R.d Sharma 2022 Mcqs Solutions for Class 9 Maths Chapter 25 - Probability

Answer:

We have to find the probability of an impossible event.

Note that the number of occurrence of an impossible event is 0. This is the reason that’s why it is called impossible event.

Remember the empirical or experimental or observed frequency approach to probability.

If n be the total number of trials of an experiment and A is an event associated to it such that A happens in m-trials. Then the empirical probability of happening of event A is denoted byand is given by

Note that n is a positive integer, it can’t be zero. So, whatever may be the value of n, the probability of an impossible event is.

Hence the correct option is (b).

Answer:

We have to find the probability of a certain event.

Note that the number of occurrence of an impossible event is same as the total number of trials. When we repeat the experiment, every times it occurs. This is the reason that’s why it is called certain event.

Remember the empirical or experimental or observed frequency approach to probability.

If n be the total number of trials of an experiment and A is an event associated to it such that A happens in m-trials. Then the empirical probability of happening of event A is denoted byand is given by

Note that n is a positive integer, it can’t be zero. So, the probability of an impossible event is.

Hence the correct option is (b).

Answer:

Remember the empirical or experimental or observed frequency approach to probability.

If n be the total number of trials of an experiment and A is an event associated to it such that A happens in m-trials. Then the empirical probability of happening of event A is denoted byand is given by

Note that m is always less than or equal to n and n is a positive integers, it can’t be zero. But, m is a non negative integer. So, the maximum value of probability of an event is, which is the probability of a certain event and the minimum value of it is 0, which is the probability of an impossible event. For any other events the value is in between 0 and 1.

Hence the correct option is (c).

Answer:

Remember the empirical or experimental or observed frequency approach to probability.

If n be the total number of trials of an experiment and A is an event associated to it such that A happens in m-trials. Then the empirical probability of happening of event A is denoted byand is given by

Note that m is always less than or equal to n and n is a positive integers, it can’t be zero. But, m is a non negative integer. So, the maximum value of probability of an event is, which is the probability of a certain event and the minimum value of it is 0, which is the probability of an impossible event. For any other events the value is in between 0 and 1.

All the options except (c) satisfy the above criteria’s.

Hence the correct option is (c).

Answer:

The random experiment is tossing two coins simultaneously.

All the possible outcomes are HH, HT, TH, and TT.

Let A be the event of getting at most one head.

The number of times A happens is 3.

Remember the empirical or experimental or observed frequency approach to probability.

If n be the total number of trials of an experiment and A is an event associated to it such that A happens in m-trials. Then the empirical probability of happening of event A is denoted byand is given by

Therefore, we have

So, the correct choice is (b).

Answer:

The total number of trials is 1000. Let x be the number of times a tail occurs.

Let A be the event of getting a tail.

The number of times A happens is x.

Remember the empirical or experimental or observed frequency approach to probability.

If n be the total number of trials of an experiment and A is an event associated to it such that A happens in m-trials. Then the empirical probability of happening of event A is denoted byand is given by

Therefore, we have.

But, it is given that. So, we have

Hence a tail is obtained 375 times.

Consequently, a head is obtainedtimes.

So, the correct choice is (c).

Answer:

The total number of trials is 600.

Let A be the event of getting a prime number (2, 3 and5).

The number of times A happens is.

Remember the empirical or experimental or observed frequency approach to probability.

If n be the total number of trials of an experiment and A is an event associated to it such that A happens in m-trials. Then the empirical probability of happening of event A is denoted byand is given by

Therefore, we have

So, the correct choice is (a).

Answer:

The total number of trials is 6.

Let A be the event that the attendance of a class is more than 75%.

The number of times A happens is 3 (for classes’ VIII, VII and VI).

Remember the empirical or experimental or observed frequency approach to probability.

If n be the total number of trials of an experiment and A is an event associated to it such that A happens in m-trials. Then the empirical probability of happening of event A is denoted byand is given by

Therefore, we have

So, the correct choice is (d).

Answer:

The total number of trials is 50.

Let A be the event that the number on the picked coin is not a prime.

The prime’s lies in between 51 and 100 are 53, 59, 61, 67, 71, 73, 79, 83, 89 and 97. They are 10 in numbers. Therefore the numbers lies between 51 and 100 and which are not primes are in numbers.

So, the number of times A happens is 40.

Remember the empirical or experimental or observed frequency approach to probability.

If n be the total number of trials of an experiment and A is an event associated to it such that A happens in m-trials. Then the empirical probability of happening of event A is denoted byand is given by

Therefore, we have

So, the correct choice is (d).

Answer:

The total number of trials is 10.

Let A be the event that Ronaldo makes a goal in a penalty kick.

The number of times A happens is 4.

Remember the empirical or experimental or observed frequency approach to probability.

If n be the total number of trials of an experiment and A is an event associated to it such that A happens in m-trials. Then the empirical probability of happening of event A is denoted byand is given by

Therefore, we have

So, the correct choice is (d).

Answer:

Three biased coins are tossed 800 times.

∴ Total number of trials = 800

Let E be the event of occurrence of two heads and F be the event of occurrence of all heads.

∴ Probability of occurrence of two heads = P(E) = $\frac{\mathrm{Number} \mathrm{of} \mathrm{trials} \mathrm{of} \mathrm{occurrence} \mathrm{of} \mathrm{two} \mathrm{heads}}{\mathrm{Total} \mathrm{number} \mathrm{of} \mathrm{trials}}=\frac{x}{800}$      .....(1)

Now,

Number of trials of occurrence of all heads (or three heads)

= Total number of trials − Number of trials of occurrence of no head − Number of trials of occurrence of one head − Number of trials of occurrence of two heads

= 800 − 120 − 280 − x

= 400 − x

∴ Probability of occurrence of all heads = P(F) = $\frac{\mathrm{Number} \mathrm{of} \mathrm{trials} \mathrm{of} \mathrm{occurrence} \mathrm{of} \mathrm{all} \mathrm{heads}}{\mathrm{Total} \mathrm{number} \mathrm{of} \mathrm{trials}}=\frac{400-x}{800}$      .....(2)

It is given that,

Probability of occurrence of two heads = 3 × Probability of occurrence of all heads

$\therefore \frac{x}{800}=3\times \left(\frac{400-x}{800}\right)$              [From (1) and (2)]

$\Rightarrow x=1200-3x$

$\Rightarrow 4x=1200$

$\Rightarrow x=\frac{1200}{4}=300$

Thus, the value of x is 300.

Hence, the correct answer is option (c).

Answer:

It is given that an unbiased dice was rolled 800 times.

∴ Total number of trials = 800

Let E be the event of getting a number on the dice which is a perfect square.

Now, 1 and 4 are perfect squares among the outcomes 1, 2, 3, 4, 5 and 6.

∴ Number of trials of getting a number which is perfect square on the dice

= Frequency of getting 1 or 4 on the dice

= 150 + 75

= 225

So, P(Getting a number which is perfect square) = P(E) = $\frac{\mathrm{Number} \mathrm{of} \mathrm{trials} \mathrm{of} \mathrm{getting} \mathrm{a} \mathrm{number} \mathrm{which} \mathrm{is} \mathrm{perfect} \mathrm{square}}{\mathrm{Total} \mathrm{number} \mathrm{of} \mathrm{trials}}=\frac{225}{800}=\frac{9}{32}$

Thus, the probability of getting a number which is a perfect square is $\frac{9}{32}$.

Hence, the correct answer is option (a).

Answer:

Given that,
Total number of bulbs = 100
Number of bad bulbs = 30
Number of good bulbs = 70
$\begin{array}{rcl}\therefore \mathrm{Probability} \mathrm{of} \mathrm{good} \mathrm{bulb}& =& \frac{70}{100}\\ & =& 0.7\end{array}$

Hence, the correct answer is option (b).

Answer:

Given that, 
Total number of students = 100
Number of students having blood group B⁺ = 10
$\begin{array}{rcl}\therefore \mathrm{Required} \mathrm{probability} & =& \frac{10}{100}\\ & =& 0.1\end{array}$

Hence, the correct answer is option (d).

Answer:

Given that,
Total probability = 250
 Probability that its unit digit is less than 2 = 18 + 22
                                                                    = 40
$\begin{array}{rcl}\therefore \mathrm{Required} \mathrm{probability} & =& \frac{40}{250}\\ & =& 0.16\end{array}$

Hence, the correct answer is option (a).