Today we learned about rationalizing radicals when the radical sign
is in the demonimator. You do it by multiplying it by a form of 1 such as square 2 over square 2, to move the radical up top.
Its a pain in the butt, but its worth it. Todays assignment was page 19 #35-53 odd. Tomorrows scribe is Kara Lee Rae. Haha
Showing posts with label scribe. Show all posts
Showing posts with label scribe. Show all posts
Thursday, February 14, 2008
Tuesday, February 12, 2008
February 11, 2008
Today in class we learnt how to Simplify Radicals.
Mrs. Remple used a card game at first to help us understand the concept.
She handed everyone a few cards from her deck of cards. Everyone organized their cards into pairs of 2. We put all our pairs on the left side of our desk and our extra cards on the right. Then we repeated all this but making sets of 3. It helped show us what happens when we are simplifying radicals.
Here is an example:
²√ 16x³y¹z²
= 2∙2∙2∙2∙x∙x∙x∙y∙z∙z
There are two sets of 2s.
{2∙2}∙{2∙2}∙x∙x∙x∙y∙z∙z
There is one set of X’s and one X left over.
{2∙2}∙{2∙2}∙{x∙x}∙x∙y∙z∙z
There is only one Y, so it is just a left over.
There is one set of Z’s with 0 left over.
{2∙2}∙{2∙2}∙{x∙x}∙x∙y∙{z∙z}.
The simplified answer is:
2²xz√xy
Today in class we learnt how to Simplify Radicals.
Mrs. Remple used a card game at first to help us understand the concept.
She handed everyone a few cards from her deck of cards. Everyone organized their cards into pairs of 2. We put all our pairs on the left side of our desk and our extra cards on the right. Then we repeated all this but making sets of 3. It helped show us what happens when we are simplifying radicals.
Here is an example:
²√ 16x³y¹z²
= 2∙2∙2∙2∙x∙x∙x∙y∙z∙z
There are two sets of 2s.
{2∙2}∙{2∙2}∙x∙x∙x∙y∙z∙z
There is one set of X’s and one X left over.
{2∙2}∙{2∙2}∙{x∙x}∙x∙y∙z∙z
There is only one Y, so it is just a left over.
There is one set of Z’s with 0 left over.
{2∙2}∙{2∙2}∙{x∙x}∙x∙y∙{z∙z}.
The simplified answer is:
2²xz√xy
February 8, 2008
Today we learnt about Real Number Stuff. We did questions from the overhead with groups.
Some examples of questions were:
State wheather each of the following is always true, sometimes true, or never true.
The sum of a rational number and an irrational number is:
a) Positive: Sometimes True
b) Irrational: Always True
c) A fraction: Never True
d) Rational: Never True
e) Negative: Sometimes True
f) A whole number: Never True
If you took the absolute value of every number in each of the following sets of numbers, which set of numbers would you obtain?
a) Integers: Whole numbers
b) Negative integers: Natural numbers
c) Whole numbers: Whole numbers
d) Real numbers: Positive real numbers and zero
I learnt alot this day ha thanks to Ms. Remple she gave us no homework!
Some examples of questions were:
State wheather each of the following is always true, sometimes true, or never true.
The sum of a rational number and an irrational number is:
a) Positive: Sometimes True
b) Irrational: Always True
c) A fraction: Never True
d) Rational: Never True
e) Negative: Sometimes True
f) A whole number: Never True
If you took the absolute value of every number in each of the following sets of numbers, which set of numbers would you obtain?
a) Integers: Whole numbers
b) Negative integers: Natural numbers
c) Whole numbers: Whole numbers
d) Real numbers: Positive real numbers and zero
I learnt alot this day ha thanks to Ms. Remple she gave us no homework!
Friday, February 8, 2008
February 7 - Real Numbers and Absolute Value
Today, February 7th, in PreCal 20S, we learned about real number lines.
Every real number corresponds to a point on the real number line. There is a one-one correspondence between real numbers and the points on the line. In this real number line, there are no gaps, the line is complete throughout. Example:
_________________________________________
-10 -9 -8 -7 -6 -5 -4 -3 -2 -1 0 1 2 3 4 5 6 7 8 9 10
When Graphing on a Real Number Line - An open dot means that the point does not include the real number. A closed dot means that the point includes the real number.
Absolute Value
Also, today in class, we learned about absolute value.
The absolute value of a real number is the distance from zero to the position of the number on the real number line. When finding the absolute value of a real number, ignore the signs.
The notation for absolute value is x
Example: -2 = 2 , 2 = 2
Example: 2 - -5 , 2 - 5 = -3
Every real number corresponds to a point on the real number line. There is a one-one correspondence between real numbers and the points on the line. In this real number line, there are no gaps, the line is complete throughout. Example:
_________________________________________
-10 -9 -8 -7 -6 -5 -4 -3 -2 -1 0 1 2 3 4 5 6 7 8 9 10
When Graphing on a Real Number Line - An open dot means that the point does not include the real number. A closed dot means that the point includes the real number.
Absolute Value
Also, today in class, we learned about absolute value.
The absolute value of a real number is the distance from zero to the position of the number on the real number line. When finding the absolute value of a real number, ignore the signs.
The notation for absolute value is x
Example: -2 = 2 , 2 = 2
Example: 2 - -5 , 2 - 5 = -3
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