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![[Post New]](/templates/default/images/icon_minipost_new.gif) 11 May 2008 19:42:53 IST
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Date : 11 - 5 - 2008
Day : Sunday
QUESTION OF THE DAY
The function f is defined such that f ( x + yn ) = f ( x ) + [ f ( y ) ]n where n is a natural number and n > 1. Also f '( 0 ) > 0.
Then the value of f ( 5 ) + f '( 5 ) is
( A ) 1
( B ) 5
( C ) 2
( D ) 6
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11 May 2008 19:45:24 IST
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put n=2 ...make it simpler ..
if not ...then i m trying.
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doceed ti u nac ? |
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11 May 2008 19:45:40 IST
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NEXT "QUESTION OF THE DAY" ON 12 - 5 - 2008 from 'ALGEBRA'
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11 May 2008 19:50:26 IST
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wat about dis one ..
u got d ans ..
r u satisfied ..
atlest tell i\me
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doceed ti u nac ? |
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11 May 2008 20:34:42 IST
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I KNOW THE ANSWER. I AM JUST TRYING TO PUT DOWN A MAXIMUM NUMBER OF GOOD QUESTIONS TO HELP YOU ALL TO SHARPEN YOUR BRAIN.
NOW TRY TO GET THE CORRECT ANSWER TO THIS QUESTION.
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11 May 2008 21:09:01 IST
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putting x and y both as 0 i get f(0) as 0........{f(0)=2f(0)}
so i have putting 0 in the origional eqn. that
f(yn) =[f(y)]n ........
now this can happen in a special case of f(y)=y.............or say f(x)=x........
thus i have my f(5)=5............----------------1)
and as f(x)=x .........f'(x)=1.........--------------2)
so we have f(5) + f'(5) = 6 from 1) and 2)..............d)
this might not be the traditional mtd........this is the mtd i will use..............
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"Logic is the systematic way of reaching the wrong conclusion with confidence" lol..... |
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12 May 2008 17:21:10 IST
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GOOD. NOW TRY TODAY'S " QUESTION OF THE DAY ".
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12 May 2008 17:35:49 IST
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Date : 12 - 5 - 2008
Day : Monday
QUESTION OF THE DAY
Let f : N * N  N be a function such that
- f ( 1 , 1 ) = 2
- f ( m + 1 , n ) = f ( m , n ) + m
- f ( m , n + 1 ) = f ( m , n ) - n
for all m, n  N. If f ( p , q ) = 2001, then which of the following is(are) true?
( A ) ( p , q ) = ( 2000 , 1999 )
( B ) ( p , q ) = ( 1001 , 999 )
( C ) ( p , q ) = ( 1001 , 1999 )
( D ) ( p , q ) = ( 2000 , 999 )
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12 May 2008 23:30:50 IST
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-------------------------------soory wrong answer-----------------------------------------------------------
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<SRIRAM.A> on high way of IIT
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13 May 2008 10:23:04 IST
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I think ans are A and B.The important thing to note is f(k,k)=f(k,k-1+1)=f(k,k-1)-(k-1)=f(k-1+1,k-1)+1-k=f(k-1,k-1).
So,f(2000,1999)=f(1999,1999)+1999=f(1998,1998)+1999=.......=f(1,1)+1999=2001
f(1001,999)=f(1000,999)+1000=f(999,999)+1999=f(1,1)+1999=2001
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MAKING A MISTAKE IS HUMAN BUT REPEATING IT IS IDIOTIC. |
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13 May 2008 13:24:20 IST
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reply to the first qn .
Take y to be constant :
differentiating both sides wrt x , we get f'( x + y^n ) = f'(x ) for all y
which means f'( x ) = constant = c ( let )
so f( x ) = cx + d ( d = constant )
Now putting x = y = 0 in the given reln we get that f(0) = 0
giving , d= 0
so f( x ) = cx
Now put x = 0 in the given relation , so we get
f( y^n ) = [f(y )]^n
so cy^n = c^n y^n for all y
giving , c= 1
so f( x ) = x ; thus f(5 ) + f'(5 ) = 5 + 1 = 6
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