Question
The probability scale is drawn between
- 2 & 3
- 1 & 2
- 0 & 1
- 1 & 4
The correct answer is: 0 & 1
Related Questions to study
If two dice are thrown, then the probability of getting the sum as a prime number is____.
0 ≤ P(E) ≤ 1 . Sum of probabilities of all events = 1
If two dice are thrown, then the probability of getting the sum as a prime number is____.
0 ≤ P(E) ≤ 1 . Sum of probabilities of all events = 1
The total probability is
0 ≤ P(E) ≤ 1.Sum of probabilities of all events = 1
The total probability is
0 ≤ P(E) ≤ 1.Sum of probabilities of all events = 1
The probability of impossible event is
An impossible event is getting a 7 on rolling a dice. Also, P(sure event) = 1
The probability of impossible event is
An impossible event is getting a 7 on rolling a dice. Also, P(sure event) = 1
The probability of getting an even number is _________.
0 ≤ P (E) ≤ 1 , sum of all probabilities of all events = 1
The probability of getting an even number is _________.
0 ≤ P (E) ≤ 1 , sum of all probabilities of all events = 1
The average temperatures recorded as shown below.
![](data:image/png;base64,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)
The minimum temperature recorded is _______.
The average temperatures recorded as shown below.
![](data:image/png;base64,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)
The minimum temperature recorded is _______.
Jeremy scored 70, 80, 70, 90, 80, 100, 70 in his last seven math exams. The average score is _________.
Jeremy scored 70, 80, 70, 90, 80, 100, 70 in his last seven math exams. The average score is _________.
In a lottery, there are 15 prizes and 30 blanks. A lottery is drawn at random. The probability of a getting a prize is________.
In a lottery, there are 15 prizes and 30 blanks. A lottery is drawn at random. The probability of a getting a prize is________.
Probability cannot be ____.
Probability cannot be ____.
The stem in number 43 is________.
The stem in number 43 is________.
The probability of an impossible event is________.
The probability of an impossible event is________.
If an ordinary die is thrown, the chance of getting 6 is________.
If an ordinary die is thrown, the chance of getting 6 is________.
The range of 8, 9, 10, 11, 12, 13 is
The range of 8, 9, 10, 11, 12, 13 is
The mode of 1, 5, 6, 8, 9 is _____.
The mode of 1, 5, 6, 8, 9 is _____.
The median of the data 10, 39, 71, 42, 39, 76, 38, 25 is
The median of the data 10, 39, 71, 42, 39, 76, 38, 25 is
A group of customer service surveys was sent out at random. The scores were 90, 50, 70, 80, 60, 20, 90 and 20. The mean score is _______.
Mean of a data is the sum of all values divided by the total number of values, it is also called average.
A group of customer service surveys was sent out at random. The scores were 90, 50, 70, 80, 60, 20, 90 and 20. The mean score is _______.
Mean of a data is the sum of all values divided by the total number of values, it is also called average.