Class 9 Exam  >  Class 9 Notes  >  RD Sharma Solutions for Class 9 Mathematics  >  RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics PDF Download

Q1. If f(x) = 2x3–13x2+17x+12 , Find

1. f(2)
2. f(-3)
3. f(0)

Sol :

The given polynomial is f(x) = 2x3–13x2+17x+12

1. f(2)

we need to substitute the ‘2‘ in f(x)

f(2) = 2(2)3–13(2)2+17(2)+12

= (2 * 8) – (13 * 4) + (17 * 2) + 12

= 16 – 52 + 34 + 12

= 10

therefore f(2) = 10

2. f(-3)

we need to substitute the ‘ (-3) ‘ in f(x)

f(-3) =2(−3)3–13(−3)2+17(−3)+12

= (2 * -27) – ( 13 * 9) – ( 17 * 3) + 12

= -54 – 117 – 51 + 12

= -210

therefore f(-3) = -210

3. f(0)

we need to substitute the ‘(0)‘ in f(x)

f(0) = 2(0)3–13(0)2+17(0)+12

= ( 2 * 0) – ( 13 * 0) + (17 * 0) + 12

= 0 – 0 + 0 + 12

= 12

therefore f(0) = 12


Q2. Verify whether the indicated numbers are zeros of the polynomial corresponding to them in the following cases :

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics
RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

Sol :

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

we know that ,

f(x) = 3x + 1
RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

= -1 + 1

= 0

Since, the result is 0 RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics is the root of 3x + 1

(2) f(x) = x2–1,x = (1,−1)

we know that,

f(x) = x2 – 1

Given that x = (1 , -1)

substitute x = 1 in f(x)

f(1) = 12 – 1

= 1 – 1

= 0

Now , substitute x = (-1) in f(x)

f(-1) = (−1)2 – 1

= 1 – 1

= 0

Since , the results when x = (1 , -1) are 0 they are the roots of the polynomial f(x) = x2 – 1

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

Sol :

We know that

g(x) = 3x2–2

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

= 4 – 2

= 2 ≠ 0
Now, Substitute RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics
RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

Since, the results when RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics are not 0, they are roots of 3x2–2

(4) p(x) = x3–6x2+11x–6 , x = 1, 2, 3

Sol :

We know that ,

p(x) = x3–6x2+11x–6

given that the values of x are 1, 2 , 3

substitute x = 1 in p(x)

p(1) = 13–6(1)2+11(1)–6

= 1 – (6 * 1) + 11 – 6

= 1 – 6 + 11 – 6

= 0

Now, substitute x = 2 in p(x)

P(2) =23–6(2)2+11(2)–6

= (2 * 3) – ( 6 * 4) + ( 11 * 2) – 6

= 8 – 24 – 22 – 6

= 0

Now, substitute x = 3 in p(x)

P(3) = 33–6(3)2+11(3)–6

= ( 3 * 3) – (6 * 9) + (11 * 3) – 6

= 27 – 54 + 33 – 6

= 0

Since , the result is 0 for x = 1, 2, 3 these are the roots of x3–6x2+11x–6

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

we know that ,

f(x) = 5x–π

Given that , x = 4/5

Substitute the value of x in f(x)

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

= 4 – π

≠ 0

Since , the result is not equal to zero ,  x = 4/5 is not the root of the polynomial 5x – π

(6) f(x) = x2 , x = 0

Sol :

we know that , f(x) = x2

Given that value of x is ‘ 0 ’

Substitute the value of x in f(x)

f(0) = 02

= 0

Since, the result is zero , x = 0 is the root of x2

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

Sol :

We know that,

f(x) = lx + m

Given , that   RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

Substitute the value of x in f(x)

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

= -m + m

= 0  RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics  is the root of lx + m

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

Sol :

We know that ,

f(x) = 2x + 1

Given that x = 1/2

Substitute the value of x and f(x)

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

= 1 + 1

= 2 ≠ 0

Since , the result is not equal to zero

x = 1/2 is the root of 2x + 1


Q3. If x = 2 is a root of the polynomial f(x) = 2x2–3x+7a, Find the value of a

Sol :

We know that , f(x) = 2x2–3x+7a

Given that x = 2 is the root of f(x)

Substitute the value of x in f(x)

f(2) = 2(2)2–3(2)+7a

= (2 * 4) – 6 + 7a

= 8 – 6 + 7a

= 7a + 2

Now, equate 7a + 2 to zero

⇒ 7a + 2 = 0

⇒ 7a = -2

⇒  RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

The value of RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics


Q4. If  RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics is zero of the polynomial p(x) = 8x3–ax2–x+2 , Find the value of a

Sol :

We know that , p(x) = 8x3–ax2–x+2

Given that the value of  RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

Substitute the value of x in f(x)

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics
RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

To , find the value of a , equate  RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics to zero

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

On taking L.C.M

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics  

⇒ 6 – a = 0

⇒ a = 6


Q5. If x = 0 and x = -1 are the roots of the polynomial f(x) = 2x3–3x2+ax+b , Find the of a and b.

Sol :

We know that ,  f(x) = 2x3–3x2+ax+b

Given , the values of x are 0 and -1

Substitute x = 0 in f(x)

f(0) = 2(0)3–3(0)2+a(0)+b

= 0 – 0 + 0 + b

= b     ——— 1

Substitute x = (-1) in f(x)

f(-1) = 2(−1)3–3(−1)2+a(−1)+b

= -2 – 3 – a + b

= -5 – a + b    ———— 2

We need to equate equations 1 and 2 to zero

b = 0 and -5 – a + b = 0

since, the value of b is zero

substitute  b = 0 in equation 2

⇒ -5 – a = -b

⇒ -5 – a = 0

a = -5

the values of a and b are -5 and 0 respectively


Q6. Find the integral roots of the polynomial f(x) = x3+6x2+11x+6

Sol :

Given , that f(x) = x3+6x2+11x+6

Clearly we can say that, the polynomial f(x) with an integer coefficient and the highest degree term coefficient which is known as leading factor is 1.

So, the roots of f(x) are limited to integer factor of 6, they are

±1, ±2, ±3, ±6

Let x = -1

f(-1) = (−1)3+6(−1)2+11(−1)+6

= -1 + 6 -11 + 6

= 0

Let x = -2

f(-2) = (−2)3+6(−2)2+11(−2)+6

= -8 – (6 * 4) – 22 + 6

= -8 + 24 – 22 + 6

= 0

Let x = -3

f(-3) = (−3)3+6(−3)2+11(−3)+6

= -27 – (6 * 9) – 33 + 6

= -27 + 54 – 33 + 6

= 0

But from all the given factors only -1 , -2 , -3 gives the result as zero .

So, the integral multiples of x3+6x2+11x+6 are -1 , -2 , -3


Q7. Find the rational roots of the polynomial f(x) = 2x3+x2–7x–6

Sol :

Given that f(x) = 2x3+x2–7x–6

f(x) is a cubic polynomial with an integer coefficient . If the rational root in the form of p/q , the values of p are limited to factors of 6 which are ±1, ±2, ±3, ±6

and the values of q are limited to the highest degree coefficient i.e 2 which are ±1, ±2

here, the possible rational roots are

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

Let , x = -1

f(-1) = 2(−1)3+(−1)2–7(−1)–6

= -2 + 1 +7 – 6

= -8 + 8

= 0

Let , x = 2

f(-2) = 2(2)3+(2)2–7(2)–6

= ( 2 * 8) + 4 -14 – 6

= 16 + 4 -14 – 6

= 20 – 20

= 0

RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics

But from all the  factors only -1 , 2 and −3/2 gives the result as zero

So, the rational roots of 2x3+x2–7x–6 are -1, 2 and −3/2

The document RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths | RD Sharma Solutions for Class 9 Mathematics is a part of the Class 9 Course RD Sharma Solutions for Class 9 Mathematics.
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FAQs on RD Sharma Solutions Ex-6.2, Factorization Of Polynomials, Class 9, Maths - RD Sharma Solutions for Class 9 Mathematics

1. What is factorization of polynomials?
Ans. Factorization of polynomials is the process of expressing a given polynomial as a product of its factors. It helps in simplifying complex polynomials and finding their roots or solutions.
2. How do you factorize a polynomial?
Ans. To factorize a polynomial, we look for common factors and then use various methods such as grouping, using identities, or trial and error method to break down the polynomial into its factors. The factors are then multiplied together to obtain the original polynomial.
3. What are the benefits of factorizing polynomials?
Ans. Factorization of polynomials helps in simplifying complex expressions, finding the roots or solutions of equations, and identifying patterns or relationships among the terms of the polynomial. It also allows us to perform operations such as addition, subtraction, and division of polynomials more easily.
4. Can all polynomials be factorized?
Ans. No, not all polynomials can be factorized. Some polynomials may have irreducible factors or prime factors that cannot be further simplified. However, most polynomials can be factorized using appropriate methods and techniques.
5. How is factorization of polynomials useful in real-life applications?
Ans. Factorization of polynomials is used in various real-life applications such as engineering, physics, economics, and computer science. It helps in solving problems related to optimization, finding roots of equations, analyzing data patterns, and modeling real-world situations. By factorizing polynomials, we can simplify complex problems and make them easier to understand and solve.
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