Monday, October 05, 2009
Math 6 (Class 40)
Lesson Title
Investigation 6: The Locker Problem (1)
Overview
In today’s class students are presented with a perplexing problem about lockers! The solution of this problem will require them to use many of the ideas and skills from this unit of study.
Textbook Sections
Problem 6.1 (Txt. p.59) Unraveling the Locker Problem
Vocabulary
analyze
prime
composite
product
factor
divisor
conjecture
Key Attitudes
Willingness to work as a group to help meet individual and group goals.
Key Ideas
How can the concepts and skills we have been studying be used to solve the locker problem?
Key Skills
I can use what I have learned in this unit to solve a complex problem.
Turn-In (#-1)
No Homework
Handouts
No Handouts Posted
Assignment
ACE p.61 #1-5
Quiz Corrections
Disclaimer- The assignment as stated in class is the official assignment. Every effort is made to keep this posting accurate, but you should refer to what was stated in class as the final word.
Posted by Mr. Holcomb on 10/05 at 06:02 AM
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Algebra 2 (Class 20)
Lesson Title
1.2.3 What do they have in common?
Overview
In today’s class students continue to investigate how to determine if a function is linear from examining a table of values or a situation.
Textbook Sections
1.2.3 (Txt. p.38) What do they have in Common?
Vocabulary
input
output
relation
function
dependent variable
independent variable
parameters
linear relationship
Key Attitudes
Willingness to work as a group to help meet individual and group goals.
Key Ideas
What do all linear equations have in common?
How can you determine if a relationship is linear?
Key Skills
I can determine if a relationship is linear by examining a table of values.
I can determine if a relationship is linear by analyzing the context of the problem.
I can create a table of values which represents a linear relationship.
I can create a situation which represents a linear relationship.
Turn-In (#-1)
No Homework
Handouts
No Handouts Posted
Assignment
1-90 to 1-94
Quiz Corrections
Disclaimer- The assignment as stated in class is the official assignment. Every effort is made to keep this posting accurate, but you should refer to what was stated in class as the final word.
Posted by Mr. Holcomb on 10/05 at 06:02 AM
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Math 7 (Class 40)
Lesson Title
Investigation 4: Multiplying and Dividing Integers
Overview
In today’s class student learn how to play the “Integer Product Game”. This game is intended to help students develop fluency with multiplication of integers as well as lay the ground work for understanding division of integers.
Textbook Sections
Problem 4.3 (Txt. p. 57) Playing the Integer Product Game
Vocabulary
Integer
temperature
opposites
chip board
model
inverse
rate
Key Attitudes
Willingness to work as a group to help meet individual and group goals.
Key Ideas
How do you play the integer product game?
Key Skills
I can find the product of two integers.
I can play the integer product game.
I can determine the different moves that could be made when playing the integer product game.
Turn-In (#-1)
No Homework
Handouts
No Handouts Posted
Assignment
Play the Integer Product Game at least twice or for 30 minutes.
Quiz Corrections
Disclaimer- The assignment as stated in class is the official assignment. Every effort is made to keep this posting accurate, but you should refer to what was stated in class as the final word.
Posted by Mr. Holcomb on 10/05 at 06:01 AM
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Friday, October 02, 2009
Math 6 (Class 39)
Lesson Title
Investigation 5: Factorizations
Overview
In today’s class students continue to develop their skills and deepen their understanding of the prime factorization of numbers.
Textbook Sections
Problem 5.3 (Txt. p.50) Using Prime Factorizations
Vocabulary
analyze
prime
composite
product
factor
divisor
conjecture
Key Attitudes
Willingness to work as a group to help meet individual and group goals.
Key Ideas
How can the prime factorization of numbers be used to find the LCM and GCF?
Key Skills
I can find the LCM of two numbers using the prime factorization of the numbers.
I can find the GCF of two numbers using the prime factorization of the numbers.
Turn-In (#-1)
ACE p.52 #9, 10
Handouts
No Handouts Posted
Assignment
No Homework
Disclaimer- The assignment as stated in class is the official assignment. Every effort is made to keep this posting accurate, but you should refer to what was stated in class as the final word.
Posted by Mr. Holcomb on 10/02 at 05:45 AM
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Algebra 2 (Class 19)
Lesson Title
1.2.3 What do they have in common?
Overview
In today’s class we continue our work with linear functions as well as write our second test.
Textbook Sections
1.2.3 (Txt. p.38) What do they have in Common?
Vocabulary
input
output
relation
function
dependent variable
independent variable
parameters
linear relationship
Key Attitudes
Willingness to work as a group to help meet individual and group goals.
Key Ideas
What do all linear equations have in common?
How can you determine if a relationship is linear?
Key Skills
I can determine if a relationship is linear by examining a table of values.
I can determine if a relationship is linear by analyzing the context of the problem.
Turn-In (#-1)
1-84 to 1-89
Handouts
No Handouts Posted
Assignment
No Homework
Disclaimer- The assignment as stated in class is the official assignment. Every effort is made to keep this posting accurate, but you should refer to what was stated in class as the final word.
Posted by Mr. Holcomb on 10/02 at 05:45 AM
Permalink
Math 7 (Class 39)
Lesson Title
Investigation 4: Multiplying and Dividing Integers
Overview
Textbook Sections
Problem 4.2 (Txt. p.56) Studying Multiplication Patterns
Vocabulary
Integer
temperature
opposites
chip board
model
inverse
rate
Key Attitudes
Willingness to work as a group to help meet individual and group goals.
Key Ideas
How can I model the multiplication of integers?
What types of situations involve the multiplication of integers?
Key Skills
I can describe patterns that I observe in a table of numbers.
I can use patterns to make a prediction about the multiplication of integers.
I can find the product of two integers.
Turn-In (#-1)
ACE p.60 #26, 29
Handouts
No Handouts Posted
Assignment
No Homework
Disclaimer- The assignment as stated in class is the official assignment. Every effort is made to keep this posting accurate, but you should refer to what was stated in class as the final word.
Posted by Mr. Holcomb on 10/02 at 05:44 AM
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Thursday, October 01, 2009
IB Math HL (Class 19)
Announcements
Test next Friday
Lesson Title
Lesson for PS 7: The Derivative Function (4)
Overview
In today’s class students will score an Internal Assessment and use this activity to reflect on their Internal Assessment and what is required to score well. Students will work together on Workshop 4.
Textbook Sections
Vocabulary
function
independent variable
dependent variable
with respect to
rate of change
limit
derivative
Key Attitudes
Willingness to work as a group to help meet individual and group goals.
Key Ideas
For any differentiable function f(x), a slope (derivative) can be found for any value of x.
A function can be created using the derivatives (slopes) of another function.
A derivative function is positive on the intervals where the original function is increasing-- in other words, where the slope of the original function is positive.
A derivative function is negative on the intervals where the original function is decreasing-- in other words, where the slope of the original function is negative.
A derivative function is zero on the intervals where the original function is remaining constant-- in other words, where the slope of the original function is zero.
Key Skills
I can determine what is happening in a situation by examining a graph.
I can sketch a graph to represent the relationship between variables.
I can use a graphing calculator to examine what is happening to a function on a very small scale.
I can determine what is happening in a situation by examining a graph.
I can sketch a graph to represent the relationship between variables.
I can approximate the derivative of a function at a point.
I can use a graphing calculator to examine what is happening to a function on a very small scale.
I can determine what is happening in a situation by examining a graph.
I can sketch a graph to represent the relationship between variables.
I can approximate the derivative of a function at a point.
I can explain the meaning of “definite integral”.
I can estimate the value of a definite integral by using rectangles (left, middle, or right) or by using trapezoids.
I can determine if a situation calls for finding a definite integral.
I can interpret the meaning of the definite integral using its units of measure to help.
I can explain the meaning of a limit of a function.
I can determine the limit of a function using a graph, a table of values, or algebra.
I can explain the meaning of “definite integral”.
I can estimate the value of a definite integral by using rectangles (left, middle, or right) or by using trapezoids.
I can determine if a situation calls for finding a definite integral.
I can interpret the meaning of the definite integral using its units of measure to help.
I can explain the meaning of a limit of a function.
I can determine the limit of a function using a graph, a table of values, or algebra.
I can explain the meaning of a limit of a function.
I can determine the limit of a function using a graph, a table of values, or algebra.
I can evaluate the limit of a function which involves the x-value approaching infinity.
I can explain the meaning of a limit of a function.
I can determine the limit of a function using a graph, a table of values, or algebra.
I can evaluate the limit of a function which involves the x-value approaching infinity.
I can explain the meaning of a limit of a function.
I can determine the limit of a function using a graph, a table of values, or algebra.
I can evaluate the limit of a function which involves the x-value approaching infinity.
I can explain what is meant by “derivative function”.
I can determine over what interval a function is differentiable given the graph of the function.
When given four graphs, I can determine if any two represent a function and its derivative function.
I can sketch the graph of the derivative function when given the graph of a function.
I can sketch the graph of a function without using a calculator and then create a graph of the derivative function.
I can explain what is meant by “derivative function”.
I can determine over what interval a function is differentiable given the graph of the function.
When given four graphs, I can determine if any two represent a function and its derivative function.
I can sketch the graph of the derivative function when given the graph of a function.
I can sketch the graph of a function without using a calculator and then create a graph of the derivative function.
Handouts
No Handouts Posted
Assignment
WS is Due next Thursday, Oct. 17. Other assignments will be coming, so don’t put it all off
Disclaimer- The assignment as stated in class is the official assignment. Every effort is made to keep this posting accurate, but you should refer to what was stated in class as the final word.
Posted by Mr. Holcomb on 10/01 at 05:02 AM
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Math 6 (Class 38)
Lesson Title
Investigation 5: Factorizations
Overview
In today’s class students examine how the prime factorization of two numbers can be used to find the LCM and GCD of the numbers.
Textbook Sections
Problem 5.3 (Txt. p.50) Using Prime Factorizations
Vocabulary
analyze
prime
composite
product
factor
divisor
conjecture
Key Attitudes
Willingness to work as a group to help meet individual and group goals.
Key Ideas
How can the prime factorization of numbers be used to find the LCM and GCF?
Key Skills
I can find the LCM of two numbers using the prime factorization of the numbers.
I can find the GCF of two numbers using the prime factorization of the numbers.
Turn-In (#-1)
ACE p.52 #1-8
Handouts
No Handouts Posted
Assignment
ACE p.52 #9, 10
Disclaimer- The assignment as stated in class is the official assignment. Every effort is made to keep this posting accurate, but you should refer to what was stated in class as the final word.
Posted by Mr. Holcomb on 10/01 at 04:56 AM
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Math 7 (Class 38)
Lesson Title
Investigation 4: Multiplying and Dividing Integers
Overview
In today’s lesson students study patterns to help understand the multiplication of integers.
Textbook Sections
Problem 4.2 (Txt. p.56) Studying Multiplication Patterns
Vocabulary
Integer
temperature
opposites
chip board
model
inverse
rate
Key Attitudes
Willingness to work as a group to help meet individual and group goals.
Key Ideas
Explore the use of integers in applied settings.
Numbers above zero are positive and below zero are negative.
Numbers above zero are positive and below zero are negative.
Numbers above zero are positive and below zero are negative.
Numbers above zero are positive and below zero are negative.
Numbers above zero are positive and below zero are negative.
Numbers above zero are positive and below zero are negative.
Numbers above zero are positive and below zero are negative.
Numbers above zero are positive and below zero are negative.
A number line can be used to model the addition of integers.
A number line can be used to model the addition of integers.
A number line can be used to model the addition of integers.
Addition of integers can be modeled with a chip board.
Addition of integers can be modeled with a chip board.
Addition of integers can be modeled with a chip board.
Subtraction of integers can be modeled using a chip board.
Subtraction of integers can be modeled using a chip board.
Subtraction of integers can be modeled using a chip board.
Subtraction of integers can be modeled using a number line.
Subtraction of integers can be modeled using a number line.
Subtraction of integers can be modeled using a number line.
Patterns can help you make predictions.
Addition and subtraction are operations which undo each other, they are inverses of each other.
Addition and subtraction are operations which undo each other, they are inverses of each other.
Addition and subtraction are operations which undo each other, they are inverses of each other.
Addition and subtraction are operations which undo each other, they are inverses of each other.
How can I model the multiplication of integers?
How can I model the multiplication of integers?
Key Skills
I can describe patterns that I observe in a table of numbers.
I can use patterns to make a prediction about the multiplication of integers.
I can find the product of two integers.
Turn-In (#-1)
Problem 4.1 Follow-Up
Handouts
No Handouts Posted
Assignment
ACE p.60 #26, 29
Disclaimer- The assignment as stated in class is the official assignment. Every effort is made to keep this posting accurate, but you should refer to what was stated in class as the final word.
Posted by Mr. Holcomb on 10/01 at 04:55 AM
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