Quod Erat Demonstrandum


[FW][Gag] 36 Methods of Mathematical Proof

Filed under: Fun — johnmayhk @ 12:01 上午

Proof by obviousness
“The proof is so clear that it need not be mentioned."

Proof by general agreement
“All in favor?. . . "

Proof by imagination
“Well, we’ll pretend it’s true. . .

Proof by convenience
“It would be very nice if it were true, so . . .

Proof by necessity
“It had better be true, or the entire structure of mathematics would crumble to the ground."

Proof by plausibility
“It sounds good, so it must be true."

Proof by intimidation
“Don’t be stupid; of course it’s true."

Proof by lack of sufficient time
“Because of the time constraint, I’ll leave the proof to you."

Proof by postponement
“The proof for this is long and arduous, so it is given in the appendix."

Proof by accident
“Hey, what have we here?!"

Proof by insignificance
“Who really cares, anyway?"

Proof by mumbo-jumbo (即:西非黑人崇拜的鬼神) <- – – XD

Proof by profanity
(example omitted)

Proof by definition
“We define it to be true."

Proof by tautology
‘It’s true because it’s true."

Proof by plagiarism
“As we see on page 289……"

Proof by lost reference
“I know I saw it somewhere……"

Proof by calculus
“This proof requires calculus, so we’ll skip it."

Proof by terror
When intimidation fails …

Proof by lack of interest
“Does anyone really want to see this?"

Proof by illegibility

Proof by logic
“If it is on the problem sheet, then it must be true!"

Proof by majority rule
Only to be used if general agreement is impossible

Proof by clever variable choice
“Let A be the number such that this proof works. . "

Proof by tessellation
“This proof is the same as the last."

Proof by divine word
“And the Lord said, ‘Let it be true,’ and it was true."

Proof by stubbornness
“I don’t care what you say-it is true!"

Proof by simplification
“This proof reduces to the statement 1 + 1 = 2."

Proof by hasty generalization
“Well, it works for 17, so it works for all reals."

Proof by deception
“Now everyone turn their backs. . ."

Proof by supplication
“Oh please, let it be true."

Proof by poor analogy
“Well, it’s just like . . . "

Proof by avoidance
Limit of proof by postponement as it approaches infinity

Proof by design
If it’s not true in today’s math, invent a new system in which it is.

Proof by authority
“Well, Don Knuth says it’s true, so it must be!"

Proof by intuition
“I just have this gut feeling. . ."

source: http://jwilson.coe.uga.edu/EMT668/EMAT6680.F99/Challen/proof/proof.html

^_^ 這些又是數學的日常應(或誤)用嗎?
攪完 gag 了。如果要認真了解數學上的不同證明方法,推薦大家閱讀蕭文強教授著的《數學證明》,慢慢讀,排排毒。走人。


發表迴響 »


RSS feed for comments on this post. TrackBack URI



WordPress.com 標誌

您的留言將使用 WordPress.com 帳號。 登出 /  變更 )

Google+ photo

您的留言將使用 Google+ 帳號。 登出 /  變更 )

Twitter picture

您的留言將使用 Twitter 帳號。 登出 /  變更 )


您的留言將使用 Facebook 帳號。 登出 /  變更 )


連結到 %s


%d 位部落客按了讚: