BdMO National 2012: Secondary 4, Junior 8

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Zzzz
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BdMO National 2012: Secondary 4, Junior 8

Unread post by Zzzz » Sun Feb 12, 2012 8:48 am

Problem:
Find the total number of the triangles whose all the sides are integer and longest side is of $100$ in length. If the similar clause is applied for the isosceles triangle then what will be the total number of triangles?
Every logical solution to a problem has its own beauty.
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Eesha
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Re: BdMO National 2012: Secondary 4, Junior 8

Unread post by Eesha » Mon Feb 13, 2012 11:49 am

148টি
গণিত অলেম্পিয়াডে প্রাইজ পাওয়াটাই আসল না। প্রাইজ সবসময় পায়না এমন অনেকেও অনেক ভাল।

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sakibtanvir
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Re: BdMO National 2012: Secondary 4, Junior 8

Unread post by sakibtanvir » Mon Feb 13, 2012 3:14 pm

I participated in junior category and solved this successfully..I think the problem was slightly changed in hall.It was said that there can be more than one longest side.....
There are 5050 triangles and 148 isosceles. :)
An amount of certain opposition is a great help to a man.Kites rise against,not with,the wind.

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Eesha
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Re: BdMO National 2012: Secondary 4, Junior 8

Unread post by Eesha » Tue Feb 14, 2012 8:45 am

সেখানে কেবল isosceles triangle এর সংখ্যা বের করতে বলা হয়েছিল
গণিত অলেম্পিয়াডে প্রাইজ পাওয়াটাই আসল না। প্রাইজ সবসময় পায়না এমন অনেকেও অনেক ভাল।

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