Search found 592 matches
- Wed Aug 26, 2015 11:50 pm
- Forum: National Math Camp
- Topic: Practice Problemset 2
- Replies: 5
- Views: 7062
Re: Practice Problemset 2
I have approved your post. Now you should be able to pm.
- Wed Aug 26, 2015 7:35 pm
- Forum: National Math Camp
- Topic: Practice Problemset 2
- Replies: 5
- Views: 7062
Practice Problemset 2
Here is the second problemset for practice. Comment your ideas or solutions. If there are confusions or problems, comment here so everyone can see. There will be an exam tomorrow.
- Wed Aug 26, 2015 7:33 pm
- Forum: National Math Camp
- Topic: Discussion on Exam 1
- Replies: 8
- Views: 8661
Re: Discussion on Exam 1
No, it is given that they are a Pythagorean Triple. You have to prove $2(b+p)$ is a perfect square.
- Wed Aug 26, 2015 1:11 am
- Forum: National Math Camp
- Topic: Discussion on Exam 1
- Replies: 8
- Views: 8661
Re: Discussion on Exam 1
$5$ divides $6^n-1$.badass0 wrote:Can anybody give me hints on how to solve problem 1.4?
- Wed Aug 26, 2015 1:10 am
- Forum: National Math Camp
- Topic: Discussion on Exam 1
- Replies: 8
- Views: 8661
Re: Discussion on Exam 1
Problem 1.2 $a_{0}$ can't be equal to 1. let, $a_{0}=2$ then, $a_{1} = 4$ $a_{2} = 6/8$ $a_{3} = 8/9/10/12$ $a_{n} = ......$ if $a_{0}=3$ then, $a_{1} = 6$ $a_{2} = 8/9$ $a_{3} = 10/12$ $a_{n} = ......$ we can see that integers 5, 7, 11 etc. aren't coming in this recurrence. because $a_{n}$ is a mu...
- Tue Aug 25, 2015 11:16 pm
- Forum: National Math Camp
- Topic: Discussion on Exam 1
- Replies: 8
- Views: 8661
Re: Discussion on Exam 1
Let me give you a hint on how to solve problem 1.2. Though I forgot to mention, but it should be kind of obvious that $a_0>1$.
Hint: If $s(a)$ is the smallest prime divisor of $a$, then $a+s(a)$ is always even.
Hint: If $s(a)$ is the smallest prime divisor of $a$, then $a+s(a)$ is always even.
- Tue Aug 25, 2015 11:07 pm
- Forum: National Math Camp
- Topic: Discussion on Exam 1
- Replies: 8
- Views: 8661
Discussion on Exam 1
Ok, the first exam is over. You can discuss on the problems now. Solutions have been posted here. Until then, post your solutions and opinions on the problems or other solutions. And there will be no exam tomorrow. But there will one the next day after that. So be prepared for that.
- Tue Aug 25, 2015 9:15 pm
- Forum: National Math Camp
- Topic: Exam 1, Online Number Theory Camp, 2015
- Replies: 15
- Views: 16049
Re: Exam 1, Online Number Theory Camp, 2015
If you can't pm, just email me.
- Tue Aug 25, 2015 5:02 pm
- Forum: National Math Camp
- Topic: Exam 1, Online Number Theory Camp, 2015
- Replies: 15
- Views: 16049
Re: Exam 1, Online Number Theory Camp, 2015
তোমার খুশি।tanmoy wrote:Can we write solutions in Bangla??
- Tue Aug 25, 2015 5:00 pm
- Forum: National Math Camp
- Topic: Exam 1, Online Number Theory Camp, 2015
- Replies: 15
- Views: 16049
Re: Exam 1, Online Number Theory Camp, 2015
এমন $k$ বের করা লাগবে যাতে এই ধারার কোন পদ হিসেবে $k$ পাওয়া যায়।