If α is the only real root of x3+bx2+cx+1=0 (b

Question

If α is the only real root of x3+bx2+cx+1=0 (b < c), then the value of |[α ]| is (where, [.] represents the greatest integer function) (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

Let, f(x)=x3+bx2+cx+1 f(x)=0 has only one real root so it is an increasing function Now, f(0)=1,f(- 1)=-1+b-c+1 f(- 1)=b-c < 0 using mean value theorem, real root must lie between (- 1,0) so, [α ]=-1 |[α ]|=1

Q. If $α$ is the only real root of $x^{3} + b x^{2} + c x + 1 = 0 (b < c),$ then the value of $∣ [α] ∣$ is (where, $[.]$ represents the greatest integer function)

Let, $f (x) = x^{3} + b x^{2} + c x + 1$
$f (x) = 0$ has only one real root so it is an increasing function
Now, $f (0) = 1, f (- 1) = - 1 + b - c + 1$
$f (- 1) = b - c < 0$
using mean value theorem, real root must lie between $(- 1, 0)$
so, $[α] = - 1$
$∣ [α] ∣ = 1$

Q. If α is the only real root of x3+bx2+cx+1=0(b<c), then the value of ∣[α]∣ is (where, [.] represents the greatest integer function)

Let, f(x)=x3+bx2+cx+1 f(x)=0 has only one real root so it is an increasing function Now, f(0)=1,f(−1)=−1+b−c+1 f(−1)=b−c<0 using mean value theorem, real root must lie between (−1,0) so, [α]=−1 ∣[α]∣=1

Q. If $α$ is the only real root of $x^{3} + b x^{2} + c x + 1 = 0 (b < c),$ then the value of $∣ [α] ∣$ is (where, $[.]$ represents the greatest integer function)

Let, $f (x) = x^{3} + b x^{2} + c x + 1$
$f (x) = 0$ has only one real root so it is an increasing function
Now, $f (0) = 1, f (- 1) = - 1 + b - c + 1$
$f (- 1) = b - c < 0$
using mean value theorem, real root must lie between $(- 1, 0)$
so, $[α] = - 1$
$∣ [α] ∣ = 1$