1. Proof of Sum of Interior Angles bounded by // lines
2. Proof of Exterior Angle Property
Let a, b and c be angles in a triangle and d be the exterior angle beside c.
Prove that a + b = d
a + b + c = 180 (sum of angles in a triangle)
d + c = 180 (adj. angles on a straight line)
Since a + b + c = d + c = 180,
cancelling out c, we get a + b = d.
Therefore, a + b = d. (Proven!)
3. Giving a Counter-Example
This means giving an example which disproves something.
Let's consider the number pattern: 2, 4, 8, 16, 32, ... ...
Show that T(n) = 2n is incorrect.
*Use examples*
Let n be 3.
So, T(3) = 2(3)
= 6
*Include Concluding Sentence":
However, it is shown that the third term is 8 and not 6, so this formula is incorrect. (Proven!)
Example: (By the way, I made it so it is very easy)
Pattern: 9, 27, 81, 243, 729, ... ...
(a) Show that T(n) = 9n is wrong.
(b) What is the correct formula for this pattern?
ANSWER:
(a) Let n be 3.
T(3) = 9(3)
= 27
The third term is 81 but the answer I get is 27. Therefore it is wrong.
(b) 9^n (9 to the power of n)
4. Rewriting algebraic Formula
Ok that's all I can help you. Please remember all that.
For MA104 students, if you want to learn, ask from the A-Math Students, including me.
Hope I'm not spamming the class blog! :):):)
Goldwin
3 comments:
So for our math quiz, we just have to learn all the proofs rite?
Correct.
Goldwin,i think the answer for b) is 3^n+1 instead.(you know, the pattern 9,27,81,242,729...)
Post a Comment