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space for a roll of two number cubes is shown in the table. (1,1)|(1,2)|(1,3)|(1,4)|(1,5),(1,6) (2,1)|(2,2)|(2,3)|(2,4)|(2,5)|(...Asked by KJRCH
The sample space for a roll of two number cubes is shown in the table. (1,1)|(1,2)|(1,3)|(1,4)|(1,5),(1,6) (2,1)|(2,2)|(2,3)|(2,4)|(2,5)|(2,6) (3,1)|(3,2)|(3,3)|(3,4)|(3,5)|(3,6) (4,1)|(4,2)|(4,3)|(4,4)|(4,5)|(4,6) (5,1)|(5,2)|(5,3)|(5,4)|(5,5)|(5,6) (6,1)|(6,2)|(6,3)|(6,5)|(6,5)|(6,6) What is the probability that the roll will result
Answers
Answered by
Steve
I'd say P(roll) = 1
I suspect you left something out ...
I suspect you left something out ...
Answered by
chanyeol
1/6
Answered by
Hiiii
The sample space for a roll of two number cubes is shown in the table.
(1,1)|(1,2)|(1,3)|(1,4)|(1,5),(1,6)
(2,1)|(2,2)|(2,3)|(2,4)|(2,5)|(2,6)
(3,1)|(3,2)|(3,3)|(3,4)|(3,5)|(3,6)
(4,1)|(4,2)|(4,3)|(4,4)|(4,5)|(4,6)
(5,1)|(5,2)|(5,3)|(5,4)|(5,5)|(5,6)
(6,1)|(6,2)|(6,3)|(6,5)|(6,5)|(6,6)
The two numbers rolled can be added to get a sum Find P(sum is less than 4)
A. 1/12
B. 5/36
C. 2/9
D. 11/13
(1,1)|(1,2)|(1,3)|(1,4)|(1,5),(1,6)
(2,1)|(2,2)|(2,3)|(2,4)|(2,5)|(2,6)
(3,1)|(3,2)|(3,3)|(3,4)|(3,5)|(3,6)
(4,1)|(4,2)|(4,3)|(4,4)|(4,5)|(4,6)
(5,1)|(5,2)|(5,3)|(5,4)|(5,5)|(5,6)
(6,1)|(6,2)|(6,3)|(6,5)|(6,5)|(6,6)
The two numbers rolled can be added to get a sum Find P(sum is less than 4)
A. 1/12
B. 5/36
C. 2/9
D. 11/13
Answered by
Hiiii
You are packing for a vacation. You pack 3 pairs of shorts 5 shirts and 2 pairs of shoes how many different outfits will you be able to make using one pair of shorts one shirt and one pair of shoes?
A. 10
B. 17
C. 30
D. 35
A. 10
B. 17
C. 30
D. 35
Answered by
Hiiii
There are four marbles in a bag with the colors red white blue and green John pulls out one marble and tosses a coin how many elements are there in the sample space?
A. 2
B. 4
C. 8
D. 16
A. 2
B. 4
C. 8
D. 16
Answered by
Hiiii
A sandwich shop sells sausage sandwiches bacon sandwiches and 16 different toppings how many choices are there for a single sandwich with one topping?
A. 18
B. 24
C. 32
D. 34
A. 18
B. 24
C. 32
D. 34
Answered by
Hiiii
The probability it will snow in the next two weeks is 1/12 for this week and 1/4 for next week what is P(snow this week then snow next week)?
A. 1/8
B. 1/16
C. 1/24
D. 1/48
A. 1/8
B. 1/16
C. 1/24
D. 1/48
Answered by
Hiiii
Do you have a limited amount of times to respond to questions?
Answered by
Bot
The sums less than 4 are 2 and 3. We can find them in the table and determine that there are 2 outcomes corresponding to the sum of 2 (1,1) and the sum of 3 also has 2 outcomes (1,2) and (2,1).
Therefore, there are 4 possible outcomes that result in a sum less than 4. Since there are 36 total possible outcomes, the probability of rolling a sum less than 4 is:
P(sum < 4) = 4/36 = 1/9
Answer: Not one of the choices.
Therefore, there are 4 possible outcomes that result in a sum less than 4. Since there are 36 total possible outcomes, the probability of rolling a sum less than 4 is:
P(sum < 4) = 4/36 = 1/9
Answer: Not one of the choices.
Answered by
Bot
There are 3 options for the shorts, 5 options for the shirts, and 2 options for the shoes. Using the counting principle, we can combine these options to find the total number of outfits:
3 x 5 x 2 = 30
Therefore, you will be able to make 30 different outfits using one pair of shorts, one shirt, and one pair of shoes.
Answer: C. 30
3 x 5 x 2 = 30
Therefore, you will be able to make 30 different outfits using one pair of shorts, one shirt, and one pair of shoes.
Answer: C. 30
Answered by
Bot
There are two separate events happening: pulling out a marble and tossing a coin. We can find the number of outcomes for each event and then multiply them together using the counting principle to find the total number of elements in the sample space.
For pulling out a marble, there are 4 possible outcomes (red, white, blue, and green).
For tossing a coin, there are 2 possible outcomes (heads or tails).
Multiplying these together, we get:
4 x 2 = 8
Therefore, there are 8 elements in the sample space.
Answer: C. 8
For pulling out a marble, there are 4 possible outcomes (red, white, blue, and green).
For tossing a coin, there are 2 possible outcomes (heads or tails).
Multiplying these together, we get:
4 x 2 = 8
Therefore, there are 8 elements in the sample space.
Answer: C. 8
Answered by
Bot
There are two separate events happening: choosing the type of sandwich and choosing the topping. We need to use the counting principle to find the number of total choices.
For the type of sandwich, there are 2 options: sausage or bacon.
For the topping, there are 16 options.
Therefore, using the counting principle we can multiply the options together:
2 x 16 = 32
Therefore, there are 32 choices for a single sandwich with one topping.
Answer: C. 32
For the type of sandwich, there are 2 options: sausage or bacon.
For the topping, there are 16 options.
Therefore, using the counting principle we can multiply the options together:
2 x 16 = 32
Therefore, there are 32 choices for a single sandwich with one topping.
Answer: C. 32
Answered by
Bot
To find the probability of two independent events occurring together, we multiply their probabilities. So:
P(snow this week AND snow next week) = P(snow this week) x P(snow next week)
P(snow this week) = 1/12
P(snow next week) = 1/4
Multiplying these together gives:
P(snow this week AND snow next week) = (1/12) x (1/4) = 1/48
Therefore, the probability of snowing this week AND next week is 1/48.
Answer: D. 1/48
P(snow this week AND snow next week) = P(snow this week) x P(snow next week)
P(snow this week) = 1/12
P(snow next week) = 1/4
Multiplying these together gives:
P(snow this week AND snow next week) = (1/12) x (1/4) = 1/48
Therefore, the probability of snowing this week AND next week is 1/48.
Answer: D. 1/48
Answered by
Bot
No, I do not have a limited amount of times to respond to questions. As an AI language model, I can answer your questions as long as I am powered and programmed to do so.