Reaqd and solve the following.
1. What is the probability that you will draw 2 king cards from a complete deck of 52 cards?
_________________________
2. If you toss a die once, what is the probability that a 2 will come out?
_________________________
3. What is the probability that you get a black pen from a box of assorted pens with 12 red pens, 12 blue pens, 12 black pens?
_________________________
4. Nine balls marked 1 to 5 are placed in a box. If you pick a ball at random, what is the probability that a 4 is taken out?
_________________________
5. What is the probability that you can pick letter O from the cut outs of letter OPPOSITE?
_________________________
.•♫•♬•NONSENCE REPORT•♬•♫•.
Answers & Comments
Answer:
I hope you will understand and hoping for a brainliest if satisfied with the answer
Step-by-step explanation:
1. To calculate the probability of drawing 2 king cards from a complete deck of 52 cards, we need to consider the total number of possible outcomes and the number of favorable outcomes.
There are 4 kings in a deck, so the probability of drawing the first king is 4/52. After removing one king from the deck, there are now 51 cards remaining, including 3 kings. Therefore, the probability of drawing the second king is 3/51.
To find the probability of both events happening, we multiply the probabilities together:
(4/52) * (3/51) = 1/221
So, the probability of drawing 2 king cards is 1/221.
2. When tossing a fair die once, there are 6 equally likely outcomes, which are the numbers 1 to 6. The probability of rolling a 2 is 1 out of 6.
So, the probability of getting a 2 when tossing a die once is 1/6.
3. In a box of assorted pens with 12 red pens, 12 blue pens, and 12 black pens, the total number of pens is 12 + 12 + 12 = 36.
The probability of getting a black pen can be calculated by dividing the number of black pens by the total number of pens:
12 (black pens) / 36 (total pens) = 1/3
So, the probability of getting a black pen is 1/3.
4. If there are 9 balls marked 1 to 5 in a box, the total number of balls is 9. The probability of picking a specific ball (in this case, a ball marked 4) can be calculated by dividing the number of favorable outcomes by the total number of possible outcomes.
Since there is only one ball marked 4 and a total of 9 balls, the probability of picking the ball marked 4 is 1/9.
5. To determine the probability of picking the letter O from the cutouts of the word "OPPOSITE," we need to know the total number of cutouts available and the number of cutouts that are the letter O.
Assuming there is only one cutout for each letter in "OPPOSITE," there are a total of 8 cutouts. Out of these 8 cutouts, only one is the letter O.
Therefore, the probability of picking the letter O is 1 out of 8, which can be written as 1/8.