The document discusses square roots and radicals. It defines the square root operation as finding the number that, when squared, equals the given number. It provides a table of common square numbers and their square roots that should be memorized. It also describes how to estimate the square root of numbers between values in the table by interpolating between the two closest square roots. A scientific calculator is needed to evaluate more complex square roots.
2. Radicals and Pythagorean Theorem
From here on we need a scientific calculator.
You may use the digital calculators on your personal devices.
3. Radicals and Pythagorean Theorem
From here on we need a scientific calculator.
You may use the digital calculators on your personal devices.
Make sure the calculator could displace your input so that
you may check the input before executing it.
4. Radicals and Pythagorean Theorem
Square Root
From here on we need a scientific calculator.
You may use the digital calculators on your personal devices.
Make sure the calculator could displace your input so that
you may check the input before executing it.
5. “9 is the square of 3” may be rephrased backwards as
“3 is the square root of 9”.
Radicals and Pythagorean Theorem
Square Root
From here on we need a scientific calculator.
You may use the digital calculators on your personal devices.
Make sure the calculator could displace your input so that
you may check the input before executing it.
6. “9 is the square of 3” may be rephrased backwards as
“3 is the square root of 9”.
Radicals and Pythagorean Theorem
Definition: If a is > 0, and a2 = x, then we say a is the square
root of x. This is written as sqrt(x) = a, or x = a.
Square Root
From here on we need a scientific calculator.
You may use the digital calculators on your personal devices.
Make sure the calculator could displace your input so that
you may check the input before executing it.
7. “9 is the square of 3” may be rephrased backwards as
“3 is the square root of 9”.
Example A.
a. Sqrt(16) =
c.–3 =
Radicals and Pythagorean Theorem
Definition: If a is > 0, and a2 = x, then we say a is the square
root of x. This is written as sqrt(x) = a, or x = a.
b. 1/9 =
d. 3 =
Square Root
From here on we need a scientific calculator.
You may use the digital calculators on your personal devices.
Make sure the calculator could displace your input so that
you may check the input before executing it.
8. “9 is the square of 3” may be rephrased backwards as
“3 is the square root of 9”.
Example A.
a. Sqrt(16) = 4
c.–3 =
Radicals and Pythagorean Theorem
Definition: If a is > 0, and a2 = x, then we say a is the square
root of x. This is written as sqrt(x) = a, or x = a.
b. 1/9 =
d. 3 =
Square Root
From here on we need a scientific calculator.
You may use the digital calculators on your personal devices.
Make sure the calculator could displace your input so that
you may check the input before executing it.
9. “9 is the square of 3” may be rephrased backwards as
“3 is the square root of 9”.
Example A.
a. Sqrt(16) = 4
c.–3 =
Radicals and Pythagorean Theorem
Definition: If a is > 0, and a2 = x, then we say a is the square
root of x. This is written as sqrt(x) = a, or x = a.
b. 1/9 = 1/3
d. 3 =
Square Root
From here on we need a scientific calculator.
You may use the digital calculators on your personal devices.
Make sure the calculator could displace your input so that
you may check the input before executing it.
10. “9 is the square of 3” may be rephrased backwards as
“3 is the square root of 9”.
Example A.
a. Sqrt(16) = 4
c.–3 = doesn’t exist
Radicals and Pythagorean Theorem
Definition: If a is > 0, and a2 = x, then we say a is the square
root of x. This is written as sqrt(x) = a, or x = a.
b. 1/9 = 1/3
d. 3 =
Square Root
From here on we need a scientific calculator.
You may use the digital calculators on your personal devices.
Make sure the calculator could displace your input so that
you may check the input before executing it.
11. “9 is the square of 3” may be rephrased backwards as
“3 is the square root of 9”.
Example A.
a. Sqrt(16) = 4
c.–3 = doesn’t exist
Radicals and Pythagorean Theorem
Definition: If a is > 0, and a2 = x, then we say a is the square
root of x. This is written as sqrt(x) = a, or x = a.
b. 1/9 = 1/3
d. 3 = 1.732.. (calculator)
Square Root
From here on we need a scientific calculator.
You may use the digital calculators on your personal devices.
Make sure the calculator could displace your input so that
you may check the input before executing it.
12. “9 is the square of 3” may be rephrased backwards as
“3 is the square root of 9”.
Example A.
a. Sqrt(16) = 4
c.–3 = doesn’t exist
Radicals and Pythagorean Theorem
Definition: If a is > 0, and a2 = x, then we say a is the square
root of x. This is written as sqrt(x) = a, or x = a.
b. 1/9 = 1/3
d. 3 = 1.732.. (calculator)
Note that the square of both +3 and –3 is 9,
but we designate sqrt(9) or 9 to be +3.
Square Root
From here on we need a scientific calculator.
You may use the digital calculators on your personal devices.
Make sure the calculator could displace your input so that
you may check the input before executing it.
13. “9 is the square of 3” may be rephrased backwards as
“3 is the square root of 9”.
Example A.
a. Sqrt(16) = 4
c.–3 = doesn’t exist
Radicals and Pythagorean Theorem
Definition: If a is > 0, and a2 = x, then we say a is the square
root of x. This is written as sqrt(x) = a, or x = a.
b. 1/9 = 1/3
d. 3 = 1.732.. (calculator)
Note that the square of both +3 and –3 is 9,
but we designate sqrt(9) or 9 to be +3.
We say “–3” is the “negative of the square root of 9”.
From here on we need a scientific calculator.
You may use the digital calculators on your personal devices.
Make sure the calculator could displace your input so that
you may check the input before executing it.
Square Root
15. 0 02 = 0 0 = 0
1 12 = 1 1 = 1
2 22 = 4 4 = 2
3 32 = 9 9 = 3
4 42 = 16 16 = 4
5 52 = 25 25 = 5
6 62 = 36 36 = 6
7 72 = 49 49 = 7
8 82 = 64 64 = 8
9 92 = 81 81 = 9
10 102 = 100 100 = 10
11 112 = 121 121 = 11
Radicals and Pythagorean Theorem
Following are the square numbers and square-roots that one
needs to memorize. These numbers are special because
many mathematics exercises utilize square numbers.
16. 0 02 = 0 0 = 0
1 12 = 1 1 = 1
2 22 = 4 4 = 2
3 32 = 9 9 = 3
4 42 = 16 16 = 4
5 52 = 25 25 = 5
6 62 = 36 36 = 6
7 72 = 49 49 = 7
8 82 = 64 64 = 8
9 92 = 81 81 = 9
10 102 = 100 100 = 10
11 112 = 121 121 = 11
We may estimate the sqrt
of other small numbers using
this table.
Radicals and Pythagorean Theorem
Following are the square numbers and square-roots that one
needs to memorize. These numbers are special because
many mathematics exercises utilize square numbers.
17. 0 02 = 0 0 = 0
1 12 = 1 1 = 1
2 22 = 4 4 = 2
3 32 = 9 9 = 3
4 42 = 16 16 = 4
5 52 = 25 25 = 5
6 62 = 36 36 = 6
7 72 = 49 49 = 7
8 82 = 64 64 = 8
9 92 = 81 81 = 9
10 102 = 100 100 = 10
11 112 = 121 121 = 11
We may estimate the sqrt
of other small numbers using
this table. For example,
25 < 30 < 36
Radicals and Pythagorean Theorem
Following are the square numbers and square-roots that one
needs to memorize. These numbers are special because
many mathematics exercises utilize square numbers.
18. 0 02 = 0 0 = 0
1 12 = 1 1 = 1
2 22 = 4 4 = 2
3 32 = 9 9 = 3
4 42 = 16 16 = 4
5 52 = 25 25 = 5
6 62 = 36 36 = 6
7 72 = 49 49 = 7
8 82 = 64 64 = 8
9 92 = 81 81 = 9
10 102 = 100 100 = 10
11 112 = 121 121 = 11
We may estimate the sqrt
of other small numbers using
this table. For example,
25 < 30 < 36
hence
25 < 30 <36
Radicals and Pythagorean Theorem
Following are the square numbers and square-roots that one
needs to memorize. These numbers are special because
many mathematics exercises utilize square numbers.
19. 0 02 = 0 0 = 0
1 12 = 1 1 = 1
2 22 = 4 4 = 2
3 32 = 9 9 = 3
4 42 = 16 16 = 4
5 52 = 25 25 = 5
6 62 = 36 36 = 6
7 72 = 49 49 = 7
8 82 = 64 64 = 8
9 92 = 81 81 = 9
10 102 = 100 100 = 10
11 112 = 121 121 = 11
We may estimate the sqrt
of other small numbers using
this table. For example,
25 < 30 < 36
hence
25 < 30 <36
or 5 < 30 < 6
Radicals and Pythagorean Theorem
Following are the square numbers and square-roots that one
needs to memorize. These numbers are special because
many mathematics exercises utilize square numbers.
20. 0 02 = 0 0 = 0
1 12 = 1 1 = 1
2 22 = 4 4 = 2
3 32 = 9 9 = 3
4 42 = 16 16 = 4
5 52 = 25 25 = 5
6 62 = 36 36 = 6
7 72 = 49 49 = 7
8 82 = 64 64 = 8
9 92 = 81 81 = 9
10 102 = 100 100 = 10
11 112 = 121 121 = 11
We may estimate the sqrt
of other small numbers using
this table. For example,
25 < 30 < 36
hence
25 < 30 <36
or 5 < 30 < 6
Since 30 is about half way
between 25 and 36,
Radicals and Pythagorean Theorem
Following are the square numbers and square-roots that one
needs to memorize. These numbers are special because
many mathematics exercises utilize square numbers.
21. 0 02 = 0 0 = 0
1 12 = 1 1 = 1
2 22 = 4 4 = 2
3 32 = 9 9 = 3
4 42 = 16 16 = 4
5 52 = 25 25 = 5
6 62 = 36 36 = 6
7 72 = 49 49 = 7
8 82 = 64 64 = 8
9 92 = 81 81 = 9
10 102 = 100 100 = 10
11 112 = 121 121 = 11
We may estimate the sqrt
of other small numbers using
this table. For example,
25 < 30 < 36
hence
25 < 30 <36
or 5 < 30 < 6
Since 30 is about half way
between 25 and 36,
so we estimate that30 5.5.
Radicals and Pythagorean Theorem
Following are the square numbers and square-roots that one
needs to memorize. These numbers are special because
many mathematics exercises utilize square numbers.
22. 0 02 = 0 0 = 0
1 12 = 1 1 = 1
2 22 = 4 4 = 2
3 32 = 9 9 = 3
4 42 = 16 16 = 4
5 52 = 25 25 = 5
6 62 = 36 36 = 6
7 72 = 49 49 = 7
8 82 = 64 64 = 8
9 92 = 81 81 = 9
10 102 = 100 100 = 10
11 112 = 121 121 = 11
We may estimate the sqrt
of other small numbers using
this table. For example,
25 < 30 < 36
hence
25 < 30 <36
or 5 < 30 < 6
Since 30 is about half way
between 25 and 36,
so we estimate that30 5.5.
In fact 30 5.47722….
Radicals and Pythagorean Theorem
Following are the square numbers and square-roots that one
needs to memorize. These numbers are special because
many mathematics exercises utilize square numbers.
23. Equations of the form x2 = c has two answers:
x = +c or –c if c>0.
Radicals and Pythagorean Theorem
24. Equations of the form x2 = c has two answers:
x = +c or –c if c>0.
Radicals and Pythagorean Theorem
(If c<0, there is no real solution.)
25. Equations of the form x2 = c has two answers:
x = +c or –c if c>0.
Radicals and Pythagorean Theorem
Example B. Solve the following equations.
a. x2 = 25
(If c<0, there is no real solution.)
26. Equations of the form x2 = c has two answers:
x = +c or –c if c>0.
Radicals and Pythagorean Theorem
Example B. Solve the following equations.
a. x2 = 25
x = ±25
(If c<0, there is no real solution.)
27. Equations of the form x2 = c has two answers:
x = +c or –c if c>0.
Radicals and Pythagorean Theorem
Example B. Solve the following equations.
a. x2 = 25
x = ±25 = ±5
(If c<0, there is no real solution.)
28. Equations of the form x2 = c has two answers:
x = +c or –c if c>0.
Radicals and Pythagorean Theorem
Example B. Solve the following equations.
a. x2 = 25
x = ±25 = ±5
b. x2 = –4
(If c<0, there is no real solution.)
29. Equations of the form x2 = c has two answers:
x = +c or –c if c>0.
Radicals and Pythagorean Theorem
Example B. Solve the following equations.
a. x2 = 25
x = ±25 = ±5
b. x2 = –4
Solution does not exist.
(If c<0, there is no real solution.)
30. Equations of the form x2 = c has two answers:
x = +c or –c if c>0.
Radicals and Pythagorean Theorem
Example B. Solve the following equations.
a. x2 = 25
x = ±25 = ±5
b. x2 = –4
Solution does not exist.
c. x2 = 8
(If c<0, there is no real solution.)
31. Equations of the form x2 = c has two answers:
x = +c or –c if c>0.
Radicals and Pythagorean Theorem
Example B. Solve the following equations.
a. x2 = 25
x = ±25 = ±5
b. x2 = –4
Solution does not exist.
c. x2 = 8
x = ±8
(If c<0, there is no real solution.)
32. Equations of the form x2 = c has two answers:
x = +c or –c if c>0.
Radicals and Pythagorean Theorem
Example B. Solve the following equations.
a. x2 = 25
x = ±25 = ±5
b. x2 = –4
Solution does not exist.
c. x2 = 8
x = ±8 ±2.8284.. by calculator
(If c<0, there is no real solution.)
33. Equations of the form x2 = c has two answers:
x = +c or –c if c>0.
Radicals and Pythagorean Theorem
Example B. Solve the following equations.
a. x2 = 25
x = ±25 = ±5
b. x2 = –4
Solution does not exist.
c. x2 = 8
x = ±8 ±2.8284.. by calculator
exact answer approximate answer
(If c<0, there is no real solution.)
34. Equations of the form x2 = c has two answers:
x = +c or –c if c>0.
Radicals and Pythagorean Theorem
Example B. Solve the following equations.
a. x2 = 25
x = ±25 = ±5
b. x2 = –4
Solution does not exist.
c. x2 = 8
x = ±8 ±2.8284.. by calculator
exact answer approximate answer
Square-roots numbers show up in geometry for measuring
distances because of the Pythagorean Theorem.
(If c<0, there is no real solution.)
35. A right triangle is a triangle with a right angle as one of its
angle.
Radicals and Pythagorean Theorem
36. A right triangle is a triangle with a right angle as one of its
angles. The longest side C of a right triangle is called the
hypotenuse,
Radicals and Pythagorean Theorem
hypotenuse
C
37. A right triangle is a triangle with a right angle as one of its
angles. The longest side C of a right triangle is called the
hypotenuse, the two sides A and B forming the right angle
are called the legs.
Radicals and Pythagorean Theorem
hypotenuse
legs
A
B
C
38. A right triangle is a triangle with a right angle as one of its
angles. The longest side C of a right triangle is called the
hypotenuse, the two sides A and B forming the right angle
are called the legs.
Pythagorean Theorem
Given a right triangle with labeling as shown,
then A2 + B2 = C2 as shown
Radicals and Pythagorean Theorem
hypotenuse
legs
A
B
C
39. Radicals and Pythagorean Theorem
There are two types of problems that use the Pythagorean
Theorem to find the sides of the right triangles
40. Radicals and Pythagorean Theorem
There are two types of problems that use the Pythagorean
Theorem to find the sides of the right triangles-finding the
hypotenuse versus finding the legs.
41. Example C. Find the missing side of the following right
triangles. Find the exact answer and the approximate answer.
Draw.
a. a = 5, b = 12, c = ?
Radicals and Pythagorean Theorem
There are two types of problems that use the Pythagorean
Theorem to find the sides of the right triangles-finding the
hypotenuse versus finding the legs.
42. Example C. Find the missing side of the following right
triangles. Find the exact answer and the approximate answer.
Draw.
a. a = 5, b = 12, c = ?
Radicals and Pythagorean Theorem
There are two types of problems that use the Pythagorean
Theorem to find the sides of the right triangles-finding the
hypotenuse versus finding the legs.
43. Example C. Find the missing side of the following right
triangles. Find the exact answer and the approximate answer.
Draw.
a. a = 5, b = 12, c = ?
Since it is a right triangle,
122 + 52 = c2
Radicals and Pythagorean Theorem
There are two types of problems that use the Pythagorean
Theorem to find the sides of the right triangles-finding the
hypotenuse versus finding the legs.
44. Example C. Find the missing side of the following right
triangles. Find the exact answer and the approximate answer.
Draw.
a. a = 5, b = 12, c = ?
Since it is a right triangle,
122 + 52 = c2
144 + 25 = c2
Radicals and Pythagorean Theorem
There are two types of problems that use the Pythagorean
Theorem to find the sides of the right triangles-finding the
hypotenuse versus finding the legs.
45. Example C. Find the missing side of the following right
triangles. Find the exact answer and the approximate answer.
Draw.
a. a = 5, b = 12, c = ?
Since it is a right triangle,
122 + 52 = c2
144 + 25 = c2
169 = c2
Radicals and Pythagorean Theorem
There are two types of problems that use the Pythagorean
Theorem to find the sides of the right triangles-finding the
hypotenuse versus finding the legs.
46. Example C. Find the missing side of the following right
triangles. Find the exact answer and the approximate answer.
Draw.
a. a = 5, b = 12, c = ?
Since it is a right triangle,
122 + 52 = c2
144 + 25 = c2
169 = c2
So c = ±169 = ±13
Radicals and Pythagorean Theorem
There are two types of problems that use the Pythagorean
Theorem to find the sides of the right triangles-finding the
hypotenuse versus finding the legs.
47. Example C. Find the missing side of the following right
triangles. Find the exact answer and the approximate answer.
Draw.
a. a = 5, b = 12, c = ?
Since it is a right triangle,
122 + 52 = c2
144 + 25 = c2
169 = c2
So c = ±169 = ±13
Since length can’t be
negative, therefore c = 13.
Radicals and Pythagorean Theorem
There are two types of problems that use the Pythagorean
Theorem to find the sides of the right triangles-finding the
hypotenuse versus finding the legs.
48. b. a = 5, c = 12, b = ?
Radicals and Pythagorean Theorem
49. b. a = 5, c = 12, b = ?
Radicals and Pythagorean Theorem
50. b. a = 5, c = 12, b = ?
Since it is a right triangle,
b2 + 52 = 122
Radicals and Pythagorean Theorem
51. b. a = 5, c = 12, b = ?
Since it is a right triangle,
b2 + 52 = 122
b2 + 25 = 144
Radicals and Pythagorean Theorem
52. b. a = 5, c = 12, b = ?
Since it is a right triangle,
b2 + 52 = 122
b2 + 25 = 144
b2 = 144 – 25
Radicals and Pythagorean Theorem
53. b. a = 5, c = 12, b = ?
Since it is a right triangle,
b2 + 52 = 122
b2 + 25 = 144
b2 = 144 – 25
So b = ±119 ±10.9.
Radicals and Pythagorean Theorem
54. b. a = 5, c = 12, b = ?
Since it is a right triangle,
b2 + 52 = 122
b2 + 25 = 144
b2 = 144 – 25
So b = ±119 ±10.9.
But length can’t be negative,
therefore b = 119 10.9
Radicals and Pythagorean Theorem
55. b. a = 5, c = 12, b = ?
Since it is a right triangle,
b2 + 52 = 122
b2 + 25 = 144
b2 = 144 – 25
So b = ±119 ±10.9.
But length can’t be negative,
therefore b = 119 10.9
Radicals and Pythagorean Theorem
The Distance Formula
56. b. a = 5, c = 12, b = ?
Since it is a right triangle,
b2 + 52 = 122
b2 + 25 = 144
b2 = 144 – 25
So b = ±119 ±10.9.
But length can’t be negative,
therefore b = 119 10.9
Radicals and Pythagorean Theorem
The Distance Formula
57. b. a = 5, c = 12, b = ?
Since it is a right triangle,
b2 + 52 = 122
b2 + 25 = 144
b2 = 144 – 25
So b = ±119 ±10.9.
But length can’t be negative,
therefore b = 119 10.9
Radicals and Pythagorean Theorem
Let (x1, y1) and (x2, y2) be two
points, D = distance between them,
The Distance Formula
(x1, y1)
(x2, y2)
D
58. b. a = 5, c = 12, b = ?
Since it is a right triangle,
b2 + 52 = 122
b2 + 25 = 144
b2 = 144 – 25
So b = ±119 ±10.9.
But length can’t be negative,
therefore b = 119 10.9
Radicals and Pythagorean Theorem
Let (x1, y1) and (x2, y2) be two
points, D = distance between them,
then D2 = Δx2 + Δy2
The Distance Formula
(x1, y1)
(x2, y2)
Δy
Δx
D
59. b. a = 5, c = 12, b = ?
Since it is a right triangle,
b2 + 52 = 122
b2 + 25 = 144
b2 = 144 – 25
So b = ±119 ±10.9.
But length can’t be negative,
therefore b = 119 10.9
Radicals and Pythagorean Theorem
Let (x1, y1) and (x2, y2) be two
points, D = distance between them,
then D2 = Δx2 + Δy2 where
The Distance Formula
(x1, y1)
(x2, y2)
Δx = x2 – x1
Δy
Δx = x2 – x1
D
60. b. a = 5, c = 12, b = ?
Since it is a right triangle,
b2 + 52 = 122
b2 + 25 = 144
b2 = 144 – 25
So b = ±119 ±10.9.
But length can’t be negative,
therefore b = 119 10.9
Radicals and Pythagorean Theorem
Let (x1, y1) and (x2, y2) be two
points, D = distance between them,
then D2 = Δx2 + Δy2 where
The Distance Formula
(x1, y1)
(x2, y2)
Δx = x2 – x1 Δy = y2 – y1and
Δy = y2 – y1
Δx = x2 – x1
D
by the Pythagorean Theorem.
61. b. a = 5, c = 12, b = ?
Since it is a right triangle,
b2 + 52 = 122
b2 + 25 = 144
b2 = 144 – 25
So b = ±119 ±10.9.
But length can’t be negative,
therefore b = 119 10.9
Radicals and Pythagorean Theorem
Let (x1, y1) and (x2, y2) be two
points, D = distance between them,
then D2 = Δx2 + Δy2 where
The Distance Formula
(x1, y1)
(x2, y2)
Δx = x2 – x1 Δy = y2 – y1and
Δy = y2 – y1
Δx = x2 – x1by the Pythagorean Theorem.
Hence we’ve the Distant Formula:
D = √ Δx2 + Δy2
D
62. b. a = 5, c = 12, b = ?
Since it is a right triangle,
b2 + 52 = 122
b2 + 25 = 144
b2 = 144 – 25
So b = ±119 ±10.9.
But length can’t be negative,
therefore b = 119 10.9
Radicals and Pythagorean Theorem
Let (x1, y1) and (x2, y2) be two
points, D = distance between them,
then D2 = Δx2 + Δy2 where
The Distance Formula
(x1, y1)
(x2, y2)
Δx = x2 – x1 Δy = y2 – y1and
Δy = y2 – y1
Δx = x2 – x1by the Pythagorean Theorem.
Hence we’ve the Distant Formula:
D = √ Δx2 + Δy2 = √ (x2 – x1)2 + (y2 – y1)2
D
63. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
64. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
65. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
66. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
67. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
68. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
69. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
Higher Root
70. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
Higher Root
If r3 = x, then we say a is the cube root of x.
71. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
Higher Root
If r3 = x, then we say a is the cube root of x. We write this as
x = r.3
72. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
Higher Root
If r3 = x, then we say a is the cube root of x. We write this as
x = r. In general, if r k = x, then we say r is the k’th root of x,3
73. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
Higher Root
If r3 = x, then we say a is the cube root of x. We write this as
x = r. In general, if r k = x, then we say r is the k’th root of x,
and we write it as a = x.
3
k
74. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
Higher Root
If r3 = x, then we say a is the cube root of x. We write this as
x = r. In general, if r k = x, then we say r is the k’th root of x,
and we write it as a = x. In the cases of even roots,
i.e. k = 2, 4, 6, … we must have x > 0 and that x = a > 0.
3
k
k
75. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
3
k
k
Example E.
a. 8 =
3
Higher Root
If r3 = x, then we say a is the cube root of x. We write this as
x = r. In general, if r k = x, then we say r is the k’th root of x,
and we write it as a = x. In the cases of even roots,
i.e. k = 2, 4, 6, … we must have x > 0 and that x = a > 0.
76. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
3
k
k
Example E.
a. 8 = 2
3
Higher Root
If r3 = x, then we say a is the cube root of x. We write this as
x = r. In general, if r k = x, then we say r is the k’th root of x,
and we write it as a = x. In the cases of even roots,
i.e. k = 2, 4, 6, … we must have x > 0 and that x = a > 0.
77. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
3
k
k
Example E.
a. 8 = 2 b. –1 =
3 3
Higher Root
If r3 = x, then we say a is the cube root of x. We write this as
x = r. In general, if r k = x, then we say r is the k’th root of x,
and we write it as a = x. In the cases of even roots,
i.e. k = 2, 4, 6, … we must have x > 0 and that x = a > 0.
78. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
3
k
k
Example E.
a. 8 = 2 b. –1 = –1
3 3
Higher Root
If r3 = x, then we say a is the cube root of x. We write this as
x = r. In general, if r k = x, then we say r is the k’th root of x,
and we write it as a = x. In the cases of even roots,
i.e. k = 2, 4, 6, … we must have x > 0 and that x = a > 0.
79. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
3
k
k
Example E.
a. 8 = 2 b. –1 = –1 c.–27 =
3 3 3
Higher Root
If r3 = x, then we say a is the cube root of x. We write this as
x = r. In general, if r k = x, then we say r is the k’th root of x,
and we write it as a = x. In the cases of even roots,
i.e. k = 2, 4, 6, … we must have x > 0 and that x = a > 0.
80. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
3
k
k
Example E.
a. 8 = 2 b. –1 = –1 c.–27 = –3
3 3 3
Higher Root
If r3 = x, then we say a is the cube root of x. We write this as
x = r. In general, if r k = x, then we say r is the k’th root of x,
and we write it as a = x. In the cases of even roots,
i.e. k = 2, 4, 6, … we must have x > 0 and that x = a > 0.
81. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
3
k
k
Example E.
a. 8 = 2 b. –1 = –1 c.–27 = –3
d. 16 =
3 3 3
Higher Root
If r3 = x, then we say a is the cube root of x. We write this as
x = r. In general, if r k = x, then we say r is the k’th root of x,
and we write it as a = x. In the cases of even roots,
i.e. k = 2, 4, 6, … we must have x > 0 and that x = a > 0.
4
82. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
3
k
k
Example E.
a. 8 = 2 b. –1 = –1 c.–27 = –3
d. 16 = 2
3 3 3
Higher Root
If r3 = x, then we say a is the cube root of x. We write this as
x = r. In general, if r k = x, then we say r is the k’th root of x,
and we write it as a = x. In the cases of even roots,
i.e. k = 2, 4, 6, … we must have x > 0 and that x = a > 0.
4
83. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
3
k
k
Example E.
a. 8 = 2 b. –1 = –1 c.–27 = –3
d. 16 = 2 e. –16 =
3 3 3
Higher Root
If r3 = x, then we say a is the cube root of x. We write this as
x = r. In general, if r k = x, then we say r is the k’th root of x,
and we write it as a = x. In the cases of even roots,
i.e. k = 2, 4, 6, … we must have x > 0 and that x = a > 0.
4 4
84. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
3
k
k
Example E.
a. 8 = 2 b. –1 = –1 c.–27 = –3
d. 16 = 2 e. –16 = not real
3 3 3
Higher Root
If r3 = x, then we say a is the cube root of x. We write this as
x = r. In general, if r k = x, then we say r is the k’th root of x,
and we write it as a = x. In the cases of even roots,
i.e. k = 2, 4, 6, … we must have x > 0 and that x = a > 0.
4 4
85. Example D. Find the distance between (–1, 3) and (2, –4).
(-1, 3)
– ( 2, -4)
D = (–3)2 + 72 = 58 7.62
D
7
–3
Radicals and Pythagorean Theorem
–3, 7
Δx Δy
3
k
k
Example E.
a. 8 = 2 b. –1 = –1 c.–27 = –3
d. 16 = 2 e. –16 = not real f. 10 ≈ 2.15..
3 3 3
Higher Root
If r3 = x, then we say a is the cube root of x. We write this as
x = r. In general, if r k = x, then we say r is the k’th root of x,
and we write it as a = x. In the cases of even roots,
i.e. k = 2, 4, 6, … we must have x > 0 and that x = a > 0.
4 4 3
87. The number 2 is the length of the
hypotenuse of the right triangle as shown.
Radicals and Pythagorean Theorem
Rational and Irrational Numbers
2 = 12 + 12
1
1
88. The number 2 is the length of the
hypotenuse of the right triangle as shown.
Radicals and Pythagorean Theorem
Rational and Irrational Numbers
2 = 12 + 12
1
1
It can be shown that
2 is not a fraction like 3/5, ½ etc..
89. The number 2 is the length of the
hypotenuse of the right triangle as shown.
Radicals and Pythagorean Theorem
Rational and Irrational Numbers
2 = 12 + 12
1
1
It can be shown that
2 is not a fraction like 3/5, ½ etc.. i.e.
2 ≠ P/Q of any two integers P and Q.
90. The number 2 is the length of the
hypotenuse of the right triangle as shown.
Radicals and Pythagorean Theorem
Rational and Irrational Numbers
2 = 12 + 12
1
1
It can be shown that
2 is not a fraction like 3/5, ½ etc.. i.e.
2 ≠ P/Q of any two integers P and Q.
Therefore we said that2 is an irrational (non–ratio) number.
91. The number 2 is the length of the
hypotenuse of the right triangle as shown.
Radicals and Pythagorean Theorem
Rational and Irrational Numbers
2 = 12 + 12
1
1
It can be shown that
2 is not a fraction like 3/5, ½ etc.. i.e.
2 ≠ P/Q of any two integers P and Q.
Therefore we said that2 is an irrational (non–ratio) number.
Most real numbers are irrational.
92. The number 2 is the length of the
hypotenuse of the right triangle as shown.
Radicals and Pythagorean Theorem
Rational and Irrational Numbers
2 = 12 + 12
1
1
It can be shown that
2 is not a fraction like 3/5, ½ etc.. i.e.
2 ≠ P/Q of any two integers P and Q.
Therefore we said that2 is an irrational (non–ratio) number.
Most real numbers are irrational.
The real line is populated sparsely by fractional numbers.
The Pythagorean school of the ancient Greeks had believed
that all the measurable quantities in the universe are fractional
quantities. The “discovery” of these extra irrational numbers
caused a profound intellectual crisis.
93. The number 2 is the length of the
hypotenuse of the right triangle as shown.
Radicals and Pythagorean Theorem
Rational and Irrational Numbers
2 = 12 + 12
1
1
It can be shown that
2 is not a fraction like 3/5, ½ etc.. i.e.
2 ≠ P/Q of any two integers P and Q.
Therefore we said that2 is an irrational (non–ratio) number.
Most real numbers are irrational.
The real line is populated sparsely by fractional numbers.
The Pythagorean school of the ancient Greeks had believed
that all the measurable quantities in the universe are fractional
quantities. The “discovery” of these extra irrational numbers
caused a profound intellectual crisis.
It wasn’t until the last two centuries that mathematicians
clarified the strange questions “How many and what kind of
numbers are there?”
94. Radicals and Pythagorean Theorem
Exercise A. Solve for x. Give both the exact and approximate
answers. If the answer does not exist, state so.
1. x2 = 1 2. x2 – 5 = 4 3. x2 + 5 = 4
4. 2x2 = 31 5. 4x2 – 5 = 4 6. 5 = 3x2 + 1
7. 4x2 = 1 8. x2 – 32 = 42 9. x2 + 62 = 102
10. 2x2 + 7 = 11 11. 2x2 – 5 = 6 12. 4 = 3x2 + 5
x
3
4
Exercise B. Solve for x. Give both the exact and approximate
answers. If the answer does not exist, state so.
13. 4
3
x14. x
12
515.
x
1
116. 2
1
x17. 3 2
3
x18.
95. Radicals and Pythagorean Theorem
x
4
19.
x
x20.
3 /3
21.
43 5 2
6 /3
Exercise C. Given the following information, find the rise and
run from A to B i.e. Δx and Δy. Find the distance from A to B.
A
22.
B
A
23.
B
24. A = (2, –3) , B = (1, 5) 25. A = (1, 5) , B = (2, –3)
26. A = (–2 , –5) , B = (3, –2) 27. A = (–4 , –1) , B = (2, –3)
28. Why is the distance from A to B the same as from B to A?