BdMO Higher secondary solutions
I need the solutions of the latest National BdMO's last three questions of higher secondary catergory.
YaY!! I am the first one to post in the forum.
ইতিহাসে আমার নাম স্বর্ণাক্ষরে লেখা থাকবে সেই আনন্দে আমার কান্না পাচ্ছে।
YaY!! I am the first one to post in the forum.
ইতিহাসে আমার নাম স্বর্ণাক্ষরে লেখা থাকবে সেই আনন্দে আমার কান্না পাচ্ছে।
"Go down deep enough into anything and you will find mathematics." ~Dean Schlicter
Re: BdMO Higher secondary solutions
Well,I am posting the solution to a problem(may be 9 or 10).
The problem asked to find the number of odd coefficient in the expansion of $(a+b)^{2010}$.I am posting for exponent $n$.The number of odd coefficients is $2^m$ where $m$ is the number of $1's$ in the binary expansion of $n$.The rest is yours.
The problem asked to find the number of odd coefficient in the expansion of $(a+b)^{2010}$.I am posting for exponent $n$.The number of odd coefficients is $2^m$ where $m$ is the number of $1's$ in the binary expansion of $n$.The rest is yours.
One one thing is neutral in the universe, that is $0$.
Re: BdMO Higher secondary solutions
It would be better if you post the problems.
One one thing is neutral in the universe, that is $0$.
Re: BdMO Higher secondary solutions
Masum, I think that she would appreciate more if you give us a full solution, not just the answer.
"Inspiration is needed in geometry, just as much as in poetry." -- Aleksandr Pushkin
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Re: BdMO Higher secondary solutions
This is the Problem: BdMO 2010, Higher Sec. ,problem 9.
Find the number of odd coefficients in expansion of $(x + y)^{2010}$.
I solve the problem using Lucus Theorem. Lucus Theorem actually KILLS the problem. Abir vi showed me another "elementary" way. I think that Avik vi can show us that solution, as he proposed this problem.
Find the number of odd coefficients in expansion of $(x + y)^{2010}$.
I solve the problem using Lucus Theorem. Lucus Theorem actually KILLS the problem. Abir vi showed me another "elementary" way. I think that Avik vi can show us that solution, as he proposed this problem.
"Inspiration is needed in geometry, just as much as in poetry." -- Aleksandr Pushkin
Please install LaTeX fonts in your PC for better looking equations,
learn how to write equations, and don't forget to read Forum Guide and Rules.
Please install LaTeX fonts in your PC for better looking equations,
learn how to write equations, and don't forget to read Forum Guide and Rules.
Re: BdMO Higher secondary solutions
Thank you!
And yes I would prefer a 'solution' not an answer.
Check the resources section of the official website for the questions/
And yes I would prefer a 'solution' not an answer.
Check the resources section of the official website for the questions/
"Go down deep enough into anything and you will find mathematics." ~Dean Schlicter
Re: BdMO Higher secondary solutions
আচ্ছা একটা ভাল কথা। এইখানে সবাই কি গাইড লাইনটা পড়ে দেখেছ? আর LaTeX font install করেছ?
"Inspiration is needed in geometry, just as much as in poetry." -- Aleksandr Pushkin
Please install LaTeX fonts in your PC for better looking equations,
learn how to write equations, and don't forget to read Forum Guide and Rules.
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Re: BdMO Higher secondary solutions
If you look carefully,you can find it as a consequence of Lucas-Kummer theorem. But my mistake was I assumed TIURMI knows this.And thanks to Moon for giving the link,also a general suggestion for users.If you see a new theory then search in google.Because that will help you so much that you will feel it yourself,for example Tricky lemma or Vieta JumpingMoon wrote:This is the Problem: BdMO 2010, Higher Sec. ,problem 9.
Find the number of odd coefficients in expansion of $(x + y)^{2010}$.
I solve the problem using Lucus Theorem. Lucus Theorem actually KILLS the problem. Abir vi showed me another "elementary" way. I think that Avik vi can show us that solution, as he proposed this problem.
One one thing is neutral in the universe, that is $0$.
Re: BdMO Higher secondary solutions
আচ্ছা, ৮,৯ নম্বরের সমাধান আগেও দেখছি। কিন্তু আমি কখনোই ১০ নম্বর সমস্যাটার সমাধান কোথাও দেখি নাই। নিজেও করতে পারি নাই অবশ্যই। কেউ কি দিতে পারেন?
সমস্যাটা হইলঃ
Let $a_1,a_2,…,a_k,…,a_n$ is a sequence of distinct positive real numbers such that $a_1<a_2<…<a_k$ and $a_k>a_{k+1}>…>a_n$. A grasshopper is to jump along the real axis, starting at the point $O$ and making $n$ jumps to right of lengths $a_1,a_2,…,a_n$ respectively. Prove that, once he reaches the rightmost point, he can come back to point $O$ by making $n$ jumps to left of of lengths $a_1,a_2,…,a_n$ in some order such that he never lands on a point which he already visited while jumping to the right. (The only exceptions are point O and the rightmost point).
সমস্যাটা হইলঃ
Let $a_1,a_2,…,a_k,…,a_n$ is a sequence of distinct positive real numbers such that $a_1<a_2<…<a_k$ and $a_k>a_{k+1}>…>a_n$. A grasshopper is to jump along the real axis, starting at the point $O$ and making $n$ jumps to right of lengths $a_1,a_2,…,a_n$ respectively. Prove that, once he reaches the rightmost point, he can come back to point $O$ by making $n$ jumps to left of of lengths $a_1,a_2,…,a_n$ in some order such that he never lands on a point which he already visited while jumping to the right. (The only exceptions are point O and the rightmost point).
Every logical solution to a problem has its own beauty.
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(Important: Please make sure that you have read about the Rules, Posting Permissions and Forum Language)
Re: BdMO Higher secondary solutions
আলাদা পোস্ট কর! (এইটা এইখানে থাকুক সমস্যা নাই...খালি কপি-পেস্ট কর)
"Inspiration is needed in geometry, just as much as in poetry." -- Aleksandr Pushkin
Please install LaTeX fonts in your PC for better looking equations,
learn how to write equations, and don't forget to read Forum Guide and Rules.
Please install LaTeX fonts in your PC for better looking equations,
learn how to write equations, and don't forget to read Forum Guide and Rules.