Pythagoras theorem ppt
90,367 views
52 slides
Jun 07, 2015
Slide 1 of 52
1
2
3
4
5
6
7
8
9
10
11
12
13
14
15
16
17
18
19
20
21
22
23
24
25
26
27
28
29
30
31
32
33
34
35
36
37
38
39
40
41
42
43
44
45
46
47
48
49
50
51
52
About This Presentation
The best presentation u have ever seen of Mathematics.
Slide Content
a
b
c
222
cba =+
b
c
222
cba =+
Pythagorean Theorem Essential
Questions
How is the Pythagorean Theorem used to
identify side lengths?
When can the Pythagorean Theorem be
used to solve real life patterns?
Questions
How is the Pythagorean Theorem used to
identify side lengths?
When can the Pythagorean Theorem be
used to solve real life patterns?
This is a right triangle:
We call it a right triangle
because it contains a
right angle.
because it contains a
right angle.
The measure of a right
angle is 90
o
90
o
angle is 90
o
90
o
The little square
90
o
in the
angle tells you it is a
right angle.
90
o
in the
angle tells you it is a
right angle.
About 2,500 years ago, a
Greek mathematician named
Pythagorus discovered a
special relationship between
the sides of right triangles.
Greek mathematician named
Pythagorus discovered a
special relationship between
the sides of right triangles.
Pythagorus realized that if
you have a right triangle,
3
4
5
you have a right triangle,
3
4
5
and you square the lengths
of the two sides that make
up the right angle,
2
4
2
3
3
4
5
of the two sides that make
up the right angle,
2
4
2
3
3
4
5
and add them together,
3
4
5
2
4
2
3
22
43+
3
4
5
2
4
2
3
22
43+
22
43+
you get the same number
you would get by squaring
the other side.
222
543 =+
3
4
5
43+
you get the same number
you would get by squaring
the other side.
222
543 =+
3
4
5
Is that correct?
222
543 =+
?
25169 =+
?
222
543 =+
?
25169 =+
?
It is. And it is true for any
right triangle.
8
6
10222
1086 =+
1006436 =+
right triangle.
8
6
10222
1086 =+
1006436 =+
The two sides which
come together in a right
angle are called
come together in a right
angle are called
The two sides which
come together in a right
angle are called
come together in a right
angle are called
The two sides which
come together in a right
angle are called
come together in a right
angle are called
The lengths of the legs are
usually called a and b.
a
b
usually called a and b.
a
b
The side across from the
right angle
a
b
is called the
right angle
a
b
is called the
And the length of the
hypotenuse
is usually labeled c.
a
b
c
hypotenuse
is usually labeled c.
a
b
c
The relationship Pythagorus
discovered is now called
The Pythagorean Theorem:
a
b
c
discovered is now called
The Pythagorean Theorem:
a
b
c
The Pythagorean Theorem
says, given the right triangle
with legs a and b and
hypotenuse c,
a
b
c
says, given the right triangle
with legs a and b and
hypotenuse c,
a
b
c
then
a
b
c
.
222
cba =+
a
b
c
.
222
cba =+
You can use The Pythagorean
Theorem to solve many kinds
of problems.
Suppose you drive directly
west for 48 miles,
48
Theorem to solve many kinds
of problems.
Suppose you drive directly
west for 48 miles,
48
Then turn south and drive for
36 miles.
48
36
36 miles.
48
36
How far are you from where
you started?
48
36
?
you started?
48
36
?
48
2
Using The Pythagorean
Theorem,
48
36
c
36
2
+ =c
2
2
Using The Pythagorean
Theorem,
48
36
c
36
2
+ =c
2
Why? Can you see that we have a
right triangle?
48
36
c
48
2
36
2
+ =c
2
right triangle?
48
36
c
48
2
36
2
+ =c
2
Which side is the hypotenuse?
Which sides are the legs?
48
36
c
48
2
36
2
+ =c
2
Which sides are the legs?
48
36
c
48
2
36
2
+ =c
2
=+
22
3648
Then all we need to do is
calculate:
=+12962304
=3600
2
c
22
3648
Then all we need to do is
calculate:
=+12962304
=3600
2
c
And you end up 60 miles from
where you started.
48
36
60
So, since c
2
is 3600, c is 60.So, since c
2
is 3600, c is
where you started.
48
36
60
So, since c
2
is 3600, c is 60.So, since c
2
is 3600, c is
Find the length of a diagonal
of the rectangle:
15"
8"
?
of the rectangle:
15"
8"
?
Find the length of a diagonal
of the rectangle:
15"
8"
?
b = 8
a = 15
c
of the rectangle:
15"
8"
?
b = 8
a = 15
c
222
cba =+
222
815 c=+
2
64225 c=+289
2
=c17=c
b = 8
a = 15
c
cba =+
222
815 c=+
2
64225 c=+289
2
=c17=c
b = 8
a = 15
c
Find the length of a diagonal
of the rectangle:
15"
8"
17
of the rectangle:
15"
8"
17
Practice using
The Pythagorean Theorem
to solve these right triangles:
The Pythagorean Theorem
to solve these right triangles:
5
12
c= 13
12
c= 13
10
b
26
b
26
10
b
26
= 24
(a)
(c)
222
cba =+
222
2610 =+b
676100
2
=+b
100676
2
-=b
576
2
=b
24=b
b
26
= 24
(a)
(c)
222
cba =+
222
2610 =+b
676100
2
=+b
100676
2
-=b
576
2
=b
24=b
Check It Out! Example 2
A rectangular field has a length of 100 yards and a
width of 33 yards. About how far is it from one corner
of the field to the opposite corner of the field? Round
your answer to the nearest tenth.
A rectangular field has a length of 100 yards and a
width of 33 yards. About how far is it from one corner
of the field to the opposite corner of the field? Round
your answer to the nearest tenth.
Check It Out! Example 2 Continued
11 Understand the Problem
Rewrite the question as a statement.
• Find the distance from one corner of the field to the
opposite corner of the field.
• The segment between the two corners is
the hypotenuse.
• The sides of the fields are legs, and they are 33 yards long
and 100 yards long.
List the important information:
• Drawing a segment from one corner of the field to the
opposite corner of the field divides the field into two
right triangles.
11 Understand the Problem
Rewrite the question as a statement.
• Find the distance from one corner of the field to the
opposite corner of the field.
• The segment between the two corners is
the hypotenuse.
• The sides of the fields are legs, and they are 33 yards long
and 100 yards long.
List the important information:
• Drawing a segment from one corner of the field to the
opposite corner of the field divides the field into two
right triangles.
Check It Out! Example 2 Continued
22Make a Plan
You can use the Pythagorean Theorem to
write an equation.
22Make a Plan
You can use the Pythagorean Theorem to
write an equation.
Check It Out! Example 2 Continued
Solve33
a
2
+ b
2
= c
2
33
2
+ 100
2
= c
2
1089 + 10,000 = c
2
11,089 = c
2
105.304 » c
The distance from one corner of the field to the
opposite corner is about 105.3 yards.
Use the Pythagorean Theorem.
Substitute for the known variables.
Evaluate the powers.
Add.
Take the square roots of both sides.
105.3 » cRound.
Solve33
a
2
+ b
2
= c
2
33
2
+ 100
2
= c
2
1089 + 10,000 = c
2
11,089 = c
2
105.304 » c
The distance from one corner of the field to the
opposite corner is about 105.3 yards.
Use the Pythagorean Theorem.
Substitute for the known variables.
Evaluate the powers.
Add.
Take the square roots of both sides.
105.3 » cRound.
The Pythagorean Theorem
“For any right triangle,
the sum of the areas of
the two small squares is
equal to the area of the
larger.”
aa
22
+ b + b
22
= c = c
22
“For any right triangle,
the sum of the areas of
the two small squares is
equal to the area of the
larger.”
aa
22
+ b + b
22
= c = c
22
Proof
a
a
a
2
b
b
c
c
b
2
c
2
Let’s look at it
this way…
a
a
2
b
b
c
c
b
2
c
2
Let’s look at it
this way…
Baseball Problem
A baseball “diamond” is really a square.
You can use the Pythagorean theorem to find
distances around a baseball diamond.
A baseball “diamond” is really a square.
You can use the Pythagorean theorem to find
distances around a baseball diamond.
Baseball Problem
The distance between
consecutive bases is 90
feet. How far does a
catcher have to throw
the ball from home
plate to second base?
The distance between
consecutive bases is 90
feet. How far does a
catcher have to throw
the ball from home
plate to second base?
Baseball Problem
To use the Pythagorean
theorem to solve for x,
find the right angle.
Which side is the
hypotenuse?
Which sides are the legs?
Now use: aa
22
+ b + b
22
= c = c
22
To use the Pythagorean
theorem to solve for x,
find the right angle.
Which side is the
hypotenuse?
Which sides are the legs?
Now use: aa
22
+ b + b
22
= c = c
22
Baseball Problem
Solution
•The hypotenuse is the
distance from home to
second, or side x in the
picture.
•The legs are from home to
first and from first to
second.
•Solution:
x
2
=
90
2
+ 90
2
= 16,200
x = 127.28 ft
Solution
•The hypotenuse is the
distance from home to
second, or side x in the
picture.
•The legs are from home to
first and from first to
second.
•Solution:
x
2
=
90
2
+ 90
2
= 16,200
x = 127.28 ft
Ladder Problem
A ladder leans against a
second-story window of a
house.
If the ladder is 25 meters
long,
and the base of the ladder
is 7 meters from the
house,
how high is the window?
A ladder leans against a
second-story window of a
house.
If the ladder is 25 meters
long,
and the base of the ladder
is 7 meters from the
house,
how high is the window?
Ladder Problem
Solution
•First draw a diagram that
shows the sides of the
right triangle.
•Label the sides:
–Ladder is 25 m
–Distance from house is 7
m
•Use a
2
+ b
2
= c
2
to solve for
the missing side.
Distance from house: 7 meters
Solution
•First draw a diagram that
shows the sides of the
right triangle.
•Label the sides:
–Ladder is 25 m
–Distance from house is 7
m
•Use a
2
+ b
2
= c
2
to solve for
the missing side.
Distance from house: 7 meters
Ladder Problem
Solution
7
2
+ b
2
= 25
2
49 + b
2
= 625
b
2
= 576
b = 24 m
How did you do?
A = 7 m
Solution
7
2
+ b
2
= 25
2
49 + b
2
= 625
b
2
= 576
b = 24 m
How did you do?
A = 7 m
Tags
Categories
GeneralDownload
Download Slideshow Get the original presentation fileQuick Actions
Statistics
- Views 90,367
- Slides 52
- Favorites 43
- Age 3829 days
Related Slideshows
22
Pray For The Peace Of Jerusalem and You Will Prosper
RodolfoMoralesMarcuc
30 views
26
Don_t_Waste_Your_Life_God.....powerpoint
chalobrido8
32 views
31
VILLASUR_FACTORS_TO_CONSIDER_IN_PLATING_SALAD_10-13.pdf
JaiJai148317
30 views
14
Fertility awareness methods for women in the society
Isaiah47
28 views
35
Chapter 5 Arithmetic Functions Computer Organisation and Architecture
RitikSharma297999
26 views
5
syakira bhasa inggris (1) (1).pptx.......
ourcommunity56
28 views