This week in class we
discussed materials and resources in a math classroom. This is something that
may be obvious is a school that has access to things such as computers,
smartboards and the finances to support a technological math classroom, but
this is not always the case. Something that I think many teachers and students
don't think about is using themselves as a resource. Students can be used as
the primary resource in a classroom through things such as collaboration and
presentations of hands on actives with each other. They have the ability to
create, draw, write and research and then their work can be used as resources.
If you allow students to be creative and come up with their own approach to a problem
in mathematics, chances are you will have several different solutions to the
same problem. As a teacher you could then use these different solutions to
teach how these different approaches work and the math behind them. This allows
for collaboration, creativity and higher level thinking in the classroom as
well as student centered learning. Using students’ examples to teach would be a
great way to use your students as a resource in the classroom, especially if
you’re in a school that may not have access to many resources.
This
week I also had my presentation on the grade 10 academic mathematics course. In
this presentation we (Ela and I) did an overview of the whole course looking at
each major strand: Quadratic Relations, Trigonometry and Analytic Geometry. We
then each did an activity that can be used in this course. I did my activity
for the Quadratic Relations unit focusing on the transformations of a parabola.
In this activity I use a student-centered approach while incorporating
technology. In this activity 8 different groups of students would each be given
4 equations representing one a transformation. For example group one would be
given 4 equations of a parabola shifted up, group 2 would be given 4 equations
representing a parabola shifted down, group 3 would be given 4 equations
representing a parabola shifted right etc. The eight groups would be given one
of the following transformations: shift up, shift down, shift right, shift
left, stretch and compression. As
a teacher you may want to strategically choose these groups to ensure that each
group has 1-2 strong students depending on the class size. From here the groups
would graph their functions by hand using a table of values and discover the
pattern between their graphs. From here each group will present their findings.
This is where you can incorporate technology. I used Desmos, which is an online
graphing calculator. Using this technology you can either have each group put
their graphs onto the same grid so everyone can visually see what each
transformation would look like in comparison to a non-transformed parabola.
This can be seen in figure one.
Figure one: Desmos Screenshot
From here students would get into new groups
where one student from each of the eight groups form a new group. Each of these
new groups would then have an ‘expert’ of each transformation. They will then
be given a list of parabolas that contain several transformations of the form
y=a(x-d)2+h. They will then come up with a general solution for what
each parameter represents and share these findings with the class through a
gallery walk and/or class discussion. Desmos also has a parabola transformation
software on it that can be used for this part where you adjust each parameter
to see how the parabola changes. Other forms of technology can be used
throughout this activity such as graphing calculators, a smartboard and gismos.
This activity is a student centered lesson which uses the student’s work as
resources as well as technology if it is available, but the technology is not
required is just there for visual assistance. This activity also allows
students to collaborate and explore.
figure two: student graphing their transformation on desmos (student: Ela)
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