LEARN TO DISPUTE MATHEMATICS

aku_EnSeM · Post time 12-4-2008 03:24 PM

Hai kengkawan... Ni thread bari akuensem, learn to dispute mathematics...

Skrg ni kte akn discover sume kesalahan dan kejatuhan2 teori matematik...

Kedgrn menakutkan, tp anda x perlu study math smpi dpt PhD ke, Prof ke utk meneliti kejatuhan teori math ni.... Budak form 1 pun leh buat...

Sekarang ni, buktikan

0 = 1

Sape yg gedik nk gune bi tu,

, prove that

0 = 1

[ Last edited by aku_EnSeM at 12-4-2008 03:41 PM ]

Urban_Iz · Post time 12-4-2008 03:37 PM

aku belum belajar sampai tahap untuk prove yang 0=1...cikgu aku ada cakap mende ni belajar kat U...

aku_EnSeM · Post time 12-4-2008 03:42 PM

la ye ke....

xpe2, cgo ko kte blaja kt uni, kite blaja kt porum...

Raindancer · Post time 12-4-2008 06:05 PM

apa jawapannye?:kiss:

sosimple · Post time 12-4-2008 06:16 PM

0 = 1... haaa tuh sos dah buktikan....

aku_EnSeM · Post time 12-4-2008 08:43 PM

Originally posted by Raindancer at 12-4-2008 06:05 PM
apa jawapannye?:kiss:

hehehe...

utk buktikan 0=1, consider the infinite siries

   S = 1 - 1 + 1 - 1 + 1 - 1 + 1 - 1 + 1 ........

we can also write it as

   S = (1 - 1) + (1 - 1) + (1 - 1) + ............
   S = 0

changing the position of the bracket, we have

   S = 1 - (1 - 1) - (1 - 1) - (1 - 1) - ......
   S = 1 - 0 - 0 - 0 - 0 - .....
   S = 1

So,

   0 = 1 (proven)

KEJATUHAN MATEMATIK 1:

Dalam kes tertentu, siri infiniti adalah tidak benar!!! hehehe...

aku_EnSeM · Post time 12-4-2008 08:45 PM

Cabaran seterusnya;

buktikan -1 adalah nombor positif...

iaitu...

-1 > 0

meitantei · Post time 12-4-2008 09:56 PM

ala, ni banyak kat wiki...

kalau proof tu betul, maknanya bukan sajer 0 = 1, tapi semua nombor sama dengan 0!

let x be a number and
Consider the infinite series of

S = x - x + x - x + x - x...

letak bracket,

S = (x - x) + (x - x) + (x - x)...
= 0

tukar tempat bracket;

S = x - (x - x) - (x - x) - (x - x)...
= x

Hence, aper2 number pun = 0.

Kesalahan dlm proof ni ialah, camner nak letak bracket kalau hujung expression math tu tak der hujung (ie. infinite)?

[ Last edited by meitantei at 12-4-2008 10:02 PM ]

seroja · Post time 12-4-2008 10:38 PM

kata adik adi putra.. tader yg inifinity. ade lagi pehtu

aku_EnSeM · Post time 12-4-2008 10:39 PM

well, kene fikir gak...

proof yg salah atau infinite siries tu yg salah?

klu ikut infinite siries, sume expression tu betul.. but then die hasilkan jwpn yg salah... so, infinite siries tu salah dlm hal ni yek?

aku_EnSeM · Post time 12-4-2008 10:41 PM

buktikan -1 itu positif...

consider infinite siries

   S = 1 + 2 + 4 + 8 + 16 + 32 + ....

So S > 0

But

   2S = 2 + 4 + 8 + 16 + 32 + .....
   2S = S - 1
   S = -1

But S > 0

So -1 > 0

Nice....

aku_EnSeM · Post time 12-4-2008 10:43 PM

Next, kesalahan matematik dalam trigonometri...

Buktikan 4 = 0 menggunakan trigonometri....

scidbu · Post time 13-4-2008 12:17 AM

oh tidak!!!

abstract algebraku fail!!

meitantei · Post time 13-4-2008 02:16 AM

erm... soalan aku ialah, camner nak letak bracket kalau series tu takder penghujung?

aku_EnSeM · Post time 13-4-2008 10:01 AM

klu siries tu xde penhujung, ape msalah nk letak bracket? then bracket tu pun xkn ade penghujung, and so the new expression would also be an infinite siries....