To differentiate the function f(x) = tan(x) / sec(x) using the quotient rule, we follow these steps:
The quotient rule states that if you have a function that is the quotient of two other functions, say u(x) / v(x), then the derivative is given by:
f'(x) = (u’v – uv’) / v2.
In our case, let:
- u = tan(x),
- v = sec(x).
Next, we need to find the derivatives of u and v:
- u’ = sec2(x) (the derivative of tan(x)),
- v’ = sec(x)tan(x) (the derivative of sec(x)).
Now we can substitute these derivatives back into the quotient rule formula:
f'(x) = (sec2(x) * sec(x) – tan(x) * sec(x)tan(x)) / (sec(x))2.
This simplifies to:
f'(x) = (sec3(x) – tan2(x)sec(x)) / sec2(x).
To further simplify, notice that tan2(x) = sec2(x) – 1. So we can substitute this into our expression:
f'(x) = (sec3(x) – (sec2(x) – 1)sec(x)) / sec2(x).
Hence, the derivative can be simplified to:
f'(x) = 1.
In conclusion, using the quotient rule, we find that the derivative of the function f(x) = tan(x) / sec(x) is simply 1.