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Polynomial lesson exercises all

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Answer:

Ex 2.1 Class 9 Maths Question 1.

Which of the following expressions are polynomials in one variable and which are not? State reasons for your answer.

(i) 4x2 – 3x + 7

(ii) y2 + √2

(iii) 3 √t + t√2

(iv) y+

2

y

(v) x10+ y3+t50

Solution:

(i) We have 4x2 – 3x + 7 = 4x2 – 3x + 7x0

It is a polynomial in one variable i.e., x

because each exponent of x is a whole number.

(ii) We have y2 + √2 = y2 + √2y0

It is a polynomial in one variable i.e., y

because each exponent of y is a whole number.

(iii) We have 3 √t + t√2 = 3 √t1/2 + √2.t

It is not a polynomial, because one of the exponents of t is

1

2

,

which is not a whole number.

(iv) We have y +

y+

2

y

= y + 2.y-1

It is not a polynomial, because one of the exponents of y is -1,

which is not a whole number.

(v) We have x10+ y3 + t50

Here, exponent of every variable is a whole number, but x10 + y3 + t50 is a polynomial in x, y and t, i.e., in three variables.

So, it is not a polynomial in one variable.

Ex 2.1 Class 9 Maths Question 2.

Write the coefficients of x2 in each of the following

(i) 2 + x2 + x

(ii) 2 – x2 + x3

(iii)

π

2

x2 + x

(iv) √2 x – 1

Solution:

(i) The given polynomial is 2 + x2 + x.

The coefficient of x2 is 1.

(ii) The given polynomial is 2 – x2 + x3.

The coefficient of x2 is -1.

(iii) The given polynomial is

π

2

x

2

+ x.

The coefficient of x2 is

π

2

.

(iv) The given polynomial is √2 x – 1.

The coefficient of x2 is 0.

Ex 2.1 Class 9 Maths Question 3.

Give one example each of a binomial of degree 35, and of a monomial of degree 100.

Solution:

(i) Abmomial of degree 35 can be 3x35 -4.

(ii) A monomial of degree 100 can be √2y100.

Ex 2.1 Class 9 Maths Question 4.

Write the degree of each of the following polynomials.

(i) 5x3+4x2 + 7x

(ii) 4 – y2

(iii) 5t – √7

(iv) 3

Solution:

(i) The given polynomial is 5x3 + 4x2 + 7x.

The highest power of the variable x is 3.

So, the degree of the polynomial is 3.

(ii) The given polynomial is 4- y2. The highest

power of the variable y is 2.

So, the degree of the polynomial is 2.

(iii) The given polynomial is 5t – √7 . The highest power of variable t is 1. So, the degree of the polynomial is 1.

(iv) Since, 3 = 3x° [∵ x°=1]

So, the degree of the polynomial is 0.

Ex 2.1 Class 9 Maths Question 5.

Classify the following as linear, quadratic and cubic polynomials.

(i) x2+ x

(ii) x – x3

(iii) y + y2+4

(iv) 1 + x

(v) 3t

(vi) r2

(vii) 7x

3

Solution:

(i) The degree of x2 + x is 2. So, it is a quadratic polynomial.

(ii) The degree of x – x3 is 3. So, it is a cubic polynomial.

(iii) The degree of y + y2 + 4 is 2. So, it is a quadratic polynomial.

(iv) The degree of 1 + x is 1. So, it is a linear polynomial.

(v) The degree of 3t is 1. So, it is a linear polynomial.

(vi) The degree of r2 is 2. So, it is a quadratic polynomial.

(vii) The degree of 7x3 is 3. So, it is a cubic polynomial.

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