Functions and Graphs Introduction
Use the “Functions and Graphs Vocab Guided Notes Worksheet” to take notes as we go Basic definitions are written for you Add in additional ideas and tips Draw in examples Highlight or underline what helps you
Vocabulary Relation Relation – Is the mapping between a set of input values (x) and output values (y). They show a relationship between sets of information, can be represented in ordered pairs, table, graph, or mapping Any set of ordered pairs can be used in a relation. No specific rule required Examples: (1, 40), (1, 50), (2, 65), (2, 75), (3, 80)… {(A, Frankie), (C, Denise), (B, Brady), (A, Julietta), (D, Bob), (B, Evelyn)} (0,0), (1, 1), (1, -1), (2, 1.414…), (2, -1.414…)…
Vocabulary Function Function: a relation between a given set of elements for which each input value (x) there exists exactly one output value (y). A function is a more specific type of relation. It has to follow certain ‘rules’ *no repeat x values allowed with different y outputs One x-value cannot have more than one y-value. (6, 8) and (6, 20) NOT a function because the input of 6 has two different outputs (can’t have repeat xs with different ys) One y-value can have more than x-value. (7, 4) and (9, 4) YES it is a function because the each input has only one output (it’s ok to have repeated y values) Examples: (1, 40), (2, 65), (3, 80), (5, 90), (6, 80), (7, 85) (0,0), (1, 1), (2, 1.414…), (3, -7.7320…), (4, 2)…
How to determine if a relation is a function: Analyze the x-values given in ordered pairs or in a table. If an x repeats with a different y-value, then it is NOT a function. Practice: State if the relation is a function H = {(2, 5), (3, 9), (-4, 10), (6, -6), (-7, 5)} M = {(3, 7), (-8, 2), (-1, 0), (3, 8), (2, 6)} 3. 4. Function Not a function Not a function Function The input of 3 has two different outputs The input of 4 has two different outputs
How to determine if a graph is a function: Vertical Line Test = A visual method used to determine whether a relation represented as a graph is a function If you draw a vertical line anywhere on the graph and it goes through only one point = FUNCTION If you draw a vertical line anywhere on the graph and it goes through more than one point = NOT a Function. This tells you if an input has only one or more than one corresponding y output Practice: Is this graph a function? x y x y Yes, function Not a function Not a function Yes, function
Vocabulary Function Notation Is a way to represent functions algebraically that makes it more efficient to recognize the independent and dependent variables. a way of writing a function. The most popular way to write a function is f(x). This is read “f of x” f(x)= is same as saying y= This tells you that x is the input/independent variable (This is NOT multiplying f times x.) Example: f(x) = 2x + 4 It is very similar to saying y = 2x + 4 as we did in pre-algebra x is still input output input f(x) is the output instead of y f(3) = 2(3) + 4 Plug the x input 3 into the ‘rule’ 2x+4 f(3) = 10 means with input 3, the function’s output is 10
How to use function notation f(x)… f(x) = 2x + 7, find f(5). This is asking what is the value of the function when the input/independent variable is 5 Substitute 5 in where you see x and evaluate. f(5) = 2(5) + 7 f(5) = 17 The answer is 17. f(x) = -3x2 – x – 4, find f(2) This means to substitute 2 in where you see x. f(2) = -3(2)2 – 2 – 4 f(2) = -18
General Graph Vocab
General Graph Vocab