Consider the quadratic equation (c - 5)x2-2cx + (c-4) = 0, c ≠ 5. Let S be the set of all integral values of c for which one root of the equation lies in the interval (0,2) and its other root lies in the interval (2,3). Then the number of elements in S is :

Question

Consider the quadratic equation (c - 5)x2-2cx + (c-4) = 0, c ≠ 5. Let S be the set of all integral values of c for which one root of the equation lies in the interval (0,2) and its other root lies in the interval (2,3). Then the number of elements in S is : (A) 11 (B) 18 (C) 10 (D) 12

Tardigrade Admin · Accepted Answer

Let f(x)=(c-5) x2-2 c x+c-4 ∴ f(0) f(2)<0 f(2) f(3)<0 from (1) &(2) (c-4)(c-24)<0 &(c-24)(4 c-49)<0 ⇒ (49/4)< c <24 ∴ s = 13,14,15, ldots . .23 Number of elements in set S=11

Q. Consider the quadratic equation $(c - 5) x^{2} - 2 c x + (c - 4) = 0, c \neq = 5$ . Let S be the set of all integral values of $c$ for which one root of the equation lies in the interval $(0, 2)$ and its other root lies in the interval $(2, 3)$ . Then the number of elements in $S$ is :

11

18

10

12

Let $f (x) = (c - 5) x^{2} - 2 c x + c - 4$
$∴ f (0) f (2) < 0$
$f (2) f (3) < 0$
from $(1) & (2)$
$(c - 4) (c - 24) < 0$
$& (c - 24) (4 c - 49) < 0$
$\Rightarrow \frac{49}{4} < c < 24$
$∴ s = {13, 14, 15, \dots ..23}$
Number of elements in set $S = 11$

Q. Consider the quadratic equation (c−5)x2−2cx+(c−4)=0,c=5. Let S be the set of all integral values of c for which one root of the equation lies in the interval (0,2) and its other root lies in the interval (2,3). Then the number of elements in S is :

11

18

10

12

Let f(x)=(c−5)x2−2cx+c−4 ∴f(0)f(2)<0 f(2)f(3)<0 from (1)&(2) (c−4)(c−24)<0 &(c−24)(4c−49)<0 ⇒449​<c<24 ∴s={13,14,15,…..23} Number of elements in set S=11

Q. Consider the quadratic equation $(c - 5) x^{2} - 2 c x + (c - 4) = 0, c \neq = 5$ . Let S be the set of all integral values of $c$ for which one root of the equation lies in the interval $(0, 2)$ and its other root lies in the interval $(2, 3)$ . Then the number of elements in $S$ is :

Let $f (x) = (c - 5) x^{2} - 2 c x + c - 4$
$∴ f (0) f (2) < 0$
$f (2) f (3) < 0$
from $(1) & (2)$
$(c - 4) (c - 24) < 0$
$& (c - 24) (4 c - 49) < 0$
$\Rightarrow \frac{49}{4} < c < 24$
$∴ s = {13, 14, 15, \dots ..23}$
Number of elements in set $S = 11$