Good
afternoon everyone,
I hope you had a wonderful night.
Tomorrow is a Day 4 and a continuation of our daily rehearsals for our Wizard
of Oz performance. Please ensure that students arrive to school on time! We
will be spending all day, every day over the next fours days perfecting our
Wizard of Oz Arts’ Night performance. We are trying our hardest to ensure our
students are not missing important lessons! Aftercare invoices have been sent
out. All payments are due by April 15th. Please pay by this date to
avoid interest being charged to your account!!
Important dates/items:
Thursday, May 9 –
MYP Shakespeare Play
Tuesday, May 14 –
Grade 3-8 Arts’ Night
Friday, May
17-Monday, May 20 – No School – Victoria Day Weekend
Thursday, May 23 –
SJA Track and Field Meet
Monday, May 27 –
Inner-School Spelling Bee
Wednesday, May 29
– Casual Day
Friday, May 31
–SJA vs TMA Track and Field Competition
Friday, June 14 –
Last Day of School and Promotion Ceremony
Unit of Inquiry
Today
we continued our third Scratch activity – a self-inquiry project.
HOMEWORK
-
Inquiry into
Mathematics
Today
we continued our first review – Show What You Know!
The
Grade 5 Team has decided to push back this math unit. With all that is
happening at the school, we are going to slow down this unit. We will be
spending the rest of the week and part of next week completing the lessons.
Beginning late next week and continuing the following week, we will be
completing our reviews. On Wednesday, May 15th we will take up the
review and answer any questions. Students will write their math test on
Thursday, May 16th.
Points to remember:
Transformations
Don’t
forget to include brackets around your coordinates (3, 5), the comma
between the x and y coordinates (3,
4), and the apostrophe for the prime coordinates A’. Be sure to correctly plot your coordinates and lastly, ensure
the image is the correct number of spaces away from the axis as the figure is
when doing certain transformations.
Axis – the horizontal axis
is represented by X and is the first number in the coordinates (3, 5) and the vertical axis is
represented by the Y and is the second number in the coordinates (3, 5).
Translations – slide. After a translation,
a figure and its image are congruent (same shape and same size) and they face
the same way. We say 'A prime' and write A’ when referring to the points on the
new image.
Reflections- flip. After reflections, a
figure and its image are congruent and can face opposite ways. Remember
any point and its reflection image are the same distance form the
mirror line. Remember to label each new image and use prime (') on the new
points.
Rotations - turns. After a rotation, a
figure and its image are congruent and may face different ways. If a figure
turns 360 degrees (a full turn), we will not use the prime (‘) symbol as with
the full turn it is back to the original figure.
For
any transformation, we have our original coordinates (x, y). For a 90 degree counter clockwise rotation,
the formula/rule to follow is (-y, x). For example, if our original coordinates
are (3, 5) then our new prime coordinate for our 90 degree counter clockwise
turn is (-5, 3). For an 180 degree
counter clockwise rotation, the formula/rule to follow is (-x, -y). For
example, if our original coordinates are (3, 5) then our new prime coordinate
for our 180 degree counter clockwise turn is (-3, -5). For a 270 degree counter clockwise rotation, the formula/rule to
follow is (y, -x). For example, if our original coordinates are (3, 5) then our
new prime coordinate for our 270 degree counter clockwise turn is (5, -3).
For
any transformation, we have our original coordinates (x, y). For a 90 counter clockwise rotation,
the formula/rule to follow is (y, -x). For example, if our original coordinates
are (3, 5) then our new prime coordinate for our 90 degree clockwise turn is
(5, -3). For an 180 degree clockwise
rotation, the formula/rule to follow is (-x, -y) – the same as an 180
degree counter clockwise turn. For example, if our original coordinates are (3,
5) then our new prime coordinate for our 180 degree clockwise turn is (-3, -5).
For a 270 degree clockwise rotation,
the formula/rule to follow is (-y, x). For example, if our original coordinates
are (3, 5) then our new prime coordinate for our 270 degree clockwise turn is
(-5, 3).
90
degrees is a ¼ turn, 180 degrees is a ½ turn and 270 degrees is a ¾ turn.
Clockwise follows a clock (12, 1, 2, 3, etc.) and counter clockwise goes
backwards (12, 11, 10, 9, etc.).
Congruent figures are the same shape
and size. They have the same angles and the same side lengths. Similar figures have corresponding
angels equal and the side lengths of one figure multiplied by the same number
are equal to the corresponding side lengths of the other figure.
Line symmetry divides a figure into
congruent parts. Reflections can be sued to draw figures with one or more lines
of symmetry.
Rotational symmetry - a figure that coincides with itself more
than once when rotated to a full turn or less has rotational symmetry. Some
figures that have rotational symmetry are a + sign, a rectangle, a star, and an
octagon. An example of a figure that has no rotational symmetry is a heart.
HOMEWORK
-Math
test on Thursday, May 16th
Inquiry into Language
Today
we rehearsed for the Wizard of Oz. We also continued working on our Hatchet
summative project – an article about Brian’s rescue!
HOMEWORK
-
Have
a wonderful night!
Love
Mrs. Hocevar
No comments:
Post a Comment