Duplicate Question
The question on this page has been marked as a duplicate question.
Original Question
Consider the function f(x)=sin(1/x) Find a sequence of x-values that approach 0 such that (1) sin (1/x)=0 {Hint: Use the fact t...Asked by George
Consider the function f(x)=sin(1/x)
Find a sequence of x-values that approach 0 such that
(1) sin (1/x)=0 {Hint: Use the fact that sin(pi) = sin(2pi)=sin(3pi)=...=sin(npi)=0}
(2) sin (1/x)=1 {Hint: Use the fact that sin(npi)/2)=1 if n= 1,5,9...}
(3) sin (1/x)=-1
(4) Explain why your answers to any of parts(1-3) show that lim X->0 sin(1/x) does not exist.
Is sin sin (1/x)=0 and sin (1/x)=-1 does not exist.
What is sin (1/x)=1 then.
Find a sequence of x-values that approach 0 such that
(1) sin (1/x)=0 {Hint: Use the fact that sin(pi) = sin(2pi)=sin(3pi)=...=sin(npi)=0}
(2) sin (1/x)=1 {Hint: Use the fact that sin(npi)/2)=1 if n= 1,5,9...}
(3) sin (1/x)=-1
(4) Explain why your answers to any of parts(1-3) show that lim X->0 sin(1/x) does not exist.
Is sin sin (1/x)=0 and sin (1/x)=-1 does not exist.
What is sin (1/x)=1 then.
Answers
Answered by
matematicas
plz answer
There are no AI answers yet. The ability to request AI answers is coming soon!
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.