Tuesday, January 23, 2018

Latest Good News for UGC NET-JRF 2018 exam Notification Out



This is a short notice for UGC NET JRF Exam conduct 08 July 2017 (Sunday). CBSE  will be conduct the next UGC -NET for Junior Research Fellowship & Eligibility foe Assistant Professor on 08 July, 2018 (Sunday). As per the revised scheme, the test will consist of two papers: paper 1 asked 50 questions and paper 2 asked 100 questions. All  question s are compulsory.
Age limit for JRF: 30 yrs (Gen), Apply online from 06th March 208. last date for applying online is 05 April, 2018. And application fee can be paid up-to 06 April, 2018.

Sunday, April 9, 2017

UGC NET JRF / SBI PO / IBPS PO / SSC CGL /Rly / other Exam related Important Videos below here: Must Watch


UGC NET JRF / SBI PO / IBPS PO / SSC CGL /Rly other Exam related Important Videos below here: Must Watch


(1) Full Concept of Classification (वर्गीकरण) with Examples
       

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(2) Full Concept of Coding-Decoding (कोडिंगडिकोडिंगwith Examples

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(3) (a) Full Concept of Number Series with Examples: Part -1
 
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(3) (b) Full Concept of Number Series with Examples: Part - 2
         
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(4) Introduction to Basic Research (बुनियादी अनुसंधान का परिचय)(بنیادی تحقیق کا تعارف) 
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(5) CBSE UGC NET paper 1 Syllabus in HINDI 
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(6) CBSE UGC NET/JRF Syllabus Paper-1 in English 
         
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(7) CBSE UGC NET JRF Syllabus (Snapshot) 
          
             
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(8) कैसे डाउनलोड करे (How to Download) CBSE UGC NET/JRF Exam Admit Card Video Tutorials 
                 
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Sunday, April 2, 2017

Number Series


Full Concept of Number Series


Number series can be defined as an arrangement of numbers in a certain order, where some numbers are wrongly put into the series of numbers and some number is missiang in that series, We need to observer and find the accurate number to the series of numbers. 
OR
A Series is a sequence of numbers obtained by some particular predefine rule and also applying that predefined rule it is possible to find out the missing or wrong number in a sequence. The missing or wrong number may be at the beginning or middle or at the end of sequence/next term of series.





           





Different Types of Number Series:
  1. Even Series:
  2. Odd Series:
  3. Prime Series:
  4. Square Series:
  5. Cube Series:
  6. Arithmetic Series:
  7. Geometric Series:
  8. Geometric - Arithmetic Series (GP-AP Series):
  9. Twin Series:
  10. Decimal Series:
  11. Fractional Series:
  12. Half Pattern series:
  13. Multiplication & Addition Series:
  14. Multiplication and Subtraction Series:
  15. Divisible series:
  16. Ration Series:
  17. Difference Series:
  18. Series of Date or Time:
  19. Series of LCM or HCF:
  20. One Line Series:
  21. Two Line Series:
  22. Follow Product series:
  23. By Use of digit-Sum Series:
  24. Odd Number out Series:
  25. Mixed Series:- Series based on a given logic, series based on Square & Cube, etc..

1.) Even Series: The series in which all the numbers are even numbers followed by a sequence, is known as even series.
Example: 2 , 4 , 6 , 8 , 10 , 12 , 14 , 16 , 18 , 20 etc.

2.) Odd Series: The series in which all the numbers are odd numbers followed by a sequence, is known as odd series.
Example: 1 , 3 , 5 , 7 , 9 , 11 , 13 , 15 , 17 , 19 , 21 etc.

3.) Prime Series: The series in which all the numbers are prime numbers followed by a sequence, is known as prime series.
Example: 2 , 3 , 5 , 7 , 11 , 13 , 17 , 19 , 23 , 29 , 31 etc.

4.) Square Series: The series in which all the numbers are squares of natural numbers followed by a sequence is known as square series.(This series can be formed by squaring every successive numbers.)
Example: 1 , 4 , 9 , 16 , 25 , 36 , 49 , 64 , 81 , 100 , 121 etc.


5.) Cube Series: The series in which all the numbers are the cube of natural numbers followed by a sequence, is known as cube series. (This series can be formed by cubing every successive numbers.)
Example: 1 , 8 , 27 , 64 , 125 , 216 , 343 , 512 , 729 etc.


6.) Arithmetic Series: The series in which the difference between each successive terms is constant, is known as arithmetic series. (A succession of numbers is said to be in Arithmetic series if the difference between any term and the term preceding it is constant throughout.)
Example: 84 , 80 , 76 , 72 , 68 , 64 , 60 , 56 , 52 , 48 , 44 etc.


Example : 1 , 4 , 7 , 10 , 13 , ........ , ..........


(A.) Two Tier / Second Degree Arithmetic Series: A series in which the difference between two of successive terms themselves are in the arithmetic series, form a second degree arithmetic series. (The series in which the difference is constant after two steps, is known as two tier arithmetic series.)
Example: 2 , 6 , 12 , 20 , 30 , 42 , 56 , 72 , 90 , 120 etc.


Example: 2 , 3 , 6 , 11 , 18 , ............

(B.) Three Tier / Third Degree Arithmetic Series: A series in which the difference of the successive terms form a second degree Arithmetic series is termed as third degree Arithmetic series. (The series in which the difference is constant after three steps, is known as three tier arithmetic series.)
Example: 336 , 210 , 120 , 60 , 24 , 6 , 0 etc.


Example : 20 , 30 , 42 , 59 , 84 , 120 , ?


    7.) Geometric Series: The series in which the ratio between each successive term is constant, is known as geometric series. (A succession of numbers is said to be in geometric series if the ratio of any term and the term preceding it, is constant throughout.)
    Example: 5 , 45 , 405 , 3645 , ?

    Note: This type of series are based on ascending or descending order of numbers and each successive number is obtain by multiplying or dividing the previous number with a fixed number.
(A.) Two stage type Series: A two tier Arithmetic series is one in which the differences of successive numbers themselves from an arithmetic series.
Example: 4 , 5 , 9 , 16 , 26 , 39


Example : 4 , 12 , 36 , 108 , 324 , ..............

8.) Geometrico - Arithmetic Series (GP-AP/AP-GP Series): The series in which we can get the next term first by multiplying/dividing and then by adding/subtracting, is known as GP-AP series. (It is just reverse of Arithmetico - Geometric Series.)
Example: 3 , 7 , 15 , 31 , 63 , 127 , 255 , 511 , 1023 etc. 


    (9.) Twin Series: As the name suggests, it consists of two series combined into a single series. The alternating terms of this series form an independent series.
    Example: 3 , 5 , 7 , 10 , 12 , 30 , ? , ?

(10.) Decimal Series: Series based on decimal number .
Example: 12 , 6.5 , 7.5 , 12.75 , 27.50 , ?


    (11.) Fractional Series: Series based on Fraction number
    Example: 12/15 , 7/15 , 2/15 , ? , -8/15

    (12.) Half Pattern Series:
    Example: 70 , 40 , 50 , 90 , 200 , ?



       



    (13.) Multiplication & Addition Series:
Example: 5 , 13 , 29 , 61 , 125 , ?


(14.) Multiplication and Subtraction Series:
    Example: 5 , 7 , 11 , 19 , 35 , ?

    (15.) Divisible series: Completely Divisible series
    Example: 12 , 12 , 18 , 45 , 180 , ?

    (16.) Ration Series: All terms while in increasing order multiplied
    Example: 336 , 168 , 84 , 42 , 21 , ?

    (17.) Difference Series:
Example: 1348 , 1338 , 1318 , 1288 , 1248 , ?

    (18.) Series of Date or Time:
Example: 05-01-96 , 27-01-96 , 18-02-96 , ? , 02-04-96

Example: 05.40 , 08.00 , 10.20 , ? , 3.00 , 5.20

(19.) Series of LCM or HCF: Some numbers followed by their LCM or HCF:
Example: 1 , 2 , 3 , 6 , 4 , 5 , 6 , 60 , 5 , 6 , 7 , ___
Example: 8 , 4 , 4 , 7 , 8 , 1 , 3 , 9 , 3 , 2 , 1 , ___

(20.) One Line Series: If the rate of increase/decrease is slow in a series, there must be addition or subtraction. So, the series is an arithmetic series.
Example: 2 , 6 , 12 , 20 , 30 , 42 , 56 , 72 , .......

(21.) Two Line Series: If the rate of increase/decrease is slow, it is a form of arithmetic series. Take the difference between the first term of the two lines. if the first term of second line is greater than the first term of first line, add the difference with the required number of the first line. If the first term of second line is lower than the first term of first line, subtract the difference from the required number of the first line.
Example: 128 , 124 , 118 , 110 , 100
100 , (A) , (B) , (C) , (D)
Find the value of (D).

  1. Follow Product series: Some numbers followed by their product:
    Example: 2 , 3 , 6 , 18 , 108 , ?

  1. By Use of digit-Sum Series:
    Example: 14 , 19 , 29 , 40 , 44 , ? , 59 , 73

  1.  Odd Number out Series: Sometimes a group of numbers is written out.
    Example: 22 , 44 , 88 , 132 , 165 , 191 , 242

(25.) Mixed Series: This types of series are more than one different order are given in a series which arranged in alternatively in a single series or created according to any non-conventional rule.
Example: 11 , 24 , 50 , 102 , 206 , ?

(A) Squares & Cubes mixed Series: This series can be formed by squaring or cubing every successive numbers.
Example : 4 , 6 , 256 , .........
Example : 2 , 8 , 512 , .........

Example : 4 , 27 , 16 , 125 , 36 , 343 , .........
















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