Kategorier: Alle - prime - division - mathematics - diagrams

af Lupe De Jesus 5 år siden

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MTE 280 Elementary Mathmatics

Prime factorization involves breaking down a number into its prime components using methods like factor trees or upside-down division. In a factor tree, one multiplies prime numbers to reconstruct the original number.

MTE 280 Elementary Mathmatics

MTE 280 Elementary Mathematics

Weeks 11-15

Mentally Calculating %
Find 10% First
+, -, x Decimals
Showing Decimals
Estimate Before Solving
LINE UP WHOLE NUMBERS!!!!
Order of Operations
Not P.E.M.D.A.S., but G.E.M.D.A.S.

GEMDAS:

Divisibility Rules
2,3,6...3 & 9...2,4,8...5 & 10

Divisibility Rules:

Algorithms for +, -, x, / Fractions
Backwards "C" and "KCF"
Simplify First
Remember What We Did with Factor Trees?

Weeks 6-10

Showing how to Compare/Solve Fractions with Diagrams
Rectangles are Better
Pac-Man Wants the Fraction Missing the Smaller Piece
LCM & GCF
Big Number vs. Small Number
Prime Factorization
Factor Trees and Upside Down Division
Showing how to Solve +, -, x, and / Integer Problems with Diagrams
Grouping and Zero Banks
"Hector's Method"
White/Yellow Tiles Means Positive and Red Tiles Means Negative

Weeks 4-5

Using Alternative Algorithms for Multiplication
Multiplication Made Easy

Base Ten Blocks, Area Model, Expanded Form, and Lattice.

Using Alternative Algorithms for Addition
Timely, but Worth It

Expanded Form, Left to Right, Scratch Method, and Lattice.

Numbers are our Friends

Compatible/Friendly Numbers and Trade Off.

Downwards Division
LLLLLLeaving Base Ten

Weeks 1-3

Changing Bases
Converting from Base Ten
  1. Using what we know about the rules of "FLU", we know that in base eight, one long consists of eight units. With this knowledge, we can begin to draw a diagram, counting every long drawn equal to eight. So, for example, 8, 16, 24 and so on. Continue this process. If need be, write the number under the long that you are on.
  2. Next, when we have reached 8 rows of 8 longs, it is important to remember to then draw that group of longs into a flat, since we know that in base eight, eight rows of eight is equal to one flat.
  3. Continue counting longs (and remembering to group 8 rows of longs into a flat) until you have reached the number 136.
  4. By using this method, we should have two flats, one long, and zero units. Therefore, the answer would be 210 base eight.
  5. To check our math, we can do 64+64+8, and this would equal 136, which was our original base ten number before we began converting.
Converting to Base Ten
  1. Using our previous knowledge about "FLU", we know to draw two flats, seven longs, and one unit to represent 271.
  2. Because it is 271 base nine we know that one flat is equal to nine rows of nine, which equals eighty one. Because there are two flats, we would begin to write our equation as 9 squared plus 9 squared, or simply, 2(81)+__.
  3. Next, because we know that one long is equal to nine units in base nine, and there are seven longs, we can add to our equation: 2(81)+7(9)+__.
  4. Continuing, because we know that one unit is equal to one, and there is only one unit in the number 271, we can finish writing our equation by adding in: 2(81)+7(9)+1=__
  5. Finally, when first multiplying 2(81) and 7(9) then adding all the numbers together, our answer is 226. Because it is assumed when there is no base number written that it is automatically in base ten, our answer is simply 226.
Introduction to Working with Bases
The Smallest Base that Numbers Can Be In
Reading Numbers with the "FLU"

When reading a number, we must follow the "FLU" (starting from left to right) rule to determine how many flats, longs, and units there are in order to make a diagram representing this, or to help skip count to convert bases.

Standards of Math Practice
Problem Solving Strategies
  1. Identify What Makes the Problem Hard, and Get Rid of the Hard Part.
  2. Draw a Diagram (not Picture).
  3. Guess and Check!
  4. Write an Equation.
UnDev CarLO

There is a four step process to problem solving: