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Answers
Which of the following expressions are polynomials in one variable and which are not? State reasons for your answer.
(i) 4x2–3x+7
The equation 4x2–3x+7 can be written as 4x2–3x1+7x0
Since x is the only variable in the given equation and the powers of x (i.e., 2, 1 and 0) are whole numbers, we can say that the expression 4x2–3x+7 is a polynomial in one variable...
2..y2+√2
The equation y2+√2 can be written as y2+√2y0
Since y is the only variable in the given equation and the powers of y (i.e., 2 and 0) are whole numbers, we can say that the expression y2+√2 is a polynomial in one variable.
iii) 3√t+t√2
Solution:
The equation 3√t+t√2 can be written as 3t1/2+√2t
Though, t is the only variable in the given equation, the powers of t (i.e.,1/2) is not a whole number. Hence, we can say that the expression 3√t+t√2 is not a polynomial in one variable.
iv) y+2/y
Solution:
The equation y+2/y an be written as y+2y-1
Though, y is the only variable in the given equation, the powers of y (i.e.,-1) is not a whole number. Hence, we can say that the expression y+2/y is not a polynomial in one variable.
(v) x10+y3+t50
Solution:
Here, in the equation x10+y3+t50
Though, the powers, 10, 3, 50, are whole numbers, there are 3 variables used in the expression..
. Write the coefficients of x2 in each of the following:
(i) 2+x2+x
The equation 2+x2+x can be written as 2+(1)x2+x
We know that, coefficient is the number which multiplies the variable.
Here, the number that multiplies the variable x2 is 1
(ii) 2–x2+x3
Solution:
The equation 2–x2+x3 can be written as 2+(–1)x2+x3
We know that, coefficient is the number (along with its sign, i.e., – or +) which multiplies the variable.
Here, the number that multiplies the variable x2 is -1
the coefficients of x2 in 2–x2+x3 is -1.
iii) (/2)x2+x
Solution:
The equation (/2)x2 +x can be written as (/2)x2 + x
We know that, coefficient is the number (along with its sign, i.e., – or +) which multiplies the variable.
Here, the number that multiplies the variable x2 is /2.
the coefficients of x2 in (/2)x2 +x is /2
3. Give one example each of a binomial of degree 35, and of a monomial of degree 100.
Solution:
Binomial of degree 35: A polynomial having two terms and the highest degree 35 is called a binomial of degree 35
Eg., 3x35+5
Monomial of degree 100: A polynomial having one term and the highest degree 100 is called a monomial of degree 100
Eg., 4x100
Write the degree of each of the following polynomials:
(i) 5x3+4x2+7x
Solution:
The highest power of the variable in a polynomial is the degree of the polynomial.
Here, 5x3+4x2+7x = 5x3+4x2+7x1
The powers of the variable x are: 3, 2, 1
the degree of 5x3+4x2+7x is 3 as 3 is the highest power of x in the equation.
(ii) 4–y2
Solution:
The highest power of the variable in a polynomial is the degree of the polynomial.
Here, in 4–y2,
The power of the variable y is 2
the degree of 4–y2 is 2 as 2 is the highest power of y in the equation.
(iii) 5t–√7
Solution:
The highest power of the variable in a polynomial is the degree of the polynomial.
Here, in 5t–√7 ,
The power of the variable t is: 1
the degree of 5t–√7 is 1 as 1 is the highest power of y in the equation.
(iv) 3
The highest power of the variable in a polynomial is the degree of the polynomial.
Here, 3 = 3×1 = 3× x0
The power of the variable here is: 0
the degree of 3 is 0.
Classify the following as linear, quadratic and cubic polynomials:
Solution:
We know that,
Linear polynomial: A polynomial of degree one is called a linear polynomial.
Quadratic polynomial: A polynomial of degree two is called a quadratic polynomial.
Cubic polynomial: A polynomial of degree three is called a cubic polynomial.
(i) x2+x
Solution:
The highest power of x2+x is 2
the degree is 2
Hence, x2+x is a quadratic polynomial
(ii) x–x3
Solution:
The highest power of x–x3 is 3
the degree is 3
Hence, x–x3 is a cubic polynomial
(iii) y+y2+4
Solution:
The highest power of y+y2+4 is 2
the degree is 2
Hence, y+y2+4is a quadratic polynomial
(iv) 1+x
Solution:
The highest power of 1+x is 1
the degree is 1
Hence, 1+x is a linear polynomial.
(v) 3t
Solution:
The highest power of 3t is 1
the degree is 1
Hence, 3t is a linear polynomial.
(vi) r2
Solution:
The highest power of r2 is 2
the degree is 2
Hence, r2is a quadratic polynomial.
(vii) 7x3
Solution:
The highest power of 7x3 is 3
the degree is 3
Hence, 7x3 is a cubic polynomial.