As we all know, quantitative aptitude is an important section of the IPMAT entrance exam. Trailing Zeroes is one of the essential concepts under mathematics, and you can expect a few questions from this topic in the exam.

To ease your preparation, we have compiled a list of important IPM Aptitude Trailing zeroes Questions with solutions in this post.

So, why late! Try to practice these questions regularly to enhance your preparation levels.

Conceptual Questions based on Trailing Zeroes

As said above, trailing zeroes is one of the concepts under the IPMAT Syllabus. Before moving on to conceptual questions, it is imperative to understand, What is a trailing zero?.

In simple words, it is a zero digit with no non-zero numbers to the right of it. Let us understand this with an example:

9100340560000

In the above example, there are four trailing zeros. Most of you might think that there are three other zeros in the given number, but they do not count ad trailing zeros because there are non-other zero digits that are less significant.

The number 10000 has four trailing zeros as 1 has four zero digits and no non-zero digit to the right.

How many trailing zeros are in the number 10500?

The number 10500 has only two trailing zeros. Note that there is another zero in the representation of the number, but it doesn't count as trailing zeros because there are non-zero digits to the right of it.

Another vital concept required to understand trailing zero conceptual questions is the factorial of a number. The factorial of a whole number 'n' is defined as the product of that number with every whole number till 1.

For example,

2! = 2 x 1 = 2

3! = 3 x 2 x 1 = 6

4! = 4 x 3 x 2 x 1 = 24

IPM Aptitude Questions & Answers based on Trailing Zeroes

To help you get an idea about the type of trailing zeroes questions asked in ipmat quant section, we have curated important questions that are collected from previous year's IPMAT Question Papers.

Let us check out the IPM trailing zeroes questions with solutions from the post below.

Question 1

Find the Maximum no. of 2’s and 5’s present in the following

10!

40!

100!

Solution

Here in this question, we have to find the number of factors of 2 and 5 present in the given factorial. Calculating the number of 2’s and 5’s can be done manually, but it will be a cumbersome procedure, as shown below.

10! = 10 x 9 x 8 x 7 x 6 x 5 x 4 x 3 x 2 x 1 = 3628800

Factoring terms of 10! In the form of 2’s and 5’s,

10! = (5 x 2) x 9 x (23) x 7 x (3 x 2) x 5 x 22 x 3 x 2 x 1

Counting from the above we have, number of 2’s = 8 and number of 5’s = 2

This method can be used to solve small factorials but wouldn't be convenient for calculating large numbers like 40!

To solve these questions quickly and conveniently, you can use the following trick.

Trick-1:-to find the maximum power of a prime number which is a factor of the given factorial number, we have to divide the factorial by the prime number, then dividing the integer part of the answer again and again by the prime number up till the answer is not smaller than the prime number.

Better Solution

10!

Now solving for 10! using the trick mentioned above, divide 10/2 = 5(as the answer is more significant than 2, we will not stop at this stage), now dividing five by the given prime number we get (5/2 = ) 2 (as we have only to take integer values of the answer), finally 2/2 = 1(as 1 < 2, we will stop at this stage)

Ans = 5+2+1 = 8

This method will be accurate for every prime number available in the factorial.

For calculating no. of 5’s present in 10!

⇒ 10/5 = 2 (as 2 < 5 , we will stop at this stage)

Find the highest value of ‘n’ so that 2n completely divides

10!

100!

150!

Solution

10!

Here we need to find the power of 2 that will completely divide 10! using the concept discussed above, we calculate the maximum capacity of the prime number available in the factors of the factorial number.

Find the highest value of ‘n’ that so that 10n completely divides

100!

250!

Solution

100!

As 10 is not a prime number, we wouldn't be able to use the method used above in question number two. For these questions, factorize the term into prime factors form.

Like 10 = 21 x 51

We now need to find the maximum number of 2 x 5 present in 100! Which can be found using the trick mentioned above.

We need to find the maximum number of 2 x 5 present in 250! Which can be found using the trick mentioned above.

Maximum no. of 2’s present in 250! = 244

⇒ 250/2 = 125

⇒ 125/2 = 62

⇒ 62/2 = 31

⇒ 31/2 = 15

⇒ 15/2 = 7

⇒ 7/2 = 3

⇒ 3/2 = 1

Maximum no. of 5’s present in 250! = 62

⇒ 250/5 = 50

⇒ 50/5 = 10

⇒ 10/5 = 2

Therefore the maximum pairs of 2 x 5 are 62.

Hence answer = 62

Question 2

Find the trailing zeros of 250!.

Solution

The number of trailing zeroes of a number is the highest power of n for which we can completely divide 10n.

Note

Trailing zeros = highest power = highest power of 5

We don't need to calculate the highest power of 2 which we have done above as the deciding factor is the term having minimum power. This is true only in the case of pure factorials, not in cases like 100! x 5200.

Hence answer = 62.

Question 3

Find the number of trailing zeros at the end of the first hundred multiples of 10

Solution:

Before moving to the solution try to solve this question on your own.

Here we need to find the number of trailing zeroes in 10 x 20 x 30 x 40 ……x 1000

⇒ (10 x 1 ) x (10 x 2) x (10 x 3 )…… (10 x 100)

⇒ 10100 x (1 x 2 x 3 x 4 ….. x 100)

⇒ 10100 x 100!

⇒ 10100 x 1024 x N (writing 100! = 1024 x N )

⇒ 10124 x N

Hence answer = 124.

FAQ's

How to find the maximum power of a prime number factor of a given factorial?

To find the maximum power of a prime number which is a factor of the given factorial number, we have to divide the factorial by the prime number, then dividing the integer part of the answer again and again by the prime number up till the answer is not smaller than the prime number.

What is the best reference book for Quantitative Aptitude preparation for the IPMAT exam?

As Quantitative Aptitude consists of two sections, a reference book like Magical book on quicker maths by M Tyra would help you learn tricks to solve mathematical calculation faster using mental calculation.

What is the best IPMAT revision technique after the syllabus is completed?

The best way to boost your score in the last few months is to take mock examinations and utilize all of the strategies and tricks stated above in a scheduled mock exam. Practising mock examinations will not only help you improve your speed and accuracy on exam day, but it will also allow you to evaluate your level of preparation.

How can I improve my accuracy during the IPMAT Maths Preparation?

You can easily improve your speed and accuracy in the IPMAT Exam by solving as many sample papers as possible. Practicing mock tests would definitely improve your time management skills and problem-solving techniques. So, it is advisable to solve mock tests on a daily basis.

Which is the best Study Material for IPMAT Quant Preparation?

For cracking quantitative ability section, refer to R.D. Sharma or R.S. Aggarwal book. It includes all the concepts from 12th standard explained in depth. It is also easily understandable without any tutor.

Do I need to take specific coaching for IPMAT Maths?

It solely depends on you whether you need to take IPMAT coaching or not. If your fundamentals are strong, then it is easy to crack the exam just by solving previous year sample papers and Mock tests. However, if you want to improve your fundamentals then opting for coaching is beneficial.