**Number Type Test**

**Reasoning** is one of the most important section in a *Competitive exam*. A good score in Reasoning test can lead you to score very good marks in competitive exams. Only a deep knowledge of reasoning skills can give you a good marks. Logically and type wise reasoning can be divided into few more sections. Number Type Test is one of them.

Number Type Test is a very important chapter of Reasoning aptitude tests. Few reasoning questions in your exam will surely come from this chapter. Now we will show you the process of solving the Number Type Test reasoning questions in a very easy and quick manner. This will help in your examination to solve Number Type Test reasoning questions. Reasoning shortcut tricks is all about quickly and accurately solve reasoning questions in exams. Here we will show you the method of *“How to solve Reasoning using shortcut tricks”*.

### Few Important things to Remember

One of the most important thing in every exams is Time. You need to finish your examination within time. But in competitive exams, your calculation ability is tested. They tests, how you do your calculation within time. They tests, how quickly a student can solve a question paper. For this reason, many students won’t complete their paper within the given time space. But if you use tricks of reasoning and Number Type Test then it will help you to solve bank, government or any other exam paper much faster.

We provide so many shortcut tricks and online tests here in www.ReasoningTricks.com. Carefully learn those shortcut tricks. Learn every topic and every chapter of reasoning Then buy reasoning books from the market or reasoning PDF from online. You can also download reasoning eBooks from online if it’s free. Then use the practice set and solve those reasoning MCQ questions using tricks which you will learn here in www.ReasoningTricks.com. Now you can notice the difference between usage of reasoning tricks and non usage of reasoning tricks. Go through our reasoning notes on Number Type Test will help to get success in your examination.

Now we will discuss few important reasoning question answer and also discuss Number Type Test chapter in detail.

### Example #1

How many 1’s are there

### in number sequence that immediately followed by 3 and not immediate preceded by 1.

2 3 4 1 3 9 5 6 8 4 1 3 9 4 1 3 3 2 5 4 8 4 1 3 9 4 3 2

Solution:

Four in number sequence that immediately followed by 3 and not immediate preceded by 1.

2 3** [ 4 1 3 ]** 9 5 6 8 **[ 4 1 3 ]** 9 **[ 4 1 3 ]** 3 2 5 4 8 **[ 4 1 3 ]** 9 4 3 2

### Example #2

How many odd number are there in sequence which is followed by even number and immediately preceded by odd number ?

2 4 7 2 8 7 2 2 9 1 7 4 2 2 4 4 8 8 3 7 6 9 9 7 3 7 1 3 7 7 7 8

Solution:

There are three which is followed by even number and immediately preceded by odd number .

2 4 7 2 8 7 2 2 9** [ 1 7 4 ]** 2 2 4 4 8 8 **[ 3 7 6 ]** 9 9 7 3 7 1 3 7** [ 7 7 8 ]**

### Example #3

How many even number are there in sequence which is followed by even number and immediately preceded by odd number ?

3 4 7 5 3 2 8 9 5 8 7 1 3 9 4 1 2 3 2 8 3 4 5 5 6 3 2 8 9 4 3

Solution:

There are three which is followed by even number and immediately preceded by odd number .

3 4 7 5 **[ 3 2 8 ]** 9 5 8 7 1 3 9 4 1 2 **[ 3 2 8 ]** 3 4 5 5 6 **[ 3 2 8 ]** 9 4 3

### Example #4

Find the number 6’s there in the following numbers sequence that is exactly divisible by its immediate preceded number and also followed numbers ?

1 7 2 6 7 7 2 6 3 7 8 5 4 5 8 8 9 7 1 3 2 6 3 1 3 9 7 1 3 2 6 3

Solution:

Here three 6’s are present which exactly divisible by its immediate preceded number and also followed numbers.

1 7 2 6 7 7 **[ 2 6 3 ]** 7 8 5 4 5 8 8 9 7 1 3 **[ 2 6 3 ]** 1 3 9 7 1 3 **[ 2 6 3 ]** 1

### Example #5

Count 9 in the numbers sequence which is followed by 7 and preceded by either 4 or 5. How many 9 are there in the sequence ?

1 2 3 7 8 9 1 4 9 7 3 6 9 8 1 5 3 5 9 7

Solution:

Two 9 are present which is followed by 7 and preceded by either 4 or 5.

1 2 3 7 8 1 **[ 4 9 7 ]** 3 6 9 8 1 5 3** [ 5 9 7 ]** 1 1 2 7

### Example #6

Count the numbers in the given sequence numbers, which have equal frequency ?

1 5 4 8 9 7 1 5 4 7 8 9 1 6 5 7 8 9 2 4 7 5 6 8 9 2 6 5 4 7 9 2 4 5 8 7 4 6 9 8 3 9 5 4 6 9 7 3 4 5 8 3

Solution:

1’s has three times and 2 has three times and 3 has three times present in this number sequence.

**[ 1 ]** 5 4 8 9 7 **[ 1 ]** 5 4 7 8 9 **[ 1 ]** 6 5 7 8 9 **[ 2 ]** 4 7 5 6 8 9 **[ 2 ]** 6 5 4 7 9 **[ 2 ]** 4 5 8 7 4 6 9 8 **[ 3 ]** 9 5 4 6 9 7 **[ 3 ]** 4 5 8 **[ 3 ]**

### Example #7

Find out how many times 2, 3, and 7 have present together, and always 3 in middle and 2 and 7 places either side of 3 ?

1 1 1 1 3 3 2 2 2 3 7 7 3 3 3 6 6 4 7 3 2 4 9 8 7 7 3 2 3 3 3 4 4 2 3 7

Solution:

Four times 3 present together with 2 and 7, where 2 and 7 present either side of 3.

1 1 1 1 3 3 2 2** [ 2 3 7 ]** 7 3 3 3 6 6 4 **[ 7 3 2 ]** 4 9 8 7 **[ 7 3 2 ]** 3 3 3 4 4 **[ 2 3 7 ]**

### Example #8

How many even number are there in sequence which is followed by odd number and not immediately preceded by odd number ?

6 8 6 4 8 7 1 4 4 5 8 2 4 4 4 1 8 8 6 6 8 6 8 6 4 8 8 6 7

Solution:

Three number are there in sequence which is followed by odd number and not immediately preceded by even number 487, 441, 867

6 8 6 **[ 4 8 7 ]** 1 4 4 5 8 2 4 **[ 4 4 1 ]** 8 8 6 6 8 6 8 6 4 8 **[ 8 6 7 ]**

### Example #9

Find out how many numbers from 1 to 25 which are exactly divisible 3, and arranged in ascending order ?

1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25

Solution:

6 9 12 15 18 21 24 divisible by 3 in ascending order.

1 2 3 4 5 **[ 6 ]** 7 8 **[ 9 ]** 10 11 **[ 12 ]** 13 14 **[ 15 ]** 16 17 **[ 18 ]** 19 20 **[ 21 ]** 22 23 **[ 24 ]** 25

### Example #10

How many 3 are there in the following list in which followed by 9 and preceded 2, 3, or 4 ?

1 1 2 3 9 4 4 5 5 5 5 3 3 9 8 7 7 7 8 8 8 5 5 4 3 9 6 6 6 6

Solution:

Three numbers in which followed by 9 and preceded 2, 3, or 4

1 1 **[ 2 3 9 ] **4 4 5 5 5 5 **[ 3 3 9 ]** 8 7 7 7 8 8 8 5 5 **[ 4 3 9 ]** 6 6 6 6

**You may also like to see:**

In question no. 4, there will be also a 6(2 6 1) present, which is exactly divisible by immediate preceded number and also followed number. so total number of 6’s should be 4.

24+56=98

37+48=54

45+30=100

56+22=?