Write a polynomial f(x) such that it's degree is equal to log10^x-2x / x.
Answers
Answered by
1
First compute :-
log10^x -2x / x
= (x * log 10 - 2x ) / x
= x -2x / x
= -x/x
= -1 .
The degree of polynomial must be -1 according to the question but a polynomial with the negative degree doesn't exist.
f(x) = infinite.
log10^x -2x / x
= (x * log 10 - 2x ) / x
= x -2x / x
= -x/x
= -1 .
The degree of polynomial must be -1 according to the question but a polynomial with the negative degree doesn't exist.
f(x) = infinite.
Answered by
0
Hey..
Answer :- log10^x -2x / x
= (x * log 10 - 2x ) / x
= x -2x / x
= -x/x
= -1 .
polynomial with the negative degree doesn't exist.
Answer :- log10^x -2x / x
= (x * log 10 - 2x ) / x
= x -2x / x
= -x/x
= -1 .
polynomial with the negative degree doesn't exist.
Similar questions