This is a 10 question general review game for the state tests at the end of the year. I was introduced to this website, Kahoot.it, at a professional development meeting during my internship in a middle school. Students can use laptops provided by the schools, or their own devices- depending on your school's technology availability and policy. The quizzes are really easy to make and have a fun game-show feel to them that the kids absolutely loved. There will be many more Kahoots in the future!
https://play.kahoot.it/#/k/83fbac5b-b0e8-4ede-a0b0-3a6082ff80df
Sunday, April 6, 2014
Wednesday, March 26, 2014
My Classroom Behavior Management Plan
Classroom Behavior
Management Plan
Classroom Rules
1. Respect
others. Be kind with words and actions.
2. Come
to class daily prepared with materials and a positive attitude.
3. Listen
carefully and follow directions the first time asked.
4. Do
not interrupt others while speaking and raise your hand if you have a question.
5. Ask
questions and stay on task.
Explanation of Rules
1. Students should always follow the golden rule: “Treat others how you would want to be treated”. If students respect one another, then the classroom environment will remain stable and peaceful.
2. Students need to bring all
materials and maintain a positive attitude every day in order to be
successful in their education. A positive attitude will assist students in
becoming enthusiastic and open-minded learners. Time is wasted when
students must ask around for materials which they should have already. In
a worst case scenario, the student may have to go without and lose
valuable information in the process.
3. Class time is wasted when
students need the teacher to repeat directions, therefore students must
pay attention the first time.
4. In order for students to
fully absorb presented information, students should not not talk while others are
speaking. They must listen and maintain respect with hand raising rather
than speaking out.
5. If students do not
understand information, it is their job to let the teacher know, so she can
adjust, modify, or change teaching techniques to accommodate students’ learning styles and needs. Students should remain on task during lessons and activities
because this maximizes learning time.
1. Verbal warning and logical consequences informing students that they have a choice in their behavior and the resulting consequences of misbehavior.
2. Contact Parent to reinforce the seriousness of the situation at home and at school.
3. Denial of privileges such as lunch with friends or advisement activities.
4. Lunch detention, sitting at the silent lunch table during lunchtime.
5. Before or after-school detention with teacher.
6. Parent/team conference to ensure support from all members of students’ lives.
7. Referral to administration.
Consequences
1. Verbal warning and logical consequences informing students that they have a choice in their behavior and the resulting consequences of misbehavior.
2. Contact Parent to reinforce the seriousness of the situation at home and at school.
3. Denial of privileges such as lunch with friends or advisement activities.
4. Lunch detention, sitting at the silent lunch table during lunchtime.
5. Before or after-school detention with teacher.
6. Parent/team conference to ensure support from all members of students’ lives.
7. Referral to administration.
My Classroom Management Plan
My Classroom Management
Plan
Philosophy (and Influences) of Classroom Management
My philosophy on classroom management can be summed up in one statement: Be patient, caring, structured and practical. The ground rules should be clearly laid out on the first day of school, such as what Harry Wong describes, in order to establish a firm understanding of what is expected in the classroom from day one. Children need structure and it is immensely beneficial for the teacher to provide it at all times. I also ascribe to Lee and Marlene Canter’s ideas of assertive discipline. It should be made clear that “students have the right to learn while they are in school and the teacher has the right to teach”. Any disruptions that negatively affect class time will be handled accordingly, per the prescribed set of class rules that students will consistently be reminded of.
While physically teaching, I show preference toward Jacob Kounin’s lesson management techniques; To maintain order, teachers need to be aware of all that is happening in the classroom at all times and have the ability to act quickly when circumstances arise. I also believe that student behavior is optimal when students are interested in presented material. Lesson momentum and excitement play a pivotal role in the advancement of student learning.
When confronting students with issues that may be construed in a negative manner, I agree with Haim Ginott’s “Congruent Communications Theory”. “I-messages” are much more effective than “You-messages” because students may feel threatened and lash out when a teacher addresses situations in a negative and non-productive manner. “I-messages” also show students that the teacher truly cares about the student and encourages improvement rather than places blame.
In the classroom, I prefer myself to maintain a referent power base with my students. My intention is not to be a friend to the students, but rather, to convey a message that I care about them on an individual level. When I am disappointed or angry, it is because students were breaking pivotal rules, being disrespectful, or disruptive. Everyone is entitled to their own thoughts and opinions, and should feel comfortable asking questions or expressing concerns without the fear of ridicule or negative backlash.
I believe in collaborative management because it is the teacher’s responsibility to ensure that students become productive members of a democratic society. A helpful way for students to learn how to function democratically is for the teacher to model the behavior and allow students to make their own decisions. The teacher should serve as the guide and leader and the student should be able to provide input which is valued and taken into consideration in times of need.
My introduction to students on the first day of school will most certainly be: “I am the teacher and my job is to teach you. You are the student and your job is to learn. As long as we both do our jobs well, this will be a rewarding year.”
Routines and Procedures
To avoid disciplinary problems
stemming from idle time, students will be required to enter the classroom and
immediately begin a warm-up activity of some sort. The warm-up activity will
serve as a distraction from social activity and will prepare students for the
requirement of focus on the topic of the day.
Throughout the workday, students
will be required to stay on task and only leave their seats for sharpening
pencils or throwing away trash, etc., when they do so in a non-disruptive
manner or have asked for permission to do so. This will alleviate unnecessary
distractions throughout the school day and procedures will, likewise, be
explained thoroughly to students during the first days of class.
Students must remain quiet and
attentive to instruction, unless notified otherwise (because of group work or
other extenuating circumstances) and will be reminded of the necessity to do so
and the consequences of disruptive behavior whenever the necessity arises.
Seating Arrangement
My classroom seating chart will be
laid out in rows and columns with each student having the accessibility of a
single partner at all times. In this way, students are all faced forward and
will be less likely to become distracted by peers around them. The teacher’s
desk will, optimally, be in the front, corner of the room so that when students are working
and the teacher is at the desk, the teacher is always in view of all the
students. In this way, the teacher can monitor misbehavior or receive questions
and comments from students at all times. There will be room in between rows and
around the room to move around and desks will have the option to be pushed
together and moved around for special activities throughout the school year.
Storage best placed in the back of the classroom because it does not need to be a focus
or distraction for students. Additional desks
will be placed off to the side for students to use for projects that require
more space or for students who consistently misbehave in class and must sit near
the teacher, who will then exert proximity control to maintain appropriate
behavioral expectations.
Friday, March 14, 2014
Triangle Inequality Theorem Lesson Plan (7th grade)
Lesson Plan
Subject/Topic: Math/ Triangle Inequality Theorem
Time (minutes) required for lesson: 60 minutes
CC Georgia
Performance Standards for this lesson:
MCC7.G.2. Draw
(freehand, with ruler and protractor, and with technology) geometric shapes with
given conditions. Focus on constructing triangles from three measures of angles
or sides, noticing when the conditions determine a unique triangle, more than
one triangle, or no triangle.
Essential Question(s):
- What is the relationship between the sides of a triangle?
Purpose/Relevance:
- Students need to understand what side lengths will create a triangle in order to recognize whether measurements are valid or not.
- Students will be able to determine whether side lengths create a triangle by applying their understanding of the triangle inequality theorem.
- Materials/Equipment/Technology Required:
- Computer, projector, and
Mobi Tablet OR white board.
- Olympic Math website: http://nrich.maths.org/8191
- Straws and Triangle
Inequality Theorem worksheet
PROCEDURES
Warm-up: (10 minutes)
Olympic Math-
Identify and describe angles various pictures from the Olympics which
highlight angle relationships such as supplementary, complementary, vertical,
corresponding, and adjacent.
Format of the lesson: (30 minutes)
Independent Practice:
1. Students
will work individually to create various examples of triangles using the
manipulative activity and discover the pattern that lends itself to the
Triangle Inequality Theorem. The teacher will facilitate learning by keeping
students on track and answering any questions they may have, but the students
will discover the theorem for themselves.
Direct Instruction:
(10 minutes)
1. Teacher
will take examples from each student and use probing questions to draw out the
pattern that the students found from their experimentation.
Closure: 10
minutes
1. Ask students to summarize what they learned.
2. Exit
ticket. Using the formula for the Triangle Inequality Theorem, give one example
of a set of sides that do not create a triangle and another example of a set of
sides that do create a triangle.
Appendices:
Triangle Inequality Theorem Task http://www.glencoe.com/sites/common_assets/support_pages/MC_Course3/Triangle_Inequality.pdf
Complementary, Supplementary, and Angles in a Triangle Lesson Plan (7th grade)
Lesson
Plan
Subject/Topic:
Math/Complimentary, Supplementary, and Triangle Angles
Time (minutes) required for lesson: 135 minutes
CC
Georgia Performance Standards for this lesson:
MCC7.G.2.
Draw (freehand, with ruler and protractor, and with technology) geometric
shapes with given conditions. Focus on constructing triangles from three
measures of angles or sides, noticing when the conditions determine a unique
triangle, more than one triangle, or no triangle.
MCC7.G.5.
Use facts about supplementary, complementary, vertical, and adjacent angles in
a multi-step problem to write and solve simple equations for an unknown angle
in a figure.
Essential Question(s):
·
How can protractors be used to create and describe
angle measurements?
·
How can angle relationships be described as
supplementary or complimentary?
·
Why does the sum of the angles within a triangle
always equal 180 degrees?
Purpose/Relevance:
·
Understanding
relationships between angles is necessary to facilitate missing angle
measurement problem solving later in the geometry curriculum.
Goals of lesson aligned with CC
Georgia Performance Standards:
·
Students
will accurately find angle measurements using protractors.
·
Students
will determine angle relationships as being complimentary and/or supplementary.
·
Students
will understand the relationship between the sum of angles in a triangle and
supplementary angle measurements.
Materials/Equipment/Technology
Required:
·
< 10 geo-boards
·
< 100 rubber bands
·
< 2 sets of “ang-legs” (Substitute with Popsicle sticks, etc., if necessary)
·
Class
set of protractors
·
Paper
and pencils
·
Computer
with projector and internet connection to go to: http://www.amblesideprimary.com/ambleweb/mentalmaths/protractor.html for protractor modeling OR large protractor for modeling OR document
camera for modeling protractor usage
PROCEDURES
Introduction: 20 minutes
Protractor Review I DO- WE DO- YOU
DO format. This is a general review for using protractors, because students
should have already been exposed to this already. Students need to know how to
use protractors so that they can explore the properties of angles and identify
relationships between angles later on.
·
Ask students: What is the protractor used for
when making shapes? (Expected response would be to measure angles.)
* I do- We do- You do:
Exercise for protractors*
o Estimate to one or two degrees.
1.
I do: Several examples from: http://www.amblesideprimary.com/ambleweb/mentalmaths/protractor.html (This website is just a digital
version of a protractor. The teacher can set parameters as to the degree of
accuracy accepted for determining angle measurements using a protractor, as
well as other versions of protractor usage outside of finding angle
measurements.)
2.
We do: (On the white board with the wooden protractor)
§ Make a 45 degree angle.
§ Make a 105 degree angle.
3.
You
do:
§ Make an acute, obtuse, and right
angle.
Format of
the lesson- Direct Instruction: 15 minutes
1.
Supplementary and complementary note taking-
definition, examples, and real-world examples. What are supplementary angles?
Give clue for the “S” in supplementary as being able to turn into an 8 for 180
degrees. What are complimentary angles? Give clue for the “C” in complimentary
as being able to turn into a 9 for 90 degrees.
2.
Review angle measurements of triangles by asking
students how many degrees are in a triangle and clarifying any misconceptions
that may occur.
3.
Provide detailed instructions for the following
independent “centers”. Students will
break into six groups (decided on by the teacher). There will be three centers
duplicated so that there will be two of each center ongoing at all times.
Co-teaching model will provide students with one teacher per three centers for
monitoring and assistance purposes. Directions for each center will be posted
at each individual center.
Centers:
Complimentary Angles, Supplementary Angles, and Angles of a Triangle (20 minutes for each center)
1. Geo-board
Supplementary Angles Task: Investigate what makes two angles supplementary.
a. Use a protractor to measure the angle
formed by one long rubber band
piece, stretched over at least 5 pegs. What kind of an angle is this called?
(Straight angle).
b. Create a scalene triangle using the original long rubber band piece
(straight angle), and two shorter pieces and then add a fourth orange piece to
the center of the long rubber band piece, up through the vertex of the shorter
two rubber band pieces.
c. Remember how many degrees were in the
straight angle formed by the first single long rubber band. Measure and record
each of the angles formed at the center connector of the first long piece.
d. What do you notice about these angles?
How do they relate to the measurement of the degrees in the single long piece,
straight angle?
e. Try this again one more time with
different sized rubber band pieces. Is there a similar relationship?
f. What kind of angles are these?
Geo-board
Complimentary Angles Task: Investigate complimentary angles.
g. Make
medium-large sized square to begin.
h. Measure
and record the angle at the lower left vertex. *Use the protractor to measure
angles.
i.
Use
another connecting piece to divide the angle you just measured into two angles
as shown.
j.
Measure
both angles created by the new connecting piece, the angle bisector.
k. What
do you notice about these angles? How do they relate to the measurement of one
of the angles in the square?
l.
Find an equation that explains the mathematical relationship
between the original angle of the square and the two acute angles.
m. Try
this again one more time with different color pieces. Is there a similar
relationship?
n. What
kind of angles are the two acute angles?
2. “Ang-Legs” Triangle Sum Task: Investigate
the properties of the angles of a triangle.
a. Build
three congruent scalene triangles.
b. Identify
a different vertex on each triangles (arrows).
c. Connect
all three vertices together and align triangle legs.
d. What
do you notice about the degree measurement when all three angles are connected?
e. Repeat
with equilateral and isosceles triangles.
f. Does
this work for all triangles, or only certain triangles?
Closure: 20 minutes
·
What
are supplementary angles?
·
What
are complementary angles?
·
How
many degrees are in a triangle?
·
Find
examples of complementary and supplementary angles in the classroom.
Populations and Samples Lesson Plan (7th grade)
Lesson
Plan
Time (minutes) required for lesson:
120 minutes
CC
Georgia Performance Standards for this lesson:
MCC7.SP.1.
Understand that statistics can be used to gain information about a population
by examining a sample of the population; generalizations about a population
from a sample are valid only if the sample is representative of that
population. Understand that random sampling tends to produce representative
samples and support valid inferences.
MCC7.SP.2.
Use data from a random sample to draw inferences about a population with an unknown
characteristic of interest. Generate multiple samples (or simulated samples) of
the same size to gauge the variation in estimates or predictions. For example,
estimate the mean word length in a book by randomly sampling words from the
book; predict the winner of a school election based on randomly sampled survey
data. Gauge how far off the estimate or prediction might be.
Essential Question(s):
·
How do scientists make estimations about a
population size using a representative sample?
·
Purpose/Relevance:
· Choosing
biased, random, and convenient samples affect the fairness and accuracy of
statistical estimations.
Goals of lesson aligned with CC
Georgia Performance Standards:
·
Students
will recognize that larger samples are more likely to be representative of a
population.
·
Students
will understand the differences between random, convenient, and biased samples.
Materials/Equipment/Technology
Required:
·
· “Counting
Trees” state task handout retrieved from https://www.georgiastandards.org/Common-Core/Common%20Core%20Frameworks/CCGPS_Math_7_7thGrade_Unit4SE.pdf
PROCEDURES
Introduction: 20 minutes
Opener: On the projector/whiteboard-
1. What can you think of that’s
random?
2. What can you think of that’s
biased?
3. What can you think of that’s
convenient?
Format of
the lesson: 40 minutes
1.
Discuss
vocabulary terms and meanings: random sample, biased sample, and convenient
sample. Link ideas about vocabulary into everyday experiences and explain the
vocabulary’s mathematical connotations.
2.
Discuss
and show an example of random sampling through the conceptualization of fish in
a lake. Out of three types of fish, there are 125 of one group, 130 of another
group, and 45 of another group. Discuss by leading questions regarding how we
might use this collected sampling data to make inferences about the fish
population in the lake. Students should come to the conclusion that the
relationship between the fish populations can be quantified through using
inequalities and discovering patterns.
3.
Discuss common mistakes with random sampling through
an example of an election. Point out that choosing a small amount of data can
skew results when results are closely tied. Ask students which amount of people
would give the most representative and, therefore, valid representation of
voters- 25, 100, 2500, etc?
4.
Give examples of biased and convenient samples and
allow students to discuss how they differ from one another and how they differ
from random sample. Which sampling method do they think will produce the most
valid population representation? Answers should lead students to determining
that random sampling is more accurate.
Application/Independent
Practice: 40 minutes
1.
Independently,
students will complete the “Counting Trees” state task. Within this task
students will be expected to determine which method would be best used to
determine and estimate the amount of old trees vs. young trees. Students will
display logical reasoning skills and make inferences based on estimations from
over 1000 trees.
Closure:
20 minutes
·
Recap of the meaning of biased, convenient, and
random sampling and how they are used appropriately or inappropriately to make
inferences about populations.
·
Exit ticket: Give an example of a situation in which
sampling could be used to make inferences about a population and explain your
reasoning.
Geometry Unit Vocabulary Knowledge Scale
Students need multiple opportunities for exposure to new vocabulary terms in order to remember and apply the words appropriately. I found this knowledge scale to be an effective way to engage students through multiple ways of looking at the words.
Vocabulary Knowledge
Scale
|
Word
|
I
have never seen or heard the word, but I don’t know what it means
|
I
have seen or heard the word but I don’t know what it means
|
I
think I know what it means
|
I
know the definition of the word
|
I
can use the word in a sentence or in math class
|
Brainstorm
|
Meaning/
Example/
Illustration
|
|
Vertex
|
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Composite
Figure
|
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Parallel
|
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Perpendicular
|
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Skew
|
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Vertical Angles
|
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Adjacent Angles
|
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Straight Angles
|
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Complimentary Angles
|
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Supplementary Angles
|
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Area
|
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Circumference
|
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