If x^{101} +101 is divided by x+1 find the remainder
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Answered by
127
Hi ,
***************************************
Remainder theorem :
On dividing the polynomial p( x ) of
degree one or more than 1 by a
linear polynomial x - a , the
remainder obtained is p( a ) ,
Where a is a real number .
****************************************
Let p( x ) = x^101 + 101
If p( x ) divided by ( x + 1 ) then the
remainder is p ( -1 ).
p ( -1 ) = ( -1 )^101 + 101
= -1 + 101
= 100
I hope this helps you.
: )
***************************************
Remainder theorem :
On dividing the polynomial p( x ) of
degree one or more than 1 by a
linear polynomial x - a , the
remainder obtained is p( a ) ,
Where a is a real number .
****************************************
Let p( x ) = x^101 + 101
If p( x ) divided by ( x + 1 ) then the
remainder is p ( -1 ).
p ( -1 ) = ( -1 )^101 + 101
= -1 + 101
= 100
I hope this helps you.
: )
Answered by
46
refer to the photo the answer is correct i have explained it step wise
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