# Class 9 RD Sharma Solutions – Chapter 6 Factorisation of Polynomials- Exercise 6.1

### (v) x12 + y3 + t50

Solution:

(i) 3x2 â€“ 4x + 15

It is a polynomial in one variable, that is, x. And all the powers of x are whole numbers.

(ii) y2 + 2âˆš3

It is a polynomial in variable y. And all the powers of y are whole numbers.

(iii) 3âˆšx + âˆš2x

It is not a polynomial since the exponent of 3âˆšx is a rational term.

(iv) x â€“ 4/x

It is not a polynomial since the exponent of variable x is – 4/x which is not a positive term.

(v) x12 + y3 + t50

It is a three variable polynomial, where the variables are x, y and t.

### (iv) âˆš3x â€“ 7

Solution:

(i) 17 â€“ 2x + 7x2

Coefficient of x2 in the above equation = 7

(ii) 9 â€“ 12x + x3

Coefficient of x2 =0, since there is no term with x2

(iii) Ï€/6 x2 â€“ 3x + 4

Coefficient of x2 in the above equation = Ï€/6

(iv) âˆš3x â€“ 7

Coefficient of x2 = 0, since there is no term with x2 in the above equation.

### (v) 0

Solution:

The degree is the highest possible degree of the variable in the polynomial. Now, we have

(i) Degree of the polynomial 7x3 + 4x2 â€“ 3x + 12 is 3, since the term x3 is highest

(ii) Degree of the polynomial 12 â€“ x + 2x3 is 3, since the term x3 is highest

(iii) Degree of the polynomial 5y â€“ âˆš2 is 1, since the term 5y only has the variable.

(iv) Degree of the polynomial 7 is 0, since there is no term with variable.

(v) Degree of the polynomial 0 is undefined.

### (vi) 7t4 + 4t3 + 3t â€“ 2

Solution:

Linear polynomials have highest degree = 1. Quadratic have highest degree = 2. Cubic polynomials have highest degree = 3 and bi-quadratic as 4.

(i) x + x2 + 4: It is a quadratic polynomial since its highest possible degree is 2.

(ii) 3x â€“ 2 : It is a linear polynomial since its highest possible degree is 1.

(iii) 2x + x2: It is a quadratic polynomial since its highest possible degree is 2.

(iv) 3y: It is a linear polynomial since its highest possible degree is 1.

(v) t2+ 1: It is a quadratic polynomial since its highest possible degree s 2.

(vi) 7t4 + 4t3 + 3t â€“ 2: It is a bi-quadratic polynomial since its highest possible degree is 4.

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