Answer:
[tex]sin(-x)[/tex]
Step-by-step explanation:
Odd functions follow the relation of
[tex]f(-x)=-f(x)[/tex]
Lets check for the most trivial value, does
[tex]sin(-0) = -sin(0)[/tex]
Well these values both equal 0, so this is correct!
What about another value?
[tex]sin(- \frac{\pi}{2})=-1\\-sin(\frac{\pi}{2})=-1[/tex]
In-fact this is strictly defined for all values of sin. Meaning that this is an odd function.
The example of an odd trigonometric function is sin(-x).
All functions that involved trig functions could be even, odd, or not. A function could be odd if f(-x) = - f(x)
So, for sin, it is
sin (-0) = -sin(0)
Since these values both equal 0, so this is right
So, here sine be the odd function and cos is an even function.
Therefore, The example of an odd trigonometric function is sin(-x).
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