If x is real, then (x2-2 x+4/x2+2 x+4) takes values in the interval:

Question

If x is real, then (x2-2 x+4/x2+2 x+4) takes values in the interval: (A)  [1/3, 3]  (B)  (1/3, 3)  (C)  (3, 3)  (D)  (-1/3, 3)

Tardigrade Admin · Accepted Answer

Let y=(x2-2 x+4/x2+2 x+4) ⇒ x2(y-1)+x(2 y+2)+4 y-4=0 Since, x is real therefore its discriminant b2-4 a c ≥ 0 ∴ (2 y+2)2-4(y-1) 4(y-1) ≥ 0 ⇒ 4 y2+8 y+4-16 y2-16+32 y ≥ 0 ⇒-12 y2+40 y-12 ≥ 0 ⇒ 3 y2-10 y+3 ≤ 0 ⇒(3 y-1)(y-3) ≤ 0 ⇒ (1/3) y ≤ 3

Q. If $x$ is real, then $\frac{x ^{2} - 2 x + 4}{x ^{2} + 2 x + 4}$ takes values in the interval:

$[1/3, 3]$

$(1/3, 3)$

$(3, 3)$

$(- 1/3, 3)$

Q. If x is real, then x2+2x+4x2−2x+4​ takes values in the interval:

[1/3,3]

(1/3,3)

(3,3)

(−1/3,3)

Let y=x2+2x+4x2−2x+4​ ⇒x2(y−1)+x(2y+2)+4y−4=0 Since, x is real therefore its discriminant b2−4ac≥0 ∴(2y+2)2−4(y−1)4(y−1)≥0 ⇒4y2+8y+4−16y2−16+32y≥0 ⇒−12y2+40y−12≥0 ⇒3y2−10y+3≤0 ⇒(3y−1)(y−3)≤0 ⇒31​y≤3

Q. If $x$ is real, then $\frac{x ^{2} - 2 x + 4}{x ^{2} + 2 x + 4}$ takes values in the interval:

$[1/3, 3]$

$(1/3, 3)$

$(3, 3)$

$(- 1/3, 3)$