NCERT Solutions Class 10th Maths Chapter – 2 Polynomials Exercise – 2.4

NCERT Solutions Class 10th Maths Chapter – 2 Polynomials

TextbookNCERT
Class10th
SubjectMathematics
Chapter2nd
Chapter NamePolynomials
GradeClass 10th Mathematics
Medium English
Sourcelast doubt

NCERT Solutions Class 10th Maths Chapter – 2 Polynomials Exercise – 2.4 were prepared by Experienced Lastdoubt.com Teachers. Detailed answers of all the questions in Chapter 2 maths class 10 Polynomials Exercise 2.4 provided in NCERT TextBook. 

NCERT Solutions Class 10th Maths Chapter – 2 Polynomials

Chapter – 2

Polynomials

Exercise – 2.4

Ncert Solution Class 10th (Chapter – 2) Exercise – 2.4 Question No. 1

1. Verify that the numbers given alongside of the cubic polynomials below are their zeroes. Also verify the relationship between the zeroes and the coefficients in each case:

(i) 2x3 + x2– 5x + 2; – 1/2, 1, – 2

Solution: Given,
p(x) = 2x3+ x2– 5x + 2
And zeroes for p(x) are = 1/2, 1, – 2
∴ p(1/2) = 2(1/2)3 + (1/2)2– 5(1/2) + 2 = (1/4) +(1/4) – (5/2) + 2 = 0
p(1) = 2(1)3+ (1)2– 5(1) + 2 = 0
p(- 2) = 2(- 2)3+ (- 2)2– 5(- 2) + 2 = 0
Hence, proved 1/2, 1, -2 are the zeroes of 2x3 + x2– 5x + 2.
Now, comparing the given polynomial with general expression, we get;
∴ ax3+ bx2 + cx + d = 2x3 + x2– 5x + 2
a = 2, b = 1, c = – 5 and d = 2
As we know, if α, β, γ are the zeroes of the cubic polynomial ax3+ bx2 + cx + d , then;
α + β + γ = – b/a
αβ + βγ + γα = c/a
α βγ = – d/a.
Therefore, putting the values of zeroes of the polynomial,
α + β + γ = ½ + 1 + (- 2) = -1/2 = – b/a
αβ + βγ + γα = (1/2 × 1) + (1 × – 2) + (- 2 × 1/2) = – 5/2 = c/a
α β γ = ½ × 1 × (- 2) = – 2/2 = – d/a
Hence, the relationship between the zeroes and the coefficients are satisfied.

(ii) x3– 4x2 + 5x – 2 ;2, 1, 1

solution: Given,
p(x) = x3– 4x2 + 5x – 2
And zeroes for p(x) are 2,1,1.
∴ p(2)= 23– 4(2)2 + 5(2) – 2 = 0
p(1) = 13– (4 × 1) + (5 × 1) – 2 = 0
Hence proved, 2, 1, 1 are the zeroes of x3– 4x2+ 5x – 2
Now, comparing the given polynomial with general expression, we get;
∴ ax3+ bx2 + cx + d = x3– 4x2 + 5x – 2
a = 1, b = – 4, c = 5 and d = – 2
As we know, if α, β, γ are the zeroes of the cubic polynomial ax3+ bx2 + cx + d , then;
α + β + γ = – b/a
αβ + βγ + γα = c/as
α β γ = – d/a.
Therefore, putting the values of zeroes of the polynomial,
α + β + γ = 2 + 1 + 1 = 4 = – (- 4)/1 = – b/a
αβ + βγ + γα = 2 × 1 + 1× 1 + 1 × 2 = 5 = 5/1= c/a
αβγ = 2 × 1 × 1 = 2 = -(- 2)/1 = – d/a
Hence, the relationship between the zeroes and the coefficients are satisfied.

Ncert Solution Class 10th (Chapter – 2) Exercise – 2.4 Question No. 2

2. Find a cubic polynomial with the sum, sum of the product of its zeroes taken two at a time, and the product of its zeroes as 2, –7, –14 respectively.

Solution: Let us consider the cubic polynomial is ax3 + bx2 + cx + d and the values of the zeroes of the polynomials be α, β, γ.
As per the given question,
α + β + γ = – b/a = 2/1
αβ + βγ + γα = c/a = -7/1
αβγ = – d/a = -14/1
Thus, from above three expressions we get the values of coefficient of polynomial.
a = 1, b = -2, c = -7, d = 14
Hence, the cubic polynomial is x3– 2x2 – 7x + 14

Ncert Solution Class 10th (Chapter – 2) Exercise – 2.4 Question No. 3

3. If the zeroes of the polynomial x3-3x2+x+1 are a – b, a, a + b, find a and b.

Solution: We are given with the polynomial here,
p(x) = x3– 3x2 + x + 1
And zeroes are given as a – b, a, a + b
Now, comparing the given polynomial with general expression, we get;
∴px3+ qx2 + rx + s = x3– 3x2 + x + 1
p = 1, q = -3, r = 1 and s = 1
Sum of zeroes = a – b + a + a + b
-s/p = 1 – b2
Putting the values q and p.
-(- 3)/1 = 3a
a = 1
Thus, the zeroes are 1- b, 1, 1 + b.
Now, product of zeroes = 1(1 – b)(1 + b)
-s/p = 1 – b2
-1/1 = 1 – b2
b2 = 1 + 1 = 2
b = ±√2
Hence,1 – √2, 1 ,1 + √2 are the zeroes of x3– 3x2 + x + 1.

Ncert Solution Class 10th (Chapter – 2) Exercise – 2.4 Question No. 4

4. If two zeroes of the polynomial x4– 6x3– 26x2 +138x – 35 are 2 ±3, find other zeroes.

Solution: Since this is a polynomial equation of degree 4, hence there will be total 4 roots.
Let f(x) = x4– 6x3– 26x2 + 138x – 35
Since 2 + √3 and 2 – √3 are zeroes of given polynomial f(x).
∴ [x − (2 + √3)] [x − (2 – √3)] = 0
(x − 2 − √3)(x − 2 + √3) = 0
On multiplying the above equation we get,
x2– 4x + 1, this is a factor of a given polynomial f(x).
Now, if we will divide f(x) by g(x), the quotient will also be a factor of f(x) and the remainder will be 0.

So, x4 – 6x3– 26x2 + 138x – 35 = (x2– 4x + 1)(x2 – 2x − 35)
Now, on further factorizing (x2 – 2x − 35) we get,
x2(7 − 5)x − 35 = x2– 7x + 5x + 35 = 0
x(x −7) + 5(x − 7) = 0
(x + 5)(x − 7) = 0
So, its zeroes are given by:
x= − 5 and x = 7.
Therefore, all four zeroes of given polynomial equation are: 2 + √3 , 2 – √3, −5 and 7.

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