Question 1

Simplify and write the trigonometric expression in terms of sine and cosine: sec t − cos t sec t = ( f ( t ) ) 2 sect-costsect=(f(t))2

Question 2

Answer:

$f(t) = 1 - cos^2\ t$ and
$f(t) = sin^2\ t$

Explanation:

Given

$(sec\ t - cos\ t)/(sec\ t) = f(t)$

Required

Simplify

$f(t) = (sec\ t - cos\ t)/(sec\ t)$

Split fraction

$f(t) = (sec\ t )/(sec\ t) - (cos\ t)/(sec\ t)$

$f(t) = 1 - (cos\ t)/(sec\ t)$

$sec\ t = (1)/(cos\ t)$

So, we have:

$f(t) = 1 - (cos\ t)/((1)/(cos\ t))$

$f(t) = 1 - cos\ t * cos\ t$

$f(t) = 1 - cos^2\ t$

In trigonometry:

$1 - cos^2\ t = sin^2\ t$

So, we have:

$f(t) = sin^2\ t$

Please log in or register to add a comment.

Please log in or register to answer this question.