6ADV-95-STATCOUNT.ppt

WARMUPS

NONE; SIT DOWN QUIETLY. TIME TO PASS BACK YOUR TESTS

WARMUPS

[(9-5) x 6] + 42 x 3 = IN 1996 780,000,000 CDs WERE

SHIPPED IN HE U.S.. WHAT IS ANOTHER WAY OF EXPESSING THIS LARGE NUMBER?

WHAT IS THE VALUE OF 34 - 25

COUNTING

CHAPTER 10-5

COUNTING

USED TO DETERMINE POSSIBLE STATISTICAL OUTCOMES

PROCESS USED IN GENETIC ENGINEERING

USED IN GROWING PLANTS TELLS US HOW MANY WAYS THINGS

CAN BE COMBINED

TWO METHODS OF ìCOUNTINGî

TREE DIAGRAMS FUNDAMENTAL

COUNTING PRINCIPLE

TREE DIAGRAM

A TREE DIAGRAM IS A LINE SCHEMATIC THAT LINKS ALL POSSIBLE OUTCOMES

X AX

A Y AY

Z AZ

X BX

B Y BY

Z BZ

TREE DIAGRAM

IF MEL HAS TWO CARS WITH THE OPTION OF THREE COLORS. WHAT IS THE POSSIBLE CAR COLOR COMBINATIONS ARE THERE

TREE DIAGRAM


RED HONDA/RED

HONDA

TREE DIAGRAM


RED HONDA/RED

HONDA BLUE HONDA/BLUE

TREE DIAGRAM


RED HONDA/RED


GREEN HONDA/GREEN

TREE DIAGRAM


RED HONDA/RED


GREEN HONDA/GREEN

RED FORD/RED

FORD

TREE DIAGRAM


RED HONDA/RED


GREEN HONDA/GREEN

RED FORD/RED

FORD BLUE FORD/BLUE

TREE DIAGRAM

IF MEL HAS TWO CARS WITH THE OPTION OF THREE COLORS. WHAT IS THE POSSIBLE CAR COLOR COMBINATIONS ARE THERE?

RED HONDA/RED


GREEN HONDA/GREEN

RED FORD/RED

FORD BLUE FORD/BLUE

GREEN FORD/GREEM

TREE DIAGRAM IF MEL HAS TWO

CARS WITH THE OPTION OF THREE COLORS. WHAT IS THE POSSIBLE CAR COLOR COMBINATIONS ARE THERE?

THERE ARE 6 POSSIBLE OUTCOMES

RED HONDA/RED


GREEN HONDA/GREEN

RED FORD/RED

FORD BLUE FORD/BLUE

GREEN FORD/GREEM

TWO METHODS OF ìCOUNTINGî

TREE DIAGRAMS FUNDAMENTAL

COUNTING PRINCIPLE

FUNDAMENTAL COUNTING PRINCIPLE

IF EVENT M CAN OCCUR IN m WAYS, IS FOLLOWED BY EVENT N THAT CAN OCCUR IN n WAYS, THEN THE EVENT M FOLLOWED BY EVENT N CAN OCCUR IN m TIMES n WAYS.


SUPPOSE I HAVE 6 DIFFERENT CAR MODELS AND 9 DIFFERENT PAINT SCHEMES. HOW MAY DIFFERENT CAR/PAINT COMBINATIONS CAN I HAVE?


SUPPOSE I HAVE 6 DIFFERENT CAR MODELS AND 9 DIFFERENT PAINT SCHEMES. HOW MAY DIFFERENT CAR/PAINT COMBINATIONS CAN I HAVE?

9 6 54x

YOU DO THE MATH

YOU DO THE MATH

A DICE IS ROLLED TWICE. HOW MANY POSSIBLE OUTCOMES ARE THERE?

YOU DO THE MATH

1 11

2 12

1 3 13

4 14

5 15

6 16

YOU DO THE MATH

1 11

2 12

1 3 13

4 14

5 15

6 16

6 POSSIBILITIES

YOU DO THE MATH

1 21

2 22

2 3 23

4 24

5 25

6 26

YOU DO THE MATH

1 21

2 22

2 3 23

4 24

5 25

6 26

6 POSSIBILITIES

YOU DO THE MATH

1 31

2 32

3 3 33

4 34

5 35

6 36

YOU DO THE MATH

1 31

2 32

3 3 33

4 34

5 35

6 36

6 POSSIBILITIES

YOU DO THE MATH

1 41

2 42

4 3 43

4 44

5 45

6 46

YOU DO THE MATH

1 41

2 42

4 3 43

4 44

5 45

6 46

6 POSSIBILITIES

YOU DO THE MATH

1 51

2 52

5 3 53

4 54

5 55

6 56

YOU DO THE MATH

1 51

2 52

5 3 53

4 54

5 55

6 56

6 POSSIBILITIES

YOU DO THE MATH

1 61

2 62

6 3 63

4 64

5 65

6 66

YOU DO THE MATH

1 61

2 62

6 3 63

4 64

5 65

6 66

6 POSSIBILITIES

ALL TOGETHER

FOR 1’S - 6 POSSIBILITIES FOR 2’S - 6 POSSIBLITIES FOR 3’S - 6 POSSIBILITIES FOR 4’S - 6 POSSIBILITIES FOR 5’S - 6 POSSIBILITIES FOR 6’S - 6 POSSIBILITIES

ALL TOGETHER

FOR 1’S - 6 POSSIBILITIES FOR 2’S - 6 POSSIBLITIES FOR 3’S - 6 POSSIBILITIES FOR 4’S - 6 POSSIBILITIES FOR 5’S - 6 POSSIBILITIES FOR 6’S - 6 POSSIBILITIES

TOTAL OF

36 POSSIBILITIES

IN ALL

36 POSSIBILITIES

11 12 13 14 15 16

21 22 23 24 25 26

31 32 33 34 35 36

41 42 43 44 45 46

51 52 53 54 55 56

61 62 63 64 65 66

PROBABILITY

PROBABILTIY IS THE CHANCE AN EVENT WILL HAPPEN

PROBABILITY = NUMBER OF FAVORABLE OUTCOMES DIVIDED BY POSSIBLE OUTCOMES

YOU DO THE MATH

A DICE IS ROLLED TWICE. WE FOUND OUT THAT THERE WERE 36 POSSIBLE OUTCOMES.

WHAT IS THE PROBABILITY OF ROLLING TWO 1’S?

PROBABILITY PROBABILITY = FAVORABLE OUTCOMES POSSIBLE OUTCOMES

PROBABILITY = 1 36

1/36 OR 1:36 OR .027

DO IN CLASS: PAGE 652-653, EXERCISES DO 1 TO 20.

6ADV-95-STATCOUNT.ppt

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