Search found 153 matches
- Fri Dec 02, 2011 10:09 pm
- Forum: Junior Level
- Topic: Math problem 2 (need solution)
- Replies: 9
- Views: 6014
Re: Math problem 2 (need solution)
I misread as it asked the difference between maximum and minimum perimeter. Actually $2\left(\max\{AB,BC,CA\}-\min\{AB,BC,CA\}\right)$ doesn't express an area here!
- Fri Dec 02, 2011 2:22 pm
- Forum: Junior Level
- Topic: Math problem 2 (need solution)
- Replies: 9
- Views: 6014
Re: Math problem 2 (need solution)
Not actually, you can draw only 3 parallelogram with 3 given vertexes. So if the given points are $A, B,C$ then the answer of your problem is $2\left(\max\{AB,BC,CA\}-\min\{AB,BC,CA\}\right)$ By the way, if you want to post something drawn, you can draw it in your PC and then submit it as a attachme...
- Fri Dec 02, 2011 12:51 pm
- Forum: Junior Level
- Topic: Math problem 2 (need solution)
- Replies: 9
- Views: 6014
Re: Math problem 2 (need solution)
How ?ataher.sams wrote:One can draw as many parallelograms as possible keeping those three points as the three vertices of the parallelogram
- Fri Nov 25, 2011 3:21 pm
- Forum: Number Theory
- Topic: Hard sequence
- Replies: 2
- Views: 2170
Re: Hard sequence
Nice problem! :) $[0]=(1,1)$ $[1]=(1,2,1)$ $[2]=(1,3,2,3,1)$ . . . $[n]=(a_1, a_2, a_3, \cdots , a_m)$ $S(n) = a_1^3 + a_2^3 + \cdots + a_m^3$ $T(n) = a_1 a_2 (a_1+a_2) + a_2 a_3 (a_2+a_3) + \cdots + a_{m-1}a_m ( a_{m-1}+a_m )$ $c_n = S(n)+T(n) - 1$ Note that, $[n+1]=(a_1, a_1+a_2,a_2,a_2+a_3,\cdots...
- Fri Nov 25, 2011 2:08 pm
- Forum: Number Theory
- Topic: Find all integers
- Replies: 3
- Views: 2668
Re: Find all integers
"from which every point lies outside the circle which contains all the other points and has it's centre in one of it.", I can't get it.
- Tue Nov 22, 2011 2:34 am
- Forum: Algebra
- Topic: Functional Equation [Own]
- Replies: 2
- Views: 2285
Re: Functional Equation [Own]
Complete Solution,
- Sat Nov 19, 2011 12:45 pm
- Forum: Algebra
- Topic: Functional Equation [Own]
- Replies: 2
- Views: 2285
Re: Functional Equation [Own]
At last solved :mrgreen: Complete solutions: $ f(x) =\begin{cases}c &\mbox{if }x\geq a\\ a+h(x) &\mbox{if }a\geq x\geq\frac{r}{2a}\\ \frac{r}{2x}+h(x) &\mbox{if }\frac{r}{2a}\geq x\end{cases} $ Where $ 2c^{2}\geq 2ac\geq r\geq a $ and $ h:(0,a]\longrightarrow [0,\infty) $ is any continuous function ...
- Sat Nov 05, 2011 11:30 pm
- Forum: National Math Camp
- Topic: solutions to camp exam problem
- Replies: 28
- Views: 14561
Re: solutions to camp exam problem
হুম, আমি চাইসিলাম ডানপক্ষে যেন $|x-y|$ থাকে, তাই $(x,\frac{x+y}{2} )$ নিসি, যেহেতু মূল সমীকরণ x আর y এর জন্য সমরূপ, তাই, $(y ,\frac{x+y}{2} )$-ও নিসি এবং শেষে বাকীপদগুলা নিচিহ্ন করার জন্য $(\frac{3x+y}{4}, \frac{x+3y}{4}$ নিসি।
- Sat Nov 05, 2011 8:17 pm
- Forum: National Math Camp
- Topic: solutions to camp exam problem
- Replies: 28
- Views: 14561
Re: solutions to camp exam problem
@Joty: P2: আমরা জানি $|a| + |b| \geq |a+b|$ এবং আরো জানি, $f'(x) \geq 0$ হলে $f$ increasing হবে। P9: এটা আমি পুরা লিখতে ভুলে গেসি। খেয়াল কর, $f(x) = \frac{1}{\sqrt(1+e^{2x})}$ কনভেক্স। তারপর Jensen মার। P10: জানি না :-/ তবে এটা মোটামুটি এখন Intuition হয়ে গেছে, অনেক বেশি Function equation করার ফল। ...
- Sat Nov 05, 2011 8:10 pm
- Forum: National Math Camp
- Topic: solutions to camp exam problem
- Replies: 28
- Views: 14561
Re: solutions to camp exam problem
Texmacs :
sudo apt-get install texmacs
sudo apt-get install texmacs