Question
A coin has ___.
- One head
- One tail
- One head & tail
- Two heads
Hint:
For this question you must be familiar with a real coin. Looking at a coin we will see two sides, one is called head and the another is tail.
The correct answer is: One head & tail
A coin has one head and one tail.
Related Questions to study
The probability of getting a job is
. If the probability of not getting the job is , then the value of x is
The probability of getting a job is
. If the probability of not getting the job is , then the value of x is
If a die is rolled, then the probability of getting a composite number is_____.
Composite number is the number which has more than two factors.
If a die is rolled, then the probability of getting a composite number is_____.
Composite number is the number which has more than two factors.
The probability of picking an alphabet from consonants is
0≤ P(E) ≤ 1.
The probability of picking an alphabet from consonants is
0≤ P(E) ≤ 1.
The probability of the spinners landing on 1 is
![](data:image/png;base64,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)
0 ≤ P(E) ≤ 1
The probability of the spinners landing on 1 is
![](data:image/png;base64,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)
0 ≤ P(E) ≤ 1
In a lottery there are 10 prizes and 25 blanks. The probability of getting prize in a single draw is
0 ≤ P (E) ≤ 1
In a lottery there are 10 prizes and 25 blanks. The probability of getting prize in a single draw is
0 ≤ P (E) ≤ 1
From a bag of 3 red and 5 blue balls, a ball is drawn randomly. The probability of getting blue is
0 ≤ P(E) ≤ 1.Also sum of probability of all events is 1 i.e Here, P(red) + P(blue) = 1
From a bag of 3 red and 5 blue balls, a ball is drawn randomly. The probability of getting blue is
0 ≤ P(E) ≤ 1.Also sum of probability of all events is 1 i.e Here, P(red) + P(blue) = 1
If the winning probability is 0.3, then the probability of losing a game is______.
0 ≤ P(E) ≤ 1 , sum of probabilities of all events = 1
If the winning probability is 0.3, then the probability of losing a game is______.
0 ≤ P(E) ≤ 1 , sum of probabilities of all events = 1
If a coin is tossed thrice, then the probability of getting head twice is_________________.
0 ≤ P(E) ≤ 1
If a coin is tossed thrice, then the probability of getting head twice is_________________.
0 ≤ P(E) ≤ 1
Among the following that cannot be a probability is
Among the following that cannot be a probability is
Certain means there’s a ________ chance than an event will happen.
Probability of a sure event is 1,for an possible event it is 0 and for all other events its value lies between 0 and 1.
Certain means there’s a ________ chance than an event will happen.
Probability of a sure event is 1,for an possible event it is 0 and for all other events its value lies between 0 and 1.
If we toss a coin, then the probability of getting tails is_____.
Probability of a sure event is 1,for an impossible event it is 0 and for all other events its value lies between 0 and 1.
If we toss a coin, then the probability of getting tails is_____.
Probability of a sure event is 1,for an impossible event it is 0 and for all other events its value lies between 0 and 1.
The number of cards in a deck are____.
A deck has 4 types of cards also called suits. (1) Diamonds (2) Hearts (3) spades and (4) Clubs
The number of cards in a deck are____.
A deck has 4 types of cards also called suits. (1) Diamonds (2) Hearts (3) spades and (4) Clubs
If we toss a coin, then the probability of getting head is_____
0 ≤ P (E) ≤ 1 , sum of probabilities of all event is 1
If we toss a coin, then the probability of getting head is_____
0 ≤ P (E) ≤ 1 , sum of probabilities of all event is 1
Tossing a coin is ___ event
A random event is an event in which any outcome of all the possible one can occur.
Tossing a coin is ___ event
A random event is an event in which any outcome of all the possible one can occur.