Just need help finding the A(3, n) general formula. A(1, n) = n + 1 and A(2, n) = 2n + 3
Just need help finding the A(3, n) general formula. A(1, n) = n + 1 and...
2. (15p) We shall consider a function A, defined by the recurrences A(0,n n+1 for n 20 for m>0 for m, n > 0 A(m, n) A(m-1, A(m, n-1)) = Observe that A(1,1) = A(0,A(1,0))=A(0,2) = 3 A(1,2 A(0, A(1, 1)) A(0,34 and it is now not hard to see (as can be proved by an easy induction) that A(1,n)n 2 for all n 20 1. (5p) Calculate A(2,0), A(2,1), A(2,2), and A(2,3) Then state (you are not required to...
Find all pure strategy Nash Equilibria in the following games a.) Player 2 b1 b2 b3 a1 1,3 2,2 1,2 a2 2,3 2,3 2,1 a3 1,1 1,2 3,2 a4 1,2 3,1 2,3 Player 1 b.) Player 2 A B C D A 1,3 3,1 0,2 1,1 B 1,2 1,2 2,3 1,1 C 3,2 2,1 1,3 0,3 D 2,0 3,0 1,1 2,2 Player 1 c.) Player 2 S B S 3,2 1,1 B 0,0 2,3
3. Consider the following game in normal form. Player 1 is the "row" player with strate- gies a, b, c, d and Player 2 is the "column" player with strategies w, x, y, z. The game is presented in the following matrix: W Z X y a 3,3 2,1 0,2 2,1 b 1,1 1,2 1,0 1,4 0,0 1,0 3,2 1,1 d 0,0 0,5 0,2 3,1 с Find all the Nash equilibria in the game in pure strategies.
1. (Induction.) Consider the following program, called Ackbar(m,n). It takes in as input any two natural numbers m, n, and does the following: (i) If m-0, Ackbar(0, n) = n + 1. (ii) If n-0, Ackbar(rn,0) is equal to Ackbar(m-1, 1). iii) Otherwise, if n, m > 0, then Ackbar(m, n) can be found by calculating Ackbar(m - 1, Ackbar(m,n 1)) Here's a handful of calculations to illustrate this definition: Ackbar(1,0)-Ackbar(0,1) = 1 + 1-2 Ackbar (1, 1) Ackbar (0,...
Find the Nash equilibria of and the set of rationalizable strategies for the games 2 2 L R L С R 3,3 2,0 A 5,9 0, 1 U 4,3 В 4,1 8,- 3,2 М 0,9 1,1 D 0,1 2, 8 8,4 (а) (b) 2 2 1 W X Y Z R 3,6 4, 10 5,0 U 0,8 U 0,0 1, 1 2,6 3, 3 4, 10 1,1 0,0 5,5 D 1,5 2,9 3,0 4,6 (d) (c) L M
Which of the following combinations of quantum numbers is allowed? 1 A n = 3,1 = 3, mi = 1, ms=+ B. 'n = 1,1 = 2, m/-0, ms مجانا 1 on = 4,1 = 3, m = 4, ms D. n = 3,1 = 2, mi = 1, ms-ti E. n = 2,1 = 1, mi = -1, ms = 0
NEED HELP WITH DISCRETE MATH: . Consider the following game. Alice and Bob have a an infinite quarter chessboard in front of them. The chessboard has a left edge and a bottom edge. There is one checker on some square the chessboard. The player whose turn it is can move the checker down any positive number of squares, or can move the check one column to the left, but anywhere in that column. The game ends when a player cannot...
Problem #3: Strictly dominated and non-rationalizable strategies (6 pts) Below, there are three game tables. For each one, identify which strategies are non-rationalizable (if any), and which strategies are strictly dominated (if any). Do this for both players in each game. Note: You don't need to use IESDS or IENBR in this problem: I only want to know which strategies are strictly dominated or non-rationalizable in the games as presented. Rogers Go Rogue Go Legit 2,3 3,4 3,2 5,1 3,1...
8. Identify the correct values for a 4f sublevel. A) n = 3,1 = 1, ml = 0 B) n = 2,1 = 1, ml = 2 C) n = 1,1 = 0, ml = 0 D) n= 4,1 = 3, ml = -2
Iculate the probability of the foltowing events G first digit 1, 2, or 3 P(F) P(G) | F-sum of digits-4 P(F and G) P(F given G) P(F and G)/P(G) 2 Dice Sample Space 1,6 2,6 3,6 1,5 1,1 2,1 3,1 4,1 5,1 1,2 2,2 3,2 4,2 5,2 6,2 1,3 2,3 3,3 4,3 5,3 6,3 1,4 2,4 3,4 4,4 5,4 6,4 2,5 3,5 4,5 4,6 5,5 5,6 6,5 6,6 6,1 25/2018 HW 2- Probability 1