If the zeroes of the polynomial x² + px + q are double in values

Q). If the zeroes of the polynomial x² + p x + q are double in values to the zeros of 2 x²– 5 x – 3 Find the value of p and q.

Ans:

Step 1: Given polynomial equation 2 x² – 5 x – 3 = 0

Comparing with standard polynomial, ax² + b x + c = 0, we get,

a = 2, b = – 5, c = – 3

Step 2: Let’s consider that the roots of this polynomial be α and β.

and we know that sum of roots (α + β) = $\frac{- b}{a}$

∴ α + β = $\frac{- (- 5)}{2} = \frac{5}{2}$ …………… (i)

Also, we know that the product of the roots (α x β) = $\frac{c}{a}$

∴ α . β = $\frac{- 3}{2} = - \frac{3}{2}$ …………. (ii)

Step 3: Given polynomial is: x² + p x + q = 0 and its roots are double of earlier one i.e. 2 𝛼 and 2𝛽

Comparing with standard polynomial, ax² + b x + c = 0, we get,

a = 1, b = p, c = q

Step 4: ∵ Sum of roots = $\frac{- b}{a}$

∴ 2 α + 2 β = $\frac{- (p)}{1}$

∴ p = 2 α + 2 β

= 2 (α + β)

= 2 $(\frac{- 5}{2})$ [value taken from equation (i)]

∴ p = 5

Step 5: Also the product of the roots = $\frac{c}{a}$

∴ 2 α . 2 β = $\frac{q}{1}$

∴ 4 (α . β) = q

∴ q = 4 $(- \frac{3}{2})$ [value taken from equation (ii)]

∴ q = – 6

Therefore, the value of p and q are 5 and – 6 respectively.

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