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Chapter 1 Functions and Limits 1.4 Limit of a Function and Limit Laws. Many ideas of calculus originated with the following two geometric problems:.
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Chapter 1 Functions and Limits1.4 Limit of a Function and Limit Laws Many ideas of calculus originated with the following two geometric problems:
Traditionally, that portion of calculus arising from the tangent line problem is called differential calculus and that arising from the area problem is called integral calculus • Tangent lines and limits • Areas and limits • Decimals and limits*
Limits The most basic use of limits is to describe how a function behaves as the independent variable approaches a given value. For example, let us examine the behavior of the function for x values closer and closer to 2. We can see that the values of f(x) get closer and closer to 3 as values of x are selected closer and closer to 2 on either side of 2.
Limits We describe this by saying that the “limit of is 3 as x approaches 2 from either side”, and we write
Note: Since x is different from a, the value of f at a or even whether f is defined at a, has not bearing on the limit L Limits (An Informal View)
Ex: How does the function behave near x=1? Solution: The given formula defines f for all real numbers x except x=1. For any x≠1, f(x)=x+1. So by observing the graph, it is clear that we can make the value of f(x) as close as we want to 2 by choosing x close enough to 1.
We say that f(x) approaches the limit 2 as x approaches 1, and write
Example Limit of the identity function Limit of the constant function
Example Discuss the behavior of the following functions as x0. It grows too large to have a limit It oscillates too much to have a limit It jumps
Example, Solution: Example: Solution:
Examples For example, Solution: The function involved is a polynomial. So Example, Solution:
Eliminating Zero Denominators Algebraically When p(x)/q(x) is a rational function for which p (a) =0 and q(a)=0, the numerator and denominator must have one or more common factors of x – a. In this case, the limit of p(x)/q(x) as x a can be found by canceling all common factors of x – a first. Here are some examples…
For example, Find Solution: Since 1 is a zero of both the numerator and the denominator, they share a common factor of x-1. The limit can be obtained as follows:
Example: Find Solution: The numerator and the denominator both have a zero at x=2, so there is common factor of x-2. Then
Example Given that Find limxc u(x), no matter how complicated u is. Solution: Since The Sandwich Theorem implies that
Examples (a) Note that (b) Note that
1.6 One-sided Limits For example: consider the function
As x approaches 0 from the right, f(x) approaches 1, and similarly, as x approaches 0 from the left, f(x) approaches -1. We denote this by Here “+” indicates a limit from the right and “-” indicates a limit from the left.
Example Example: Find
The relation between one-sided limits and two-sided limits In general, there is no guarantee that a function f will have a two-sided limit at a given point. In this case, we say that does not exist. Similarly for one-sided limits. Here we state the relation without formal proof
Ex: for the functions in the slide, find the one-sided and two sided limits at x=a if they exists.
Solution: • The functions in all three figures have the same one-sided limits as x->a, since the function are identical, except at x=a. These limits are • In all three cases the two-sided limit does not exist at x->a since the one-sided limits are not equal.
Example Example: for the function graphed below, find out for k=0, 2, 3, 4?
Limits Involving (sin / ) A central fact about sin / is that in radian measure its limit as 0 is 1. We can see this from the figure below, and confirm it algebraically using the Sandwich Theorem.
Examples Find the following limits. Let =h/2.
1.7 CONTINUITY Intuitively, the graph of a function can be described as a “continuous curve” if it has not breaks or holes. The graph of a function has a break or hole if any of the following conditions occur: • The function f is undefined at c • The limit of f(x) does not exist as x approaches c • The value of the function and the value of the limit at c are different.
Example Find the points at which the function f in below figure is continuous and the points at which f is not continuous. Why?
Continuity at a Point If a function is defined on an open interval containing c, except possibly at c itself, and f is not continuous at c, then we say that f is discontinuous at c.
Definitions A function f is right-continuous (continuous from the right) at a point x=2 in its domain if A function f is left-continuous (continuous from the left) at a point x=2 in its domain if
Continuity Test For one-sided continuity and continuity at an endpoint, the limits in part 2 And part 3 of the test should be replaced by the appropriate one-sided limits.
Example: Determine whether the following functions are continuous at x=-3. • Solution: • Observe that • f(x) is not continuous at x=-3 since it’s undefined at x=-3, • g(x) is not continuous at x=-3 since • h(x) is continuous
Example Example. The function y=|x| is discontinuous at every integer because The left –hand and right-hand limits are not equal as xn:
Discontinuities Below figure displays several common types of discontinuities:
Continuous Functions A function is continuous on an interval if and only if it is continuous at every point of the interval. A continuous function is one that is continuous at every point of its domain. Example: (a) the function y=1/x is continuous function. (b )the function y=x and the constant functions are continuous everywhere.
Properties of Continuous Functions Algebraic combinations of continuous functions are continuous wherever they are defined.
Examples • Every polynomial is continuous everywhere. • A rational function is continuous at every point where the denominator is nonzero, and has discontinuities at the points where the denominator is zero. • The functions y=sinx and y=cosx are, in fact, continuous everywhere. It follows that all six trigonometric functions are then continuous wherever they are defined.
Composites All composites of continuous functions are continuous.
