If x^4+3x is divided by (x-4) what is the remainder?
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According to remainder theorem, if f(x) is divided by (x-a) then remainder is f(a)
Given f(x) = x^4+3x is divided by (x-4) then the remainder is f(4)
f(4)
= 4^4 + 3(4)
= 256 + 12
=268 .
The remainder is 268
Given f(x) = x^4+3x is divided by (x-4) then the remainder is f(4)
f(4)
= 4^4 + 3(4)
= 256 + 12
=268 .
The remainder is 268
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0
Hey..
Answer :- Given f(x) = x^4+3x is divided by (x-4) then the remainder is f(4)
f(4)
= 4^4 + 3(4)
= 256 + 12
=268 .
Answer :- Given f(x) = x^4+3x is divided by (x-4) then the remainder is f(4)
f(4)
= 4^4 + 3(4)
= 256 + 12
=268 .
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