How to graph a sin function with respect to it's limits and x intercepts

Trespaser5
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I have been given a question to sketch the curve of y=sin(x). I have looked into finding the domain which I understand but I don't understand how I prove the x intercepts mathematically as when I make x=0 I obviously get a 0 value for y but a sin curve obviously intercepts and pi and 2pi etc, how do I prove this ? Also why when I put sin(3pi/2) into the calculator do I not get a negative figure ? or why when I put pi and 2pi in do I not get zero ?
 
on Phys.org
Check that your calculator is in radian mode, not degree mode.
 
sorry, i didn't have my calculator in radian mode. Still I don't understand how I get the values of the x intercepts mathamatically in the same way as you do with polynomial expressions ?
 
It's actually part what periodic functions are.
for a periodic function g(x): g(x+P)=g(x) where P is the period.
So your function [itex]f(x)=sin(x)[/itex] is as good as [itex]f(x)=sin (x \pm n\pi)[/itex] n=0,1,2...
so [itex]x=sin^{-1}(y) \pm n\pi[/itex]
now go ahead and put y=0 to get all your x intercepts.
 
that's the key to the door, thankyou :)
 
I've been trying all week but what I can't understand is that as [sin][/-1](0) is always 0 then any value I put in between 0 and 2∏ I get that value as an x intercept, where am I getting confused ?
 

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