Download Running a Simulation - 7th grade at cca dana!

Name: ______________________________
Date: March 16, 2017
7th Grade Math:
Unit: Statistics
and Probability
Packet 103:
Simulations
Homeroom:
Objectives:
 Scholars will be able to learn how to perform simulations to estimate
probabilities.
 Scholars will be able to use various devices to perform simulations (e.g.,
coin, number cubes, cards).
 Scholars will be able to compare estimated probabilities from simulations
to theoretical probabilities.
Agenda:
1.
2.
3.
4.
5.
Review Do Now
Simulations
Setting up Simulations
Guided Practice
Running a Simulation
Do Now:
6. Basketball Player
7. Independent Practice
8. Exit Ticket
9. Homework Overview
Homework 103: Simulations
1. You roll a single die numbered from 1 to 6 twice. What is the probability of
rolling a 6 the first time and an odd number the second?
2. A jar contains 12 caramels, 7 mints and 16 dark chocolates. What is the
probability of selecting a dark chocolate and then a caramel without
replacing the first piece of candy?
1
Simulations
In previous lessons, you estimated probabilities of events by collecting data
empirically or by establishing a theoretical probability model. There are real
problems for which those methods may be difficult or not practical to use. A
simulation is a procedure that will allow you to answer questions about real
problems about real problems by running experiments that closely resemble the
real situation.
It is often important to know the probabilities of real-life events that may not
have known theoretical probabilities. Scientists, engineers, and mathematicians
design simulations to answer questions that involve topics such as disease, water
flow, climate change, or functions of an engine. Results from the simulations are
used to estimate probabilities that help researchers understand problems and
provide possible solutions to these problems.
Setting up Simulations
How likely is it that a family with three children has all boys or all girls?
Let’s assume that a child is equally likely to be a boy or girl. Instead of observing
the results of actual births, a toss of a fair coin could be used to simulate a birth.
If the toss results in heads (H), then we could say a boy was born; if the toss
results in tails (T), then we could say a girl was born.
1. How could a number cube be used to simulate getting a boy or girl birth?
2. How could a deck of cards be used to simulate getting a boy or girl birth?
2
Guided Practice
There are five steps in completing a simulation. Let’s go through the five steps of
a simulation by using the children example!
1. Define the outcome of the REAL experiment:
2. Chose a simulation device:
a. Suppose that a family has three children. How could you use a coin to
simulate the gender of a child?
b. How could you use a desk of card to simulate the gender of three
children?
3
3. Define what is meant by a trial. Link it to the real experiment:
4. Define what is meant by a success in the trial. Link it to the real
experiment:
5. Perform the trials! More is better in this case!
a. Suppose 100 trials are performed, and in those 100 trials, 28 resulted in
either HHH or TTT. What is the estimated probability that a family of 3
children has either three boys or three girls?
b. What is the estimated probability that a family of three would have some
combination other than three boys or three girls?
4
Running a Simulation
1. Find an estimate of the probability that a family with three children will
have exactly one girl using the following outcomes of 50 trials of tossing a
fair coin three times per trial. Using H to represent a boy birth and T to
represent a girl birth.
HHT
HHT
THT
THH
HTH
HTH
TTT
HHH
HHT
HTH
HHH
HHT
THH
TTT
THT
TTH
TTH
HTT
TTH
TTH
THT
HHH
HTH
HTT
TTT
THT
HTH
TTT
THH
HHT
HTT
THH
HTT
HTT
HHT
HHH
TTT
HHH
HTH
THT
TTH
THT
TTH
TTT
TTT
HHH
THT
THT
HHH
HTT
2. Perform a simulation of 50 trials by rolling a fair number cube in order to
find an estimate of the probability that a family with three children will
have exactly one girl.
a. Specify what outcome of one roll of a fair number cube will
represent a boy, and what outcome will represent a girl.
b. Simulate 50 trials, keeping in mind that one trial requires three rolls of
the number cube. List the results of your 50 trials.
5
c. Calculate the estimated probability.
3. Calculate the theoretical probability that a family with three children will
have exactly one girl.
a. Use a tree diagram to list the possible outcomes for a family with
three children.
First Child
Second Child
Third Child
Outcome
b. Assume having a boy and having a girl are equally likely. Calculate
the theoretical probability that a family with three children will have
all boys or all girls.
c. Compare it to the estimated probabilities found in parts 1 and 2
above.
6
Basketball Player
Suppose that, on average, a basketball player makes about three out of every
four foul shots. In other words, she has a 75% chance of making each foul shot
she takes. Since a coin toss produces equally likely outcomes, it could not be
used in a simulation for this problem.
Instead, a number cube could be used by specifying that the numbers 1, 2 or 3
could represent a hit, and number 4 represent a miss, and the number 5 and 6
would be ignored. Based on the following 50 trials of rolling a fair number cube,
find an estimate of the probability that she makes 5 or 6 of the foul shots she
takes.
441323
124144
121411
344221
131224
143143
214411
343214
121142
331113
342124
333434
321341
222442
213344
243224
423221
123131
321442
311313
442123
243122
111422
343123
321241
323443
311423
242124
121423
211411
422313
232323
114232
122111
311214
324243
142141
141132
443431
433434
441243
224341
414411
322131
241131
214322
411312
343122
214433
323314
7
Independent Practice
A mouse is placed at the start of the maze shown below. If it reaches station B, it
is given a reward. At each point where the mouse has to decide which direction
to go, assume that it is equally likely to go in either direction. At each decision
point, 1, 2 or 3, it must decide whether to go left (L) or right (R). It cannot go
backwards.
1. Create a theoretical model of probabilities for the mouse to arrive at
terminal A, B and C.
a. List the sample space for the paths the mouse can take. For
example, if the mouse goes left at decision point 1 and then right at
decision point 2, then the path would be denoted LR.
b. Are the paths in your sample space equally likely?
c. What are the theoretical probabilities that a mouse reaches
terminal points A, B, and C? Explain.
8
2. Based on the following set of simulated paths, estimated the probabilities
that the mouse arrives at point A, B, C.
RR
RL
LL
RR
RR
LR
LR
LR
RL
LR
LR
RR
LL
RR
LL
RL
LR
RL
RR
LR
RL
LR
RR
LL
LR
RR
RL
RL
LL
LL
LL
LR
LR
RL
RR
RL
RR
RL
LR
LL
a. How do you reach point A? What is the experimental probability of
making it there?
b. How do you reach point B? What is the experimental probability of
making it there?
c. How do you reach point C? What is the experimental probability of
making it there?
d. How do these estimated probabilities compare to the theoretical
probabilities above?
9
10
Name: ______________________________
Date: March 16, 2017
7th Grade Math:
Unit: Statistics
and Probability
Packet 103:
Simulations
Homeroom:
Mrs. Petrozzi: (614) 725-9693
Redo:
Score: ________/5 _________%
DNG
A B C D F
Directions: Answer the following questions. Show all of your work and circle your
final answer.
Suppose that a dartboard is made up of the 8 X 8 grid of squares shown below.
Also, suppose that when a dart is thrown, it is equally likely to land on any one of
the 64 squares. A point is won if the dart lands on one of the 16 black squares.
Zero points are earned if the dart lands in a white space.
1. For one throw of the dart, what is the probability of winning a point? Note
that a point is won if the dart lands on a black square.
2. For one throw of the dart, what is the probability of NOT winning a point?
Note that you do not earn any points if the dart lands on a white square.
11
Suppose a game consists of throwing a dart three times. A trial consists of three
rolls of the number cube. (1 is a win, 2, 3, or 4 is a loss). The results of the
experiment are listed below.
324
321
144
113
421
332
332
322
223
222
411
112
421
333
222
322
433
414
414
112
124
412
111
212
113
224
443
242
431
212
221
322
244
233
413
241
424
222
314
341
111
412
331
212
442
223
433
224
241
324
3. For each roll, you can either win 0, 1, 2 or 3 points. For each outcome
listed in the table, how many points did you win?
324
332
411
322
124
224
221
241
111
223
321
332
112
433
412
443
322
424
412
433
144
322
421
414
111
242
244
222
331
224
113
223
333
414
212
431
233
314
212
241
421
222
222
112
113
212
413
341
442
324
4. You rolled the number cube 50 times. Write the probabilities for getting 0,
1, 2, or 3 points.
Number
of Points
Times You
Rolled
Probability
0
1
2
3
12
Name: ______________________________
Date: March 16, 2017
Homeroom:
7th Grade Math:
Unit: Statistics
and Probability
Packet 103:
Simulations
Directions: Answer the following questions. Circle your final answers. When you
finish the exit ticket, place it face down on your desk and assign yourself to your
advanced work or an independent reading book.
Nathan is your school’s soccer player. When he takes a shot on goal, he scores
half of the time on average. To estimate probabilities of the number of goals
Nathan makes, use a simulation with a number cube. One roll of a number cube
represents one shot.
1. Decide what outcome of a number cube you want to represent a goal
scored by Nathan in one shot.
2. For this problem, what represents a trial of taking 6 shots?
3. What is the theoretical probability of Nathan getting a goal when he
takes a shot?
13