Understanding transformers and power transmission.
Understanding the concept of power.
How to evaluate powers of i.
How to transform the graph of a hyperbola.
How to understand basic transformations of a polynomial graph.
How to use the power rule for logarithms.
How to determine the types of transformations, the definition of isometry, and how to say and write a transformation's new image.
How to determine the derivative of a power function.
How we define power functions, and which of our parent functions belong to this family.
How to define a composition of transformations; how to perform a composition of translations.
Identify the formal and informal powers of the presidency, and explain how they are used.
How we identify odd power functions and even power functions.
How to differentiate a composite function when the outside function is a power function.
How to graph the reciprocal of a linear function.
How to graph y = f(x ? h) when f(x) = sqrt(x), and what kind of transformation to expect.
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)).