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Complex Number NAT Level - 2 - Physics MCQ

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10 Questions MCQ Test Topic wise Tests for IIT JAM Physics - Complex Number NAT Level - 2

Complex Number NAT Level - 2 for Physics 2024 is part of Topic wise Tests for IIT JAM Physics preparation. The Complex Number NAT Level - 2 questions and answers have been prepared according to the Physics exam syllabus.The Complex Number NAT Level - 2 MCQs are made for Physics 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for Complex Number NAT Level - 2 below.

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*Answer can only contain numeric values

Complex Number NAT Level - 2 - Question 1

If perimeter of the locus represented by is k, then find the value of

Detailed Solution for Complex Number NAT Level - 2 - Question 1

r² + r² = 4
⇒ r = √2
perimeter = 3/2 πr

The correct answer is: 9

*Answer can only contain numeric values

Complex Number NAT Level - 2 - Question 2

If then the value of then find the value of n.

Detailed Solution for Complex Number NAT Level - 2 - Question 2

∴
∴

n = 7
The correct answer is: 7

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*Answer can only contain numeric values

Complex Number NAT Level - 2 - Question 3

If then find the value of

Detailed Solution for Complex Number NAT Level - 2 - Question 3

If |z| = |z – 1|
⇒ |z|² = |z – 1|²
again if |z| = |z + 1|
⇒ |z|² = |z + 1| ²
The correct answer is: 1

*Answer can only contain numeric values

Complex Number NAT Level - 2 - Question 4

If z is a complex number and the minimum value of |z| + |z - 1| + |2z - 3| is λ and if then find the value of [x + y]. (where [·] denotes the greatest integer function)

Detailed Solution for Complex Number NAT Level - 2 - Question 4

∴ |z| + |z – 1| + |2z – 3| =

then 2[x] + 3 =
= 3[x – 2]
⇒ 2[x] + 3 = 3([x] – 2)
or [x] = 9
then y = 2·9 + 3 = 21
∴ [x + y] = [x + 21] = [x] + 21 = 9 + 21 = 30
The correct answer is: 30

*Answer can only contain numeric values

Complex Number NAT Level - 2 - Question 5

If |z₂ + iz₁ | = |z₁ | + |z₂ | and |z₁ | = 3 and |z | = 4 then area of Δ ABC, if affix of A, B and C are (z₁ ), (z₂ ) and respectively is :

Detailed Solution for Complex Number NAT Level - 2 - Question 5

+

Let

and |z₂– z₃ | = |z₁ – z₃ |
⇒ AC = BC
∴ AB² = AC² + BC² ∴ (AB =5)

square unit
The correct answer is: 6.25

*Answer can only contain numeric values

Complex Number NAT Level - 2 - Question 6

Find the number of solutions of the equation

Detailed Solution for Complex Number NAT Level - 2 - Question 6

Let z = x + iy
⇒ x² – y² + 2ixy = x – iy
⇒ x² – y² = x
and
2xy = –y
From (2),
2xy = –y

When y = 0 from (1), we get
x = 0, 1
when

Hence the solution of the equation are
z₁ = 0 + 1.0, z₂ = 1 + 1.0 = 1

and

The correct answer is: 4

*Answer can only contain numeric values

Complex Number NAT Level - 2 - Question 7

If then find the value of

Detailed Solution for Complex Number NAT Level - 2 - Question 7

Here

multiplying (2) by i and adding it to (1) we get

The correct answer is: 5

*Answer can only contain numeric values

Complex Number NAT Level - 2 - Question 8

If then find the number of positive integers less than 20 satisfying above equation.

Detailed Solution for Complex Number NAT Level - 2 - Question 8

Now
⇒ r = 1
⇒ n = 4, 8, 12, 16
The correct answer is: 4

*Answer can only contain numeric values

Complex Number NAT Level - 2 - Question 9

Sum of common roots of the equations z³ + 2z² + 2z + 1 = 0 and z⁹⁷ + z²⁹ + 1 = 0 is equal to :

Detailed Solution for Complex Number NAT Level - 2 - Question 9

z³ + 2z² + 2z + 1 = (z³ + 1) + 2z(z + 1)
= (z + 1)(z² + z + 1) = 0
⇒ z = –1, ω, ω²
–1 does not satisfy z⁹⁷ + z²⁹ + 1 = 0
but ω and ω² satisfy and ω + ω² = –1
The correct answer is: -1

*Answer can only contain numeric values

Complex Number NAT Level - 2 - Question 10

Let , then find the value of

Detailed Solution for Complex Number NAT Level - 2 - Question 10

The correct answer is: 1

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