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Continuity

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Title: Continuity


1
Continuity
  • Alex Karassev

2
Definition
  • A function f is continuous at a number a if
  • Thus, we can use direct substitution to compute
    the limit of function that is continuous at a

3
Some remarks
  • Definition of continuity requires three things
  • f(a) is defined (i.e. a is in the domain of f)
  • exists
  • Limit is equal to the value of the function
  • The graph of a continuous functions does not have
    any "gaps" or "jumps"

4
Continuous functions and limits
  • TheoremSuppose that f is continuous at
    band Then
  • Example

5
Properties of continuous functions
  • Suppose f and g are both continuous at a
  • Then f g, f g, fg are continuous at a
  • If, in addition, g(a) ? 0 then f/g is also
    continuous at a
  • Suppose that g is continuous at a and f is
    continuous at g(a). Then f(g(x)) is continuous at
    a.

6
Which functions are continuous?
  • Theorem
  • Polynomials, rational functions, root functions,
    power functions, trigonometric functions,
    exponential functions, logarithmic functions are
    continuous on their domains
  • All functions that can be obtained from the
    functions listed above using addition,
    subtraction, multiplication, division, and
    composition, are also continuous on their domains

7
Example
  • Determine, where is the following function
    continuous

8
Solution
  • According to the previous theorem, we need to
    find domain of f
  • Conditions on x x 1 0 and 2 x gt0
  • Therefore x 1 and 2 gt x
  • So 1 x lt 2
  • Thus f is continuous on 1,2)

9
Intermediate Value Theorem
10
River and Road
11
River and Road
12
Definitions
  • A solution of equation is also calleda root of
    equation
  • A number c such that f(c)0 is calleda root of
    function f

13
Intermediate Value Theorem (IVT)
  • f is continuous on a,b
  • N is a number between f(a) and f(b)
  • i.e f(a) N f(b) or f(b) N f(a)
  • then there exists at least one c in a,b s.t.
    f(c) N

y
y f(x)
f(b)
N
f(a)
x
c
a
b
14
Intermediate Value Theorem (IVT)
  • f is continuous on a,b
  • N is a number between f(a) and f(b)
  • i.e f(a) N f(b) or f(b) N f(a)
  • then there exists at least one c in a,b s.t.
    f(c) N

y
y f(x)
f(b)
N
f(a)
x
c3
c1
c2
a
b
15
Equivalent statement of IVT
  • f is continuous on a,b
  • N is a number between f(a) and f(b), i.e f(a)
    N f(b) or f(b) N f(a)
  • then f(a) N N N f(b) N or f(b) N
    N N f(a) N
  • so f(a) N 0 f(b) N or f(b)
    N 0 f(a) N
  • Instead of f(x) we can consider g(x) f(x) N
  • so g(a) 0 g(b) or g(b) 0 g(a)
  • There exists at least one c in a,b such that
    g(c) 0

16
Equivalent statement of IVT
  • f is continuous on a,b
  • f(a) and f(b) have opposite signs
  • i.e f(a) 0 f(b) or f(b) 0 f(a)
  • then there exists at least one c in a,b s.t.
    f(c) 0

y
y f(x)
f(b)
c
x
a
N 0
b
f(a)
17
Continuity is important!
  • Let f(x) 1/x
  • Let a -1 and b 1
  • f(-1) -1, f(1) 1
  • However, there is no c such that f(c) 1/c 0

18
Important remarks
  • IVT can be used to prove existence of a root of
    equation
  • It cannot be used to find exact value of the root!

19
Example 1
  • Prove that equation x 3 x5 has a solution
    (root)
  • Remarks
  • Do not try to solve the equation! (it is
    impossible to find exact solution)
  • Use IVT to prove that solution exists

20
Steps to prove that x 3 x5 has a solution
  • Write equation in the form f(x) 0
  • x5 x 3 0 so f(x) x5 x 3
  • Check that the condition of IVT is satisfied,
    i.e. that f(x) is continuous
  • f(x) x5 x 3 is a polynomial, so it is
    continuous on (-8, 8)
  • Find a and b such that f(a) and f(b) are of
    opposite signs, i.e. show that f(x) changes sign
    (hint try some integers or some numbers at which
    it is easy to compute f)
  • Try a0 f(0) 05 0 3 -3 lt 0
  • Now we need to find b such that f(b) gt0
  • Try b1 f(1) 15 1 3 -1 lt 0 does not work
  • Try b2 f(2) 25 2 3 31 gt0 works!
  • Use IVT to show that root exists in a,b
  • So a 0, b 2, f(0) lt0, f(2) gt0 and therefore
    there exists c in 0,2 such that f(c)0, which
    means that the equation has a solution

21
x 3 x5 ? x5 x 3 0
y
31
x
0
2
N 0
c (root)
-3
22
Example 2
  • Find approximate solution of the equationx 3
    x5

23
Idea method of bisections
  • Use the IVT to find an interval a,b that
    contains a root
  • Find the midpoint of an interval that contains
    root midpoint m (ab)/2
  • Compute the value of the function in the midpoint
  • If f(a) and f (m) are of opposite signs, switch
    to a,m (since it contains root by the
    IVT),otherwise switch to m,b
  • Repeat the procedure until the length of interval
    is sufficiently small

24
f(x) x5 x 3 0
We already know that 0,2 contains root
f(x)
gt 0
lt 0
31
-3
-1
Midpoint (02)/2 1
0
2
x
25
f(x) x5 x 3 0
f(x)
31
-3
6.1
-1
1.5
0
2
1
x
Midpoint (12)/2 1.5
26
f(x) x5 x 3 0
f(x)
31
-3
6.1
1.3
-1
0
2
1.5
1
1.25
x
Midpoint (11.5)/2 1.25
27
f(x) x5 x 3 0
f(x)
31
-3
6.1
1.3
-.07
-1
1.25
1.125
1
0
2
1.5
Midpoint (1 1.25)/2 1.125
x
  • By the IVT, interval 1.125, 1.25 contains root
  • Length of the interval 1.25 1.125 0.125 2
    / 16 the length of the original interval /
    24
  • 24 appears since we divided 4 times
  • Both 1.25 and 1.125 are within 0.125 from the
    root!
  • Since f(1.125) -.07, choose c 1.125
  • Computer gives c 1.13299617282...

28
Exercise
  • Prove that the equationsin x 1 x2has at
    least two solutions

Hint Write the equation in the form f(x) 0 and
find three numbers x1, x2, x3, such that f(x1)
and f(x2) have opposite signs AND f(x2) and f(x3)
haveopposite signs. Then by the IVT the interval
x1, x2 contains a root ANDthe interval x2,
x3 contains a root.
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