# Thread: Most kelong Toto No. I ever see!

1. ## Most kelong Toto No. I ever see!

Like that also can. That person SUPER lucky, buy quick pick also kenna. Ang mo kio, really good luck for that person.

2. ## Re: Most kelong Toto No. I ever see!

Happened before.

4. ## Re: Most kelong Toto No. I ever see!

Originally Posted by redstone
22 32 41 42 43 44 31

Can remember by but I got a now.

5. ## Re: Most kelong Toto No. I ever see!

one of the lowest probability ever!!....

6. ## Re: Most kelong Toto No. I ever see!

Originally Posted by Sjourn
one of the lowest probability ever!!....
Actually, all the same probability... Could just as easily have been 1 2 3 4 5 6

7. ## Re: Most kelong Toto No. I ever see!

Originally Posted by BBTM
22 32 41 42 43 44 31

i think anyone who got that kind of numbers from quick pick will start to curse
and swear at first cos sure think that how to win with this kind of combination...
so now the truth is any combination will stand a chance to win if u are lucky enuff

8. ## Re: Most kelong Toto No. I ever see!

Originally Posted by Sjourn
one of the lowest probability ever!!....
mathemtically the probability of this and 1 1 1 1 1 1 is the same.

9. ## Re: Most kelong Toto No. I ever see!

stop gambling people!

10. ## Re: Most kelong Toto No. I ever see!

Originally Posted by mrchua
stop gambling people!
This is not gambling, just testing luck.

11. ## Re: Most kelong Toto No. I ever see!

Originally Posted by Rashkae
Actually, all the same probability... Could just as easily have been 1 2 3 4 5 6
Hey! u won't believe it, i got quick pick number that come in 1,2,3,4,5,6. I just don't believe this kind of no. will open out.........

12. ## Re: Most kelong Toto No. I ever see!

Originally Posted by Paul_Yeo
mathemtically the probability of this and 1 1 1 1 1 1 is the same.
to get 1 1 1 1 1 1 the probability is impossible lor... how to kena the same number 2 times already kelong, kena 6 times lagi impossible...

*this proves that Paul Yeo dun buy Toto*

13. ## Re: Most kelong Toto No. I ever see!

Originally Posted by Sjourn
one of the lowest probability ever!!....
Same probability of striking as any other combination of 6 numbers.

14. ## Re: Most kelong Toto No. I ever see!

Originally Posted by dkw
Same probability of striking as any other combination of 6 numbers.
logically the probability is the same, but it's just hard to believe in emotionly, that's human

15. ## Re: Most kelong Toto No. I ever see!

Originally Posted by dkw
Same probability of striking as any other combination of 6 numbers.
but if calculate in a manner of what is the probability of having more than 2 consecutive numbers in a toto draw... then the probability will surely be low.

tis happen to have 4 consecutive numbers...

16. ## Re: Most kelong Toto No. I ever see!

Does anybody know how the numbers are picked? Like computer generated, lucky-draw style, or what?

17. ## Re: Most kelong Toto No. I ever see!

Originally Posted by ST1100
Does anybody know how the numbers are picked? Like computer generated, lucky-draw style, or what?
those roll cages & balls with numbers printed on them?

touching on probability, a brain Q
im just wondering...which has more chance?

a quickpick \$3.50 with 7 random numbers

or

\$3.50 worth of quickpick random numbers, 50 cents each?

18. ## Re: Most kelong Toto No. I ever see!

\$3.50 cents of 0.50 cents each. I remembered reading from the newspaper before that a study has concluded that by buying more combinations, it gives you a higher probability of striking. Then again a system 7 payout is greater then a normal ticket payout. Gd Luck guys

19. ## Re: Most kelong Toto No. I ever see!

maybe the guy who bought the winning ticket tears it away...." This type of number where on earth can open one????".....*rips*rips*

20. ## Re: Most kelong Toto No. I ever see!

Originally Posted by Del_CtrlnoAlt
but if calculate in a manner of what is the probability of having more than 2 consecutive numbers in a toto draw... then the probability will surely be low.

tis happen to have 4 consecutive numbers...
No bro, the probability is the exact same.

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