Find the quadratic polynomial whose sum of its zeroes (roots) is − 8 5 and the product of the zeroes (roots) is 7 5 . Options: A . &nbsp14x2+7x+5 B . &nbsp5x2+8x+7 C . &nbsp2x2−8x+7 D . &nbsp5x2−8x+7

Find the quadratic polynomial whose sum of its zeroes (roots) is −85 and

Question

Find the quadratic polynomial whose sum of its zeroes (roots) is

- \frac{8}{5}

and the product of the zeroes (roots) is

\frac{7}{5}

Options:

A . 14x2+7x+5

B . 5x2+8x+7

C . 2x2−8x+7

D . 5x2−8x+7

Answer: Option B
:
B
Given that,
Sum of zeroes =

\frac{- 8}{5}

Product of zeroes =

\frac{7}{5}

Required quadratic polynomial is,

f (x) = [(x^{2} - (s u m o f r o o t s) x + (p r o d u c t o f r o o t s)]

Substituting the given values we get,

f (x) = [x^{2} - \frac{(- 8)}{5} x + \frac{7}{5}]

f (x) = [x^{2} + \frac{8}{5} x + \frac{7}{5}]

multiplying by 5 we get

f (x) = 5 x^{2} + 8 x + 7

∴

Required polynomial is

5 x^{2} + 8 x + 7

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