Duplicate Question
The question on this page has been marked as a duplicate question.
Original Question
Where are the functions f1(x)=|sin(x)| and f2(x) = sin(|x|) differentiable? Use n as an arbitrary integer constant.) f1(x) = |s...Asked by Selma
Where are the functions f1(x)=|sin(x)| and f2(x) = sin(|x|) differentiable? Use n as an arbitrary integer constant.)
f1(x) = |sin(x)| is differentiable for all x ≠______________
f2(x) = sin(|x|) is differentiable for all x ≠______________
No one has answered
f1(x) = |sin(x)| is differentiable for all x ≠______________
f2(x) = sin(|x|) is differentiable for all x ≠______________
No one has answered
Answers
Answered by
umayr
f1(x) is not at n*pie
f2(x) is not at 0
f2(x) is not at 0
There are no AI answers yet. The ability to request AI answers is coming soon!