#11
|
|||
|
|||
Re: Answer
Therefore X is prime should read "Therefore X is prime or X is divisible by a prime larger than N". Either way there is a prime larger than our assumed largest prime N, so there is no largest prime N.
|
#12
|
|||
|
|||
Re: Answer
I think we are saying the same thing - I probably could have worded the end of the proof better, as you did - I held onto the assumption of the primes being bounded for one more step. Assuming there is a largest prime leads to a contradiction either way through my reasoning above.
|
#13
|
|||
|
|||
You\'re full of crap ...
<font color="red">In the first place, you changed your last digit to 7 after I posted.</font color> NO - I didn't !!! You were only faster than me by ONE minut !!! Actually it's a pretty simple prolem.
<font color="red">In the second place, your number doesn't have anywhere near enough digits. If this was just (10,000)^4131 it would have 16,525 digits.</font color> Close enough !?! [img]/forums/images/icons/grin.gif[/img] |
#14
|
|||
|
|||
Re: You\'re full of crap ...
I saw your first answer, it had a 1 at the end. Who do you think you're dealing with some amateur? [img]/forums/images/icons/shocked.gif[/img]
|
#15
|
|||
|
|||
No you are not an ameteur ...
I'm reposting my original post - ONE minut later than your post :
Answer: 7 99,193^4131= 5683287653286836532810926345876......7610981435761 09281435761092634587610981 I forgot to some 7's in on the end - my mistake ;-) No you are not an ameteur - You are the King of this forum - like Dynasty is it in small/stakes - like Greg in tourney/no/limit - like ... Do you have a PMS-problem ? Do you have a sense of humour ? |
#16
|
|||
|
|||
Re: 99,193^4131= ...
If you want to see all the digits, follow the attached link.
99193^4131 |
#17
|
|||
|
|||
My Answer
The key to this problem is realizing that when positive integers are raised to powers, the one's digit follows identifiable patterns. Note the pattern with 3 (or any number ending with 3)
3 to the zero power is 1 3 to the first power is 3 3 to the second power is 9 3 to the third power is 27 (one's digit is 7) 3 to the fourth power is 81 (one's digit is 1 again) If you were to keep going you notice the pattern is 1, 3,9, and 7. It then repeats. Every fourth power has the one's digit as 1. The number 4131 is divisible by 4 with a remainder of 3. Therefore, the number raised to the 4128th power would have a "1" as its one's digit. Following the pattern, the next power (4129) would have a "3" in the one's digit. The next power (4130) would have a "9" in the one's digit. Finally, raising a number ending in 3 to the 4131 power would have a "7" in the one's digit. My answer is 7. |
#18
|
|||
|
|||
Re: Math Problem
I'm pleased to say that my 11 year old daughter solved this in about 3 minutes. We're ready for the next one!
|
|
|