NCERT Solutions for Polynomials Exercise 2.4 Class 9 Maths
Exercise 2.4 Class 9 Maths: NCERT solutions for class 9 maths, exercise 2.4 includes factorisation of polynomials which provides a detailed and stepwise explanation of each answer to the questions in the exercises given in the textbooks. The NCERT solutions are prepared as per the guidelines set by the CBSE board. The solutions are available in the form of PDFs which students can download for and save for future reference.
NCERT solutions for polynomials, Exercise 2.4, class 9 Maths curated by Embibe are comprehensive and understandable for the students. Students must practice the in-text questions provided in the solutions to crack the examination. The solutions are created by the experts in Embibe who have great knowledge of the chapter. In this article, we will provide you with the details of the chapter, the benefits of studying through Embibe and the important questions.
NCERT Solutions for Polynomials Exercise 2.4 Class 9 Maths – Overview
NCERT solutions for class 9 maths, exercise 2.4 are provided in PDF format. Before moving toward the PDFs. Let’s focus on the overview
NCERT Solutions for Class 9 Maths Chapter 2 Exercise 2.4: Download PDFs
NCERT Solutions for Polynomials Exercise 2.4 Class 9 Maths are available in PDF format which students can access and download for. They can also download for future reference. The students can effectively prepare for their class 9 final examinations. Students can prepare from the in-text questions. The solutions help students get a fair knowledge of all the concepts that are covered in NCERT books.
Students can start studying from NCERT solutions for class 9 maths chapter 2 exercise 2.4 to come out in flying colours. students can download the solutions in offline mode. Here we have provided all the solutions for the student’s reference.
About Class 9 Maths Chapter 2 Exercise 2.4 – Polynomials
The polynomial expression in class 9 Maths Chapter 2 Exercise 2.4 – Polynomials is an equation made from the variables or intermediate variables, terms, exponents and constants. It is an exercise of the chapter followed by exercise 2.3 which involves numerical problems. Here, we will focus on the factorisation of polynomials. The class 9 maths, chapter 2, exercise 2.4 includes some basic practice problems on the polynomials chapter consisting of factorization of higher degree polynomials with the linear polynomials in the reverse order.
The initial questions of NCERT solutions for maths 9, chapter 2, exercise 2.4 is to determine the factor of a given polynomial expression. Later, the questions of class 9, chapter 2, exercise 2.4 is to factorize the given polynomial expression by splitting the term.
Exercise 2.4 Class 9 Maths, chapter 2 Polynomials consists of the below topics and subtopics:
Polynomials
Introduction
Polynomials In One Variable
Zeroes Of A Polynomial
Remainder Theorem
Factorisation Of Polynomials
Algebraic Identities
Summary
Advantages of studying NCERT Solutions for Class 9 Maths Chapter 2 Exercise 2.4 from Embibe
There are various advantages of NCERT solutions for class 9 maths, chapter 2, Exercise 2.4 from Embibe as the solutions are prepared by SMEs at Embibe
The NCERT solutions at Embibe are curated as per the latest CBSE guidelines.
The subject matter experts explain all the concepts in an easy and more understanding way.
The solutions are in an elaborated manner to help students prepare effectively and get factual information.
The NCERT Solutions for polynomials Exercise 2.4, class 9, are of cost and students can download for and save it for future reference and revisions.
The NCERT solutions include in-text questions that are provided in CBSE class 9 textbooks.
The NCERT solutions help students to prepare for various competitive exams like JEE Main, NEET, and BITSAT as they enhance their conceptual knowledge.
The NCERT solutions help students to solve their homework problems on time.
The NCERT solutions provided by Embibe are comprehensive in nature.
The solutions provided by Embibe have various types of questions to familiarize the students with the questions asked in the examination.
NCERT Solutions for Class 9 Maths Chapter 2 Exercise 2.4- Important Questions:
Determine which of the following polynomials has\[\left( {x + 1} \right)\] a factor: i. \[{x^3} + {x^2} + x + 1\]
2. Use the Factor Theorem to determine whether g(x) is a factor of p(x) in each of the following cases:
Use the Factor Theorem to determine whether g(x) is a factor of p(x) in each of the following cases:
Use the Factor Theorem to determine whether g(x) is a factor of p(x) in each of the following cases:(i) p(x) = 2×3+x2–2x–1, g(x) = x+1
Find the value of k, if x–1 is a factor of p(x) in each of the following cases: p(x) = x2+x+k.
FAQs Related to NCERT Solutions for Class 9 Maths Chapter 2 Exercise 2.4
Below are the frequently asked questions with answers about NCERT solutions for class 9 maths chapter 2 exercise 2.4
Q.1: What is the factorisation theorem? Ans: A polynomial function will have the same number of factors as its degree, with each component having the form (xc), where c is a complex number.
Q.2: What is the middle term theorem? Ans: The process of finding the square roots/zeroes of the equation ax² + bx + c= 0 means we have to find that roots whose sum = -(b/a) and the product is equal to c/a
Q.3: Where can we download the PDFs for Class 9 Maths Chapter 2 Exercise 2.4? Ans: We can find the PDFs for NCERT Solutions for Polynomials Exercise 2.4 Class 9 Maths in the above article.
Q.4: What is the degree of constant polynomial expression? Ans: The degree of constant polynomial expression is zero.
Q.5: Can we factorise polynomial of any degree? Ans: No, we cannot factories special types of polynomials called the sequence of binomial.
I hope the above article about NCERT Solutions class 9 maths chapter 2 exercise 2.4 is helpful for the candidates who are studying for the class 9 exam. This also will be helpful to prepare for various competitive exams. Take mock tests provided by Embibe. For any doubts and queries, reach out to us in through the comments section below.