Math Test 1 ede
List the digits in the order in which students should learn to write them? What is this based on?
1472536908 The student learns straight lines first (1,4,7), then the student moves to the curves of letters with straight lines (2,3,5), then the student focuses on curves (6,9), then the student understands these skills full circle (0,8) The gradual learning of lines/shapes
Associative Property of Addition
Contextual problems adding three addends in different orders Ex. 3 + (2 + 4) = (3 + 2) + 4
Explain why "key words" should NOT be taught
It sends a wrong message about doing mathematics to our students. When they look at key words, they are not understanding the full meaning of the problem rather just looking for key words. They don't work with two-step problems or more advanced problems
Explain why and how ten frames should be used, stating specific groups of Basic Facts for Addition.
It's a representation for adding WHY: It is used so students can relate other numbers to 10. This helps build computation skills. Ten frames help students see the relationships among a number and ten, whether it is less than or more than HOW: With the chart with 10 squares and the squares get a dot. The dots represent numbers & it helps students recognize numbers using the anchor number 5 & 10.
Daisy Duck has several pots of flowers. After Donald gave Daisy 6 more pots of flowers, she had 15 pots of flowers. How many pots of flowers did Daisy have before Donald gave her any?
Join
I have 15 hamsters and there are 3 hamsters in each cage. How many hamster cages do I have?
Measurement
Algorithm
Traditional method which includes a rule or procedure in order to solve a problem
Direct Modeling Strategies
Using manipulative (Base 10 blocks, pictures, etc.) along with counting to represent meaning directly
How does the Number of the Day routine promote place value understanding?
Was given a numerical value (mine was 492); gave the number context (a referent), wrote the value in words using place value (four hundreds, 9 tens, 2 ones) and in expanded form (400+90+2 = 492); then found one and two more/less than; helped to see a number in a variety of contexts and used in different mathematical ways; helped build understanding of place value by relating it to the expanded form
What is computational estimation?
getting an approximation mentally
What is number sense?
well understood number meanings, multiple relationships among numbers, recognition of the relative magnitude of numbers, knowledge of the effect of operations on numbers, referents to measure things in the real world
What is computational fluency?
when students can complete computations mentally and quickly
Explicit Strategy Instruction
students learn a strategy, then explore and practice it
Be able to describe place value development (ideas of 10 of one thing is ONE of something else)
"ten ones makes one ten" two meanings of "ten"; three meanings of "hundred"
Three phases of Basic Facts:
1. Counting Strategies 2. Reasoning Strategies 3. Mastery
The Zero/Identity Property of Addition
Adding (or subtracting) zero to a number doesn't change its identity Ex. 3 + 0 = 3
What are the necessary behaviors associated with counting?
Assign each counted item only one counting word Demonstrate one-to-one correspondence Produce the list of counting words in order
Associative Property of Multiplication
Changing the grouping of three or more factors does not change the product. Ex. 3 x (2 x 4) = (3 x 2) x 4
Commutative Property of Multiplication
Changing the order of the factors does not change the product.
Vicky is picking out a new skateboard. They can be black, gray, tan, or dark brown, and the wheels can be yellow, purple, green, pink, or orange. How many different combinations does Vicky have to choose from?
Combinations
Minnie has 15 red marbles and some blue marbles. She has 13 more blue marbles than red ones. How many blue marbles does Minnie have?
Compare
don'ts" for teaching Basic Facts
Do NOT: use lengthy times tests use public comparisons of mastery proceed through facts in order from 0-9 move to memorization too soon work on all facts at once use facts as a barrier to good mathematics use fact mastery as a requisite for calculator use
Ex. 3 lines x 4 people = 12 people Ex. Anna has 2 packs of gum. If each pack contains 6 pieces of gum, how many pieces of gum does Anna have?
Equal Groups
Rounding
Ex. $23 to $20
Compatible Numbers
Ex. $23 to $25
Caleb and Joe both have marble collections. Caleb has 20 marbles. Joe has two times as many marbles than Caleb. How many marbles does Joe have?
Multiplicative Comparison
Join
Must have a physical action Are not only for addition problems Think about gaining from an initial total
seperate
Must have a physical action Think about giving away from the initial total
Compare
No action
Part-Part-Whole
No action Think about adding two separate things together to get one total
Invented Strategy
Nontraditional method not involving the use of manipulatives May include written recordings and mental methods Benefits of Invented Strategies for Students:
How are place value concepts evident in the 1-100 chart?
Notice that as the numbers in a row got greater, the amount of tens stayed the same, but the number of ones increased; and that as the numbers in a column got greater, the number of tens increased, but the number of ones stayed the same
Commutative Property of Addition
Pair contextual problems that have the same addends, just in different orders Ex. 3 + 2 = 5 and 2 + 3 = 5
Mickey Mouse has 4 cubes of swiss cheese and 7 cubes of cheddar cheese. How many cubes of cheese does Mickey have?
Part-Part-Whole
Gabrielle has 12 eggs in her refrigerator. She wants to cook eggs for 3 people. How many eggs can each person have?
Partition
Ex. Mrs. Smith is building a bench and needs 6 lengths of wood that each measure 1.4 meters. How many meters of wood does he need to purchase? Ex. 5 in. x 6 in. = 30 square inches
Product of Measures
List examples of the three kinds of Base-10 Models:
Proportional: Group able (Uni-fix cubes, Multi-link cubes) Pre-grouped (Base 10 blocks, flats, longs, units) Non Proportional: Teddy bear counters
Pluto gave Goofy 7 of his dog bones leaving him with 5 bones. How many bones did Pluto have before he gave any to Goofy?
Separate
List the skills/concepts that are taught through the Shapes of Numbers activity
Shapes of Numbers: Number sense Mickey Ticket to Class: Number sense
How should multiplication be introduced to students?
Start with repeated addition and then move on to invented strategies for multiplication Combinations is a good place to start Start with numbers 2 and 5
Equal Groups
The answer is the same type of thing as one of the numbers
Partition
The number of groups is known, but not the size of each group (dealing cards to a group of people)
Identity Property of Multiplication
The product of any number and 1 is that number.
Measurement
The size of each group is known, but not the number of groups
Combinations
The two numbers in a multiplicative problem represent different types of things; the answer will be a "new thing" (shirts and shorts combined form outfits) Mickey's Outfits Activity
Product of Measures
The two numbers in a multiplicative problem represent different types of things; the answer will be in terms of something different (a 5 INCH by 7 INCH frame frames a picture that is 35 SQUARE INCHES)
Distributive Property of Multiplication over Addition
a(b / c) = a times b plus a times c; add first & then multiply OR multiply each & then add Rule: a(b + c) = (a x b) + (a x c) Ex. 4 (2 + 3) = (4 x 2) + (4 x 3)
addition
addend + addend = sum
front-end estimation
an estimation method in which the front digits are added or subtracted Ex. $26 to $20
Guided Invention
an open-ended focus on strategies Students select a strategy based on their knowledge of number relationships
Division
dividend/divisor = quotient
Memorization
does not devote time to developing strategies
Know the "dos for teaching Basic Facts
emphasize operation sense, as it is very important in the mastery of basic facts ask students to self monitor focus on self-improvement drill in short time segments work on facts over time involve families make drill enjoyable use technology emphasize the importance of quick recall of facts
Multiplication
factor x factor = product
Multiplicative Comparison
involves the comparison of 2 quantities manipulatively, involves finding "how many times as much" of 1 quantity is compared in another quantity, or "stretching" the original by a certain quantity.
Subtraction
minuend - subtrahend = difference
Explain what a Basic Fact is
refers to mathematical relationships in which the two parts are less than 10.
