Question 2 :
The probability of getting a number greater than $2$ by throwing a fair dice is:

Question 6 :
An unbiased die is thrown. The probability of getting a number greater&#160;than $1$ is<br/>

Question 8 :
The probability of an event which is sure to occur at every performance of an experiment is called a ___________.<br/>

Question 9 :
Choosing a queen from a deck of cards is an example of <br>

Question 10 :
If $P(A) =$ $\dfrac{1}{2}$, what is the value of $P(\bar A)$?<br/>

Question 11 :
In how many different ways can the letter of the word TOTAL be arranged?

Question 14 :
There are $50$ students in a class and their results is below: <br/><table class="wysiwyg-table"><tbody><tr><td><br/> <p class="wysiwyg-text-align-center">Result (Pass/Fail)</p><br/> </td><td><br/> <p class="wysiwyg-text-align-center">Pass</p><br/> </td><td><br/> <p class="wysiwyg-text-align-center">Fail</p><br/> </td></tr><tr><td><br/> <p class="wysiwyg-text-align-center">No. of students</p><br/> </td><td><br/> <p class="wysiwyg-text-align-center">$35$</p><br/> </td><td><br/> <p class="wysiwyg-text-align-center">$15$</p><br/> </td></tr></tbody></table><p>If a student chosen at random out of the class (i.e., without any bias), find the probability that the student is not failing (i.e., the student passed the examination).</p>

Question 15 :
One card is drawn from a well-shuffled deck of $52$ cards. Find the probability of getting a face card.

Question 16 :
Find the probability that a leap year selected at random will contain $53$ Tuesdays.

Question 17 :
<p>$ P\left ( E \right )+P\left ( \bar{E} \right ) $ is equal to<br></p>

Question 18 :
An unbiased die is thrown. The probability of getting a number between $1$ and $6$ is<br/>

Question 19 :
A glass jar contains $10$ red, $12$ green, $14$ blue and $16$ yellow marbles. If a single marble is chosen at random from the jar, find the sample space.<br/>

Question 20 :
A box contains $3$ red, $3$ white and $3$ green balls. A ball is selected at random. Find the probability that the ball picked up is neither a white nor a red ball:

Question 22 :
How many sample points are in the sample space when a coin is flipped $4$ times?

Question 23 :
If $A, B$ and $C$ are mutually exclusive and exhaustive events, then $P(A) + P(B) + P(C)$ equals to -&#160;

Question 24 :
If three coins are tossed then find the probability of the event of getting no tail.

Question 25 :
A die is thrown. $A$ is the event that prime number comes up, $B$ is the event that the number divisible by three comes up, $C$ is the event that the perfect square number comes up. Then, $A, B$ and $C$ are :