Let - - -1-2- 2-2- 2-1 and fx be a continuous function such that fx - 2 - fx - 2 - - 0-2 - and p-4 -04f x dx - q- exactly one root of the equation ax2-bx-c-0 is lying between p and q when a- b- c - N then

The correct options are C b^2 4ac≥ 0 D c(a b + c) lt; 0 Given : α +β =1 2 α ^ 2 +2β #160; ^ 2 =1 (α +β )^ 2 =α ^ 2 +β #160; ...

You visited us 1 times! Enjoying our articles? Unlock Full Access!

Byju's Answer

Standard XII

Mathematics

Integration Using Substitution

Let α +β =1...

Question

Let $α + β = 1, 2 α^{2} + 2 β^{2} = 1$ and f(x) be a continuous function such that f(x + 2) + f(x) = 2 $\forall \times ϵ [0, 2] a n d (p + 4) = \int_{0}^{4} f (x) d x & q = \frac{α}{β}$ exactly one root of the equation $a x^{2} - b x + c = 0$ is lying between p and q when a, b, $c ϵ N$ then

b^{2} - 4 a c \leq 0

No worries! We‘ve got your back. Try BYJU‘S free classes today!

c (a - b + c) > 0

No worries! We‘ve got your back. Try BYJU‘S free classes today!

b^{2} - 4 a c \geq 0

Right on! Give the BNAT exam to get a 100% scholarship for BYJUS courses

c (a - b + c) < 0

Right on! Give the BNAT exam to get a 100% scholarship for BYJUS courses

Open in App

Solution

The correct options are
C $b^{2} - 4 a c \geq 0$
D $c (a - b + c) < 0$
Given : $α + β = 1$
$2 α^{2} + 2 β^{2} = 1 (α + β)^{2} = α^{2} + β^{2} + 2 α β (1)^{2} = \frac{1}{2} + 2 α β \frac{1}{4} = (α β) (α - β)^{2} = (α + β)^{2} - 4 α β 1 - 4 \times \frac{1}{4} = 0 (α = β) = \frac{1}{2} q = \frac{α}{β} = 1 p + 4 = \int_{0}^{4} f (x) d x p + 4 = \int_{0}^{2} f (x) d x + \int_{2}^{4} f (x) d x p + 4 = 2 + 2 p = 0$
One root of $a^{2} - b x + c = 0$ lies in $(1, 0)$
The $D \geq 0 b^{2} - 4 a c \geq 0$ as roots are real
Also, $f (0) f (1) < 0$
$(c) (a - b + c) < 0$

Suggest Corrections

Similar questions

Q. If the roots of

a x^{2} + b x + c = 0

are

α, β

and the roots of

A X^{2} + B x + C = 0

are

(α - k), (β - k)

. Then

(\frac{B^{2} - 4 A C}{b^{2} - 4 a c})

is equal to

Q. Let

α

and

β

be the zeros of

f (x) = a x^{2} + b x + c, a \neq 0

and

Δ = b^{2} - 4 a c

. If

α + β, α^{2} + β^{2}

and

α^{3} + β^{3}

are in G.P., then :

Q. If roots of the equation

f (x + 2) = a x^{2} + b x + c = 0

and

α, β

are such that

α < - 2 < β

, then for the equation

f (x) = A x^{2} + B x + C

Q. Let

α, β

be roots of the equation

a x^{2} + b x + c = 0

and

Δ = b^{2} - 4 a c

. If

α + β, α^{2} + β^{2}, α^{3} + β^{3}

are in

G P

, then

Q. Assertion :If the roots of the equations

x^{2} - b x + c = 0

and

x^{2} - c x + b = 0

differ by the same quantity, then

b + c

is equal to

- 4

Reason: If

α, β

are the roots of the equation

A x^{2} + B x + C = 0

, then

α - β = \frac{\sqrt{B^{2} - 4 A C}}{A}

Join BYJU'S Learning Program

Let α+β=1,2α2+2β2=1 and f(x) be a continuous function such that f(x + 2) + f(x) = 2 ∀×ϵ[0,2]and(p+4)=∫40f(x)dx&q=αβ exactly one root of the equation ax2−bx+c=0 is lying between p and q when a, b, cϵN then

Let $α + β = 1, 2 α^{2} + 2 β^{2} = 1$ and f(x) be a continuous function such that f(x + 2) + f(x) = 2 $\forall \times ϵ [0, 2] a n d (p + 4) = \int_{0}^{4} f (x) d x & q = \frac{α}{β}$ exactly one root of the equation $a x^{2} - b x + c = 0$ is lying between p and q when a, b, $c ϵ N$ then