NCERT Solutions Class 9 Maths Chapter 2 Polynomials Exercise 2.1
Introduction:
In this exercise/article we will learn about Polynomials. We know variable but i explain variable is x , y , z \(\displaystyle \infty \), coefficient and zero polynomial. The degree of a non - zero constant polynomial is zero. In particular , if \(\displaystyle {{a}_{0}}\,=\,{{a}_{1}}\,=\,{{a}_{2}}\,=\,{{a}_{3}}\,=\,.....\,=\,{{a}_{n}}\,=\,0\) ( all the constants are zero ), we get the zer0 polynomial, which is denoted by 0.
- ( x + y )2 = x2 + 2xy + y2
- ( x - y )2 = x2 - 2xy + y2
- x2 - y2 = ( x + y ) ( x - y )
In addition to the above, we shall study some more algebraic identity and their use in factorisation and in evaluating some given expressions.
NCERT Class 9 Maths Chapter 2 Polynomials :
- NCERT Class 9 Maths Chapter 2 Polynomials Exercise 2.1
- NCERT Class 9 Maths Chapter 2 Polynomials Exercise 2.2
- NCERT Class 9 Maths Chapter 2 Polynomials Exercise 2.3
- NCERT Class 9 Maths Chapter 2 Polynomials Exercise 2.4
- NCERT Class 9 Maths Chapter 2 Polynomials Exercise 2.5
- Extra Questions Class 9 Maths Chapter 2 Polynomials
Class 9 Maths Exercise 2.1 (Page-32)
Q1. Which of the following expressions are polynomials in one variable and Which are not? State reasons for your answer.
(i) 4x2 - 3x + 7
Solution :
We have 4x2 - 3x + 7
In the above case Polynomial only one variable = x
(ii) y2 + √2
Solution :
We have y2 + √2
In the above case Polynomial only one variable = y
(iii) 3√t + t√2
Solution :
We have 3√t + t√2
In the above case in one variable but ( t ) of power is not whole number.
(iv) y + \(\displaystyle \frac{2}{y}\)
Solution :
We have y + \(\displaystyle \frac{2}{y}\)
In the above case in one variable but ( \(\displaystyle {{y}^{{-1}}}\) ) of power is not whole number.
(v) x10 + y3 + t50
Solution :
We have x10 + y3 + t50
In the above case Polynomial is three variable = x , y and t
Q2. Write the coefficients of x2 in each of the following :
(i) 2 + x2 + x
Solution :
We have 2 + x2 + x
The coefficient of x2 = 1
(ii) 2 - x2 + x3
Solution :
We have 2 - x2 + x3
The coefficient x2 = -1
(iii) \(\displaystyle \frac{\pi }{2}{{x}^{2}}\,+\,x\)
Solution :
We have \(\displaystyle \frac{\pi }{2}{{x}^{2}}\,+\,x\)
The coefficient of x2 = \(\displaystyle \frac{\pi }{2}\)
(iv) √2x - 1
Solution :
We have √2x - 1
The coefficient of x2 = 0
Q3. Give one example each of a binomials of degree 35, and of a monomials of degree 100.
Solution :
A binomial of degree 35 = 3x35 + 4
A monomials of degree 100 = 3x100 - 4
NCERT Solutions Class 9 Maths
Q4. Write the degree of each of the following polynomials :
(i) 5x3 + 4x2 + 7x
Solution :
We have 5x3 + 4x2 + 7x
The highest degree of the variable = 3
(ii) 4 - y2
Solution :
We have 4 - y2
The highest degree of the variable = 2
(iii) 5t - √7
Solution :
We have 5t - √7
The highest degree of the variable = 1
(iv) 3
Solution :
We have 3
The highest degree of the variable = 0
Q5. Classify the following as linear , quadratic and cubic polynomials :
(i) x2 + x
Solution :
We have x2 + x
The degree of x2 + x = 2
So, it is a Quadratic polynomial
(ii) x - x3
Solution :
We have x - x3
The degree of x - x3 = 3
So, it is a cubic polynomial
(iii) y + y2 + 4
Solution :
We have y + y2 + 4
The degree of y + y2 + 4 = 2
So, it is a quadratic polynomial
(iv) 1 + x
Solution :
We have 1 + x
The degree of 1 + x = 1
So, it is a linear polynomial
(v) 3t
Solution :
We have 3t
The degree of 3t = 1
So, it is a linear polynomial
(vi) r2
Solution :
We have r2
The degree of r2 = 2
So, it is a quadratic polynomial
(vii) 7x3
Solution :
We have 7x3
The degree of 7x3 = 3
So, it is a cubic polynomial.