Hi,

The main formula you need to know for this question is the addition angle formula for tan x:

tan(a + b) = (tan a + tan b)/(1 - tan a tan b)

Of course we also need the definition of cosh and sinh:

2 cosh x = e^x + e^-x

2 sinh x = e^x - e^-x

Now let's start off by looking at tan(p/4 + x/2):

tan(p/4 + x/2) = (tan p/4 + tan x/2)/(1 - tan p/4 tan x/2) = (1 + tan x/2)/(1 - tan x/2)

using the addition angle formula for tan.

So

e^y = (1 + tan x/2)/(1 - tan x/2) [1]

e^-y = (1 - tan x/2)/(1 + tan x/2) [2]

Consider [1] + [2]:

2 cosh y = [(1 + tan x/2)² + (1 - tan x/2)² ]/(1 - tan² x/2)

(by finding a common denominator)

So:

2 cosh y = [2 + 2 tan² x/2]/(1 - tan² x/2) = (2 sec² x/2)/(1 - tan² x/2)

= (2 tan x/2)/(1 - tan² x/2) ×(sec² x/2)/(tan x/2)

= tan x / (cos x/2 sin x/2)

= tan x / (1/2 sin x) (using sin x = 2 sin x/2 cos x/2)

= 2 sec x

As required.

Now consider [1] - [2]:

2 sinh y = [(1 + tan x/2)² - (1 - tan x/2)² ]/(1 - tan² x/2) = (4 tan x/2)/(1 - tan² x/2) = 2 tan x

Hope this helps,