Let z=1-t+i √(t2+t+2), where t is a real parameter. The locus of z in the Argand plane is

Question

Let z=1-t+i √(t2+t+2), where t is a real parameter. The locus of z in the Argand plane is (A) a hyperbola (B) an ellipse (C) a straight line (D) None of these

Tardigrade Admin · Accepted Answer

x+i y=1-t+i √(t2+t+2) ⇒ x=1-t and y=√t2+t+2 Eliminating t, y2=t2+t+2=(1-x)2+1-x+2=(x-(3/2))2+(7/4) or y2-(x-(3/2))2=(7/4), which is a hyperbola.

Q. Let $z = 1 - t + i (t^{2} + t + 2)$ , where $t$ is a real parameter. The locus of $z$ in the Argand plane is

a hyperbola

an ellipse

a straight line

None of these

$x + i y = 1 - t + i (t^{2} + t + 2)$
$\Rightarrow x = 1 - t$ and $y = t^{2} + t + 2$
Eliminating t,
$y^{2} = t^{2} + t + 2 = (1 - x)^{2} + 1 - x + 2 = (x - \frac{3}{2})^{2} + \frac{7}{4}$
or $y^{2} - (x - \frac{3}{2})^{2} = \frac{7}{4}$ , which is a hyperbola.

Q. Let z=1−t+i(t2+t+2)​, where t is a real parameter. The locus of z in the Argand plane is