(af(mu) lt 0) is the necessary and suff...

`(af(mu) lt 0)` is the necessary and sufficient condition for a particular real number `mu` to lie between the roots of a quadratic equations `f(x) =0,` where `f(x) = ax^(2) + bx + c`. Again if `f(mu_(1)) f(mu_(2)) lt 0`, then exactly one of the roots will lie between `mu_(1)` and `mu_(2)`.
If `c(a+b+c) lt 0 lt (a+b+c)a`, then

A

one roots is less than 0, the other is greater than 1

B

one roots lies in `(-oo,0)` and other in `(0,1)`

C

both the roots lie in `(0,1)`

D

one roots lies in (0,1) and other in `(1,oo)`

Text Solution

Verified by Experts

The correct Answer is:

2

`f(0) f(1) lt 0 and af(1) gt 0`
`rArr f(0) f(1) lt 0 and af(0) lt 0`
Hence, exctly one root lie in (0,1) and 0 lie between the roots.

Promotional Banner

Promotional Banner

Topper's Solved these Questions

THEORY OF EQUATIONS
CENGAGE PUBLICATION|Exercise MATRIX MATCH TYPE|6 Videos
THEORY OF EQUATIONS
CENGAGE PUBLICATION|Exercise NUMERICAL VALUE TYPE|43 Videos
THEORY OF EQUATIONS
CENGAGE PUBLICATION|Exercise Multiple Correct Answer Type|38 Videos
STRAIGHT LINES
CENGAGE PUBLICATION|Exercise ARCHIVES (NUMERICAL VALUE TYPE)|1 Videos
THREE DIMENSIONAL GEOMETRY
CENGAGE PUBLICATION|Exercise All Questions|291 Videos

Similar Questions

Explore conceptually related problems

If f(x)=ax^(2)+bx+c and f(0) = 2, f(1) = 1, f(4) = 6, then find the valuse of a, b and c.

Find the condition for which the roots of the quadratic equation ax^2+bx+c=0(ane0) are both roots are zero.

if a lt c lt b, then check the nature of roots of the equation (a -b)^(2) x^(2) + 2(a+ b - 2c)x + 1 = 0

f(x) be a quadratic polynomial f(x) = (x-1) (ax+b) satisfying f(2) + f(4) = 0. If unity is one root of f(x) = 0 then find the other root.

A function f(x) is defined in a lt x lt b and a lt x_(1) lt x_(2) lt b , then f(x) is strictly monotonic decreasing in a le x le b when-

If c lt a lt b lt d , then roots of the equation bx^(2)+(1-b(c+d)x+bcd-a=0

If sin C and cos C are the two roots of the quadatic equation 2x^(2) -px +1 =, where 0 lt C lt (pi)/(2), then how many possible values can p have ?

Let a, b, c be real numbers such that a+b+clt0 and the quadratic equation ax^(2)+bx+c=0 has imaginary roots. Then

c is any real number and c ne 0 . Prove that abs(f(c) - f(-c)) = 2 , where f(x) = absx / x

The roots of the same quadratic equation ax^2 + 2bx + c = 0 (a ne 0) are real and equal then b^2 = _______

CENGAGE PUBLICATION-THEORY OF EQUATIONS-Linked Comprechension Type

Consider the quadrationax^(2) - bx + c =0,a,b,c in N which has two di...
Text Solution
|
Consider the inequation x^(2) + x + a - 9 < 0 The values of the re...
Text Solution
|
Consider the inequation x^(2) + x + a - 9 lt 0 The values of the re...
Text Solution
|
Consider the inequation x^(2) + x + a - 9 lt 0 The value of the pa...
Text Solution
|
Consider the inequation 9^(x) -a3^(x) - a+ 3 le 0, where a is real p...
Text Solution
|
Consider the inequality 9^(x)-a*3^(x)-a+3le0, where a is a real parame...
Text Solution
|
Consider the inequality 9^(x)-a*3^(x)-a+3le0, where a is a real parame...
Text Solution
|
(af(mu) lt 0) is the necessary and sufficient condition for a particu...
Text Solution
|
(af(mu) lt 0) is the necessary and sufficient condition for a particu...
Text Solution
|
(af(mu) lt 0) is the necessary and sufficient condition for a particu...
Text Solution
|
If the roots of the equation ax^2+bx+c=0(a!=0) be equal then
Text Solution
|
If (x+2) is a common factor of (px^2+qx+r) and (qx^2+px+r) then (a) ...
Text Solution
|
Consider the equation x^(4) + 2ax^(3) + x^(2)+2ax + 1 =0, where a in R...
Text Solution
|
Consider the equation x^(4) + 2ax^(3) + x^(2)+2ax + 1 =0, where a in R...
Text Solution
|
Consider the equation x^4 + 2ax^3 + x^2 + 2ax + 1 = 0 where a in R. Al...
Text Solution
|
The real numbers x1, x2, x3 satisfying the equation x^3-x^2+b x+gamma=...
Text Solution
|
The real numbers x1, x2, x3 satisfying the equation x^3-x^2+b x+gamma=...
Text Solution
|
If the equation x^4- λx^2+9=0 has four real and distinct roots, th...
Text Solution
|
If the equation has no real root, then lamda lies in the interval
Text Solution
|
If the equation x^4 -λx^2 +9=0 has only two real roots, then the set o...
Text Solution
|