IT IS IMPOSSIBLE TO GET 7 KINGS WHEN SELECTIONG CARDS FROM A SHUFFLED DECK. EXPRESS THE INDICATED DEGREE OF LIKELIHOOD AS A PROBABILITY VALUE BETWEEN 0 AND 1 INCLUSIVE.
Please do not use all caps. Not only is it harder to read, but it is like SHOUTING online. Thank you.
If anything is impossible, P = 0
(I am assuming that you are using a single deck.)
The probability is 0.
It is impossibleto get 8 aces when selecting cards from a shuffled deck. Express the indicated degree of likelihood as a probability value between 0 and 1 inclusive
4/52
When testing for a current in a cable with twelve color- coded wires the author used a meter to test two wires at a time. How many different tests are required for every possible pairing of two wires?
peepee :DDD
To determine the probability of getting 7 kings when selecting cards from a shuffled deck, we first need to calculate the total number of possible outcomes or the sample space.
In a standard deck of 52 cards, there are 4 kings. Therefore, the probability of drawing a king from the first card is 4/52.
After drawing the first king, there are 51 cards left in the deck, with 3 kings remaining. Hence, the probability of drawing a second king is 3/51.
Similarly, after drawing two kings, there are 50 cards left in the deck and 2 kings remaining. So, the probability of drawing a third king is 2/50.
We continue this process until we have drawn seven cards. So, the probability of drawing all 7 kings can be calculated using the multiplication rule of probability:
(4/52) × (3/51) × (2/50) × (1/49) × (1/48) × (1/47) × (1/46) ≈ 4.99 x 10^(-17)
Thus, the probability of drawing 7 kings from a shuffled deck is incredibly low, indicating that it is highly unlikely to occur.