a Julia Reddie 4 éve
205
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Dividing Fractions
when dividing fractions, always KCF (keep, change, flip)
example: 3and3/5 divided by 1and2/10
remember: when converting to mixed number, use "backwards c"
Multiplying Fractions:
No different than normal multiplication
Example: (3/4)(2/3)=6/12=1/2
Makes the problem much more simple and less prone to simple math mistakes if you try to reduce/ simplify the fractions before multiplying
Example: (24/35)(21/40)
can be simplified by doing the funky "1s" example from class
24=6x4 and 40=4x10 so the 4's can be crossed out
35=5x7 and 21=7x3 so the 7's can be crossed out
then you're left with (6/5)(3/10)=18/50=9/25
Prime Factorization: finding which prime numbers multiple together to make the original number
Example:
90
9 10
3 3 5 2
so... the prime factors= 2x3x3x5
Divisibility Rules
2: even #s
3: sum of digits divide by 3
4: last 2 digits divide by 4
5: any # ending in 5 or 0
6: even and sum of digits divide by 3
8: last 3 digits divide by 8
9: sum of digits divide by 9
10: any # ending in 0
Least common multiple
Greatest common factor
Example: GCF and LCM of 60 and 45
so...
Adding Fractions
Tip: if you're given 5+3/8, all you have to do is add it, not convert 5 into a fraction
25-4and3/16 is more complicated
What fractions mean:
3(5) = 3 groups of 5
3(2/7) = 3 groups of 2/7
(1/3)12 = one shirt of a group of 12
More Fractions
Important tip:
Ways to show fractions example: 4/6
set model: xxxx~~
area model: [] [] [] [] [] []
linear model: -+-+-+-
-+-+-+-+-+
Intro to Fractions
which fraction is larger?
4/7 or 5/7
5/7 pieces is more than 4/7 because it is closer to 1
5/8 or 5/9
Easy tip: when doing a problem like 32+8/11
it equals 32and8/11 so don't make it more complicated
numerator= # of pieces
denominator= size of pieces
Subtracting Integers
KEEP, CHANGE, CHANGE
Show:
-5-(-2) = - - - - - take away 2 = -3
-4-2 = - - - - - -
take away 2 ++ = -6
Making zeros: a - and a + go together to create a "zero"
Solve:
-35-(-15)
K C C = -35 + 15 = -20
(use Mr. Kilt's student's algorithm shown in adding integers)
5-9
+ -- so it's going to be a negative number = -4
Adding Integers
Tip: when talking to students about whether the positive or negative number is bigger...
Example: 3+(-5)
SHOW: 3+(-5) Mr. Milt's student's algorithm
+++
_ _ _ _ _ = -2
(there is a bigger pile of negatives, so the answer must be negative)
SLOLVE: 24+(-35)
24 + (-35) = -9
+ - - so...it will end up being a negative number
Alt. Algorithms for Subtraction
Subtraction = the distance between two numbers
show using longs and units
24-12 will go to be two longs and 4 units...then you'll take away one long and 2 units to find the answer
24-18
34-28 =6 the same distance between 2 #
33-27
show using tiles
show 5 using 9 tiles
+++++++
_ _
show 5+(-4)
+++++
_ _ _ _ = 1
show -3(-2)
_ _ _ _ _ = -5
Alt. Algorithms for Division
Tips:
Repeated Subtraction
Example: 146/8
eventually you'll take 8 away a certain amount of times until you find the answer
Alt. Algoritms for Multiplication
Multiplication = Area
Area/base 10 block expanded form
example: 27(36)
20+7
30+6
------- then you multiple each number by its vertical and diagonal counterpart
= 600+210
=120+42 then add them all together
Array Multiplication
Example: 3(4)
o o o o
o o o o
o o o o =12
Lattice Multiplication
Example: 25(15)
= 375
81/82 on exam 1
see notes
Multiplication
1st number: # of groups
2nd number: what is inside the groups
What order to teach times tables in:
teach first:
1s
2s
10s
5s
Teach second:
3s
4s
9s
Teach 3rd:
everything else
MULTIPLICATION = AREA OF A RECTANGLE
showing using base 10 blocks:
example: 14(12)
have a 10x10 flat then have 4 units added on one side and 2 on the other than add everything to get the answer = 168
Introduction to Alt. Algorithms for Multiplication
Area Model:
Example:
24(28)
20 + 8
20
+
4
this helps reinforce place value and multiplying with numbers ending in 0
How to Write Problems
Show:
convert from base ten to other bases
convert from other bases to base 10
Solve:
convert from base ten to other bases
convert from other bases to base ten
Alt. Algorithms for Addition
Friendly numbers:
example: 28+62 --- 30+60 = 90
Trade off:
example: 46+25 --- 50+21 = 71
Left to right:
example: 37+42 --- add do 30+40 then add the 7 and 2 = 79
Expanded form:
example: 748+165 --- 700+40+8 +100+60+5 = 913
Scratch:
example: 34+12+15
you would scratch when the ones place adds up to 10 then carry over
Counting
Counting and how to works in different bases
Basic counting tools
One to one correspondence
Converting Bases
Diagrams
Examples:
24six --- 2 long and 4 units
each long = 6 and each unit = 1
so...6+6+4=16
13 to base eight --- 1 long and 3 units
each long = 10 and each unit = 3
so...13 will make 1 long and 5 units = 15
Class expectations and grading
(see syllabus in canvas)
Juggling Mr. Milt