Answer:
(a) 0.5083
(b) 0.1333
(c) 0.2667
(d) 0.3596
Step-by-step explanation:
Box 1 = 4R and 8B
Box 2 = 5R and 3B
P(Box 1) = P(Head) = 40% = 0.4
P(Box 2) = P(Tail) = 1 - 0.4 = 0.6
(a) P(red marble) = (P(Box 1) and P(Red in box 1)) or (P(Box 2) and P(Red in box 2)) = (0.4 × 4/12) + (0.6 × 5/8) = 0.5083
(b) P(red marble from box 1) = (P(Box 1) and P(Red in box 1) = 0.4 × 4/12 = 0.1333
(c) P(blue marble from box 1) = (P(Box 1) and P(Blue in box 1) = 0.4 × 8/12 = 0.2667
(d) P(Two marbles with the same color) = P(1st Red from box 1 and 2nd Red from box 1) or P(1st Red from box 1 and 2nd Red from box 2) or P(1st Red from box 2 and 2nd Red from box 2) or P(1st Blue from box 1 and 2nd Blue from box 1) or P(1st Blue from box 1 and 2nd Blue from box 2) or P(1st Blue from box 2 and 2nd Blue from box 2)
P(1st Red from box 1 and 2nd Red from box 1) = (0.4 × 4/12) × (0.4 × 3/11) = 0.0145
(It is 11 in the second term because the first red has been removed.)
P(1st Red from box 1 and 2nd Red from box 2) = (0.4 × 4/12) × (0.6 × 5/8) = 0.0500
P(1st Red from box 2 and 2nd Red from box 2) = (0.6 × 5/8) × (0.6 × 4/7) = 0.1286
P(1st Blue from box 1 and 2nd Blue from box 1) = (0.4 × 8/12) × (0.4 × 7/11) = 0.0679
P(1st Blue from box 1 and 2nd Blue from box 2) = (0.4 × 8/12) × (0.6 × 3/8) = 0.0600
P(1st Blue from box 2 and 2nd Blue from box 2) = (0.6 × 3/8) × (0.6 × 2/7) = 0.0386
P(Two marbles with the same color) = 0.0145 + 0.05 + 0.1286 + 0.0679 + 0.06 + 0.0386 = 0.3596
