Given #sec x = 6# for #x# in Q1, what are the values of all the six trigonometric functions?

1 Answer
May 13, 2017

#{ (sin x = sqrt(35)/6), (cos x = 1/6), (tan x = sqrt(35)), (csc x = (6sqrt(35))/35), (sec x = 6), (cot x = sqrt(35)/35) :}#

Explanation:

Note that:

#sec x = 1/cos x#

So:

#cos x = 1/sec x = 1/6#

By Pythagoras, we know that:

#cos^2 x + sin^2 x = 1#

Hence:

#sin x = +-sqrt(1-cos^2 x) = +-sqrt(1-(1/6)^2) = +-sqrt(35/36) = +-sqrt(35)/6#

We are told that #sin x > 0#, so #sin x = sqrt(35)/6#

Then

#csc x = 1/sin x = 6/sqrt(35) = (6sqrt(35))/35#

Then:

#tan x = sin x / cos x = (sqrt(35)/6) / (1/6) = sqrt(35)#

#cot x = 1/tan x= 1/sqrt(35) = sqrt(35)/35#

#color(white)()#
Alternatively, just think of a right angled triangle with sides:

#"adjacent" = 1#

#"opposite" = sqrt(35)#

#"hypotenuse" = 6#

since #1^2+sqrt(35)^2 = 1+35 = 36 = 6^2#

Then:

#sin x = "opposite"/"hypotenuse" = sqrt(35)/6#

#cos x = "adjacent"/"hypotenuse" = 1/6#

#tan x = "opposite"/"adjacent" = sqrt(35)/1 = sqrt(35)#

#csc x = "hypotenuse"/"opposite" = 6/sqrt(35) = (6sqrt(35))/35#

#sec x = "hypotenuse"/"adjacent" = 6/1 = 6#

#cot x = "adjacent"/"opposite" = 1/sqrt(35) = sqrt(35)/35#