EDCP 342A Unit planning:
Your name: Hemlatta Engineer
School, grade & course: Seaquam Secondary School, Grade 12 & Calculus.
School, grade & course: Seaquam Secondary School, Grade 12 & Calculus.
The topic of unit: Exponential and logarithm functions
Preplanning questions:
(1) Why do we teach this unit to secondary
school students? Research and talk about the following: Why is this topic included in the curriculum? Why is it important that students learn it? What learning do you hope they will take with them from this? What is intrinsically interesting, useful, and beautiful about this topic? (150
words)
The topic is included in the curriculum because Exponential and logarithm functions develop the concept of instantaneous rate of change. It is important that students learn the topic so that they can apply them to solve the growth and decay problems. I hope
students will learn from the Exponent and logarithm functions unit that how
to model real-world situations.
Logarithm functions are helpful when working with phenomena that have a very wide range of values that students actually work within a smaller range. The Logarithm functions that are used to measure the magnitude of earthquakes. The magnitude of an earthquake is related to how much energy-related by the quake so that we can save human lives by predicting the after sock the earthquake’s effects.
Exponential functions are helpful with phenomena that change very quickly or that grow or decay by percentage over a particular time period. In many of the sciences, certain quantities
grow or decay at a rate that is proportional to their size.
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(2) A mathematics project connected to
this unit: Plan and describe a student mathematics project that will form part of this unit. Describe the topic, aims, process and timing, and what the students will be asked to produce, and how you will assess the project. (250
words)
The
Process of the project: The project is all about comparing the Exponential function and logarithm function. The project helps students to connect math to real-world situations such as the growth of population, the growth of bacteria, sea level raise, temperature raise, weather forecasting, or university fees raise.
The
students will be asked: Students will pick an Exponential function or
logarithm function growth situation and research real-life rates. They create
an equation, write a story/ world problem, create a graph, present the
PowerPoint presentation/model/poster, and compare Exponential function’s
equation with a logarithm function’s equation or vice a Versa.
Aims
to do on their project: create the equations, compare the properties of the
two functions, and make scientific conclusions based on mathematical justification.
When
I will give the project to students, I will allow students to
work either in pairs, or small groups, or individually.
I
will give clear instructions on what is expected to do during the project and give a couple of days time to think about the project and ask them how they want to do the project, how they want to work. I will check the status of their
process on the project regularly. I will give the due date to submit the
project which would be a month later, at the end of the unit.
I
will assess the project when they will share their projects with the class as
a group and I will check do students cover the skills/aims which are
essential to complete the project.
|
(3) Assessment and
evaluation: How will you build a fair and well-rounded
assessment and evaluation plan for this unit? Include formative and summative, informal/ observational and more formal assessment modes. (100
words)
I will build a fair and well-rounded
assessments and evaluation plan for this unit by below mentioned three
assessment modes.
Pre-assessment encourage students to evaluate their current thinking about the
learning topic. Students will find out
what they already know about the topic and what they do not know about the
topic before trying to teach them a new topic.
Informal/observational assessments push
students to recognize the conceptual change. I would like to introduce a new
topic through student-centered problem-solving activity so that they can
experience the topic.
Summative Assessments after the lessons, during the mid-unit, and at the end of the
unit.
|
Elements of my unit plan: Give
a numbered list of the topics of the 10 lessons in this unit in the order I
would teach them.
Lesson
|
Topic
|
1
|
Laws of exponents and logarithms
|
2
|
Exponential of functions
|
3
|
Derivatives of Exponential functions
|
4
|
Properties of the
Derivatives of Exponential functions
|
5
|
Logarithmic functions
|
6
|
Derivatives of logarithmic functions
|
7
|
Natural logarithm and common logarithm
|
8
|
Properties of the derivatives of logarithmic
functions
|
9
|
Exponential growth & decay
|
10
|
Logarithmic differentiation
|
b) Write a detailed
lesson plan for three of the lessons:
MATH LESSON PLAN 1
Subject: Math
|
Grade: 12
|
Date: Feb. 25, 2020
|
Duration:
80 Minutes
|
Lesson Overview
(What this lesson is about)
|
This lesson will help students understand the concept of
the Exponential of functions and its importance.
It will also help the students to build a concrete
foundation on Exponential functions by using/ analyzing the graph.
|
||
Class Profile
|
The class has 30 students including 5 ELL learners, 16
girls, and 14 boys.
|
||
| Big Idea |
Differential calculus develops the concept of instantaneous
rate of change.
|
Curriculum Competencies
(What the students will do)
|
Students are
expected to:
·
Explore, analyze, and apply mathematical
ideas using reason, technology, and other tools
·
Estimate reasonably and demonstrate fluent,
flexible, and strategic thinking about the number
·
Visualize to explore and illustrate mathematical
concepts and relationships
·
Apply flexible and strategic approaches to solve
problems
|
Content
(What the students will know)
|
Determine the Exponential of
functions by using the graphs and by using the laws of exponents
Determine the Exponential of
functions by using the laws of exponents
|
Language Objectives
(What new language students will
learn)
|
Define Exponential of functions, in academic and in layman terms
Sketch the Exponential of functions’ graphs in small groups
Explain & State the domain, the range,
and the asymptote of the Exponential of functions to the class, both orally and in
writing.
|
Materials and Equipment Needed for this
Lesson
|
·
Calculus 12 textbook
·
Colored pens, pencils, eraser, grid papers, and
ruler
·
Whiteboard with markers
·
Exponential of functions Worksheets including problem-solving activity
|
Assessment/Evaluation
of Students’ Learning
|
I will give the worksheets to the entire class so as to
ensure all students work on it. Students will share their perspectives with
the class to review the concepts learned that day, so their level of
understanding can be increased.
I will do informal
assessment to make sure that students have a solid understanding of an
exponential function in relation to a scenario as this will aid in their theoretical
development of its graph and reflect on what students do not understand
generally, and then review it again in the next class. I will also be able to
see which students are not good at the lesson, so I can assist them further.
|
MATH LESSON PLAN 2:
Derivatives of Exponential
functions
Subject: Math
|
Grade: 12
|
Date: Feb. 26, 2020
|
Duration:
80 Minutes
|
Lesson Overview
(What this lesson is about)
|
This lesson will help students understand the concept of
the Derivatives of Exponential of
functions and its importance.
It will also help the students to build a concrete foundation on the Derivatives of Exponential
of functions by using/analyzing the graph.
|
||
Class Profile
|
The class has 30 students including 5 ELL learners, 16
girls, and 14 boys.
|
||
| Big Idea |
Differential calculus develops the concept of
instantaneous rate of change.
|
Curriculum Competencies
(What the students will do)
|
Students are
expected to:
·
Explore, analyze, and apply mathematical
ideas using reason, technology, and other tools
·
Estimate reasonably and demonstrate fluent,
flexible, and strategic thinking about the number
·
Visualize to explore and illustrate
mathematical concepts and relationships
·
Apply flexible and strategic approaches to
solve problems
|
Content
(What the students will know)
|
Determine the Derivatives of Exponential of functions by using
the graphs
Determine the Derivatives of Exponential of functions by using
the lows of exponents
|
Language Objectives
(What new language students will learn)
|
Define the Derivatives of Exponential of functions, in academic and in layman terms
Apply the
product and chain rules for the derivatives of the exponential of functions to the class, both orally and in writing.
|
Materials and Equipment Needed for this
Lesson
|
·
Calculus 12 textbook
·
Colored pens, pencils, eraser, grid papers,
and ruler
·
Whiteboard with markers
·
Derivatives of Exponential of functions Worksheets including discussion
activity
|
Assessment/Evaluation
of Students’ Learning
|
I will give the discussion activity to the entire class so
as to ensure all students work on it.
Students will share their perspectives with the class to review
on the concepts learned that day, so their level of understanding can be
increased.
I will do an informal assessment and reflect on what students
do not understand generally, and then review it again in the next class. I
will also be able to see which students are not good at the lesson, so I can
assist them further.
|
MATH LESSON PLAN 3
Subject: Math
|
Grade: 12
|
Date: Feb. 27, 2020
|
Duration:
80 Minutes
|
Lesson Overview
(What this lesson is about)
|
This lesson will help students understand the concept of the
Properties of the Derivatives of Exponential of
functions and its importance.
It will also help the students to build a concrete
foundation on Exponential of functions by applying its properties to the real
world situations.
|
||
Class Profile
|
The class has 30 students including 5 ELL learners, 16
girls, and 14 boys.
|
||
| Big Idea |
Differential calculus develops the concept of
instantaneous rate of change.
|
Curriculum Competencies
(What the students will do)
|
Students are
expected to:
·
Explore, analyze, and apply mathematical
ideas using reason, technology, and other tools
·
Estimate reasonably and demonstrate fluent,
flexible, and strategic thinking about the number
·
Visualize to explore and illustrate
mathematical concepts and relationships
·
Apply flexible and strategic approaches to
solve problems
|
Content
(What the students will know)
|
Determine the 8 Properties of the Derivatives of Exponential
of functions by sketching the graphs
|
Language Objectives
(What new language students will
learn)
|
Define the 8 Properties of the Derivatives of Exponential
of functions, in academic and in
layman terms by sketching the Exponential of functions’ graphs
Explain & State the domain, the
range, the asymptote, the interval of increase or decrease, the extreme value,
concavity, and the sketch of the curve of the Exponential of functions
to the class, both orally and in
writing.
|
Materials and Equipment Needed for this
Lesson
|
·
Calculus 12 textbook
·
Colored pens, pencils, eraser, grid papers,
and ruler
·
Whiteboard with markers
·
Properties of the derivatives of the Exponential
of functions Worksheets including problem-solving activity
|
Assessment/Evaluation
of Students’ Learning
|
I will give the problem-solving activity and discussion
activity to the entire class so as to ensure all students work on it.
Students will share their perspectives with the class to review
on the concepts learned that day, so their level of understanding can be
increased.
I will do a summative assessment and reflect on what
students do not understand generally, and then review it again on the next
class. I will also be able to see which students are not good at the lesson,
so I can assist them further.
|
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