程序代写案例-CS 540
时间:2021-04-26
CS 540: Introduction to Artificial Intelligence

Final Exam: 12:25-2:25pm, December 16, 2002
Room 168 Noland

CLOSED BOOK
(two sheets of notes and a calculator allowed)



Write your answers on these pages and show your work. If you feel that a question is not fully specified,
state any assumptions that you need to make in order to solve the problem. You may use the backs of
these sheets for scratch work.

Write your name on this and all other pages of this exam. Make sure your exam contains six problems on
ten pages.


Name ________________________________________________________________


Student ID ________________________________________________________________



Problem Score Max Score

1 ______ 28

2 ______ 12

3 ______ 20

4 ______ 10

5 ______ 12

6 ______ 18


TOTAL ______ 100

Name: _____________________________
Problem 1 – Representing and Reasoning with Logic (28 points)

a) Convert each of the following English sentences into First-Order Predicate Calculus
(FOPC), using reasonably named predicates, functions, and constants. If you feel a sentence
is ambiguous, clarify which meaning you’re representing in logic. (Write your answers
below each English sentence.)


All birds can fly except for penguins and ostriches or unless they have a broken wing.












There was a student in CS 540 Fall 1999 who was born in a country in South America.













John sold Mary his CS 540 textbook (and, hence, this book that John formerly owned is
now owned by Mary). [You must use situation calculus here.]













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Name: _____________________________
b) Provide a formal interpretation that shows that the following translation from English to
FOPC is incorrect. Be sure to explain your answer formally using the interpretation you
provide.

A book of Sue’s is missing. !x [ book(x) " owner(x, Sue) ] # missing(x)

















c) What is the most-general unifier (mgu) of these two wff’s? ____________________
Show your work.

P(?x, ?x, f(?y)) P(g(?a, ?b), g(1, ?b), ?b)












d) Why is And Elimination a legal inference rule but Or Elimination is not?



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Name: _____________________________
Problem 2 – Neural Networks (12 points)

a) Consider a perceptron that has two real-valued inputs and an output unit with a step function
as its activation function. All the initial weights and the bias (“threshold”) equal 0.1. Assume
the teacher has said that the output should be 0 for the input in1 = 5 and in2 = -3.

Show how the perceptron learning rule would alter this neural network upon processing this
training example. Let $ (the learning rate) be 0.2 and be sure to adjust the output unit’s bias
during training.


Perceptron BEFORE Training








Perceptron AFTER Training










b) Qualitatively draw a (2D) picture of weight space where the backprop algorithm is likely to
i. do well






ii. do poorly





Be sure to explain your answers.
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Name: _____________________________
Problem 3 –Miscellaneous Questions (20 points)

a) What do you feel are the two (2) most important design choices you would need to make if
you used CBR to choose the location of your next vacation? Briefly justify your answers.

i. ______________________________________________________________









ii. ______________________________________________________________










b) In a weird dream, you’re the simulated annealing algorithm. Currently you’re at node A in a
search space; g(A) = 7 and h(A) = 5. You next randomly select node B; g(B) = 9 and
h(B) = 8. The temperature is a Wisconsin-like 10 degrees.
Do you move to node B? _________ Show your work. (Lower h values are better.)










c) Show an example of a cross over for a GA whose individuals/entities are 6-bits long.
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Name: _____________________________

d) On your way out of the hit feature To Build a Decision Tree, you are surprised to find out the
movie theater is giving away prizes. You watch the people ahead of you choose their prize
either from behind Door #1 or Door #2. Of those who chose Door #1, half received $5, 1%
got a new bike worth $1000, and the rest got a worthless movie poster. Everyone who chose
Door #2 got $10.

Assuming you want to maximize the likely dollar value of your prize, what door should you
choose? ______________ Why?











e) Consider the joint probability distribution below.

A B C P(A, B, C)
False False False 0.05
False False True 0.10
False True False 0.03
False True True 0.25
True False False 0.15
True False True 0.02
True True False 0.07
True True True 0.33


i. What is P(A = true)? ______________ Show your work below.







ii. What is P(A # B)? ______________ Explain.





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Name: _____________________________
Problem 4 – Important AI Concepts (10 points)

Describe each of the following AI concepts and briefly explain its most significant aspect. (Write
your answers in the space below the AI concept.)


Soundness








Overfitting








Fitness Functions








Vector-Space Model








Negation by Failure




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Name: _____________________________
Problem 5 – Bayesian Networks (12 points)
Consider the following Bayesian Network, where variables A-D are all Boolean-valued:





A B P(C =true | A, B) false false 0.1
false true 0.5
true false 0.4
true true 0.9
B C P(D=true | B, C)
false false 0.8
false true 0.6
true false 0.3
true true 0.1
P(A=true) = 0.2 P(B=true) = 0.7 A B
C
D


a) What is the probability that all four of these Boolean variables are false? ______________








b) What is the probability that C is true, D is false, and B is true? _______________









c) What is the probability that C is true given that D is false and B is true? _______________





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Name: _____________________________
Problem 6– More Probabilistic Reasoning (18 points)

a) Imagine that 99% of the time RE Disease (RED) causes red eyes in those with the disease, at
any point in time 2% of all people have red eyes, and at any point in time 1% of the
population has RED.

You have red eyes. What is the probability you have RED? _______________









b) Assume we have one diagnostic random variable (call it D) and two measurement variables
(call them M1 and M2). For simplicity, assume that the M’s variables have three possible
values (e.g., low, medium, and high) and that D is Boolean-valued.

We collect data on 300 episodes and find out the following:

D was true 100 times and for these cases:
M1=low 50 times, M1=med 30 times, and M1 = high 20 times
M2=low 10 times, M2=med 80 times, and M2 = high 10 times


D was false 200 times and for these cases:
M1=low 20 times, M1=med 80 times, and M1 = high 100 times
M2=low 180 times, M2=med 10 times, and M2 = high 10 times



Making the assumption that M1 and M2 are conditionally independent given D,
i. Show how Bayes rule can be used to compute P(D | M1, M2) given the data above
and under the stated assumptions. [Do this algebraically – i.e., as an equation.]










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Name: _____________________________
ii. On a new episode we find M1=low and M2=low. What is the most likely
diagnosis? ______________ This time justify your answer numerically.
















iii. Draw the Bayesian network that one would construct from the above data (do not
add any “pseudo” counts to the above statistics; we won’t worry about dealing with
probabilities equaling zero). Be sure to explain your solution.

























Have a good vacation!
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