Match the statements in Column-I with those in Column-II. [Note: Here $z$ takes values in the complex plane and $\operatorname { Im } z$ and $\operatorname { Re } z$ denote, respectively, the imaginary part and the real part of $z$.] Column I A) The set of points $z$ satisfying $| z - i | z \| = | z + i | z \mid$ is contained in or equal to B) The set of points $z$ satisfying $| z + 4 | + | z - 4 | = 10$ is contained in or equal to C) If $| w | = 2$, then the set of points $z = w - \frac { 1 } { w }$ is contained in or equal to D) If $| w | = 1$, then the set of points $z = w + \frac { 1 } { w }$ is contained in or equal to Column II p) an ellipse with eccentricity $\frac { 4 } { 5 }$ q) the set of points $z$ satisfying $\operatorname { Im } z = 0$ r) the set of points $z$ satisfying $| \operatorname { Im } z | \leq 1$ s) the set of points $z$ satisfying $| \operatorname { Re } z | \leq 2$ t) the set of points $z$ satisfying $| z | \leq 3$
A: q and r; B: p; C: p and s and t; D: q and r and s and t
Match the statements in Column-I with those in Column-II.\\
[Note: Here $z$ takes values in the complex plane and $\operatorname { Im } z$ and $\operatorname { Re } z$ denote, respectively, the imaginary part and the real part of $z$.]
\textbf{Column I}\\
A) The set of points $z$ satisfying $| z - i | z \| = | z + i | z \mid$ is contained in or equal to\\
B) The set of points $z$ satisfying $| z + 4 | + | z - 4 | = 10$ is contained in or equal to\\
C) If $| w | = 2$, then the set of points $z = w - \frac { 1 } { w }$ is contained in or equal to\\
D) If $| w | = 1$, then the set of points $z = w + \frac { 1 } { w }$ is contained in or equal to
\textbf{Column II}\\
p) an ellipse with eccentricity $\frac { 4 } { 5 }$\\
q) the set of points $z$ satisfying $\operatorname { Im } z = 0$\\
r) the set of points $z$ satisfying $| \operatorname { Im } z | \leq 1$\\
s) the set of points $z$ satisfying $| \operatorname { Re } z | \leq 2$\\
t) the set of points $z$ satisfying $| z | \leq 3$