The explanation lies in the definition of sec
-1(x) and the reason for this definition.
First we need to understand the graph of y = sec(x). Check out for example the 5th graph down on this page: http://cs.bluecc.edu/calculus/trigtools/graphs/trigGraphs/index.html .
In order to define an inverse function, we first need to find a portion of the domain of sec(x) on which sec(x) does not take the same value more than once. Ideally the function will also take all possible values at least once on this selected portion of the domain. This fussing is important!
A convenient portion of the domain of sec(x) for this purpose is the union of the two half-open intervals [0,π/2) and (π/2, π] — in other words the set X given by
X = [0, π/2) ∪ (π/2, π]
— and this is what the standard convention is for obtaining the inverse function. Note that since sec(x) = 1/cos(x) by definition, and cos(x) takes values only between -1 and +1, it follows that sec(x) takes values only in the range
Y = (-∞, -1] ∪ [1, ∞).
Now, to get the graph of the inverse function we need to consider the graph of y = sec(x) only on the restricted domain X, and then interchange the x- and y-axes. (This has the effect of flipping the graph about the 45° line y = x.) Thus the inverse function sec
-1(x) has as its domain the set Y above, and takes values in the set X above.
Thus for all x where sec
-1(x) makes sense, we have either x ≤ -1 or x ≥ +1. So x
2 ≥ 1 in either case, which shows why the expression inside of the square root sign in the original problem is always greater than 0.
