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Lesson 15-1 Limits Objective: To calculate limits of polynomials and rational functions algebraically To evaluate limits of functions using a calculator.

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Presentation on theme: "Lesson 15-1 Limits Objective: To calculate limits of polynomials and rational functions algebraically To evaluate limits of functions using a calculator."— Presentation transcript:

1 Lesson 15-1 Limits Objective: To calculate limits of polynomials and rational functions algebraically To evaluate limits of functions using a calculator

2 Definition of Limit If f(x) becomes arbitrarily close to a unique number L as x approaches a from either side, the limit of f(x) as x approaches a is L. This is written as:

3 Limits That Fail to Exist There are three conditions under which limits do not exist: 1.The function approaches a different number coming from the right hand side as opposed to the left hand side. 2.The function heads off to pos./neg. infinity. 3.The function oscillates between two fixed values as x approaches a.

4 Indeterminent Form If a function is continuous at a, then In this case you take the a in the limit and substitute it into the function. If you get a number that is the limit. If you get 0/0 or #/0 you have to use some other method to find the limit.

5 The limit of this function as x approaches 1 is 1.

6 Evaluate the limit This function is also continuous so plugging in 2 will give you the limit of the function.

7 Example Find the limit:

8 When the function is not continuous at the x- value in question, it is more difficult to evaluate. If you factor either the top or the bottom or both of the rational polynomial and then cancel. You can then use direct substitution to solve the limit.

9 This function does not have a value at x = 3, but you can see from the graph that as you approach 3 from both sides the value approaches 2.

10 Evaluate the limit

11

12 Multiplying by the conjugate

13 Evaluating on the calculator When the function is not continuous and it is not factorable it can be evaluated using the graphing calculator. – Enter the function in Y= – then [2 nd ][TBLSET] – change the independent variable to ASK – then in the [TABLE] you can enter values that approach the x from either side and see what the limit is.

14 Evaluate the limit This function is undefined at 0. Enter values into table:.1-.1.01-.01.001-.001 The limit approaches 0.

15 Evaluate the limit using the calculator

16 Special Cases

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