maths notes Arithmetic Prograesslons
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Answer:
Sequences, Series and Progressions
Step-by-step explanation:
Arithmetic Progression
An arithmetic progression (A.P) is a progression in which the difference between two consecutive terms is constant.
Example: 2, 5, 8, 11, 14…. is an arithmetic progression.
To know more about AP, visit here.
Common Difference
The difference between two consecutive terms in an AP, (which is constant) is the “common difference“(d) of an A.P. In the progression: 2, 5, 8, 11, 14 …the common difference is 3.
As it is the difference between any two consecutive terms, for any A.P, if the common difference is:
positive, the AP is increasing.
zero, the AP is constant.
negative, the A.P is decreasing.
Answer:
Get the complete notes on arithmetic progressions class 10. In this article, we are going to discuss the introduction to Arithmetic Progression (AP), general terms, and various formulas in AP such as the sum of n terms of an AP, nth term of an AP and so on in detail.
Introduction to AP
Sequences, Series and Progressions
A sequence is a finite or infinite list of numbers following a certain pattern. For example: 1, 2, 3, 4, 5… is the sequence, which is infinite.sequence of natural numbers.
A series is the sum of the elements in the corresponding sequence. For example: 1+2+3+4+5….is the series of natural numbers. Each number in a sequence or a series is called a term.
A progression is a sequence in which the general term can be can be expressed using a mathematical formula.
Arithmetic Progression
An arithmetic progression (A.P) is a progression in which the difference between two consecutive terms is constant.
Example: 2, 5, 8, 11, 14…. is an arithmetic progression.
To know more about AP, visit here.
Common Difference
The difference between two consecutive terms in an AP, (which is constant) is the “common difference“(d) of an A.P. In the progression: 2, 5, 8, 11, 14 …the common difference is 3.
As it is the difference between any two consecutive terms, for any A.P, if the common difference is:
positive, the AP is increasing.
zero, the AP is constant.
negative, the A.P is decreasing.
Finite and Infinite AP
A finite AP is an A.P in which the number of terms is finite. For example: the A.P: 2, 5, 8……32, 35, 38
An infinite A.P is an A.P in which the number of terms is infinite. For example: 2, 5, 8, 11…..
A finite A.P will have the last term, whereas an infinite A.P won’t.
To know more about Finite and Infinite AP, visit here.
General Term of AP
The nth term of an AP
The nth term of an A.P is given by Tn=a+(n−1)d, where a is the first term, d is a common difference and n is the number of terms.
The general form of an AP
The general form of an A.P is: (a, a+d,a+2d,a+3d……) where a is the first term and d is a common difference. Here, d=0, OR d>0, OR d<0
Sum of Terms in an AP
The formula for the sum to n terms of an AP
The sum to n terms of an A.P is given by:
Sn=n/2(2a+(n−1)d)
Where a is the first term, d is the common difference and n is the number of terms.
The sum of n terms of an A.P is also given by
Sn=n/2(a+l)
Where a is the first term, l is the last term of the A.P. and n is the number of terms.
Arithmetic Mean (A.M)
The Arithmetic Mean is the simple average of a given set of numbers. The arithmetic mean of a set of numbers is given by:
A.M= Sum of terms/Number of terms
The arithmetic mean is defined for any set of numbers. The numbers need not necessarily be in an A.P.
Basic Adding Patterns in an AP
The sum of two terms that are equidistant from either end of an AP is constant.
For example: in an A.P: 2,5,8,11,14,17…
T1+T6=2+17=19
T2+T5=5+14=19 and so on….
Algebraically, this can be represented as
Tr+T(n−r)+1=constant
Sum of first n natural numbers
The sum of first n natural numbers is given by:
Sn=n(n+1)/2
This formula is derived by treating the sequence of natural numbers as an A.P where the first term (a) = 1 and the common difference (d) = 1.
Step-by-step explanation: