n urn contains 3 one-dollar bills, 1 five-dollar bill and 1 ten-dollar bill. A player draws bills one at a time without replacement from the urn until a ten-dollar bill is drawn. Then the game stops. All bills are kept by the player. Determine:
(A) The probability of winning $13.(B) The probability of winning all bills in the urn.(C) The probability of the game stopping at the second draw.Question content area bottomPart 1(A) What is the probability of winning $13?
0.05 (Type a decimal or a fraction. Simplify your answer.)
Part 2
(B) What is the probability of winning all bills in the urn?
enter your response here (Type a decimal or a fraction. Simplify your answer.)
hat is the probability of the game stopping at the second draw?
An urn contains 3 one-dollar bills, 1 five-dollar bill and 1 ten-dollar bill. A player draws bills one at a time without replacement from the urn until a ten-dollar bill is drawn. Then the game stops. All bills are kept by the player. Determine:
(A) The probability of winning $13.(B) The probability of winning all bills in the urn.(C) The probability of the game stopping at the second draw.Question content area bottomPart 1(A) What is the probability of winning $13?
0.05 (Type a decimal or a fraction. Simplify your answer.)
Part 2
(B) What is the probability of winning all bills in the urn?
one fifth
(Type a decimal or a fraction. Simplify your answer.)
Part 3
(C) What is the probability of the game stopping at the second draw?
StartFraction 1 Over 30 EndFraction
(Type a decimal or a fraction. Simplify your answer.)
An urn contains 2 one-dollar bills, 1 five-dollar bill and 1 ten-dollar bill. A player draws bills one at a time without replacement from the urn until a ten-dollar bill is drawn. Then the game stops. All bills are kept by the player. Determine:
(A) The probability of winning $17.(B) The probability of winning all bills in the urn.(C) The probability of the game stopping at the second draw.MathBot Answer:
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