Five Fives/Table of 5s: Difference between revisions
From charlesreid1
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120 = 5 \times 5 \times 5 - 5 | 120 = 5 \times 5 \times 5 - 5 | ||
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<math> | |||
123 = \phi^{5+5} + \dfrac{1}{\phi^{5+5}} | |||
</math> | </math> | ||
Revision as of 06:06, 17 March 2019
Back to Five Fives
One 5
Various ways of arranging a single 5 to yield different numbers. (More limited than 4, of course...)
$ 5^{\frac{1}{2}} = \sqrt{5} $
$ 5 = 5 $
$ 120 = 5! $
Two 5s
$ 0 = \ln{ \dfrac{5}{5} } $
$ 1 = \dfrac{5}{5} $
$ 2 = \dfrac{ \ln{(5)} }{ \ln{(\sqrt{5})} } $
$ 4 = \dfrac{ \ln{5} }{ \ln{\left( \sqrt{ \sqrt{ 5 } } \right) } } $
$ 5 = \sqrt{5 \times 5} $
$ 10 = 5 + 5 $
$ 11 = \phi^5 - \dfrac{1}{\phi^5} $
$ 24 = \dfrac{5!}{5} $
$ 25 = 5 \times 5 $
$ 55 $
$ 115 = 5! - 5 $
$ 125 = 5! + 5 $
$ 600 = 5 \times 5! $
$ 3125 = 5^5 $
$ 12696403353658275925965100847566516959580321051449436762275840000000000000 = 55! $
Three 5s
$ \dfrac{1}{2} = \dfrac{ \ln{ \left( \dfrac{5}{\sqrt{5}} \right) } }{ \ln{(5)} } $
$ \dfrac{24}{25} = \dfrac{5! + 5}{5!} $
$ 1 = \dfrac{ \sqrt{5 \times 5} }{ 5 } $
$ 2 = \dfrac{ \ln{(5)} }{ \ln{ \left( \dfrac{5}{\sqrt{5}} \right) } } $
$ 3 = \log_{5}{(5! + 5)} $
$ 4 = 5 - \dfrac{5}{5} $
$ 5 = 5 - 5 + 5 $
$ 5 = \sqrt[5]{5^5} $
$ 5 = \sqrt{ \dfrac{ \sqrt{5^5} }{ \sqrt{5} } } $
$ 5 = \dfrac{5 \times 5}{5} $
$ 6 = 5 + \dfrac{5}{5} $
$ 12 = \dfrac{5!}{5+5} $
$ 15 = 5 + 5 + 5 $
$ 20 = 5 \times 5 - 5 $
$ 20 = \dfrac{ 5 \lg{5} }{ \lg{\left(\sqrt{\sqrt{5}}\right)} } $
$ 30 = 5 \times 5 + 5 $
$ 25 = \dfrac{ \sqrt{5^5} }{ \sqrt{5} } $
$ 60 = \dfrac{5!}{ \left( \dfrac{\ln{5}}{\ln{\sqrt{5}}} \right) } $
$ 95 = 5! - 5 \times 5 $
$ 130 = 5! + 5 + 5 $
$ 145 = 5! + 5 \times 5 $
$ 625 = \dfrac{5^5}{5} $
$ 503284375 = 55^5 $
Four 5s
$ 1 = \dfrac{ \ln{ \left( \dfrac{5}{ \sqrt{5} } \right) } + \ln{5} }{ \ln{5} } $
$ 1 = \dfrac{5^5}{5^5} $
$ 1 = \dfrac{ 5 \times 5}{5 \times 5} $
$ 6 = \dfrac{ \ln{(5)} }{ \ln{(\sqrt{5})} } + \dfrac{ \ln{(5)} }{ \ln{(\sqrt{\sqrt{5}})} } $
$ 7 = \sqrt{ \dfrac{5!}{5} + (5 \times 5) } $
$ 8 = \left( \dfrac{ \ln{(5)} }{ \ln{(\sqrt{5})} } \right) \left( \dfrac{ \ln{(5)} }{ \ln{(\sqrt{\sqrt{5}})} } \right) $
$ 9 = 5 + 5 - \dfrac{5}{5} $
$ 11 = 5 + 5 + \dfrac{5}{5} $
$ 12 = \left( \dfrac{5!}{5} \right) \times \left( \dfrac{ \ln{\sqrt{5}} }{ \ln{5} } \right) $
$ 13 = \dfrac{5! - 55}{5} $
$ 20 = 5 + 5 + 5 + 5 $
$ 26 = \dfrac{5^5 - 5}{5!} $
$ 35 = \dfrac{55 + 5!}{5} $
$ 35 = 5 \times 5 + 5 + 5 $
$ 49 = \dfrac{5!}{5} + (5 \times 5) $
$ 50 = 5 \times 5 + 5 \times 5 $
$ 60 = 5 \left( \dfrac{ 5! }{ 5 + 5 } \right) $
$ 70 = 5! + 5 - 55 $
$ 130 = 5 \times 5 \times 5 + 5 $
$ 120 = 5 \times 5 \times 5 - 5 $
$ 123 = \phi^{5+5} + \dfrac{1}{\phi^{5+5}} $
$ 3125 = \dfrac{5 \times 5^5}{5} $
$ 2500 = 5^5 - \dfrac{5^5}{5} $
$ 161051 = 11^5 = \left( \dfrac{55}{5} \right)^5 $