Textbook Question
If events E and F are disjoint and the events F and G are disjoint, must the events E and G necessarily be disjoint? Give an example to illustrate your opinion.
4. Probability
Basic Concepts of Probability
2:06 minutesProblem 5.7.32c
Textbook Question
Lingo
In the gameshow Lingo, the team that correctly guesses a mystery word gets a chance to pull two Lingo balls from a bin. Balls in the bin are labeled with numbers that match the numbers still on the team's Lingo board. There are also three prize balls and three red "stopper" balls in the bin. If a stopper ball is drawn first, the team loses its second draw. To form a Lingo, the team needs five numbers in a row—vertically, horizontally, or diagonally. Consider the sample Lingo board below for a team that has just guessed a mystery word.
c. What is the probability that the team makes a Lingo on their first draw?
Verified step by step guidance1
Step 1: Identify the current marked numbers on the Lingo board. The shaded (green) cells represent the numbers already marked. These are the numbers that the team has matched so far.
Step 2: Determine which numbers remain unmarked on the board. These are the numbers that, if drawn, could help complete a Lingo (five in a row vertically, horizontally, or diagonally).
Step 3: Analyze all possible ways to form a Lingo with one additional number. Look for rows, columns, or diagonals where the team has four marked numbers and only one unmarked number left to complete the sequence.
Step 4: Calculate the total number of balls in the bin. This includes all numbers still on the board (unmarked), plus the three prize balls and three red stopper balls.
Step 5: Calculate the probability of drawing the exact number needed to complete a Lingo on the first draw. This is the ratio of the number of balls that would complete the Lingo to the total number of balls in the bin, expressed as a probability.
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Video duration:
2mKey Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Probability of Drawing Specific Balls
This concept involves calculating the likelihood of drawing certain balls from a bin containing a mix of numbered balls, prize balls, and stopper balls. Understanding the total number of balls and the favorable outcomes is essential to determine the probability of events like drawing a ball that helps form a Lingo.
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Combinatorial Analysis and Counting
Combinatorial analysis helps count the number of ways to select balls that complete a Lingo line on the board. It involves identifying all possible winning combinations (rows, columns, diagonals) and the number of balls needed to complete these, which is crucial for calculating the probability of success on the first draw.
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Lingo Board Configuration and Winning Conditions
Understanding the Lingo board layout and the current marked numbers is vital. A Lingo is formed by having five marked numbers in a row vertically, horizontally, or diagonally. Analyzing the board's current state helps identify which numbers, if drawn, will complete a Lingo, directly impacting the probability calculation.
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04:09Using the Poisson Distribution to Approximate the Binomial Distribution
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