Graph each inverse circular function by hand.
y = arcsec [(1/2)x]

Inverse circular functions, such as arcsecant, are the inverses of the standard trigonometric functions. They allow us to find angles when given a ratio. For example, the function y = arcsec(x) gives the angle whose secant is x. Understanding these functions is crucial for graphing and interpreting their behavior.

The domain and range of inverse functions differ from their original functions. For arcsec(x), the domain is x ≤ -1 or x ≥ 1, while the range is [0, π/2) ∪ (π/2, π]. Knowing these restrictions is essential for accurately graphing the function and understanding where it is defined.

Transformations involve shifting, stretching, or compressing the graph of a function. In the case of y = arcsec[(1/2)x], the factor (1/2) affects the horizontal stretch of the graph. Recognizing how transformations impact the graph's shape and position is vital for accurate hand-drawing of the function.