Search found 81 matches
- Fri Mar 31, 2017 10:11 pm
- Forum: National Math Camp
- Topic: The Gonit IshChool Project - Beta FE Class
- Replies: 8
- Views: 8796
Re: The Gonit IshChool Project - Beta FE Class
I will be able to devote 10-12 hours per week. My tutorial exam will start on 5 April. So for that exam & practical pressure, I won't be able to give much time now-a-days . I know just the basics of FE. My experience of FE is thanic & Adib vai's class.
- Fri Mar 31, 2017 9:46 pm
- Forum: Geometry
- Topic: CGMO 2012/5
- Replies: 3
- Views: 3830
Re: CGMO 2012/5
$\bullet$ Claim 1 : $A ,I,O$ collinear . proof : well-known fact. $\bullet$ Claim 2 :$\triangle ADO \cong \triangle AEO$ proof : (i) $AD=AE$ (ii) $AO=AO$ (iii) $\angle DAO = \angle EAO$ $\Longrightarrow \triangle ADO \cong \triangle AEO$ $\blacksquare$ $\star$ From $Claim 2$, we get, $\angle ODA = \...
- Fri Mar 31, 2017 3:47 pm
- Forum: Social Lounge
- Topic: BDMO Forum Mafia #1
- Replies: 52
- Views: 56134
Re: BDMO Forum Mafia #1
$ahmedittihad's$ logic is not bad . (But he is also worthy of suspect.) & the vote Promi has made strengthens ds's logic. She accentuates on itti rather than trying to defend herself with any logic .& a point should be noted that, she is also a deft player in mafia that we all know .So, it's better ...
- Tue Mar 28, 2017 4:34 pm
- Forum: National Math Camp
- Topic: The Gonit IshChool Project - Beta
- Replies: 28
- Views: 43328
Re: The Gonit IshChool Project - Beta
Name you'd like to be called: nahin
Course you want to learn: Functional Equations and Number Theory Problem solving.
Preferred methods of communication (Forum, Messenger, Telegram, etc.): Telegram
Do you want to take lessons through PMs or Public?: Public
Course you want to learn: Functional Equations and Number Theory Problem solving.
Preferred methods of communication (Forum, Messenger, Telegram, etc.): Telegram
Do you want to take lessons through PMs or Public?: Public
- Mon Mar 27, 2017 7:50 pm
- Forum: Social Lounge
- Topic: BDMO Forum Mafia #1
- Replies: 52
- Views: 56134
Re: BDMO Forum Mafia #1
1. dshasan
2. ahmedittihad
3. Epshita32
4. Atony Roy Chowdhury
5. Raiyan Jamil
6. Rahul Saha
7. nahin munkar
2. ahmedittihad
3. Epshita32
4. Atony Roy Chowdhury
5. Raiyan Jamil
6. Rahul Saha
7. nahin munkar
- Mon Feb 27, 2017 11:48 pm
- Forum: Combinatorics
- Topic: Combi Marathon
- Replies: 48
- Views: 43506
Re: Combi Marathon
Another solution to problem 11 : If we divide the real numbers in $3$-triples, we get one of them is at least $3$m by PHP. And same, we get at least $\dfrac{1}{3}$ of the triples sum to at least $3$m. As the number of triples is $^9C_3 =84$, so, $A \ge \dfrac{1}{3} \times 84 =28$. So, the minimum p...
- Mon Feb 27, 2017 1:27 am
- Forum: Social Lounge
- Topic: ক্যাম্প
- Replies: 4
- Views: 3615
Re: ক্যাম্প
আমার মনে হয় সম্ভাবনা বৃদ্ধি না পেয়ে উল্টা কইমা যাবে । কারণ, প্রথম দুইজন রসগোল্লার মত উধাও হইলে তৃতীয় জনেরও উধাও হওয়ার বিপুল সম্ভাবনা আছে।ahmedittihad wrote:আমি ক্যাম্পে ডাক পেতে চাই। আমি এবার জাতীয় তে তৃতীয় হয়েছি। প্রথম দুইজন যদি উধাও হয়ে যায় তাহলে কি আমার ক্যাম্পে চান্স পাবার সম্ভাবনা বৃদ্ধি পাবে?
- Sun Feb 26, 2017 11:52 pm
- Forum: Social Lounge
- Topic: Favorite mathematician?
- Replies: 35
- Views: 73463
Re: Favorite mathematician?
Carl Friedrich Gauss
- Wed Feb 15, 2017 12:27 am
- Forum: National Math Olympiad (BdMO)
- Topic: BDMO 2017 National round Secondary 5
- Replies: 15
- Views: 11246
Re: BDMO 2017 National round Secondary 5
A synthetic solution : We denote the inscribed circle as $\omega$ , & $P,Q$ be the tangent point of arc $BC$ & $AB$ resp with $\omega$. We get, $AB=AC=r$ (radii of same circle) & $AB=BC$ similarly. $\Longrightarrow AB=AC=BC \Longrightarrow \triangle ABC$ is equilateral $\Longrightarrow \angle B =60...
- Tue Jan 10, 2017 1:32 am
- Forum: Geometry
- Topic: Geometry Marathon : Season 3
- Replies: 146
- Views: 186284
Re: Geometry Marathon : Season 3
Problem 14 Let one of the intersection points of two circles with centres $O_1,O_2$ be $P$. A common tangent touches the circles at $A,B$ respectively. Let the perpendicular from $A$ to the line $BP$ meet $O_1O_2$ at $C$. Prove that $AP\perp PC$. Solution of problem 14 : Let , the radical axis of t...