Count Up with the Four Fours Puzzle

For all your silly time-killing forum games.

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Fri Mar 17, 2017 10:29 am UTC

1822 = (T4! + τ(T(√!4)!) + F4!) / L(L(√!4)!)

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Tue Mar 21, 2017 8:32 am UTC

1823 = (T(T(√!4)!) - F(T(√!4)!)) * 4! - !(4!!)

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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Tue Mar 21, 2017 10:43 am UTC

1824 = ((!4)! + τ(F4!!) / T(√!4)!) / F4!!

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Tue Mar 21, 2017 2:17 pm UTC

1825 = ((!4)! + τ(4!!) * 4) / (4!!)!!

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Wed Mar 22, 2017 8:15 am UTC

1826 = (T!4 + T√!4) * T4!! / T√!4

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Wed Mar 22, 2017 1:15 pm UTC

Cool one!

1827 = (4!!)! * (L(√!4)!!! - τ((√!4)!)) / (!4)!

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Wed Mar 22, 2017 3:06 pm UTC

Thanks!

1828 = (T(F4!!) - L4! - F4!) / (√!4)!

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Wed Mar 22, 2017 4:58 pm UTC

1829 = F(L4!!) + (L4!! - L4!) * 4!!

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Thu Mar 23, 2017 9:16 am UTC

1830 = F!4 + 4!! + F!4 + 4

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Fri Mar 24, 2017 4:46 pm UTC

Pretty :)

1831 = (τ(L(√!4)!) - F(F4!!)) / T(√!4)!C√!4

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Mon Mar 27, 2017 6:49 am UTC

Thanks, yours is nice as well!

1832 = (T(√!4)!! / (4!!)! + τ((√!4)!)) / T!4

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Tue Mar 28, 2017 8:27 am UTC

Thanks!

1833 = ((4!!)! + (!4)!!) * T(√!4)! - τ(L(√!4)!)

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Tue Mar 28, 2017 11:11 am UTC

1834 = √(T(L(√!4)!) * F(F4!!) + (!4)! - τ(4))

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Thu Mar 30, 2017 8:21 am UTC

Nice, I see perfect squares are back :)

1835 = F(L4!!) - (F(F4!!) - T4!!) * L!4

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Thu Mar 30, 2017 1:26 pm UTC

Occasionally they'll reappear. :)

1836 = 4 * (τ(4!) + τ((√!4)!)) / F4!

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Fri Mar 31, 2017 8:06 am UTC

1837 = (F(F4!!) + F4!!√!4) / L(√!4)!

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Fri Mar 31, 2017 11:16 am UTC

1838 = L(L4!!) - F(L4!!) - ((√!4)!)!!C4

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Fri Mar 31, 2017 1:35 pm UTC

1839 = (T(√!4)!!! - τ((√!4)!) * !((√!4)!)) / (!4)!!

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Fri Mar 31, 2017 4:24 pm UTC

1840 = √(T4!!4 - (!4)! + (4!!)!!)

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Tue Apr 04, 2017 9:15 am UTC

Cool!

1841 = -(τ((√!4)!) * L!4 + T(√!4)!!!) / T!4

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Tue Apr 04, 2017 1:41 pm UTC

Thanks!

1842 = (τ(!4) + F(L(√!4)!) - τ(T(√!4)!)) / τ(√!4)

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Tue Apr 04, 2017 2:31 pm UTC

1843 = (!(4!!) - F(Ack(√4, 4))) / 4!!

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Wed Apr 05, 2017 7:43 am UTC

1844 = 4!! * L4! / (L(T(√!4)!) - T4!!)

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Wed Apr 05, 2017 8:10 am UTC

1845 = L(√!4)!! * L(L(√!4)!) * 4!! / τ(4!)

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Wed Apr 05, 2017 10:19 am UTC

1846 = (L(L4!!) - L(L(√!4)!) * (!4)!!) / L(T(√!4)!)

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Wed Apr 05, 2017 10:43 am UTC

1847 = Ack(√4, T(L(√!4)!)P√4) / T!4

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Wed Apr 05, 2017 11:26 am UTC

Nice!

1848 = √(4! * !(!4) + τ(4!!) / .4)

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Wed Apr 05, 2017 11:44 am UTC

Thanks!

1849 = √√√√√√√√√√(L!4 - 4)τ(4!) / L(√!4)!!!

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Wed Apr 05, 2017 11:57 am UTC

Funny!

1850 = T(T(√!4)!)P√!4 / T(T(√!4)!)C√4

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Thu Apr 06, 2017 12:07 pm UTC

Thanks, yours too!

1851 = (Ack(√4, -τ(!4)) + (4!!)!!) / L(L(√!4)!)

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Thu Apr 06, 2017 2:22 pm UTC

1852 = ((√!4)!)! * T(T(√!4)!) - T4!! * L(F4!!)

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Thu Apr 06, 2017 4:07 pm UTC

1853 = (τ(4!) - (4! - !4)!!) / L(√!4)!!!

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Fri Apr 07, 2017 7:50 am UTC

1854 = (τ(L(√!4)!) - F(L4!!) + L(√!4)!) / L(√!4)!

generalz
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Location: Central Europe

Re: Count Up with the Four Fours Puzzle

Postby generalz » Fri Apr 07, 2017 8:07 am UTC

1855 = !(4!!) - T4!! + 4!! / .4̅

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Fri Apr 07, 2017 9:49 am UTC

1856 = L4!! * 44 / 4

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Fri Apr 07, 2017 12:42 pm UTC

Base 927:
1857 = Ack((T(T(√!4)!) + T(T(√!4)!)) / T(T(√!4)!), T(T(√!4)!))

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Fri Apr 07, 2017 5:01 pm UTC

Cool.

1858 = F4!! + !4 + !4 * L4!!

generalz
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Re: Count Up with the Four Fours Puzzle

Postby generalz » Tue Apr 11, 2017 8:47 am UTC

Thanks! 3 versions:

1859 = (T(√!4)!C√!4)√4 / T4!!
1859 = T(F4!!) + L(L(√!4)!) * T!4 / ζ(-!√4)
1859 = √√(T(√!4)!4!! * L(√!4)!4)

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Sabrar
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Re: Count Up with the Four Fours Puzzle

Postby Sabrar » Tue Apr 11, 2017 1:00 pm UTC

Yeah, I also noticed the third one as being the most 'obvious'.

1860 = √(τ(4!) / (√!4)! - ((√!4)!)! * L(L(√!4)!))

generalz
Posts: 10
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Location: Central Europe

Re: Count Up with the Four Fours Puzzle

Postby generalz » Tue Apr 11, 2017 1:24 pm UTC

1861 = (L4!!C((√!4)!) + τ((√!4)!)) / τ(√!4)


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