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Polynomials

Long Answer Type

421. Find a quadratic polynomial whose zeroes are 1 and (-3). Verify the relation between the coefficients and zeroes of the polynomial.

2920 Views

422. Find the zeroes of the quadratic polynomial 4x² – 4x – 3 and verify the relation between the zeroes and its coefficients.

3023 Views

423. If α and β are the zeroes of the polynomial ax² + bx + c then find
(a) $straight alpha over straight beta plus straight beta over straight alpha$ (b) $space space straight alpha squared plus straight beta squared$

Since, α and β are the zeroes of the quadratic polynomial ax² + bx + c.
∴

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(a)

straight alpha over straight beta plus straight beta over straight alpha equals fraction numerator straight alpha squared plus straight beta squared over denominator αβ end fraction equals space fraction numerator left parenthesis straight alpha plus straight beta right parenthesis squared minus 2 αβ over denominator αβ end fraction

equals fraction numerator open parentheses begin display style fraction numerator negative straight b over denominator straight a end fraction end style close parentheses squared minus 2 open parentheses begin display style straight c over straight a end style close parentheses over denominator begin display style straight c over straight a end style end fraction

equals fraction numerator begin display style straight b squared over straight a squared end style minus begin display style fraction numerator 2 straight c over denominator straight a end fraction end style over denominator begin display style straight c over straight a end style end fraction equals fraction numerator begin display style fraction numerator straight b squared minus 2 ac over denominator straight a squared end fraction end style over denominator begin display style straight c over straight a end style end fraction

space space space space equals fraction numerator straight b squared minus 2 ac over denominator straight a squared end fraction cross times straight a over straight c equals fraction numerator straight b squared minus 2 ac over denominator ac end fraction.

(b)

straight alpha squared plus straight beta squared space equals space left parenthesis straight alpha plus straight beta right parenthesis squared minus 2 αβ space space space space space space space space space space space space space space equals space open parentheses fraction numerator negative straight b over denominator straight a end fraction close parentheses squared minus 2 open parentheses straight c over straight a close parentheses space space space space space space space space space space space space space space equals straight b squared over straight a squared minus fraction numerator 2 straight c over denominator straight a end fraction space space space space space space space space space space space space space space space equals space fraction numerator straight b squared minus 2 ac over denominator straight a squared end fraction.

152 Views

Short Answer Type

424.

If α and β are the zeroes of the quadratic polynomial ax² + bx + c. Find the value of α²– β².

145 Views

425. If α and β are the zeroes of the quadratic polynomial ax² + bx + c, then find the value of α³ + β³.

129 Views

Long Answer Type

426. If α and β are the zeroes of quadratic polynomial ax² + bx + c, then find

straight alpha squared over straight beta plus straight beta squared over straight alpha.

134 Views

427. If α and β are the zeroes of the quadratic polynomial P(x) = Kx² + 4x + 4 such that α² + β² = 24, find the value of K.

433 Views

Short Answer Type

428. If α and β are the zeroes of quadratic polynomial x² + x – 2. Find the value of (α^–1 + β^–1).

107 Views

429. Find a quadratic polynomial when the sum and product of its zeroes respectively
(i)

space 1 fourth comma space minus 1

(ii)

square root of 2 comma space fraction numerator negative 1 over denominator 3 end fraction

152 Views

Long Answer Type

430. If α, β are the zeroes of the quadratic polynomial 2x²– 3x – 5, form a polynomial whose zeroes are 2α + 1 and 2β + 1.

213 Views

Previous Year Papers

Test Series

Test Yourself

Long Answer Type

423. If α and β are the zeroes of the polynomial ax2 + bx + c then find(a) (b)

Short Answer Type

Long Answer Type

Short Answer Type

Long Answer Type

423. If α and β are the zeroes of the polynomial ax² + bx + c then find
(a) $straight alpha over straight beta plus straight beta over straight alpha$ (b) $space space straight alpha squared plus straight beta squared$