RD Sharma Chapter 5 Class 10 Maths Solutions Exercise 5.4 - Arithmetic Progress covers all the major fields such as Arithmetic Progress, the ninth term of an AP and the sum of terms given the first n of an AP. RD Sharma Chapter 5 Class 10 Maths Solutions Exercise 5.4 allow you to develop a deeper understanding of what sequences are, what is arithmetic progression, how to describe a sequence by writing the algebraic formula of the given terms, how to find the sum of the given terms of AP, And how to solve various problems. Verbs related to arithmetic progression.

RD Sharma Chapter 5 Class 10 Maths Exercise 5.4 Solutions consists of 27 questions. Question 1 has 7 sub-parts and Question 2 has 5 sub-parts, all of which ask you to determine the ninth term of a series. Question 3 has 3 subtypes that ask you to guess whether the given words belong to AP. Question 4 has 4 subtypes, all of which ask you to determine the total number of words in a given AP. Questions 5 to 27 are based on the total number of words in the word series and word problems on the concept of finding total words.

Download RD Sharma Chapter 5 Class 10 Maths  Solutions Exercise 5.4

.pdfobject-container { height: 500px;}.pdfobject { border: 1px solid #666; }

RD SHARMA Solutions Class 10 Maths Chapter 9 Ex 9.4

Important Definition for RD Sharma Chapter 5 Class 10 Maths Solutions Exercise 5.4

• Arithmetic Progressions 

In this chapter, you will first learn that every entry in a series of numbers is known as a ‘term’. An arithmetic progression (AP) is a series of several numbers, where every term is obtained by adding a particular number to the preceding. The first term is excluded from this process. This specific number is called the common difference of the AP, which can be positive, negative or zero. An arithmetic progression can be represented in a general form as below

a, a + d, a + 2d, a + 3d, and so on.

where, the first term is ‘a’, and the common difference ‘d’.

Here you will also learn that an arithmetic progression with a fixed number of terms is known as finite AP and it contains an end term, that is the last term of A.P.The A.P. which doesn’t contain any last term is known as infinite AP.

In general, an AP can be represented as – a1, a2 … an, and d = ak + 1 – ak.

where ak + 1 and ak are the (k + 1) th and the kth terms respectively. 

So, a given series of numbers a1, a2, a3 . . . is called an Arithmetic Progression, provided that the differences a2 – a1, a3 – a2, a4 – a3 … give the same value.

• nth term of an AP.

The nth term of an Arithmetic Progression is given by the general formula 

an = a + (n – 1) d. 

Here, the first term is ‘a’ and the common difference is’d’. Here, an is also called the general term of the AP Suppose, there are m terms in the AP, then am represents the last term which can also be denoted by the term l.

• Sum of First nTerms of an AP.

The general equation for calculating the sum of the first n terms of an AP is as follows.

S = n/2 [2a + (n-1) d]

Summation of all the terms of a given AP is given by the following equation.

S = n/2 (a + l)

Where, l is the last term (or the nth term) of the given finite AP The total of first n terms of the AP is denoted by Sn, rather than using the term S.

Know more at the official website.

FAQs on RD Sharma Chapter 5 Class 10 Maths Solutions Exercise 5.4

From where can I download Ex 5.4 class 10 RD Sharma PDF?

How to represent an arithmetic progression as per RD Sharma class 10 exercise 5.4 solutions?

How much will it cost to download the Exercise 5.4 class 10 RD Sharma PDF?