Solve the following:
22!/20!
P[8,7]
C[6,3]
Consider the three points: A = (8,7) B = (1,5) C = (5,1). Determine the angle between AB and AC. =
7. Given the solutions P (1,1), (2,5), (3,3). (4, 6), (5,2), (6,3)J, what linear in- equalities describe the convex hull of P? What are its extreme points? (4,6) (2,5) (3,3) (o,3) (5,2) 1.
Use the calculator provided to solve the following problems. UT • Consider at distribution with 20 degrees of freedom. Compute P(-1.11 < <1.11). Round your answer to at least three decimal places. • Consider at distribution with 22 degrees of freedom. Find the value of such that P( c) = 0.10. Round your answer to at least three decimal places. PC-LII <I<1.11) - c=0 X 5 ?
Solve the following: a. 2015! b. P[6,2] c. C[9,8]
find the angle between the following pair of vectors: U=(1,2) and V= (-6,3) VULVELUU30 Problem #EC-1 /5 points): Find the angle between the following pair of vectors: U = (1, 2) and V = (-6,3).
(2 points) x19 20 21 22 23 P(X = x) 0.1 0.1 0.2 0.1 0.5 Given the discrete probability distribution above, determine the following (a) P(X = 21) = (b) P(X > 20) = (c) P(X> 20)=
Given the following inverse demand and supply functions Supply p 40+30 Demand p 89-20 Solve for the equilibrium quantity - IIl units. (round your answer to two decimat places)
Player II A 5,3 3,5 8,5 Player C 6,3 24 8,9 Consider the strategic form game above. In this game, the following strategy profiles are inefficient (Please, select all that apply) b. (A,F C (C,E) d. (B,E) e (B,D) f. (A,D) . (B,F
Player II C D __________________ Player 1 A 6,3 2,6 B 4,3 8,1 Suppose that in the game above Player 2 plays strategy C with probability q=0.3. The value for is: A) 3.9 B) 4.6 C) 8.3 D) 3.2
Player lI C D Player A 6,3 2,6 В 4,3 8,1 Suppose that in the game above Player 2 plays strategy C with probability q:03. The value for ET71(A, q) is: a. 8.3 b. 3.2 C.3.9 d. 4.6