Find the unknown quantities a. P1(-6, y), P2 (8, 4) and P1P2 = 13
6. Consider the weighted voting system [23:8,9,15,8]. Find the Banzhaf power distribution of this weighted voting system. (P1P2,P3) (P1,P2,P4) P1,P3,P4) P2 P3P4) (P1,P2,P3,P4) P1.P2) P1P3) Player Times critical Power index P2.P3) (P2 P4) (P3,P4) P3 7. Cindy, Jamal, Monique, and Ryan are dividing a piece of land using the lone-divider method. The values of the four pieces of land in the eyes of the each player are: Piece 1 35% 20% 25% 15% Piece 2 15% 40% 25% 25% Piece...
Find the distance P1P2 vector between P1 (1, 2, 3) and P2 (-1, -2, 3) in Cartesian coordinates, cylindrical coordinates, AND spherical coordinates.
(8 points) Consider the weighted voting system (12:3,4,10.3] Find the Banzhaf power distribution of this weighted voting system 9. (P1.P2) P1,P3) (P1P4 (P2.P3) (P2.P4) (P3,P4) (P1P2.P3) (P1P2.P4) (P1.P3,P4) (P2.P3,P4) (P1,P2,P3,P4) P1 P2 P3 P4
Problem #1 (010) 2 A P1 6 A P2 5 V INSTRUCTIONS: Solve for the unknown voltage (V), current (D, and the powers received or delivered by the 4 components. m #2 (0/10)
s o In petunias, the alleles for flower colorare P1 pink and P2 . Neither les dominant Heteronotes P1P for these shove purple were 100 pe unknown parentage were found and planted. 50 of the offspring had blue flowers and so had purple flowers. What were the genotypes of both parents A P2P2 x P2P2 B. P1P2 x P2P2 C.P1P1 x P2P2 D.P1P1 x P1P2 EP1P1 x P1P1
Find the distance d (P1,P2) between the given points P1 and P2 P1= (6,5) P2=(-2,6) d(P1,P2)=
Problem 2. Let A = {4,5, 7} and B = {y, z}. Let p1 and p2 be the projections of A x B onto the first and second coordinates (components). That is, for each pair (a,b) E AXB, pi(a,b) = a and p2 (a,b) = b. Answer the following questions: (2.1) Find p1(4, y) and p1(7,z). (2.2) What is the range of pı? (2.3) Find p2(4, y) and p2(7,2). (2.4) What is the range of p2?
in petunias, the alleles for flower color are P1 - pink and P2 - blue. Neither ailele is dominant. Heterozygotes (P1P2) for these alleles have purple flowers. If two purple flowers were crossed, what proportion of the offspring would be pink? A all - 1/4 C. none D. 3/4
Supply the missing quantities. (Assume P1 = 0.4, P2 = 0.6, P3 = 0.4.) P(A ∩ C) = P(A ∩ D) = P(B ∩ C) = P(B ∩ D) =
2. Cournot competition: P1 and P2 (independently and simultaneously) choose quantities, qi and q2. The cost of producing q units is c(ai)i and the demand curve is given by P(O) 10 Q: (i.e., if P1 produces qi and P2 produces q2; each sells all his units at price 10 1 92 (a) Find all NE. b) Now suppose that the game is played twice. Each firm chooses both a production quantity, and, firm 2 can choose to donate some of...