GMAT Exam  >  GMAT Notes  >  Quantitative for GMAT  >  Important Formulas: Arithmetic Progression and Geometric Progression

Important Formulas: Arithmetic Progression and Geometric Progression | Quantitative for GMAT PDF Download


Basic Concept on Arithmetic Progression

First term is denoted by a
Common difference is denoted by d
nth term is denoted by an or tn 
Sum of First n terms is denoted by Sn
Example : 4,8,12,16……..


Formula of Arithmetic Progression

nth term of an AP
  • Formula to find the nth term of an AP is 
  • Tn = a + (n – 1) d 
  • where tn = nth term,
  • a= first term ,
  • d= common difference,
  • n = number of terms in the sequence.

Number of terms in an AP

  • Formula to find the numbers of term of an AP is 
    Important Formulas: Arithmetic Progression and Geometric Progression | Quantitative for GMATwhere
    n = number of terms,
    a = first term,
    l = last term,
    d= common difference.

Sum of first n terms in an AP

Formula to find the sum of first n terms of an AP is
Important Formulas: Arithmetic Progression and Geometric Progression | Quantitative for GMAT

where,
a = first term,
d= common difference,
tn = nth term = a + (n-1)d

Arithmetic Mean

If a, b, c are in AP, then the Arithmetic mean of a and c  is b  i.e.
Important Formulas: Arithmetic Progression and Geometric Progression | Quantitative for GMAT

Some other important formulas of Arithmetic Progression

Sum of first n natural numbers
We derive the formula to find the sum of first n natural numbers
Important Formulas: Arithmetic Progression and Geometric Progression | Quantitative for GMAT

where
S = Sum of first n natural numbers
n = number of First n natural numbers

Sum of squares of first n natural numbers
Formula to find the sum of squares of first n natural numbers is
Important Formulas: Arithmetic Progression and Geometric Progression | Quantitative for GMAT
where
S = Sum of Squares of first n natural numbers
n = number of First n natural numbers.

Sum of first n odd numbers

Formula to Find the Sum of First n odd numbers
S = n2
where
S = Sum of first n odd  numbers
n = number of First n odd numbers.

Sum of first n even numbers
Formula to find the Sum of First n Even numbers is
S = n(n+1)
where
S = Sum of first n Even numbers
n = number of First n Even numbers.

Formulas for GP

Common ratio:
Formula for finding the common ratio
Important Formulas: Arithmetic Progression and Geometric Progression | Quantitative for GMAT

nth term of an GP:

  • Formula for finding the nth term of an GP an=a1rn1 where a1 = First Term,
    r = common ratio and n = number of Terms
Sum of first n terms in an GP:
Standard Formula for sum of first n terms in an GP
  • Important Formulas: Arithmetic Progression and Geometric Progression | Quantitative for GMAT 
    { if r>1} where, r = common ratio, a1 = First Term, n = number of terms
  • Important Formulas: Arithmetic Progression and Geometric Progression | Quantitative for GMAT
     { if r<1} where, r = common ratio, a1 = First Term, n = number of terms

Sum of an infinite GP :
Formula for Sum of an infinite GP
Important Formulas: Arithmetic Progression and Geometric Progression | Quantitative for GMAT
Geometric Mean (GM) : If two non-zero numbers a and b are in GP, then there GM is GM = (ab)1/2

If three non-zero numbers a,b and c are in GP, then there GM is GM = (abc)1/3.

 

The document Important Formulas: Arithmetic Progression and Geometric Progression | Quantitative for GMAT is a part of the GMAT Course Quantitative for GMAT.
All you need of GMAT at this link: GMAT
115 videos|106 docs|113 tests

Top Courses for GMAT

FAQs on Important Formulas: Arithmetic Progression and Geometric Progression - Quantitative for GMAT

1. What is an arithmetic progression?
Ans. An arithmetic progression is a sequence of numbers in which the difference between any two consecutive terms is constant. For example, 2, 5, 8, 11, 14 is an arithmetic progression with a common difference of 3.
2. What is the formula to find the nth term of an arithmetic progression?
Ans. The formula to find the nth term of an arithmetic progression is given by: nth term = first term + (n-1) * common difference. This formula helps in determining any term in the arithmetic progression by substituting the values of the first term, common difference, and the desired position of the term.
3. How can we find the sum of the first n terms of an arithmetic progression?
Ans. The sum of the first n terms of an arithmetic progression can be found using the formula: sum = (n/2) * (2a + (n-1)d), where n is the number of terms, a is the first term, and d is the common difference. This formula provides a quick way to calculate the sum without manually adding each term.
4. Can an arithmetic progression have a negative common difference?
Ans. Yes, an arithmetic progression can have a negative common difference. In such cases, the terms of the progression will be decreasing. For example, -3, -7, -11, -15 is an arithmetic progression with a common difference of -4.
5. How can we determine the number of terms in an arithmetic progression?
Ans. The number of terms in an arithmetic progression can be determined using the formula: number of terms = (last term - first term + common difference) / common difference. This formula calculates the difference between the last term and the first term, and then divides it by the common difference to obtain the total number of terms.
115 videos|106 docs|113 tests
Download as PDF
Explore Courses for GMAT exam

Top Courses for GMAT

Signup for Free!
Signup to see your scores go up within 7 days! Learn & Practice with 1000+ FREE Notes, Videos & Tests.
10M+ students study on EduRev
Related Searches

Summary

,

pdf

,

ppt

,

Previous Year Questions with Solutions

,

Extra Questions

,

Exam

,

Important Formulas: Arithmetic Progression and Geometric Progression | Quantitative for GMAT

,

past year papers

,

Important Formulas: Arithmetic Progression and Geometric Progression | Quantitative for GMAT

,

Viva Questions

,

mock tests for examination

,

Semester Notes

,

Sample Paper

,

study material

,

Objective type Questions

,

shortcuts and tricks

,

practice quizzes

,

Important questions

,

video lectures

,

Free

,

MCQs

,

Important Formulas: Arithmetic Progression and Geometric Progression | Quantitative for GMAT

;