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No Math is an Island
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Title: No Math is an Island
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No Math is an Island
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No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
wholeIf I can build a bridge of connections for
my studentsBy using meaningful explorations to
give students opportunities to actively build
new knowledge from experiences and prior
knowledge (NCTM Principles and Standards
2000)Providing opportunities that develop
mathematical reasoning for concepts such as
ratios. Ratios will lead to rates. Rates will
lead to proportions. Proportions will lead to
rate of change leading directly to slope. This
perspective of slope will lead students to think
of a functions rate of change in concrete
settings in ways that are consistent with ideas
of rate of change over some interval To know
Calculus helps me to see what bodies of middle
school mathematical knowledge will lead to
Calculus. In knowing this I can choose
activities and implement instruction that gives
students a deeper understanding of these middle
school concepts. Thus providing them a bridge of
connectionThese questions will guide the
activities I choose Will the activity provide a
mental image? "Use of mental imagery is a
characteristic of a meaningful mathematical
activity. (Wheatley 1997)Will it involve at
least three of standards of NCTM? As we explored
multiplication through base 10 blocks it hit me
when Dr Pratt stated, So although my focus for
the day may be multiplication, I will need to
find a way to incorporate as many content area as
possible to accomplish rich and deeper
understanding (Pratt 2008),Will it provide
opportunities for modeling, logical analysis,
making inferences, optimization and abstraction?
Activities that provide these opportunities
allow for me to develop questions to encourage
mathematical thinking.Will it interest and
connect to the students I teach? When I can tap
into the students world they become interested
and vested in their own learning.Darlenes
comment if we as educators impart clear
understandings to the many concepts we teach in
math it will be much easier for the students to
understand future concepts, especially calculus
and analytical geometry. made it all clear that
the bridge must be constructed through rich
explorations should become part of mathematical
instruction opposed to the quick method, quick
answer, one algorithm boring repetitive math (
Jardine 2006) that some students have come to
hate.An excerpt in the Calculus wiki solidified
my thoughts. What you should concentrate on
depends on why you're taking the course. If
you're going to be a physicist, for example, you
would actually _use_ calculus on a day-to-day
basis, in which case it's worth actually
memorizing various formulas for derivatives and
integrals on a long-term basis. If you're just
supposed to get an 'appreciation' for calculus,
then you should make sure that you understand all
the definitions, and that you can set up
integrals Why do I, as a middle grades
mathematics teacher, need to know about calculus
and analytic geometry? It really depends on the
goals I have for my students. I want to provide
my students with meaningful mathematical
explorations that will help construct the bridge
to higher mathematic courses.
5
No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
wholeIf I can build a bridge of connections for
my studentsBy using meaningful explorations to
give students opportunities to actively build
new knowledge from experiences and prior
knowledge (NCTM Principles and Standards
2000)Providing opportunities that develop
mathematical reasoning for concepts such as
ratios. Ratios will lead to rates. Rates will
lead to proportions. Proportions will lead to
rate of change leading directly to slope. This
perspective of slope will lead students to think
of a functions rate of change in concrete
settings in ways that are consistent with ideas
of rate of change over some interval To know
Calculus helps me to see what bodies of middle
school mathematical knowledge will lead to
Calculus. In knowing this I can choose
activities and implement instruction that gives
students a deeper understanding of these middle
school concepts. Thus providing them a bridge of
connectionThese questions will guide the
activities I choose Will the activity provide a
mental image? "Use of mental imagery is a
characteristic of a meaningful mathematical
activity. (Wheatley 1997)Will it involve at
least three of standards of NCTM? As we explored
multiplication through base 10 blocks it hit me
when Dr Pratt stated, So although my focus for
the day may be multiplication, I will need to
find a way to incorporate as many content area as
possible to accomplish rich and deeper
understanding (Pratt 2008),Will it provide
opportunities for modeling, logical analysis,
making inferences, optimization and abstraction?
Activities that provide these opportunities
allow for me to develop questions to encourage
mathematical thinking.Will it interest and
connect to the students I teach? When I can tap
into the students world they become interested
and vested in their own learning.Darlenes
comment if we as educators impart clear
understandings to the many concepts we teach in
math it will be much easier for the students to
understand future concepts, especially calculus
and analytical geometry. made it all clear that
the bridge must be constructed through rich
explorations should become part of mathematical
instruction opposed to the quick method, quick
answer, one algorithm boring repetitive math (
Jardine 2006) that some students have come to
hate.An excerpt in the Calculus wiki solidified
my thoughts. What you should concentrate on
depends on why you're taking the course. If
you're going to be a physicist, for example, you
would actually _use_ calculus on a day-to-day
basis, in which case it's worth actually
memorizing various formulas for derivatives and
integrals on a long-term basis. If you're just
supposed to get an 'appreciation' for calculus,
then you should make sure that you understand all
the definitions, and that you can set up
integrals Why do I, as a middle grades
mathematics teacher, need to know about calculus
and analytic geometry? It really depends on the
goals I have for my students. I want to provide
my students with meaningful mathematical
explorations that will help construct the bridge
to higher mathematic courses.
6
No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
wholeIf I can build a bridge of connections for
my studentsBy using meaningful explorations to
give students opportunities to actively build
new knowledge from experiences and prior
knowledge (NCTM Principles and Standards
2000)Providing opportunities that develop
mathematical reasoning for concepts such as
ratios. Ratios will lead to rates. Rates will
lead to proportions. Proportions will lead to
rate of change leading directly to slope. This
perspective of slope will lead students to think
of a functions rate of change in concrete
settings in ways that are consistent with ideas
of rate of change over some interval To know
Calculus helps me to see what bodies of middle
school mathematical knowledge will lead to
Calculus. In knowing this I can choose
activities and implement instruction that gives
students a deeper understanding of these middle
school concepts. Thus providing them a bridge of
connectionThese questions will guide the
activities I choose Will the activity provide a
mental image? "Use of mental imagery is a
characteristic of a meaningful mathematical
activity. (Wheatley 1997)Will it involve at
least three of standards of NCTM? As we explored
multiplication through base 10 blocks it hit me
when Dr Pratt stated, So although my focus for
the day may be multiplication, I will need to
find a way to incorporate as many content area as
possible to accomplish rich and deeper
understanding (Pratt 2008),Will it provide
opportunities for modeling, logical analysis,
making inferences, optimization and abstraction?
Activities that provide these opportunities
allow for me to develop questions to encourage
mathematical thinking.Will it interest and
connect to the students I teach? When I can tap
into the students world they become interested
and vested in their own learning.Darlenes
comment if we as educators impart clear
understandings to the many concepts we teach in
math it will be much easier for the students to
understand future concepts, especially calculus
and analytical geometry. made it all clear that
the bridge must be constructed through rich
explorations should become part of mathematical
instruction opposed to the quick method, quick
answer, one algorithm boring repetitive math (
Jardine 2006) that some students have come to
hate.An excerpt in the Calculus wiki solidified
my thoughts. What you should concentrate on
depends on why you're taking the course. If
you're going to be a physicist, for example, you
would actually _use_ calculus on a day-to-day
basis, in which case it's worth actually
memorizing various formulas for derivatives and
integrals on a long-term basis. If you're just
supposed to get an 'appreciation' for calculus,
then you should make sure that you understand all
the definitions, and that you can set up
integrals Why do I, as a middle grades
mathematics teacher, need to know about calculus
and analytic geometry? It really depends on the
goals I have for my students. I want to provide
my students with meaningful mathematical
explorations that will help construct the bridge
to higher mathematic courses.
7
No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
wholeIf I can build a bridge of connections for
my studentsBy using meaningful explorations to
give students opportunities to actively build
new knowledge from experiences and prior
knowledge (NCTM Principles and Standards
2000)Providing opportunities that develop
mathematical reasoning for concepts such as
ratios. Ratios will lead to rates. Rates will
lead to proportions. Proportions will lead to
rate of change leading directly to slope. This
perspective of slope will lead students to think
of a functions rate of change in concrete
settings in ways that are consistent with ideas
of rate of change over some interval To know
Calculus helps me to see what bodies of middle
school mathematical knowledge will lead to
Calculus. In knowing this I can choose
activities and implement instruction that gives
students a deeper understanding of these middle
school concepts. Thus providing them a bridge of
connectionThese questions will guide the
activities I choose Will the activity provide a
mental image? "Use of mental imagery is a
characteristic of a meaningful mathematical
activity. (Wheatley 1997)Will it involve at
least three of standards of NCTM? As we explored
multiplication through base 10 blocks it hit me
when Dr Pratt stated, So although my focus for
the day may be multiplication, I will need to
find a way to incorporate as many content area as
possible to accomplish rich and deeper
understanding (Pratt 2008),Will it provide
opportunities for modeling, logical analysis,
making inferences, optimization and abstraction?
Activities that provide these opportunities
allow for me to develop questions to encourage
mathematical thinking.Will it interest and
connect to the students I teach? When I can tap
into the students world they become interested
and vested in their own learning.Darlenes
comment if we as educators impart clear
understandings to the many concepts we teach in
math it will be much easier for the students to
understand future concepts, especially calculus
and analytical geometry. made it all clear that
the bridge must be constructed through rich
explorations should become part of mathematical
instruction opposed to the quick method, quick
answer, one algorithm boring repetitive math (
Jardine 2006) that some students have come to
hate.An excerpt in the Calculus wiki solidified
my thoughts. What you should concentrate on
depends on why you're taking the course. If
you're going to be a physicist, for example, you
would actually _use_ calculus on a day-to-day
basis, in which case it's worth actually
memorizing various formulas for derivatives and
integrals on a long-term basis. If you're just
supposed to get an 'appreciation' for calculus,
then you should make sure that you understand all
the definitions, and that you can set up
integrals Why do I, as a middle grades
mathematics teacher, need to know about calculus
and analytic geometry? It really depends on the
goals I have for my students. I want to provide
my students with meaningful mathematical
explorations that will help construct the bridge
to higher mathematic courses
8
- No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
wholeIf I can build a bridge of connections for
my studentsBy using meaningful explorations to
give students opportunities to actively build
new knowledge from experiences and prior
knowledge (NCTM Principles and Standards
2000)Providing opportunities that develop
mathematical reasoning for concepts such as
ratios. Ratios will lead to rates. Rates will
lead to proportions. Proportions will lead to
rate of change leading directly to slope. This
perspective of slope will lead students to think
of a functions rate of change in concrete
settings in ways that are consistent with ideas
of rate of change over some interval (Thompson
1994)To know Calculus helps me to see what
bodies of middle school mathematical knowledge
will lead to Calculus. In knowing this I can
choose activities and implement instruction that
gives students a deeper understanding of these
middle school concepts. Thus providing them a
bridge of connectionThese questions will guide
the activities I choose Will the activity
provide a mental image? "Use of mental imagery
is a characteristic of a meaningful mathematical
activity. (Wheatley 1997)Will it involve at
least three of standards of NCTM? As we explored
multiplication through base 10 blocks it hit me
when Dr Pratt stated, So although my focus for
the day may be multiplication, I will need to
find a way to incorporate as many content area as
possible to accomplish rich and deeper
understanding (Pratt 2008),Will it provide
opportunities for modeling, logical analysis,
making inferences, optimization and abstraction?
Activities that provide these opportunities
allow for me to develop questions to encourage
mathematical thinking.Will it interest and
connect to the students I teach? When I can tap
into the students world they become interested
and vested in their own learning.Darlenes
comment if we as educators impart clear
understandings to the many concepts we teach in
math it will be much easier for the students to
understand future concepts, especially calculus
and analytical geometry. made it all clear that
the bridge must be constructed through rich
explorations should become part of mathematical
instruction opposed to the quick method, quick
answer, one algorithm boring repetitive math (
Jardine 2006) that some students have come to
hate.An excerpt in the Calculus wiki solidified
my thoughts. What you should concentrate on
depends on why you're taking the course. If
you're going to be a physicist, for example, you
would actually _use_ calculus on a day-to-day
basis, in which case it's worth actually
memorizing various formulas for derivatives and
integrals on a long-term basis. If you're just
supposed to get an 'appreciation' for calculus,
then you should make sure that you understand all
the definitions, and that you can set up
integrals Why do I, as a middle grades
mathematics teacher, need to know about calculus
and analytic geometry? It really depends on the
goals I have for my students. I want to provide
my students with meaningful mathematical
explorations that will help construct the bridge
to higher mathematic courses
9
- No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
wholeIf I can build a bridge of connections for
my studentsBy using meaningful explorations to
give students opportunities to actively build
new knowledge from experiences and prior
knowledge (NCTM Principles and Standards
2000)Providing opportunities that develop
mathematical reasoning for concepts such as
ratios. Ratios will lead to rates. Rates will
lead to proportions. Proportions will lead to
rate of change leading directly to slope. This
perspective of slope will lead students to think
of a functions rate of change in concrete
settings in ways that are consistent with ideas
of rate of change over some interval (Thompson
1994 )Knowing Calculus helps me to see what
bodies of middle school math will lead students
to a better understanding of Calculus. In
knowing this I can choose activities and
implement instruction that gives students a
deeper understanding of these middle school
concepts. Thus providing students a bridge of
connection.These questions will guide the
activities I choose Will the activity provide a
mental image? Use of mental imagery is a
characteristic of a meaningful mathematical
activity. (Wheatley 1997)Will it involve at
least three of standards of NCTM? As we explored
multiplication through base 10 blocks it hit me
when Dr Pratt stated, So although my focus for
the day may be multiplication, I will need to
find a way to incorporate as many content area as
possible to accomplish rich and deeper
understanding (Pratt 2008),Will it provide
opportunities for modeling, logical analysis,
making inferences, optimization and abstraction?
Activities that provide these opportunities
allow for me to develop questions to encourage
mathematical thinking.Will it interest and
connect to the students I teach? When I can tap
into the students world they become interested
and vested in their own learning.Darlenes
comment if we as educators impart clear
understandings to the many concepts we teach in
math it will be much easier for the students to
understand future concepts, especially calculus
and analytical geometry. made it all clear that
the bridge must be constructed through rich
explorations should become part of mathematical
instruction opposed to the quick method, quick
answer, one algorithm boring repetitive math (
Jardine 2006) that some students have come to
hate.An excerpt in the Calculus wiki solidified
my thoughts. What you should concentrate on
depends on why you're taking the course. If
you're going to be a physicist, for example, you
would actually _use_ calculus on a day-to-day
basis, in which case it's worth actually
memorizing various formulas for derivatives and
integrals on a long-term basis. If you're just
supposed to get an 'appreciation' for calculus,
then you should make sure that you understand all
the definitions, and that you can set up
integrals Why do I, as a middle grades
mathematics teacher, need to know about calculus
and analytic geometry? It really depends on the
goals I have for my students. I want to provide
my students with meaningful mathematical
explorations that will help construct the bridge
to higher mathematic courses
10
- No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
wholeIf I can build a bridge of connections for
my studentsBy using meaningful explorations to
give students opportunities to actively build
new knowledge from experiences and prior
knowledge (NCTM Principles and Standards
2000)Providing opportunities that develop
mathematical reasoning for concepts such as
ratios. Ratios will lead to rates. Rates will
lead to proportions. Proportions will lead to
rate of change leading directly to slope. This
perspective of slope will lead students to think
of a functions rate of change in concrete
settings in ways that are consistent with ideas
of rate of change over some interval (Thompson
1994 )Knowing Calculus helps me to see what
bodies of middle school math will lead students
to a better understanding of Calculus. In
knowing this I can choose activities and
implement instruction that gives students a
deeper understanding of these middle school
concepts. Thus providing students a bridge of
connection.These questions will guide the
activities I choose. Will the activity provide a
mental image? Use of mental imagery is a
characteristic of a meaningful mathematical
activity. (Wheatley 1997)Will it involve at
least three of standards of NCTM? As we explored
multiplication through base 10 blocks it hit me
when Dr Pratt stated, So although my focus for
the day may be multiplication, I will need to
find a way to incorporate as many content area as
possible to accomplish rich and deeper
understanding (Pratt 2008),Will it provide
opportunities for modeling, logical analysis,
making inferences, optimization and abstraction?
Activities that provide these opportunities
allow for me to develop questions to encourage
mathematical thinking.Will it interest and
connect to the students I teach? When I can tap
into the students world they become interested
and vested in their own learning.Darlenes
comment if we as educators impart clear
understandings to the many concepts we teach in
math it will be much easier for the students to
understand future concepts, especially calculus
and analytical geometry. made it all clear that
the bridge must be constructed through rich
explorations should become part of mathematical
instruction opposed to the quick method, quick
answer, one algorithm boring repetitive math (
Jardine 2006) that some students have come to
hate.An excerpt in the Calculus wiki solidified
my thoughts. What you should concentrate on
depends on why you're taking the course. If
you're going to be a physicist, for example, you
would actually _use_ calculus on a day-to-day
basis, in which case it's worth actually
memorizing various formulas for derivatives and
integrals on a long-term basis. If you're just
supposed to get an 'appreciation' for calculus,
then you should make sure that you understand all
the definitions, and that you can set up
integrals Why do I, as a middle grades
mathematics teacher, need to know about calculus
and analytic geometry? It really depends on the
goals I have for my students. I want to provide
my students with meaningful mathematical
explorations that will help construct the bridge
to higher mathematic courses
11
- No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
wholeIf I can build a bridge of connections for
my studentsBy using meaningful explorations to
give students opportunities to actively build
new knowledge from experiences and prior
knowledge (NCTM Principles and
Standards)Providing opportunities that develop
mathematical reasoning for concepts such as
ratios. Ratios will lead to rates. Rates will
lead to proportions. Proportions will lead to
rate of change leading directly to slope. This
perspective of slope will lead students to think
of a functions rate of change in concrete
settings in ways that are consistent with ideas
of rate of change over some interval (Thompson
1994 article)To know Calculus helps me to see
what bodies of middle school mathematical
knowledge will lead to Calculus. In knowing this
I can choose activities and implement instruction
that gives students a deeper understanding of
these middle school concepts. Thus providing
them a bridge of connectionThese questions will
guide the activities I choose Will the activity
provide a mental image? "Use of mental imagery
is a characteristic of a meaningful mathematical
activity. (Wheatley 1997)Will it involve at
least three of standards of NCTM? As we explored
multiplication through base 10 blocks it hit me
when Dr Pratt stated, So although my focus for
the day may be multiplication, I will need to
find a way to incorporate as many content area as
possible to accomplish rich and deeper
understanding (Pratt 2008),Will it provide
opportunities for modeling, logical analysis,
making inferences, optimization and abstraction?
Activities that provide these opportunities
allow for me to develop questions to encourage
mathematical thinking.Will it interest and
connect to the students I teach? When I can tap
into the students world they become interested
and vested in their own learning.Darlenes
comment if we as educators impart clear
understandings to the many concepts we teach in
math it will be much easier for the students to
understand future concepts, especially calculus
and analytical geometry. made it all clear that
the bridge must be constructed through rich
explorations should become part of mathematical
instruction opposed to the quick method, quick
answer, one algorithm boring repetitive math (
Jardine 2006) that some students have come to
hate.An excerpt in the Calculus wiki solidified
my thoughts. What you should concentrate on
depends on why you're taking the course. If
you're going to be a physicist, for example, you
would actually _use_ calculus on a day-to-day
basis, in which case it's worth actually
memorizing various formulas for derivatives and
integrals on a long-term basis. If you're just
supposed to get an 'appreciation' for calculus,
then you should make sure that you understand all
the definitions, and that you can set up
integrals Why do I, as a middle grades
mathematics teacher, need to know about calculus
and analytic geometry? It really depends on the
goals I have for my students. I want to provide
my students with meaningful mathematical
explorations that will help construct the bridge
to higher mathematic courses
12
- No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
wholeIf I can build a bridge of connections for
my studentsBy using meaningful explorations to
give students opportunities to actively build
new knowledge from experiences and prior
knowledge (NCTM Principles and Standards
2000)Providing opportunities that develop
mathematical reasoning for concepts such as
ratios. Ratios will lead to rates. Rates will
lead to proportions. Proportions will lead to
rate of change leading directly to slope. This
perspective of slope will lead students to think
of a functions rate of change in concrete
settings in ways that are consistent with ideas
of rate of change over some interval (Thompson
1994 article)To know Calculus helps me to see
what bodies of middle school mathematical
knowledge will lead to Calculus. In knowing this
I can choose activities and implement instruction
that gives students a deeper understanding of
these middle school concepts. Thus providing
them a bridge of connectionThese questions will
guide the activities I choose Will the activity
provide a mental image? "Use of mental imagery
is a characteristic of a meaningful mathematical
activity. (Wheatley 1997)Will it involve at
least three of standards of NCTM? As we explored
multiplication through base 10 blocks, some using
the area model, some using arrays and yet some
using grouping, it was summed up for me by Dr.
Pratts statement. So although my focus for the
day may be multiplication, I will need to find
ways to incorporate as many content standards as
possible to gain a more rich and deeper
understanding for my students .Will it provide
opportunities for modeling, logical analysis,
making inferences, optimization and abstraction?
Activities that provide these opportunities
allow for me to develop questions to encourage
mathematical thinking.Will it interest and
connect to the students I teach? When I can tap
into the students world they become interested
and vested in their own learning.Darlenes
comment if we as educators impart clear
understandings to the many concepts we teach in
math it will be much easier for the students to
understand future concepts, especially calculus
and analytical geometry. made it all clear that
the bridge must be constructed through rich
explorations should become part of mathematical
instruction opposed to the quick method, quick
answer, one algorithm boring repetitive math (
Jardine 2006) that some students have come to
hate.An excerpt in the Calculus wiki solidified
my thoughts. What you should concentrate on
depends on why you're taking the course. If
you're going to be a physicist, for example, you
would actually _use_ calculus on a day-to-day
basis, in which case it's worth actually
memorizing various formulas for derivatives and
integrals on a long-term basis. If you're just
supposed to get an 'appreciation' for calculus,
then you should make sure that you understand all
the definitions, and that you can set up
integrals Why do I, as a middle grades
mathematics teacher, need to know about calculus
and analytic geometry? It really depends on the
goals I have for my students. I want to provide
my students with meaningful mathematical
explorations that will help construct the bridge
to higher mathematic courses
13
- No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
wholeIf I can build a bridge of connections for
my studentsBy using meaningful explorations to
give students opportunities to actively build
new knowledge from experiences and prior
knowledge (NCTM Principles and Standards
2000)Providing opportunities that develop
mathematical reasoning for concepts such as
ratios. Ratios will lead to rates. Rates will
lead to proportions. Proportions will lead to
rate of change leading directly to slope. This
perspective of slope will lead students to think
of a functions rate of change in concrete
settings in ways that are consistent with ideas
of rate of change over some interval (Thompson
1994 article)To know Calculus helps me to see
what bodies of middle school mathematical
knowledge will lead to Calculus. In knowing this
I can choose activities and implement instruction
that gives students a deeper understanding of
these middle school concepts. Thus providing
them a bridge of connectionThese questions will
guide the activities I choose Will the activity
provide a mental image? "Use of mental imagery
is a characteristic of a meaningful mathematical
activity. (Wheatley 1997)Will it involve at
least three of standards of NCTM? As we explored
multiplication through base 10 blocks it hit me
when Dr Pratt stated, So although my focus for
the day may be multiplication, I will need to
find a way to incorporate as many content area as
possible to accomplish rich and deeper
understanding (Pratt 2008),Will it provide
opportunities for modeling, logical analysis,
making inferences, optimization and abstraction?
Activities that provide these opportunities
allow for me to develop questions to encourage
and develop mathematical thinking.Will it
interest and connect to the students I teach?
When I can tap into the students world they
become interested and vested in their own
learning.Darlenes comment if we as educators
impart clear understandings to the many concepts
we teach in math it will be much easier for the
students to understand future concepts,
especially calculus and analytical geometry.
made it all clear that the bridge must be
constructed through rich explorations should
become part of mathematical instruction opposed
to the quick method, quick answer, one
algorithm boring repetitive math ( Jardine 2006)
that some students have come to hate.An excerpt
in the Calculus wiki solidified my thoughts.
What you should concentrate on depends on why
you're taking the course. If you're going to be a
physicist, for example, you would actually _use_
calculus on a day-to-day basis, in which case
it's worth actually memorizing various formulas
for derivatives and integrals on a long-term
basis. If you're just supposed to get an
'appreciation' for calculus, then you should make
sure that you understand all the definitions, and
that you can set up integrals Why do I, as a
middle grades mathematics teacher, need to know
about calculus and analytic geometry? It really
depends on the goals I have for my students. I
want to provide my students with meaningful
mathematical explorations that will help
construct the bridge to higher mathematic courses
14
- No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
wholeIf I can build a bridge of connections for
my studentsBy using meaningful explorations to
give students opportunities to actively build
new knowledge from experiences and prior
knowledge (NCTM Principles and Standards
2000)Providing opportunities that develop
mathematical reasoning for concepts such as
ratios. Ratios will lead to rates. Rates will
lead to proportions. Proportions will lead to
rate of change leading directly to slope. This
perspective of slope will lead students to think
of a functions rate of change in concrete
settings in ways that are consistent with ideas
of rate of change over some interval (Thompson
1994 article)To know Calculus helps me to see
what bodies of middle school mathematical
knowledge will lead to Calculus. In knowing this
I can choose activities and implement instruction
that gives students a deeper understanding of
these middle school concepts. Thus providing
them a bridge of connectionThese questions will
guide the activities I choose Will the activity
provide a mental image? "Use of mental imagery
is a characteristic of a meaningful mathematical
activity. (Wheatley 1997)Will it involve at
least three of standards of NCTM? As we explored
multiplication through base 10 blocks it hit me
when Dr Pratt stated, So although my focus for
the day may be multiplication, I will need to
find a way to incorporate as many content area as
possible to accomplish rich and deeper
understanding (Pratt 2008),Will it provide
opportunities for modeling, logical analysis,
making inferences, optimization and abstraction?
Activities that provide these opportunities
allow for me to develop questions to encourage
mathematical thinking.Will it interest and
connect to the students I teach? When I can tap
into the students world they become interested
and vested in their own learning. This provides
an experience of meaningful imagery and allows
students to fold back (Kieren 1994) when
needed.Darlenes comment if we as educators
impart clear understandings to the many concepts
we teach in math it will be much easier for the
students to understand future concepts,
especially calculus and analytical geometry.
made it all clear that the bridge must be
constructed through rich explorations should
become part of mathematical instruction opposed
to the quick method, quick answer, one
algorithm boring repetitive math ( Jardine 2006)
that some students have come to hate.An excerpt
in the Calculus wiki solidified my thoughts.
What you should concentrate on depends on why
you're taking the course. If you're going to be a
physicist, for example, you would actually _use_
calculus on a day-to-day basis, in which case
it's worth actually memorizing various formulas
for derivatives and integrals on a long-term
basis. If you're just supposed to get an
'appreciation' for calculus, then you should make
sure that you understand all the definitions, and
that you can set up integrals Why do I, as a
middle grades mathematics teacher, need to know
about calculus and analytic geometry? It really
depends on the goals I have for my students. I
want to provide my students with meaningful
mathematical explorations that will help
construct the bridge to higher mathematic courses
15
- No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
wholeIf I can build a bridge of connections for
my studentsBy using meaningful explorations to
give students opportunities to actively build
new knowledge from experiences and prior
knowledge (NCTM Principles and Standards
2000)Providing opportunities that develop
mathematical reasoning for concepts such as
ratios. Ratios will lead to rates. Rates will
lead to proportions. Proportions will lead to
rate of change leading directly to slope. This
perspective of slope will lead students to think
of a functions rate of change in concrete
settings in ways that are consistent with ideas
of rate of change over some interval (Thompson
1994 article)To know Calculus helps me to see
what bodies of middle school mathematical
knowledge will lead to Calculus. In knowing this
I can choose activities and implement instruction
that gives students a deeper understanding of
these middle school concepts. Thus providing
them a bridge of connectionThese questions will
guide the activities I choose Will the activity
provide a mental image? "Use of mental imagery
is a characteristic of a meaningful mathematical
activity. (Wheatley 1997)Will it involve at
least three of standards of NCTM? As we explored
multiplication through base 10 blocks it hit me
when Dr Pratt stated, So although my focus for
the day may be multiplication, I will need to
find a way to incorporate as many content area as
possible to accomplish rich and deeper
understanding (Pratt 2008),Will it provide
opportunities for modeling, logical analysis,
making inferences, optimization and abstraction?
Activities that provide these opportunities
allow for me to develop questions to encourage
mathematical thinking.Will it interest and
connect to the students I teach? When I can tap
into the students world they become interested
and vested in their own learning. This provide
an experience of meaningful imagery and allows
students to fold back when needed.Darlenes
comment, If we ,as educators, impart clear
understandings to the many concepts we teach in
math it will be much easier for the students to
understand future concepts, especially calculus
and analytical geometry., made it clear that the
bridge must be constructed through rich
explorations. These explorations should be
implemented in my instruction opposed to the
quick method, quick answer, one algorithm boring
repetitive math(Jardine 2006) that some students
have come to hate.An excerpt in the Calculus
wiki solidified my thoughts. What you should
concentrate on depends on why you're taking the
course. If you're going to be a physicist, for
example, you would actually _use_ calculus on a
day-to-day basis, in which case it's worth
actually memorizing various formulas for
derivatives and integrals on a long-term basis.
If you're just supposed to get an 'appreciation'
for calculus, then you should make sure that you
understand all the definitions, and that you can
set up integrals Why do I, as a middle grades
mathematics teacher, need to know about calculus
and analytic geometry? It really depends on the
goals I have for my students. I want to provide
my students with meaningful mathematical
explorations that will help construct the bridge
to higher mathematic courses
16
- No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
wholeIf I can build a bridge of connections for
my studentsBy using meaningful explorations to
give students opportunities to actively build
new knowledge from experiences and prior
knowledge (NCTM Principles and Standards
2000)Providing opportunities that develop
mathematical reasoning for concepts such as
ratios. Ratios will lead to rates. Rates will
lead to proportions. Proportions will lead to
rate of change leading directly to slope. This
perspective of slope will lead students to think
of a functions rate of change in concrete
settings in ways that are consistent with ideas
of rate of change over some interval (Thompson
1994 article)To know Calculus helps me to see
what bodies of middle school mathematical
knowledge will lead to Calculus. In knowing this
I can choose activities and implement instruction
that gives students a deeper understanding of
these middle school concepts. Thus providing
them a bridge of connectionThese questions will
guide the activities I choose Will the activity
provide a mental image? "Use of mental imagery
is a characteristic of a meaningful mathematical
activity. (Wheatley 1997)Will it involve at
least three of standards of NCTM? As we explored
multiplication through base 10 blocks it hit me
when Dr Pratt stated, So although my focus for
the day may be multiplication, I will need to
find a way to incorporate as many content area as
possible to accomplish rich and deeper
understanding (Pratt 2008),Will it provide
opportunities for modeling, logical analysis,
making inferences, optimization and abstraction?
Activities that provide these opportunities
allow for me to develop questions to encourage
mathematical thinking.Will it interest and
connect to the students I teach? When I can tap
into the students world they become interested
and vested in their own learning. This provide
an experience of meaningful imagery and allows
students to fold back when needed.Darlenes
comment, If we ,as educators, impart clear
understandings to the many concepts we teach in
math it will be much easier for the students to
understand future concepts, especially calculus
and analytical geometry., made it clear that the
bridge must be constructed through rich
explorations. These explorations should be
implemented in mathematical instruction opposed
to the quick method, quick answer, one
algorithm boring repetitive math(Jardine 2006)
that some students have come to hate.An excerpt
in the Calculus wiki solidified my thoughts.
What you should concentrate on depends on why
you're taking the course. If you're going to be a
physicist, for example, you would actually _use_
calculus on a day-to-day basis, in which case
it's worth actually memorizing various formulas
for derivatives and integrals on a long-term
basis. If you're just supposed to get an
'appreciation' for calculus, then you should make
sure that you understand all the definitions, and
that you can set up integrals Why do I, as a
middle grades mathematics teacher, need to know
about calculus and analytic geometry? It really
depends on the goals I have for my students. I
want to provide my students with meaningful
mathematical explorations that will help
construct the bridge to higher mathematic
courses.
17
No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
whole I will build a bridge of connections for
my students using meaningful opportunities to
develop mathematical reasoning.
Middle school math
18
No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
whole I will build a bridge of connections for
my students using meaningful opportunities to
develop mathematical reasoning.
Calculus and Analytical Geometry
Rich explorations
Middle school math
19
No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
whole I will build a bridge of connections for
my students using meaningful opportunities to
develop mathematical reasoning.
Calculus and Analytical Geometry
Middle school math
20
No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
whole I will build a bridge of connections for
my students using meaningful opportunities to
develop mathematical reasoning.
Calculus and Analytical Geometry
Meaningful activities
Incorporating more than one standard in activity
Middle school math
21
No math is an island, entire of itself Middle
school math a piece of Calculus, a part of the
whole I will build a bridge of connections for
my students using meaningful opportunities to
develop mathematical reasoning.
Develop questions that encourage mathematical
reasoning
Middle school math
Calculus and Analytical Geometry
22
No Math is an Island based on No Man is an Island
by John Donne Music by Groove Masters
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