Let B1, B2, B3 be pairwise exclusive, P(B1) = 1/8, P(B2) = 1/4, P(B3) = 5/8, P(A | B1) = 1, P(A | B2) = 1/3, P(A | B3) = 1/3. Calculate P(B2 | A).
Given that, B1, B2, B3 be pairwise exclusive, P(B1) = 1/8, P(B2) = 1/4, P(B3) = 5/8, P(A | B1) = 1, P(A | B2) = 1/3,
P(A | B3) = 1/3
We want to find, P(B2 | A)
=> P(B2 | A) = 1/5 = 0.2
Let B1, B2, B3 be pairwise exclusive, P(B1) = 1/8, P(B2) = 1/4, P(B3) = 5/8,...
Let a sample space be partitioned into three mutually exclusive and exhaustive events, B1, B2, and, B3. Complete the following probability table. (Round your answers to 2 decimal places.) Prior Probabilities Conditional Probabilities Joint Probabilities Posterior Probabilities P(B1) = 0.11 P(A | B1) = 0.45 P(A ∩ B1) = P(B1 | A) = P(B2) = P(A | B2) = 0.62 P(A ∩ B2) = P(B2 |A) = P(B3) = 0.38 P(A | B3) = 0.85 P(A ∩ B3) = P(B3...
Let a sample space be partitioned into three mutually exclusive and exhaustive events, B1, B2, and, B3. Complete the following probability table. (Round your answers to 2 decimal places.) Prior Probabilities Conditional Probabilities Joint Probabilities Posterior Probabilities P(B1) = 0.15 P(A | B1) = 0.40 P(A ∩ B1) = P(B1 | A) = P(B2) = P(A | B2) = 0.65 P(A ∩ B2) = P(B2 |A) = P(B3) = 0.32 P(A | B3) = 0.75 P(A ∩ B3) = P(B3...
Let B = {b1,b2, b3} be a basis for a vector space V. Let T be a linear transformation from V to V whose matrix relative to B is [ 1 -1 0 1 [T]B = 2 -2 -1 . 10 -1 -3 1 Find T(-3b1 – b2 - b3) in terms of bı, b2, b3 .
We know that P(B1 ∩ B2) = 0, P(B1) = 1/4, P(B2) = 3/4, P(A) = 1/8. What is the maximum possible value of the product P(A | B1) · P(A | B2)?
(a) Let P(B1∩B2)>0, and A1∪A2⊂B1∩B2. Then show that P(A1|B1).P(A2|B2)=P(A1|B2).P(A2|B1). (b) Let A and B1 be independent; similarly, let A and B2 be independent. Show that in this case, A and B1∪B2 are independent if and only if A and B1∩B2 are independent. (c) Given P(A) = 0.42,P(B) = 0.25, and P(A∩B) = 0.17, find (i)P(A∪B) ; (ii)P(A∩Bc) ; (iii)P(Ac∩Bc) ; (iv)P(Ac|Bc).
Problem 4. Determine if the following sets B1, B2, B3, B4 and Bs are open, closed, compact or connected. (You don't need to prove your findings here) a) B1 =RQ. b) We define the set B2 iteratively: C1 = [0, 1] C2 =[0,1/4] U [3/4, 1] C3 =[0,1/16] U [3/16, 4/16] U [12/16, 13/16] U [15/16, 1] Then B2 = n Cn. NEN c) B3 = U (2-7,3+"). nn +1 NEN d) f:R+R continuous and V CR closed. B4 =...
Assume that the transition matrix from basis B = {b1, b2, b3} to basis C = {c1, c2, c3} is PC,B = 1/2*[ 0 -1 1 ; -1 1 1 ; 1 0 0 ]. (a) If u = b1 + b2 + 2b3, find [u]C. (b) Calculate PB,C. (c) Suppose that c1 = (1, 2, 3), c2 = (1, 2, 0), c3 = (1, 0, 0) and let S be the standard basis for R 3 . (i) Find...
solution of question d (4 points) Consider the basis of R5 given by with b2 (2,-1,-5,-4,7), b3-(3, 2,-7,-5,9) b4 2,1,4,4,-5) bs (-1,0,1,2,0) The MATLAB code to produce the basis vectors is given by b1 11,0-2-2.3], b2 -12-1.-5-4,7T, b3 13-2-7-5,91, b4 [-2,14.4-5T, b5 1-1,0,1,20 Let S denote the standard basis for R a Find the transition matrix P P,s PB,s b. Use the previous answer to calculate the coordinate matrix of the vector z ( 1,5, 4, 3, 3) with respect...
Example 2 Projects B1 and B2 are mutually exclusive. Projects CI and C2 are mutually exclusive and dependent on the acceptance of B2. Finally, project D is dependent on the acceptance of Cl. Assuming that MARR-10% per year. Capital availability is limited to $48,000. Formulate the problem as LP model cash flow ($000) for end of year k 4 PW 1 Project 0 -50 -30 20 20 $13.40 12 $8.04 4 ($1.32) 5 $0.85 6 $9.02 20 20 B1 12...
How was the linear transformation of b1 and b2 were applied (L(b1) , L(b2))? NOTE: b1=(1,1)^T , b2=(-1,1)^T Linear Transformations EXAMPLE 4 Let L be a linear transformation mapping R? into itself and defined by where (bi, b2] is the ordered basis defined in Example 3. Find the matrix A represent- ing L with respect to [bi, b2l Solution Thus, A0 2 onofosmation D defined by D(n n' maps P into P, Given the ordered Linear Transformations EXAMPLE 4 Let...