Letz Be A Complex Number Such That Z Z 3 I Where I Let z be a complex number such that |z| z = 3 i (where i = √ 1 . then |z| is equal to : (1) 5 3 (2) √34 3 (3) √41 4 (4) 5 4. Let z be a complex number such that |z| z = 3 i (where i = sqrt ( 1) ) . then |z| is equal to easy math 4 jee 822 subscribers subscribe.
Letz Be A Complex Number Such That Z Z 3 I Where I Step by step video, text & image solution for let z be a complex number such that |z| z=3 i (where i=sqrt ( 1)) then ,|z| is equal to by maths experts to help you in doubts & scoring excellent marks in class 12 exams. To solve for the magnitude of the complex number $$z$$z, we start with the equation given: where $$x$$x and $$y$$y are real numbers. the magnitude of $$z$$z is given by: click here 👆 to get an answer to your question ️ let z be a complex number such that | z | z = 3 i (where i = √ − 1 ) . Given a complex number z = x iy, where x and y are real numbers, and i= −1. we have the equation: ∣z∣ z = 3 i. here, ∣z∣ = x2 y2. we treat ∣z∣ as a real number; so the equation breaks down into real and imaginary parts: ∣z∣ x iy = 3 i. matching real and imaginary parts gives:. Let z be a complex number such that |z| z = 3 i ( where i = √ 1). then | z | is equal to. check answer and solution for above question from math.
Let Z Be A Complex Number Such That Z Z 3 I Where I Sqrt 1 Given a complex number z = x iy, where x and y are real numbers, and i= −1. we have the equation: ∣z∣ z = 3 i. here, ∣z∣ = x2 y2. we treat ∣z∣ as a real number; so the equation breaks down into real and imaginary parts: ∣z∣ x iy = 3 i. matching real and imaginary parts gives:. Let z be a complex number such that |z| z = 3 i ( where i = √ 1). then | z | is equal to. check answer and solution for above question from math. Since the system of equations implies that $x=2n\pi y$, that means that $ {z 1} {z 3}$ and $ {z 2} {z 3}$ must be complex conjugates, whether we be in the minimum case or the maximum case. Let z be a complex number such that |z| z = 3 i (where i = $$\sqrt { 1} $$). then |z| is equal to :. Let ‘z’ be a complex number such that |z| z = 3 i at (where i = 1). then |z| is equal to: by inspection it is clearly that imaginary part is 1. > jee main 2026 application will start probably from second week of october 2025 till november 2025. >check for 2026 examination. Hint: we must assume z as a general complex number, z = a i b then the magnitude of the complex number z will be | z | = a 2 b 2 using these two relations we must substitute them in the equation.
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