Assignments for Class 9 Mathematics Polynomials have been developed for Standard 9 students based on the latest syllabus and textbooks applicable in CBSE, NCERT and KVS schools. Parents and students can download the full collection of class assignments for class 9 Mathematics Polynomials from our website as we have provided all topic wise assignments free in PDF format which can be downloaded easily. Students are recommended to do these assignments daily by taking printouts and going through the questions and answers for Grade 9 Mathematics Polynomials. You should try to do these test assignments on a daily basis so that you are able to understand the concepts and details of each chapter in your Mathematics Polynomials book and get good marks in class 9 exams.
Key Concepts for Class 9 Mathematics Polynomials
Constants : A symbol having a fixed numerical value is called a constant.
Example : 7, 3, -2, 3/7, etc. are all constants.
Variables : A symbol which may be assigned different numerical values is known as variable.
Example : C = 2π r C – circumference of circle
r – radius of circle
Where 2 & π are constants. while C and r are variable
Algebraic expressions : A combination of constants and variables. Connected by some or all of the operations +, -, X and ÷ is known as algebraic expression
Example : 4 + 9x – 5x2y + 3/8, xy etc
Terms : The several parts of an algebraic expression separated by ‘+’ or ‘-‘ operations are called the terms of the expression
Example : x2 + 2x2y + 4xy2 + y3 + 7 is an algebraic expression containing 5 terms x2, 3x3y, – 4xy2, y3 & 7
Polynomials : An algebraic expression in which the variables involved have only non-negative integral powers is called a polynomial.
(i) 5x3 – 4x2 – 6x – 3 is a polynomial in variable x.
(ii) 5 + 8x3/2 + 4x-2 is an expression but not a polynomial
Polynomials are denoted by p (x), q (x) and r (x) etc.
Coefficients : In the polynomial x3 + 3x2 + 1, coefficient of x3, x2, x are 1,3,3 respectively and we also say that +1 is the constant term in it.
Degree of a polynomial in one variable : In case of a polynomial in one variable the highest power of the variable is called the degree of the polynomial.
Classification of polynomials on the basis of degree.
degree Polynomial Example
(a) 1 Linear x + 1, 2x + 3 etc.
(b) 2 Quadratic etc. ax2 + bx + c etc.
(c) 3 Cubic etc. x3 – 3x2 + 1 etc
(d) 4 Biquadratic x4 – 1
Classification of polynomials on the basis of no. of terms
No. of terms Polynomial & Examples.
(i) 1 Monomial – 5, 3x, 1/3, y etc.
(ii) 2 Binomial – (3 + 6x), (x – 5y) etc.
(iii) 3 Trinomial – 2x2 + 4x + 2 etc.
Constant polynomial : A polynomial containing one term only, consisting a constant term is called a constant polynomial the degree of non-zero constant polynomial is zero.
Zero polynomial : A polynomial consisting of one term, namely zero only is called a zero polynomial.
The degree of zero polynomial is not defined.
Zeroes of a polynomial : Let p (x) be a polynomial. If p (a) = 0, then we say that α is a zero of the polynomial of p(x).
Remark : Finding the zeroes of polynomial p(x) means solving the equation p(x) = 0.
Remainder theorem : Let f (x) be a polynomial of degree n ≥ 1 and let a be any real number. When f (x) is divided by (x – α) then the remainder is (α)
Factor theorem : Let f (x) be a polynomial of degree n > 1 and let a be any real number.
(i) if (α) = 0 then (x – α) is factor of f (x)
(ii) if (x – α) is a factor of f (x) then f (a) = 0
Factor : A polynomial p (x) is called factor of q (x), if p (x) divides q (x) exactly.
Factorization : To express a given polynomial as the product of polynomials each of degree less than that of the given polynomial such that no such a factor has a factor of lower degree, is called factorization.
Example : x2 – 16 = (x + 4) (x – 4)
Methods of Factorization :
Factorization by taking out the common factor
e.g.
36q3b – 60a2bc = 12a2 (3a – 5c)
Factorizing by grouping
ab + bc + ax + cx = (ab + bc) + (ax + cx)
= (a + c) + x(a + c)
= (a + c) (b + x)
Factorization of quadratic trinomials by middle term splitting method.
x2 + bc + c = x2 + (p + q) x + pq
= ( x + p) ( x + q)
Identity : Identity is a equation (trigonometric, algebraic ) which is true for every value of variable.
Some algebraic identities useful in factorization:
(i) (x + y)2 = x2 + 2xy + y2
(ii) (x + y)2 = x2 – 2xy + y2
(iii) x2 – y2 = (x – y) (x +y)
(iv) (x +a) (x + b) = x2 + (a + b) x + ab
(v) (x + y + z)2 = x2 + y2 + z2 + 2xy + 2yz + 2zx
(vi) (x +y)3 = x3 + y3 + 3xy (x – y)
(vii) (x – y)3 = x3 – y3 – 3xy (x – y)
(viii) x3 + y3 + z3 – 3xyz = (x + y + z)(x2 + y2 + z2 – xy – yz -zx)
x3 + y3 + z3 = 3xyz if x + y + z = 0
Class 9 Mathematics Polynomials Assignments
Class 9 Mathematics Polynomials Important Questions and Answers
Question. Write the degree of each of the following polynomial.
(i) 2x – √5
Ans.
1
(ii) 3 – x + x2 – 6x3
Ans.
3
(iii) 9
Ans.
0
(vi) 8x4 – 36x + 5x7
Ans.
4
(v) x9 – x5 + 3x10 + 8
Ans.
9
(vi) 2 – 3x2
Ans.
2
Question. If x/y + y/x = -1 where x ≠ 0, y ≠ 0 then find the value of x3 – y3
Ans.
0
Question. The zeroes of the polynomial p(x) = 3x2 – 1 are
(a) 1/3
(b) 1/√3
(c) -1/√3
(d) 1/√3 and -1/√3
Ans.
1/√3 & -1/√3
Question. Find the zeros of the polynomials given below :
(i) p (x) = x – 5
Ans.
x = 5
(ii) q (x) = x + 4
Ans.
x = – 4
(iii) h (x) = 6x – 1
Ans.
x = 1/6
(vi) p (x) = ax + b
Ans.
x = – b/a
(v) r (x) = x2 + 3x
Ans.
x = 0, x = – 3
(vi) l (x) = x2 + 2x + 1
Ans.
x = – 1, – 1
Question. Which of the following expressions is polynomial?
(i) x5 – 2x3 + x + 7
(ii) y3 – √3y
(iii) 5√z – 6
(iv) x – (1/x)
(v) x108 – 1
(vi) 2vx – 27
(vii) x – 2 + 2x – 1 + 3
Ans.
(i), (ii), (v)
Question. Find the remainder when f (x) = 12x3 – 13x2 – 5x + 7 is divided by (3x + 2)?
Ans.
remainder = 1
Question. Factorize :
(i) 9x2 – 16y2
Ans.
(3x + 4y) (3x – 4y)
(ii) x3 – x
Ans.
x (x + 1) (x – 1)
Question. Find the value of a for which (x – a )is a factor of the polynomial.
f(x) = x5 – a2x3 + 2x + a – 3
Ans.
a = 1
Question. Factorize following expressions.
(i) x2 + 9 x + 18
Ans.
(x + 6) (x + 3)
(ii) x2 – 4x – 21
Ans.
(x -7) (x + 3)
(iii) x2 – 9x + 18
Ans.
(x – 6) (x – 3)
(iv) x2 – 19x + 78
Ans.
(x – 6) (x – 13)
Question. Calculate (997)2 using algebraic identities
Ans.
994009
Question. Factorize:
(i) a (a – 1) – b (b – 1)
Ans.
(a-b) (a+b-1)
Question. Calculate 103 X 107 using algebraic identities
Ans.
11021
Question. Expand (2a + 3b + 4c)2
Ans.
4a2 + 9b2 + 16c2 + 12zb + 12bc + 16ac
Question. Factorize 4x2 + y2 + z2 – 4xy – 2yz + 4xz
Ans.
(2x – y + z)2
Question. Expand
(i) (4a + 5b)2
Ans.
64a3 + 125b3 + 240a2b + 300qb2
(ii) (5x – 3y)3
Ans.
125x3 – 27y3 + 225x2y + 135xy2
Question. Evaluate
(i) (95)3
Ans.
857375
(ii) (106)3
Ans.
1191016
Question. Factorize the following expressions.
(i) 5x2 – 20 xy
Ans.
5x (x – 4y)
(ii) 5a (b + c) – 7b (b + c)
Ans.
(b + c) (5a – 7b)
(iii) x (x – y)2 + 3x2y (x – y)
Ans.
x (x – y) (x – y)
(iv) 6ab – b2 + 12ac – 3bc
Ans.
(b +2c) (6a – b)
(v) x2 + 1/x2 + 2 – 2x – (2/x)
Ans.
Question. Degree of zero polynomial is
(a) 1
(b) 0
(c) not defined
(d) none of these
Ans.
(c) not defined
Question. Factorize a3 + 27b3 + 8c3 – 18abc
Ans.
(a + 3b + 2c) (a2 + 9b2 +4c2 – 3ab – 6bc – 2ac)
Question. Factorize (p – q)3 (q -r)3 (r – p)3
Ans.
3(p – q) (q – r) (r – p)
Question. Find the product (3x – 5y – 4) (9x2 + 25y2 + 15xy + 12x – 20y + 16)
Ans.
27x3 – 125y3 – 64 – 180xy.
Question. Factorize
(i) x3 + 64
Ans.
(x + 4) (x2 – 4x + 16)
(ii) 27x3 + 125y3
Ans.
(3x + 5y) (9x2 – 15xy + 25y)2
(iii) 8a3 – 27b3
Ans.
(2a = 3b) (4a2 + 6ab + 9b2)
(iv) 1- 64a3
Ans.
(1 – 4a) (1 + 4a + 16a2)
Question. Which of the following expression is a polynomial?
Ans.
Question. If (x + 2) and (x – 1) are factors of (x2 + 10x2 + mx + n) then find value of m & n?
Ans.
m = 7, n = -18
Question. If if x + y + z = 9 and xy + yz + zx = 23 then find the value of (x3 + y3 + z3 – 3xyz)?
Ans.
108
Question. For what value of k is the polynomial p (x) = 2x3 – kx2 + 3x + 10 exactly divisible by (x + 2)?
(a) -1/3
(b) 1/3
(c) 3
(d) -3
Ans.
-3
Question. Find the value of (368)2 – (368)2
Ans.
737
Assignments for Class 9 Mathematics Polynomials as per CBSE NCERT pattern
All students studying in Grade 9 Mathematics Polynomials should download the assignments provided here and use them for their daily routine practice. This will help them to get better grades in Mathematics Polynomials exam for standard 9. We have made sure that all topics given in your textbook for Mathematics Polynomials which is suggested in Class 9 have been covered ad we have made assignments and test papers for all topics which your teacher has been teaching in your class. All chapter wise assignments have been made by our teachers after full research of each important topic in the textbooks so that you have enough questions and their solutions to help them practice so that they are able to get full practice and understanding of all important topics. Our teachers at https://www.assignmentsbag.com have made sure that all test papers have been designed as per CBSE, NCERT and KVS syllabus and examination pattern. These question banks have been recommended in various schools and have supported many students to practice and further enhance their scores in school and have also assisted them to appear in other school level tests and examinations. Its easy to take print of thee assignments as all are available in PDF format.
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