How to graph the reciprocal of a linear function.
How to transform the graph of a hyperbola.
How to define the reciprocal trigonometric functions, the reciprocal identities, and the Pythagorean identities.
How to understand basic transformations of a polynomial graph.
Understanding transformers and power transmission.
How to determine the types of transformations, the definition of isometry, and how to say and write a transformation's new image.
How to define a composition of transformations; how to perform a composition of translations.
How to graph y = f(x ? h) when f(x) = sqrt(x), and what kind of transformation to expect.
How to use the unit circle to derive identities that are useful in graphing the reciprocal trigonometric functions.
How to graph the transformation y = a f(x) + k when f(x) = abs(x).
How the value of h affects the shape of the graph y = A sin(B(x-h)).
How determine what transformation the graph y = f(bx) represents when b > 1.
How to simplify a trigonometric expression by converting to sines and cosines and using algebra.
How to find the vertical asymptotes of secant, cosecant, and cotangent.