Let C be the set of all complex numbers. Let
S₁ = {z ∈ C | |z - 3 - 2i|² = 8},
S₂ = {z ∈ C | Re(z) ≥ 5} and
S₃ = {z ∈ C | |z - z̄| ≥ 8}.
Then the number of element in S₁ ∩ S₂ ∩ S₃ is equal to:

Option 1 - 0

Option 2 - 2

Option 3 - 1

Option 4 - Infinity

10 Views|Posted 6 months ago

Asked by Shiksha User

1 Answer

Sort by:

Answered by

Vishal Baghel | Contributor-Level 10

6 months ago

Correct Option - 3

Detailed Solution:

S? : |z - 3 - 2i|² = 8
|z - (3 + 2i)| = 2√2
(x - 3)² + (y - 2)² = (2√2)²
S? : Re (z) ≥ 5
x ≥ 5
S? : |z - z? | ≥ 8
|2iy| ≥ 8
2|y| ≥ 8
|y| ≥ 4
y ≥ 4 or y ≤ -4
From the graph of the circle (S? ) and the regions (S? and S? ), we can see that there is one point of intersection at (5, 4).
∴ n (S? ∩ S? ∩ S? ) = 1

Upvote

Similar Questions for you

If |z + 1| = αz + β (i + 1) and  $z = \frac{1}{2}$ – 2i, find α + β.

Alok Kumar Singh

$| \frac{1}{2} - 2 i + 1 | = α (\frac{1}{2} - 2 i) + β (1 + i)$

$\sqrt[]{\frac{9}{4} + 4} = α (\frac{1}{2} - 2 i) + β (1 + i)$

$\frac{5}{2} = α (\frac{1}{2}) + β + i (- 2 α + β)$

$\frac{α}{2} + β = \frac{5}{2}$ ...(1)

–2α + β = 0 …(2)

Solving (1) and (2)

$\frac{α}{2} + 2 α = \frac{5}{2}$

$\frac{5}{2} α = \frac{5}{2}$

a =

Alok Kumar Singh

$z^{2} = - \bar{i z}$

$| z^{2} | = | - \bar{i z} |$

$| z^{2} | = | z |$

$| z^{2} | - | z | = 0$

$| z | (| z | - 1) = 0$

|z| = 0 (not acceptable)

|z| = 1

|z|² = 1

Alok Kumar Singh

Given : x² – 70x + l = 0

->Let roots be a and b

->b = 70 – a

->= a (70 – a)

l is not divisible by 2 and 3

->a = 5, b = 65

-> $\frac{\sqrt[]{5 - 1} + \sqrt[]{65 - 1}}{| 60 |} = | \frac{4 + 8}{60} | = \frac{1}{5}$

Alok Kumar Singh

z₁ + z₂ = 5

$z_{1}^{3} + z_{2}^{3} = 20 + 15 i$

$z_{1}^{3} + z_{2}^{3} = {(z_{1} + z_{2})}^{3} - 3 z_{1} z_{2} (z_{1} + z_{2})$

$z_{1}^{3} + z_{2}^{3} = 125 - 3 z_{1} \cdot z_{2} (5)$

⇒ 20 + 15i = 125 – 15z₁z₂

⇒ 3z₁z₂ = 25 – 4 – 3i

3z₁z₂ = 21– 3i

z₁⋅z₂ = 7 – i

(z₁ + z₂)² = 25

$z_{1}^{2} + z_{2}^{2} = 25 - 27 (7 - i)$

= 11 + 2i

${(z_{? 1}^{2} + z_{2}^{2})}^{2}$ &nb

Vishal Baghel

$x^{2} - 2 (3 k - 1) x + 8 k^{2} - 7 > 0 \Rightarrow a > 0, & D < 0,$

a = 1 > 0 and D < 0

4 (3k – 1)² – 4 (8k² – 7) < 0

$(9 k^{2} + 1 - 6 k - 8 k^{2} + 7 < 0)$

$k (k - 4) - 2 (k - 4) < 0$

$k \in (2, 4)$

K = 3

Taking an Exam? Selecting a College?

Get authentic answers from experts, students and alumni that you won't find anywhere else.

On Shiksha, get access to

66K

Colleges

1.2K

Exams

6.9L

Reviews

1.8M

Answers

Learn more about...

Maths Ncert Solutions class 11th 2026

View Exam Details

82 Answered Questions

Share Your College Life Experience

Didn't find the answer you were looking for?

Search from Shiksha's 1 lakh+ Topics

Ask Current Students, Alumni & our Experts

Quick Actions

Community GuidelinesUser Points System

QuestionsDiscussionsTags

Have a question related to your career & education?

See what others like you are asking & answering

Let C be the set of all complex numbers. LetS₁ = {z ∈ C | |z - 3 - 2i|² = 8},S₂ = {z ∈ C | Re(z) ≥ 5} andS₃ = {z ∈ C | |z - z̄| ≥ 8}.Then the number of element in S₁ ∩ S₂ ∩ S₃ is equal to:

Similar Questions for you

Taking an Exam? Selecting a College?

Learn more about...

Maths Ncert Solutions class 11th 2026

Share Your College Life Experience

Didn't find the answer you were looking for?

Ask Current Students, Alumni & our Experts

Quick Actions

Have a question related to your career & education?

Let C be the set of all complex numbers. Let
S₁ = {z ∈ C | |z - 3 - 2i|² = 8},
S₂ = {z ∈ C | Re(z) ≥ 5} and
S₃ = {z ∈ C | |z - z̄| ≥ 8}.
Then the number of element in S₁ ∩ S₂ ∩ S₃ is equal to: