Clock puzzlers

Darby · 2011-10-14 04:04:13

I lay awake at night staring at the (digital) clock, and try to make equations as each minute passes by...I have all the 11 and 12 o`clock ones figured out, and most of the 10`s. Can you help with 10:26, 10:27, 10:28 and a few others I am sure you will come across as difficult. You can use any functions including roots and factorials (with the exception of the inequality sign!), however all the digits MUST be in order (as seen on the clock), and (except for square roots with their implied `2`)any root function MUST be warranted by the digit being already present.

Examples : 12:30 1+2=3+0 11:57 1+1+5=7 10:41 1+0=(sqrt)4-1 12:38 1x2=(3root)8

anonimnystefy · 2011-10-14 04:18:32

hi Darby

i sometimes like to do that game w/ old car registrations

which contain only numbers in it,but i allow myself to change the order,and restrict myself to the four basic operations!

10=2+8?

bobbym · 2011-10-14 04:18:49

Hi Darby;

10:26

(1+0+2)! = 6

10:28

10 = 2+8

Darby · 2011-10-14 04:34:17

I tried to quote bobbym in this reply, but evidently I don't know how to do that. Thank you for your quick answers.....do you sometimes want to just bang your head quietly on a desk? Some very rudimentary equations there.....I am a little sheepish. And to anonimnystefy, where I live the license plates have three letters and three numbers so I have an easier time making words from the letters....three numbers is often not a lot to work with mathematically...

bobbym · 2011-10-14 04:35:11

Do you allow integer functions?

Darby · 2011-10-14 06:00:36

I am not immediately familiar with those....can you give some examples?

I'm a C+ Algebra 11 student (although Algebra 11 was decades ago....)

bobbym · 2011-10-14 06:10:35

Hi;

That is the floor function there is also a ceiling function.

Darby · 2011-10-14 06:16:42

bobbym wrote:

Hi;
That is the floor function there is also a ceiling function.

I see what you mean. That would be stretching things just a bit, but in the absence of any other exact solutions I suppose it would be OK. As long as everything isn't quickly solved by this application (sort of like my "cheater" way on the 11 o'clock equations where almost every one of them can be written as 1 being equal to a power of one.....)

Darby · 2011-10-14 19:41:09

These are the only ones I have left to get:

10:27, 10:38, 10:47, 10:57, 10:58, 10:59

If you can get those, you are better than I am (like that hasn't been proved already....)

Thanks, and have fun.

reconsideryouranswer · 2011-10-14 20:15:58

Darby wrote:

1 = (0 X 2 X 7)!

1 = (0/2 X 7)!

1 = [0 X (2 + 7)]!

1 = [0 X (2 - 7)]!

1 = [0 X 2^7]!

1 = [0/(2^7)]!

1 = (0^27)!

1 = [0^ (2 X 7)]!

1 = [0^(2^7)]!

1 = [(0^2)^7]!

1 = [0^2 X 7]!

1 = [0^(2/7)]!

1 = [(0/2)/7]!

1 = [(0 X 2)/7]!

1 = (0/2/7)!

1 = (0/2 X 7)!

1 = (0/27)!

1 = [0/(2 X 7)]!

1 = [(0 X 2)^7]!

1 = [(0/2)^7]!

1 = [0/(2^7)]!

1 = [0/(2 + 7)]!

bobbym · 2011-10-14 20:16:39

Hi Darby;

I am sorry but I have been unable to find anything for those that does not use something more complicated then what you have been using.

Darby · 2011-10-15 06:38:07

reconsideryouranswer wrote:

Darby wrote:
1 = (0 X 2 X 7)!
1 = (0/2 X 7)!
1 = [0 X (2 + 7)]!
1 = [0 X (2 - 7)]!
1 = [0 X 2^7]!
1 = [0/(2^7)]!
1 = (0^27)!
1 = [0^ (2 X 7)]!
1 = [0^(2^7)]!
1 = [(0^2)^7]!
1 = [0^2 X 7]!
1 = [0^(2/7)]!
1 = [(0/2)/7]!
1 = [(0 X 2)/7]!
1 = (0/2/7)!
1 = (0/2 X 7)!
1 = (0/27)!
1 = [0/(2 X 7)]!
1 = [(0 X 2)^7]!
1 = [(0/2)^7]!
1 = [0/(2^7)]!
1 = [0/(2 + 7)]!

I like this, because it actually solves all the rest as well. I went over all my equations to see if I had used zero as an exponent (another defined term) and I hadn't - and these fit the criteria so closely they work. Plus....I lack the mathematical depth to continue searching for some elusive root of some elusive factorial....

Thanks!!

reconsideryouranswer · 2011-10-15 06:50:11

bobbym wrote:

Hi Darby;
I am sorry but I have been unable to find anything for those
that does not use something more complicated then what
you have been using.