Match the statements in column-I with those in column-II. [Note: Here z takes the values in the complex plane and textIm z and textRe z denote, respectively, the imaginary part and the real part of z ] Column I Column II A The set of points z satisfying |z-i| z||=|z+i| z|| is contained in or equal to p an ellipse with eccentricity (4/5) B The set of points z satisfying |z+4|+|z-4|=10 q the set of points z satisfying Im z=0 is contained in or equal to C If |ω|=2, then the set of points z=ω-1 / ω is r the set of points z satisfying | textIm z| ≤ 1 contained in or equal to D If |ω|=1, then the set of points z=ω+1 / ω is s the set of points z satisfying | textRe z| ≤ 1 contained in or equal to t the set of points z satisfying |z| ≤ 3

Question

Match the statements in column-I with those in column-II. [Note: Here z takes the values in the complex plane and textIm z and textRe z denote, respectively, the imaginary part and the real part of z ] Column I Column II A The set of points z satisfying |z-i| z||=|z+i| z|| is contained in or equal to p an ellipse with eccentricity (4/5) B The set of points z satisfying |z+4|+|z-4|=10 q the set of points z satisfying Im z=0 is contained in or equal to C If |ω|=2, then the set of points z=ω-1 / ω is r the set of points z satisfying | textIm z| ≤ 1 contained in or equal to D If |ω|=1, then the set of points z=ω+1 / ω is s the set of points z satisfying | textRe z| ≤ 1 contained in or equal to t the set of points z satisfying |z| ≤ 3 (A) ( A ) arrow( Q ) ;( B ) arrow( P ) ;( C ) arrow( P )( T ) ;( D ) arrow( Q ),( T ) (B) ( A ) arrow( Q ) ;( B ) arrow( Q ) ;( C ) arrow( P )( T ) ;( D ) arrow( Q ),( S ) (C) ( A ) arrow( P ) ;( B ) arrow( P ) ;( C ) arrow( P )( T ) ;( D ) arrow( Q ),( T ) (D) ( A ) arrow( R ) ;( B ) arrow( P ) ;( C ) arrow( R )( T ) ;( D ) arrow( Q ),( T )

Tardigrade Admin · Accepted Answer

(A)(q) |(z/|z|)-i|=|(z/|z|)+i|, z ≠ 0 (z/|z|) is unimodular complex number and lies on perpendicular bisector of i and -i ⇒ (z/|z|)=± 1 ⇒ z=± 1|z| ⇒ a is real number ⇒ textIm(z)=0 (B) (p) |z+4|+|z-4|=10 z lies on an ellipse whose focus are (4,0) and (-4,0) and length of major axis is 10 ⇒ 2 ae =8 and 2 a =10 ⇒ e =4 / 5 | textRe(z)| ≤ 5 (C) (p),(t) |w|=2 ⇒ w=2( cos θ+i sin θ) x+i y=2( cos θ+i sin θ)-(1/2)( cos θ-i sin θ) =(3/2) cos θ+i (5/2) sin θ ⇒ (x2/(3 / 2)2)+(y2/(5 / 2)2)=1 e2=1-(9 / 4/25 / 4)=1-(9/25)=(16/25) ⇒ e=(4/5) (D)(q),(t) |w|=1 ⇒ x+i y= cos +i sin θ+ cos θ-i sin θ x+i y=2 cos θ | textRe(z)| ≤ 1, mid textIm(z)=0

Column I		Column II
A	The set of points $z$ satisfying $∣ z - i ∣ z ∣∣ = ∣ z + i ∣ z ∣∣$ is contained in or equal to	p	an ellipse with eccentricity $\frac{4}{5}$
B	The set of points $z$ satisfying $∣ z + 4∣ + ∣ z - 4∣ = 10$	q	the set of points z satisfying Im $z = 0$ is contained in or equal to
C	If $∣ ω ∣ = 2$ , then the set of points $z = ω - 1/ ω$ is	r	the set of points $z$ satisfying $∣ Im z ∣ \leq 1$ contained in or equal to
D	If $∣ ω ∣ = 1$ , then the set of points $z = ω + 1/ ω$ is	s	the set of points $z$ satisfying $∣ Re z ∣ \leq 1$ contained in or equal to
		t	the set of points $z$ satisfying $∣ z ∣ \leq 3$

$(A) \to (Q); (B) \to (P); (C) \to (P) (T); (D) \to (Q), (T)$

$(A) \to (Q); (B) \to (Q); (C) \to (P) (T); (D) \to (Q), (S)$

$(A) \to (P); (B) \to (P); (C) \to (P) (T); (D) \to (Q), (T)$

$(A) \to (R); (B) \to (P); (C) \to (R) (T); (D) \to (Q), (T)$

(A)→(Q);(B)→(P);(C)→(P)(T);(D)→(Q),(T)

(A)→(Q);(B)→(Q);(C)→(P)(T);(D)→(Q),(S)

(A)→(P);(B)→(P);(C)→(P)(T);(D)→(Q),(T)

(A)→(R);(B)→(P);(C)→(R)(T);(D)→(Q),(T)

$(A) \to (Q); (B) \to (P); (C) \to (P) (T); (D) \to (Q), (T)$

$(A) \to (Q); (B) \to (Q); (C) \to (P) (T); (D) \to (Q), (S)$

$(A) \to (P); (B) \to (P); (C) \to (P) (T); (D) \to (Q), (T)$

$(A) \to (R); (B) \to (P); (C) \to (R) (T); (D) \to (Q), (T)$