Lesson Plan:
Function composition is the process of combing two functions to create a third function. The output of one function then becomes the input of another function. Let's take a look.
- Function 1: f(x) = 6x - 5
- Function 2: g(x) = x^2
To compose these functions, we must use a certain notation. Depending on which function we want to compose within the other function, we could use either of the two following formulas:
1. (f o g)(x) = (f(g(x))
2. (g o f)(x) = (g(f(x))
In function 1, we would first solve g(x). After finding the value of g(x), plugin that value into f(x). In function 2, we would first solve f(x). After finding the value of f(x), plugin that value into g(x).
Let's do an example problem.
f(g(x)) when x = 3
g(3) = (3)^2 = 9
f(9) = 6(9) - 5 = 49
so, f(g(3)) = 49.
I really like your example because its simple enough to answer my questions about composition functions.
ReplyDeleteVery clear explanation of composition function. I think it is much easier to grasp this kind of math concepts by simple explanation.
ReplyDeleteGreat examples!
ReplyDeleteGood examples.
ReplyDeleteblake,
ReplyDeletenice examples and clear step by step instructions. a real life example would have been a nice addition but nice job otherwise.
professor little