4. 107 x 106=
5. 108 x 109=
Multiplying Two Numbers With 1st
Numbers = And A 0 In The Middle
402 x 405
1.
The 1st two numbers = the product of the hundreds digits
2. The middle two numbers = the sum of the
units x the hundreds digit
3. The last two digits = the product of the units digits
4(4) 4(2+5) 2(5)
= 16 28 10
Multiplying Two Numbers With 1st
Numbers = And A “0” In The Middle
402 x 405
1. 405 x 405=
2. 205 x 206=
3. 703 x 706=
4. 603 x 607=
5. 801 x 805=
10101 Rule
Multiplying By 3367
18 x 3367
1. Divide the non-3367 # by 3
2. Multiply by 10101
18/3 = 6 x 10101=
= 60606
10101 Rule
Multiplying By 3367
18 x 3367
1. 3367 x 33=
2. 3367 x123=
3. 3367 x 66=
4. 3367 x 93=
5. 3367 x 24=
121 Pattern
Multiplying A 2-Digit # By 11
92 x 11
(ALWAYS WORK FROM RIGHT TO LEFT)
1. Last digit is the units digit
2. The middle digit is the sum of the tens and the
units digits
3. The first digit is the tens digit + any carry
9+1 9+2 2
= 10 1 2
121 Pattern
Multiplying A 2-Digit # By 11
92 x 11
(ALWAYS WORK FROM RIGHT TO LEFT)
1. 11 x 34=
2. 11 x 98=
3. 65 x 11=
4. 11 x 69=
5. 27 x 11=
1221 Pattern
Multiplying A 3-Digit # By 11
192 x 11
(ALWAYS WORK FROM RIGHT TO LEFT)
3.
1.
Last digit is the units digit
2.
The next digit is the sum of the tens and the units digits
The next digit is the sum of the tens and the hundreds digit + carry
4.
The first digit is the hundreds digit + any carry
1+1 1+9+1 9+2 2
=2 1 1 2
1221 Pattern
Multiplying A 3-Digit # By 11
192 x 11
(ALWAYS WORK FROM RIGHT TO LEFT)
1. 11 x 231=
2. 11 x 687=
3. 265 x 11=
4. 879x 11=
5. 11 x 912=
12321 Pattern
Multiplying A 3-Digit # By 111
192 x 111
(ALWAYS WORK FROM RIGHT TO LEFT)
3.
1.
Last digit is the units digit
2.
The next digit is the sum of the tens and the units digits
The next digit is the sum of the units, tens and the hundreds digit + carry
4.
The next digit is the sum of the tens and hundreds digits + carry
5.
The next digit is the hundreds digit + carry
1+1 1+9+1 1+9+2+1 9+2 2
=21312
12321 Pattern
Multiplying A 3-Digit # By 111
192 x 111
(ALWAYS WORK FROM RIGHT TO LEFT)
1. 111 x 213=
2. 111 x 548=
3. 111 x825=
4. 936 x 111=
5. 903 x 111=
1221 Pattern
Multiplying A 2-Digit # By 111
41 x 111
(ALWAYS WORK FROM RIGHT TO LEFT)
3.
1.
Last digit is the units digit
2.
The next digit is the sum of the tens and the units digits
The next digit is the sum of the tens and the units digits + carry
4.
The next digit is the tens digit + carry
4 4+1 4+1 1
=4551
1221 Pattern
Multiplying A 2-Digit # By 111
41 x 111
(ALWAYS WORK FROM RIGHT TO LEFT)
1. 45 x 111=
2. 111 x 57=
3. 111 x93=
4. 78 x 111=
5. 83 x 111=
Multiplying A 2-Digit # By 101
93 x 101
1.
2.
The first two digits are the 2-digit number x1
The last two digits are the 2-digit number x1
93(1) 93(1)
= 93 93
Multiplying A 2-Digit # By 101
93 x 101
1. 45 x 101=
2. 62 x 101=
3. 101 x 72=
4. 101 x 69=
5. 101 x 94=
Multiplying A 3-Digit # By 101
934 x 101
1.
The last two digits are the last two digits
of the 3-digit number
2. The first three numbers are the 3-digit
number plus the hundreds digit
934+9 34
= 943 34
Multiplying A 3-Digit # By 101
934 x 101
1. 101 x 658=
2. 963 x 101=
3. 101 x 584=
4. 381 x 101=
5. 101 x 369=
Multiplying A 2-Digit # By 1001
87 x 1001
1.
3.
The first 2 digits are the 2-digit number x 1
2. The middle digit is always 0
The last two digits are the 2-digit number x 1
87(1) 0 87(1)
= 87 0 87
Multiplying A 2-Digit # By 1001
87 x 1001
1. 1001 x 66=
2. 91 x 1001=
3. 1001 x 53=
4. 1001 x 76=
5. 5.2 x 1001=
Halving And Doubling
52 x 13
1. Take half of one number
2. Double the other number
3. Multiply together
52/2 13(2)
= 26(26)= 676
Halving And Doubling
52 x 13
1. 14 x 56=
2. 16 x 64=
3. 8 x 32=
4. 17 x 68=
5. 19 x 76=
One Number in the Hundreds
And One Number In The 90’s
95 x 108
1.
2.
3.
Find how far each number is from 100
The last two numbers are the product of
the differences subtracted from 100
The first numbers = the difference (from the 90’s) from 100 increased
by 1 and subtracted from the larger number
108-(5+1)
100-(5x8)
= 102 60
One Number in the Hundreds
And One Number In The 90’s
95 x 108
1. 105 x 96=
2. 98 x 104=
3. 109 x 97=
4. 98 x 105=
5. 97 x 107=
Fraction Foil (Type 1)
8½ x6¼
1. Multiply the fractions together
2. Multiply the outside two number
3. Multiply the inside two numbers
4. Add the results and then add to the
product of the whole numbers
(8)(6)+1/2(6)+1/4(8) (1/2x1/4)
= 53 1/8
Fraction Foil (Type 1)
8½ x6¼
1. 9 1/2 x 8 1/3
2. 5 1/5 x 10 2/5
3. 10 1/7 x 14 1/2
4. 3 1/4 x 8 1/3
5. 6 1/4 x 8 1/2
Fraction Foil (same fraction)
7½ x5½
1. Multiply the fractions together
2. Add the whole numbers and
divide by the denominator
3. Multiply the whole numbers and
add to previous step
(7x5)+6 (1/2x1/2)
= 41 1/4
Fraction Foil (Type 2)
7½ x5½
1. 9 1/2 x 7 1/2
2. 4 1/5 x 11 1/5
3. 10 1/6 x 14 1/6
4. 2 1/3 x 10 1/3
5. 6 1/7 x 8 1/7
Fraction Foil (fraction adds to 1)
7¼ x7¾
1. Multiply the fractions together
2. Multiply the whole number by
one more than the whole number
(7)(7+1) (1/4x3/4)
= 56 3/16
Fraction Foil (Type 3)
7¼ x7¾
1. 8 1/2 x 8 1/2
2. 10 1/5 x 10 4/5
3. 9 1/7 x 9 6/7
4. 5 3/4 x 5 1/4
5. 2 1/4 x 2 3/4
Adding Reciprocals
7/8 + 8/7
1. Keep the common denominator
2. The numerator is the difference of
the two numbers squared
3. The whole number is always two plus
any carry from the fraction.
2
2
(8-7)
7x8
=2 1/56
Adding Reciprocals
7/8 + 8/7
1. 5/6 + 6/5
2. 11/13 + 13/11
3. 7/2 + 2/7
4. 7/10 + 10/7
5. 11/15 +15/11
Percent Missing the Of
36 is 9% of __
1. Divide the first number by
the percent number
2. Add 2 zeros or move the
decimal two places to the right
36/9
00
= 400
Percent Missing the Of
36 is 9% of __
1. 40 is 3% of ______=
2. 27 is 9% of ______=
3. 800 is 25% of ____=
4. 70 is 4% of ______=
5. 10 is 2 1/2 % of _____=
Percent Missing the Of
36 is 9% of __
1. 40 is 3% of ______=
2. 27 is 9% of ______=
3. 800 is 25% of ____=
4. 70 is 4% of ______=
5. 10 is 2 1/2 % of _____=
Base N to Base 10
426 =____10
1. Multiply the left digit times the base
2. Add the number in the units column
4(6)+2
= 2610
Base N to Base 10 Of
426 =____10
1. 546=_____10
2. 347=_____10
3. 769=_____10
4. 1245=_____10
5. 2346=_____10
Multiplying in Bases
4 x 536=___6
1. Multiply the units digit by the multiplier
2. If number cannot be written in base n subtract
base n until the digit can be written
3. Continue until you have the answer
= 4x3=12 subtract 12 Write 0
= 4x5=20+2=22 subtract 18 Write 4
= Write 3
= 3406
Multiplying in Bases
4 x 536=___6
1. 2 x 426= _____6
2. 3 x 547=_____7
3. 4 x 678=_____8
4. 5 x 345=_____5
5. 3 x 278=_____8
N/40 to a % or Decimal
21/40___decimal
1. Mentally take off the zero
2. Divide the numerator by the denominator
and write down the digit
3. Put the remainder over the 4 and write the
decimal without the decimal point
4. Put the decimal point in front of the numbers
. 5 25
21/4 1/4
N/40 to a % or Decimal
21/40___decimal
1. 31/40=
2. 27/40=
3. 51/40=
4. 3/40=
5. 129/40=
Remainder When Dividing By 9
867/9=___
remainder
1. Add the digits until you get a single digit
2. Write the remainder
8+6+7=21=2+1=3
=3
Remainder When Dividing By 9
867/9=___
1. 3251/9=
2. 264/9=
3. 6235/9=
4. 456/9=
5. 6935/9=
remainder
421 Method
Base 8 to Base 2
7328 =____2
1. Mentally put 421 over each number
2. Figure out how each base number
can be written with a 4, 2 and 1
3. Write the three digit number down
421
7
111
421
3
011
421
2
010
421 Method
Base 8 to Base 2
7328 =____2
1. 3548= _____2
2. 3258=_____2
3. 1568=_____2
4. 3548=_____2
5. 5748=_____2
421 Method
Base 2 to Base 8 Of
1110110102 =___8
1. Separate the number into groups
of 3 from the right.
2. Mentally put 421 over each group
3. Add the digits together and write the sum
421
421
421
111
7
011
3
010
2
421 Method
Base 2 to Base 8 Of
1110110102 =___8
1. 1100012= _____8
2. 1111002=_____8
3. 1010012=_____8
4. 110112=_____8
5. 10001102=_____8
Cubic Feet to Cubic Yards
3ft x 6ft x 12ft
3
=__yds
1. Try to eliminate three 3s by division
2. Multiply out the remaining numbers
3. Place them over any remaining 3s
3 6 12
3 3 3
1x2x4=8
Cubic yards
Cubic Feet to Cubic Yards
3ft x 6ft x 12ft
1. 6ft x 3ft x 2ft=
2. 9ft x 2ft x 11ft=
3. 2ft x 5ft x 7ft=
4. 27ft x 2ft x5ft=
5. 10ft x 12ft x 3ft=
3
=__yds
Ft/sec to MPH
44 ft/sec __mph
1. Use 15 mph = 22 ft/sec
2. Find the correct multiple
3. Multiply the other number
22x2=44
15x2=30 mph
Ft/sec to mph
44 ft/sec __mph
1. 88 ft/sec=_____mph
2. 120 mph=_____ft/sec
3. 90 mph =______ft/sec
4. 132 ft/sec = _____mph
5. 45 mph= ____ft/sec
Subset Problems
{F,R,O,N,T}=______
SUBSETS
1. Subsets=2n
2. Improper subsets always = 1
3. Proper subsets = 2n - 1
4. Power sets = subsets
5
2 =32
subsets
Subset Problems
{F,R,O,N,T}=______
SUBSETS
1. {A,B,C}=
2. {D,G,H,J,U,N}=
3. {!!, $, ^^^, *}=
4. {AB, FC,GH,DE,BM}=
5. {M,A,T,H}=
___
.18=___
Repeating Decimals to Fractions
fraction
1. The numerator is the number
2. Read the number backwards. If a number has a
line over it then there is a 9 in the denominator
3. Write the fraction and reduce
18 = 2
99 11
___
.18=___
Repeating Decimals to Fractions
1. .25
2. .123
3. .74
4. .031
5. .8
fraction
_
.18=___
Repeating Decimals to Fractions
fraction
1. The numerator is the number minus
the part that does not repeat
2. For the denominator read the number
backwards. If it has a line over it,
it is a 9. if not it is a o.
18-1 = 17
90 90
_
.18=___
Repeating Decimals to Fractions
1. .16
2. .583
3. .123
4. .45
5. .92
fraction
Gallons
2
Cubic Inches
3
gallons=__in
(Factors of 231 are 3, 7, 11)
1. Use the fact: 1 gal= 231 in3
2. Find the multiple or the factor and adjust the
other number. (This is a direct variation)
2(231)= 462
3
in
Gallons
2
Cubic Inches
3
gallons=__in
1. 3 gallons =_____in3
2. ½ gallon =______in3
3. 77 in3=_______gallons
4. 33 in3=_______gallons
5. 1/5 gallon=______in3
Finding Pentagonal Numbers
th
5
Pentagonal # =__
1. Use the house method)
2. Find the square #, find the triangular #,
then add them together
1+2+3+4= 10
25
5
5
25+10=35
Finding Pentagonal Numbers
th
5
Pentagonal # =__
1. 3rd pentagonal number=
2. 6th pentagonal number=
3. 10th pentagonal number=
4. 4th pentagonal number=
5. 6th pentagonal number=
Finding Triangular Numbers
th
6
Triangular # =__
1. Use the n(n+1)/2 method
2. Take the number of the term that you are looking
for and multiply it by one more than that term.
3. Divide by 2 (Divide before multiplying)
6(6+1)=42
42/2=21
Finding Triangular Numbers
th
6
Triangular # =__
1. 3rd triangular number=
2. 10th triangular number=
3. 5th triangular number=
4. 8th triangular number=
5. 40th triangular number=
Pi To An Odd Power
13=____
approximation
1. Pi to the 1st = 3 (approx) Write a 3
2. Add a zero for each odd power
of Pi after the first
3000000
Pi To An Odd Power
13=____
1. Pi11
2. Pi7
3. Pi9
4. Pi5
5. Pi3
approximation
Pi To An Even Power
12=____
approximation
1. Pi to the 2nd = 95 (approx) Write a 95
2. Add a zero for each even power
of Pi after the 4th
950000
Pi To An Even Power
12=____
1. Pi10
2. Pi8
3. Pi6
4. Pi14
5. Pi16
approximation
The “More” Problem
17/15 x 17
1.
The answer has to be more than the whole number.
2.
The denominator remains the same.
3.
The numerator is the difference in the two numbers squared.
4.
The whole number is the original whole number plus the difference
17+2
2
(17-15)
15
=19 4/15
The More Problem
17/15 x 17
1. 19/17 x 19=
2. 15/13 x 15=
3. 21/17 x 21=
4. 15/12 x 15=
5. 31/27 x 31=
The “Less” Problem
15/17 x 15
1.
4.
The answer has to be less than the whole number.
2.
The denominator remains the same.
3.
The numerator is the difference in the two numbers squared.
The whole number is the original whole number minus the difference
15-2
2
(17-15)
17
=13 4/17
The Less Problem
15/17 x 15
1. 13/17 x 13=
2. 21/23 x 21=
3. 5/7 x 5=
4. 4/7 x4=
5. 49/53 x49=
Multiplying Two Numbers Near 1000
994 x 998
1. Find out how far each number is from 1000
2. The 1st two numbers equal the sum of the
differences subtracted from 1000
3. The last two numbers equal the product of the
differences written as a 3-digit number
1000-(6+2) 6(2)
=992 012
Multiplying Two Numbers Near 1000
994 x 998
1. 996 x 991 =
2. 993 x 997 =
3. 995 x 989 =
4. 997 x 992 =
5. 985 x 994 =
Two Things Helping
The (Reciprocal) Work Problem
1/6 + 1/5 = 1/X
2.
3.
1.
Use the formula ab/a+b.
The numerator is the product of the two numbers.
The deniminator is the sum of the two numbers.
4.
Reduce if necessary
=6(5)
=6+5
=30/11
Two Things Helping
The (Reciprocal) Work Problem
1/6 + 1/5 = 1/X
1. 1/3 + 1/5 = 1/x
2. 1/2 + 1/6 =1/x
3. 1/4 + 1/7 = 1/x
4. 1/8 + 1/6 =1/x
5. 1/10 + 1/4 = 1/x
Two Things working Against Each Other
The (Reciprocal) Work Problem
1/6 - 1/8 = 1/X
1.
Use the formula ab/b-a.
2.
The numerator is the product of the two numbers.
3.
The denominator is the difference of the two
numbers from right to left.
4.
Reduce if necessary
=6(8)
=8-6
=24
Two Things working Against Each Other
The (Reciprocal) Work Problem
1/6 - 1/8 = 1/X
1. 1/8 – 1/5 = 1/x
2. 1/11 – 1/3 = 1/x
3. 1/8 – 1/10 = 1/x
4. 1/7 – 1/8 = 1/x
5. 1/30 – 1/12 = 1/x
The Inverse Variation % Problem
30% of 12 = 20% of ___
1. Compare the similar terms as a reduced ratio
2. Multiply the other term by the reduced ratio.
3. Write the answer
30/20=3/2
3/2(12)=18
=18
The Inverse Variation % Problem
30% of 12 = 20% of ___
1. 27% of 50= 54% of _____
2. 15% of 24 = 20% of _____
3. 90% of 70 = 30% of _____
4. 75% of 48 = 50% of _____
5. 14% of 27 = 21% of _____
6. 26% of 39 = 78% of _____
Sum of Consecutive Integers
1+2+3+…..+20
1.
Use formula n(n+1)/2
2. Divide even number by 2
3. Multiply by the other number
(20)(21)/2
10(21)= 210
Sum of Consecutive Integers
1+2+3+…..+20
1. 1+2+3+….+30=
2. 1+2+3+….+16=
3. 1+2+3+….+19=
4. 1+2+3+…+49=
5. 1+2+3+….100=
Sum of Consecutive Even Integers
2+4+6+…..+20
1. Use formula n(n+2)/4
2. Divide the multiple of 4 by 4
3. Multiply by the other number
(20)(22)/4
5(22)= 110
Sum of Consecutive Even Integers
2+4+6+…..+20
1. 2+4+6+….+16=
2. 2+4+6+….+40=
3. 2+4+6+….+28=
4. 2+4+6+….+48=
5. 2+4+6+….+398=
Sum of Consecutive Odd Integers
1+3+5+…..+19
2.
1. Use formula ((n+1)/2)2
Add the last number and the first number
3. Divide by 2
4. Square the result
(19+1)/2=
2
10
= 100
Sum of Consecutive Odd Integers
1+3+5+…..+19
1. 1+3+5+….+33=
2. 1+3+5+….+49=
3. 1+3+5+….+67=
4. 1+3+5+….+27=
5. 1+3+5+….+47=
Finding Hexagonal Numbers
th
Find the 5
Hexagonal Number
3.
1. Use formula 2n2-n
2. Square the number and multiply by2
Subtract the number wanted from the previous answer
2
2(5) =
50
50-5=
45
Finding Hexagonal Numbers
th
Find the 5
Hexagonal Number
1. Find the 3rd hexagonal number=
2. Find the 10th hexagonal number=
3. Find the 4th hexagonal number=
4. Find the 2nd hexagonal number=
5. Find the 6th hexagonal number=
Cube Properties
Find the Surface Area of a Cube
Given the Space Diagonal = 12
1. Use formula Area = 2D2
2. Square the diagonal
3. Multiply the product by 2
2(12)(12)
2(144)=
288
Cube Properties
Find the Surface Area of a Cube
Given the Space Diagonal of 12
1. Space diagonal = 24
2. Space diagonal = 10
3. Space diagonal = 50
4. Space diagonal = 21
5. Space diagonal = 8
Cube Properties
Find S, Then Use It To Find
Volume or Surface Area
S
3
S
S
2
Cube Properties
Find S, Then Use It To Find
Volume or Surface Area
S
3
S
S
2
Finding Slope From An Equation
3X+2Y=10
2.
1. Solve the equation for Y
The number in front of X is the Slope
3X+2Y=10
Y = -3X +5
2
Slope = -3/2
Finding Slope From An Equation
3X+2Y=10
1. Y = 2X + 8
2. Y = -7X + 6
3. 2Y = 8X - 12
4. 2X + 3Y = 12
5. 10X – 4Y = 13
Hidden Pythagorean Theorem
Find The Distance Between These Points
(6,2)
and
(9,6)
Find the distance between the X’s
Find the distance between the Y’s
3. Look for a Pythagorean triple
If not there, use the Pythagorean Theorem
1.
2.
4.
3
5
7
8
4
12
24
15
5
13
25
17
Common
Pythagorean triples
9-6=3 6-2=4
3 4
5
The distance is 5
Hidden Pythagorean Theorem
Find The Distance Between These Points
(6,2)
and
1. (4,3) and (7,7)
2. (8,3) and (13,15)
3. (1,2) and (3,4)
4. (12,29) and (5,5)
5. (3,4) and (2,4)
(9,6)
Finding Diagonals
Find The Number Of
Diagonals In An Octagon
2.
1. Use the formula n(n-3)/2
N is the number of vertices in the polygon
8(8-3)/2=
20
Finding Diagonals
Find The Number Of
Diagonals In An Octagon
1. # of diagonals in a pentagon
2. # of diagonals of a hexagon
3. # of diagonals of a decagon
4. # of diagonals of a dodecagon
5. # of diagonals of a heptagon
Finding the total number of factors
24= ________
1.
Put the number into prime factorization
2. Add 1 to each exponent
3. Multiply the numbers together
1
3
3
2=
x
1+1=2 3+1=4
2x4=8
Finding the total number of factors
24= ________
1. 12=
2. 30=
3. 120=
4. 50=
5. 36=
Estimating a 4-digit square root
7549 = _______
The answer is between 802 and 902
2. Find 852
3. The answer is between 85 and 90
4. Guess any number in that range
1.
2
80 =6400
2
85 =7225
2
90 =8100
87
Estimating a 4-digit square root
7549 = _______
1.
3165
2.
6189
3.
1796
4.
9268
5.
5396
Estimating a 5-digit square root
37485 = _______
1. Use only the first three numbers
2. Find perfect squares on either side
3. Add a zero to each number
4. Guess any number in that range
2
19 =361
190-200
2
20 =400
195
Estimating a 5-digit square root
37485 = _______
1.
31651
2.
61893
3.
17964
4.
92682
5.
53966
C
F
55C = _______F
1.
Use the formula F= 9/5 C + 32
2. Plug in the F number
3. Solve for the answer
9/5(55) + 32
99+32
= 131
C
F
59C = _______F
1. 4500C=______F
2. 400C =_____F
3. 650C =_____F
4. 250C=_____F
5. 900C=_____F
C
F
50F = _______C
1.
Use the formula C = 5/9 (F-32)
2. Plug in the C number
3. Solve for the answer
5/9(50-32)
5/9(18)
= 10
C
F
50F = _______C
1. 680F=
2. 590F=
3. 1130F=
4. 410F=
5. 950F=
Finding The Product of the Roots
2
4X
a
2.
+ 5X
+
6
b
c
1. Use the formula c/a
Substitute in the coefficients
3. Find answer
6 / 4 = 3/2
Finding The Product of the Roots
2
4X
a
+ 5X
+
6
b
c
1. 5x2 + 6x + 2
2. 2x2 + -7x +1
3. 3x2 + 4x -1
4. -3x2 +2x -4
5. -8x2 -6x +1
Finding The Sum of the Roots
2
4X
a
2.
+ 5X
+
6
b
c
1. Use the formula -b/a
Substitute in the coefficients
3. Find answer
-5 / 4
Finding The Sum of the Roots
2
4X
a
+ 5X
+
6
b
c
1. 5x2 + 6x + 2
2. 2x2 + -7x +1
3. 3x2 + 4x -1
4. -3x2 +2x -4
5. -8x2 -6x +1
Estimation
999999 Rule
142857 x 26 =
1. Divide 26 by 7 to get the first digit
2. Take the remainder and add a zero
3. Divide by 7 again to get the next number
4. Find the number in 142857 and copy in a circle
26/7 =3r5
5+0=50/7=7
3 714285
Estimation
999999 Rule
142857 x 26 =
1. 142857 x 38
2. 142857 x 54
3. 142857 x 17
4. 142857 x 31
5. 142857 x 64
Area of a Square Given the Diagonal
Find the area of a square
with a diagonal of 12
1.
2.
Use the formula Area = ½ D1D2
Since both diagonals are equal
3. Area = ½ 12 x 12
4. Find answer
½ D1 D2
½ x 12 x 12
72
Area of a Square Given the Diagonal
Find the area of a square
with a diagonal of 12
1. Diagonal = 14
2. Diagonal = 8
3. Diagonal = 20
4. Diagonal = 26
5. Diagonal = 17
Estimation of a 3 x 3 Multiplication
346 x 291 =
1.
Take off the last digit for each number
2. Round to multiply easier
3. Add two zeroes
4. Write answer
35 x 30
1050 + 00
105000
Estimation of a 3 x 3 Multiplication
346 x 291 =
1. 316 x 935
2. 248 x 603
3. 132 x 129
4. 531 x 528
5. 248 x 439
Dividing by 11 and finding the remainder
7258 / 11=_____
Remainder
1.
Start with the units digit and add up every other number
2. Do the same with the other numbers
3. Subtract the two numbers
4. If the answer is a negative or a number greater than 11
add or subtract 11 until you get a number from 0-10
8+2=10
7+5= 12
10-12= -2 +11= 9
Dividing by 11 and finding the remainder
7258 / 11=_____
Remainder
1. 16235 / 11
2. 326510 / 11
3. 6152412 / 11
4. 26543 / 11
5. 123456 / 11
Multiply By Rounding
2994 x 6 =
1.
3.
Round 2994 up to 3000
2. Think 3000 x 6
Write 179. then find the last two numbers by multiplying
what you added by 6 and subtracting it from 100.
3000(6)=179_ _
6(6)=36 100-36=64
=17964
Multiply By Rounding
2994 x 6 =
1. 3994 x 7
2. 5991 x 6
3. 4997 x 8
4. 6994 x 4
5. 1998 x 6
The Sum of Squares
(factor of 2)
2
12
1.
2.
+
2
24 =
Since 12 goes into 24 twice…
Square 12 and multiply by 10
3. Divide by 2
2
12 =144
144x10=
=1440/2
=720
The Sum of Squares
(factor of 2)
2
12
1. 142 + 282
2. 172 + 342
3. 112 + 222
4. 252 + 502
5. 182 + 362
+
2
24 =
The Sum of Squares
(factor of 3)
2
12
1.
+
2
36 =
Since 12 goes into 36 three times…
2. Square 12 and multiply by 10
2
12 =144
144x10=
=1440
The Sum of Squares
(factor of 3)
2
12
1. 142 + 422
2. 172 + 512
3. 112 + 332
4. 252 + 752
5. 182 + 542
+
2
36 =
The Difference of Squares
(Sum x the Difference)
2
32
-
2
30 =
1. Find the sum of the bases
2. Find the difference of the bases
3. Multiply them together
32+30=62
32-30=2
62 x 2 =124
The Difference of Squares
(Sum x the Difference)
2
32
1. 222 - 322
2. 732 - 272
3. 312 - 192
4. 622 - 422
5. 992 - 982
-
2
30 =
Addition by Rounding
2989 + 456=
2.
1. Round 2989 to 3000
Subtract the same amount to 456, 456-11= 445
3. Add them together
2989+11= 3000
456-11=445
3000+445=3445
Addition by Rounding
2989 + 456=
1. 2994 + 658
2. 3899 + 310
3. 294 + 498 + 28
4. 6499 + 621
5. 2938 +64
123…x9 + A Constant
(1111…Problem)
123 x 9 + 4
1.
2.
The answer should be all 1s. There should be 1 more 1
than the length of the 123… pattern.
You must check the last number. Multiply the last number
in the 123… pattern and add the constant.
3x9 + 4 =31
1111
123…x9 + A Constant
(1111…Problem)
123 x 9 + 4
1. 1234 x 9 + 5
2. 12345 x 9 + 6
3. 1234 x 9 + 7
4. 123456 x 9 + 6
5. 12 x 9 + 3
Supplement and Complement
Find The Difference Of The
Supplement And The
Complement Of An Angle Of
40.
1.
The answer is always 90
=90
Supplement and Complement
Find The Difference Of The
Supplement And The
Complement Of An Angle Of 40.
1. angle of 70
2. angle of 30
3. angle of 13.8
4. angle of 63
5. angle of 71 ½
Supplement and Complement
Find The Sum Of The
Supplement And The
Complement Of An Angle Of
40.
1.
Use the formula 270-twice the angle
2. Multiple the angle by 2
3. Subtract from 270
270-80=
=190
Supplement and Complement
Find The Sum Of The
Supplement And The
Complement Of An Angle Of 40.
1. angle of 70
2. angle of 30
3. angle of 13.8
4. angle of 63
5. angle of 71 ½
Larger or Smaller
55
52
5 13
+
4 11
1. Find the cross products
2. The larger fraction is below the larger number
3. The smaller number is below the smaller number
Larger = 5/4
Smaller = 13/11
Larger or Smaller
55
52
5 13
+
4 11
Two Step Equations
(Christmas Present Problem)
A - 1 = 11
3
1. Start with the answer and undo the
operations using reverse order of operations
11+1=12
12 x3 = 36
Two Step Equations
(Christmas Present Problem)
1.
A - 1 = 11
3
2x -1 =8
2. x/3 - 4 =6
3. 5x -12 = 33
4. x/2 + 5 =8
5. x/12 +5 = 3
Relatively Prime
(No common Factors Problem)
* One is relatively prime to all numbers
How Many #s less than 20
are relatively prime to 20?
1.
2.
Put the number into prime factorization
Subtract 1 from each exponent and multiply
out all parts separately
3. Subtract 1 from each base
4. Multiply all parts together
2
2
1
1
5 =2
0
5 =2
x
x
x1
2x1x1x4=8
Relatively Prime
(No common Factors Problem)
* One is relatively prime to all numbers
How Many #s less than 20 are
relatively prime to 20?
1. less than 18
2. less than 50
3. less than 12
4. less than 22
5. less than 100
Product of LCM and GCF
Find the Product of the GCF
and the LCM of 6 and 15
1.
Multiple the two numbers together
6 x 15 = 90
Product of LCM and GCF
Find the Product of the GCF
and the LCM of 6 and 15
1. 21 and 40
2. 38 and 50
3. 25 and 44
4. 12 and 48
5. 29 and 31
Estimation
15 x 17 x 19
1.
Take the number in the middle and cube it
3
17 =4913
Estimation
15 x 17 x 19
1. 7 x 8 x 9
2. 11 x 13 x 15
3. 19 x 20 x 21
4. 38 x 40 x 42
5. 9 x 11 x 13
Sequences-Finding the Pattern
7, 2, 5, 8, 3, 14
Find the next number in this pattern
1.
If the pattern is not obvious try looking at every other
number. There may be two patterns put together
7, 2, 5, 8, 3, 14
1
Sequences-Finding the Pattern
7, 2, 5, 8, 3, 14
Find the next number in this pattern
1. 5,10,15,20,25…..
2. 11, 12, 14, 17,…..
3. 8,9,7,8,6……
4. 7,13,14,10,21,7…..
5. 2,8,5,4,6,10,6,4,15…
Sequences-Finding the Pattern
1, 4, 5, 9, 14, 23
Find the next number in this pattern
1.
If nothing else works look for a Fibonacci Sequence
where the next term is the sum of the previous two
1, 4, 5, 9, 14, 23
14+23=37
Sequences-Finding the Pattern
1, 4, 5, 9, 14, 23
Find the next number in this pattern
1. 1,4,5,9,14,23……
2. 2,3,5,10,18,33,……
3. 1,4,9,16,25…….
4. 8, 27,64,125….
5. 10,8,6,4,….
Degrees
0
90 =
Radians
_____
Radians
1. If you want radians use π X/180
2. If you want degrees use 180 x/ π
90(π)/180
= π/2
Degrees
0
90 =
Radians
_____
Radians
1. 1800=
2. 450=
3. 2700=
4. 1800=
5. 1350=