## Count Up with the Four Fours Puzzle

For all your silly time-killing forum games.

Moderators: jestingrabbit, Moderators General, Prelates

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

1902 = F(F4!!) / √4 - L!4 + !4

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

1903 = (L(√!4)!! / 4! + T(√!4)!!!) / (!4)!!

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

1904 = T(√!4)!!! - τ(T(√!4)!) - L!4 * L(F4!!)

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

1905 = L(√!4)!! * (T(T(√!4)!) + F(L(√!4)!)) / τ(4!)

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

1906 = √L!44 + T!4 - (4!!)!!

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

1907 = (L(√!4)!! / √4 - T(√!4)!!!) / L(√!4)!!!

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

1908 = (L(T(√!4)!) * (!4)! - L(√!4)!!) / (4!!)!

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

1909 = -(τ(F4!!) / 4!! + F4!) / τ(√!4)

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

1910 = √(L(F!4) + τ(F4!!) + τ((√!4)!) / .4̅)

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

In a similar fashion:
1911 = √((L(F!4) + τ(T(√!4)!) + (4!!)!!) / √4)

Another version:
1911 = -τ(F4!!) / (((√!4)!)!!P√!4 / L!4)

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

1912 = (L(L4!!) - T(√!4)!!!) / (L(T(√!4)!) - F4!!)

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

1913 = ((τ(F4!!) + (!4)!) * √!4) / τ((√!4)!)

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

1914 = L(T(√!4)!)P4 / L(T(√!4)!)C√!4

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

1915 = (τ(4!!) * T(√!4)! - (!4)!) / (4!!)!!

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

1916 = √((!L(√!4)! - !((√!4)!) - T!4) / 4)

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

1917 = (L(√!4)!! + (4!!)! * T(T(√!4)!)) / (4!!)!

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

1918 = -T(L(√!4)!) * τ(F4!!) / T(√!4)! / F4!

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

Funny!
1919 = (T(√!4)!P!4 - T(√!4)!!!) / T(√!4)!!!

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

Thanks!

1920 = √(T(√!4)!! / (!4)!! - 4!! * (!4)!)

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

Base 8, (slightly) cheating:
1921 = τ(4!!) / T4!! + T4!! / T4!!

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

1922 = √(4 - τ(F4!!) - ((√!4)!)!! * F(F4!!))

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

1923 = ((4!!)!! - L(F4!!)) * τ((√!4)!) / F4!

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

Variety is the spice of life

1924 = √(τ(4!) / !4 + F!44)
1924 = √(L(F!4) + τ(F4!!) + (4!!)! - τ(√!4))
1924 = √(T4!!4 - F4! + ((√!4)!)!!)
1924 = √(L(√!4)!! + (!4)! - T(L(√!4)!) * !(!4))

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

Nice, 4 versions
1925 = L(√!4)!! * T!4 / (√!4)!4!!

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

Thanks.

1926 = T4! + τ(T(√!4)!) + τ(F4!!) / 4!

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

1927 = √((τ(4!!) - F(F4!!) / √4) * L!4)

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

Nice find! Simple base 8 for me:

1928 = √(T4!! * τ(4!!) + 4!! * 4!!)

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

Cool!
1929 = (τ(4!!) - T(L(√!4)!) * τ(√!4)) / 4!!

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

Thanks!

1930 = (τ(L(√!4)!) - √4) / (F(T(√!4)!) + T4!!)

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

1931 = (τ(4!) - T(√!4)!!! * !4) / L(√!4)!!!

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

1932 = √(F4! * (T!4 - 4 / 4!!))
1932 = √(F(F4!!) / .4 - τ(F4!!) - F(L4!!))
1932 = √(τ(4! / 4!!) * (!(4!!) - F4!!))

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

The first one is the nicest imo
1933 = (L(√!4)!! / √4 + T(√!4)!!!) / L(√!4)!!!

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

Mine too but the second is close as well.

1934 = T(√!4)!!! + L4! - T(L(√!4)!) * ((√!4)!)!

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

1935 = (L(√!4)!! - (4!!)!) / F4! / .4̅

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

1936 = 44 * 44

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

Mind...blown!

Division only:
1937 = τ(L(√!4)!) / (F4! / √.4̅ / τ(√!4))

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

Nice.

1938 = (τ(√!4) - F(T(√!4)!))!! / T(√!4)!!! * .4

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

Thanks. Yours is quite smart as well.

1939 = -(τ(F4!!) + L(√!4)!!! * F(T(√!4)!)) / T(T(√!4)!)

Sabrar
Posts: 42
Joined: Tue Nov 03, 2015 6:29 pm UTC

### Re: Count Up with the Four Fours Puzzle

Thanks.

1940 = T(F4!!) - L4!!C4! - ((√!4)!)!

generalz
Posts: 10
Joined: Wed Jan 14, 2015 11:18 am UTC
Location: Central Europe

### Re: Count Up with the Four Fours Puzzle

1941 = -(!(4!!) + ((√!4)!)!!) * τ((√!4)!) / F4!

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