2.5 Continuity In this section, we will:

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2.5 Continuity In this section, we will: LIMITS AND DERIVATIVES. 2.5 Continuity In this section, we will: See that the mathematical definition of continuity corresponds closely with the meaning of the word continuity in everyday language.

A function f is continuous at a number a if: CONTINUITY 1. Definition A function f is continuous at a number a if:

Notice that Definition 1 implicitly requires three things if f is CONTINUITY Notice that Definition 1 implicitly requires three things if f is continuous at a: f(a) is defined—that is, a is in the domain of f exists. .

The definition states that f is continuous CONTINUITY The definition states that f is continuous at a if f(x) approaches f(a) as x approaches a. Thus, a continuous function f has the property that a small change in x produces only a small change in f(x). In fact, the change in f(x) can be kept as small as we please by keeping the change in x sufficiently small.

Geometrically, you can think of a function CONTINUITY Geometrically, you can think of a function that is continuous at every number in an interval as a function whose graph has no break in it. The graph can be drawn without removing your pen from the paper.

The figure shows the graph of a function f. At which numbers is f CONTINUITY Example 1 The figure shows the graph of a function f. At which numbers is f discontinuous? Why?

It looks as if there is a discontinuity Example 1 It looks as if there is a discontinuity when a = 1 because the graph has a break there. The official reason that f is discontinuous at 1 is that f(1) is not defined.

The graph also has a break when a = 3. CONTINUITY Example 1 The graph also has a break when a = 3. However, the reason for the discontinuity is different. Here, f(3) is defined, but does not exist (because the left and right limits are different). So, f is discontinuous at 3.

What about a = 5? CONTINUITY Example 1 Here, f(5) is defined and exists (because the left and right limits are the same). However, So, f is discontinuous at 5.

Where are each of the following functions discontinuous? a. b. c. d. CONTINUITY Example 2 Where are each of the following functions discontinuous? a. b. c. d.

Notice that f(2) is not defined. So, f is discontinuous at 2. CONTINUITY Example 2 a (a) Notice that f(2) is not defined. So, f is discontinuous at 2.

So, f is discontinuous at 0. CONTINUITY Example 2 b Here, f(0) = 1 is defined. However, does not exist. See Example 8 in Section 2.2. So, f is discontinuous at 0. (b)

(c) Here, f(2) = 1 is defined and CONTINUITY Example 2 c (c) Here, f(2) = 1 is defined and exists. However, So, f is not continuous at 2.

A function f is continuous from the right at a number a if CONTINUITY 2. Definition A function f is continuous from the right at a number a if and f is continuous from the left at a if

A function f is continuous on an interval if it is continuous at every CONTINUITY 3. Definition A function f is continuous on an interval if it is continuous at every number in the interval. If f is defined only on one side of an endpoint of the interval, we understand ‘continuous at the endpoint’ to mean ‘continuous from the right’ or ‘continuous from the left.’

If f and g are continuous at a, and c is CONTINUITY 4. Theorem If f and g are continuous at a, and c is a constant, then the following functions are also continuous at a: 1. f + g 2. f - g 3. cf 4. fg 5. f/g if g(a) ≠ 0

Since f and g are continuous at a, we have: CONTINUITY Proof Since f and g are continuous at a, we have: Therefore, This shows that f + g is continuous at a.

Any polynomial is continuous everywhere—that is, it is continuous on CONTINUITY 5. Theorem Any polynomial is continuous everywhere—that is, it is continuous on Any rational function is continuous wherever it is defined—that is, it is continuous on its domain.

If a ball is thrown vertically into the air with CONTINUITY If a ball is thrown vertically into the air with a velocity of 50 ft/s, then the height of the ball in feet t seconds later is given by the formula h = 50t - 16t2. This is a polynomial function. So, the height is a continuous function of the elapsed time.

Find CONTINUITY Example 5 The function is rational. So, by Theorem 5, it is continuous on its domain, which is: Therefore,

From the appearance of the graphs of the sine and cosine functions, we CONTINUITY From the appearance of the graphs of the sine and cosine functions, we would certainly guess that they are continuous.

It follows from part 5 of Theorem 4 that is continuous CONTINUITY It follows from part 5 of Theorem 4 that is continuous except where cos x = 0.

This happens when x is an odd integer multiple of . CONTINUITY This happens when x is an odd integer multiple of . So, y = tan x has infinite discontinuities When and so on.

The inverse function of any continuous CONTINUITY The inverse function of any continuous one-to-one function is also continuous. Our geometric intuition makes it seem plausible. The graph of f -1 is obtained by reflecting the graph of f about the line y = x. So, if the graph of f has no break in it, neither does the graph of f -1. Thus, the inverse trigonometric functions are continuous.

Consider the exponential function y = ax . CONTINUITY Consider the exponential function y = ax . The very definition of y = ax makes it a continuous function on . Therefore, its inverse function is continuous on .

The following types of functions are CONTINUITY 7. Theorem The following types of functions are continuous at every number in their domains: Polynomials Rational functions Root functions Trigonometric functions Inverse trigonometric functions Exponential functions Logarithmic functions

Where is the function continuous? CONTINUITY Example 6 We know from Theorem 7 that the function y = ln x is continuous for x > 0 and y = tan-1x is continuous on . Thus, by part 1 of Theorem 4, y = ln x + tan-1x is continuous on . The denominator, y = x2 - 1, is a polynomial—so, it is continuous everywhere.

So, f is continuous on the intervals (0, 1) and . CONTINUITY Example 6 Therefore, by part 5 of Theorem 4, f is continuous at all positive numbers x except where x2 - 1 = 0. So, f is continuous on the intervals (0, 1) and .

Evaluate CONTINUITY Example 7 Theorem 7 gives us that y = sin x is continuous. The function in the denominator, y = 2 + cos x, is the sum of two continuous functions and is therefore continuous. Notice that the denominator is never 0 because for all x, 2 + cos x > 0 everywhere.

Thus, the ratio is continuous everywhere. CONTINUITY Example 7 Thus, the ratio is continuous everywhere. Hence, by the definition of a continuous function,

Evaluate CONTINUITY Example 8 As arcsin is a continuous function, we can apply Theorem 8:

If g is continuous at a and f is continuous CONTINUITY 9. Theorem If g is continuous at a and f is continuous at g(a), then the composite function given by is continuous at a. This theorem is often expressed informally by saying “a continuous function of a continuous function is a continuous function.”

Suppose that f is continuous on the closed INTERMEDIATE VALUE THEOREM Suppose that f is continuous on the closed interval [a, b] and let N be any number between f(a) and f(b), where . Then, there exists a number c in (a, b) such that f(c) = N.

The theorem states that a continuous INTERMEDIATE VALUE THEOREM The theorem states that a continuous function takes on every intermediate value between the function values f(a) and f(b).

The theorem is illustrated by the figure. INTERMEDIATE VALUE THEOREM The theorem is illustrated by the figure. Note that the value N can be taken on once [as in (a)] or more than once [as in (b)].

Show that there is a root of the equation between 1 and 2. INTERMEDIATE VALUE THEOREM Example 10 Show that there is a root of the equation between 1 and 2. Let . We are looking for a solution of the given equation— that is, a number c between 1 and 2 such that f(c) = 0. Therefore, we take a = 1, b = 2, and N = 0 in the theorem. We have and

Now, f is continuous since it is a polynomial. INTERMEDIATE VALUE THEOREM Example 10 Thus, f(1) < 0 < f(2)—that is, N = 0 is a number between f(1) and f(2). Now, f is continuous since it is a polynomial. So, the theorem states that there is a number c between 1 and 2 such that f(c) = 0 In other words, the equation has at least one root in the interval (1, 2). We can use a graphing calculator or computer to get the root.