How do you evaluate #cos [Sec ^-1 (-5)]#?

2 Answers
Aug 28, 2016

#-1/5#

Explanation:

As cosine is the reciprocal of secant,

# a = sec^(-1)(-5) = cos^(-1)(-1/5)#,

the given expression is

#cos a = -1/5#.

Aug 29, 2016

#cos(sec^-1(-5))=-1/5#

Explanation:

Let:

#x=cos(sec^-1(-5))#

We can then say that:

#cos^-1(x)=sec^-1(-5)#

Using the same principle to now isolate the #-5#, we say that:

#sec(cos^-1(x))=-5#

Since #sec(x)=1/cos(x)#, rewrite the left-hand side:

#1/cos(cos^-1(x))=-5#

#cos(x)# and #cos^-1(x)# undo one another, being inverse functions:

#1/x=-5#

Taking the reciprocal of both sides:

#x=-1/5#

Thus:

#cos(sec^-1(-5))=-1/5#