Q) Obtain the zeroes of the polynomial 7 x2 + 18 x – 9 Hence, write a polynomial each of whose zeroes is twice the zeroes of given polynomial.
PYQ: Q 27 – CBSE 2025 – Code 30 – Series 5 – Set 1
Ans:
Step 1: Given polynomial equation 7 x2 + 18 x – 9 = 0
Comparing with standard polynomial, a x2 + b x + c = 0, we get,
a = 7, b = 18, c = – 9
Since, its given that the roots of the polynomial be α and β.
and we know that sum of roots (α + β) = – b / a
∴ α + β = – (18) / (7) = – 18/ 7 …………… (i)
Also, we know that the product of the roots (α x β) = c/ a
∴ α . β = (- 9) / (7) = – 9 / 7 …………. (ii)
Step 2: The zeroes for new polynomial given as (2 𝛼 , 2 𝛽 ):
∵ Sum of the zeroes of new polynomial = (2 α + 2 β ) = 2 (α + β)
By transferring values from equations (i), we get:
∴ Sum of the zeroes of new polynomial = 2 (- 18/ 7) = – 36 / 7
Next, Product of the zeroes of new polynomial = (2 α).(2 β) = 4 (α . β)
By transferring values from equations (ii), we get:
∴ Product of the zeroes of new polynomial = 4 (- 9 / 7) = – 36 / 7
Step 3: New quadratic polynomial f(x) = k [x2 – (sum of the zeroes) x + (product of the zeroes)]
∴ f(x) = k [x2 – (- 36 /7) x + (- 36 / 7)]
For f(x) = 0, since k ≠ 0; ∴ polynomial x2 + (36/ 7) x – 36 /7 = 0
∴ 7 x2 + 36 x – 36 = 0
Hence, the required quadratic polynomial is 7 x2 + 36 x – 36 = 0.
[Note: For more practice, take another similar question – the link is given below:
Click here for another similar question.]
Please do press “Heart” button if you liked the solution.