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Properties Of Complex Numbers In Exponential Form

What is the result of multiplying two complex numbers in exponential form?

The magnitudes add, and the arguments multiply

The magnitudes multiply, and the arguments add.

The magnitudes multiply, and the arguments multiply

Multiplying a complex number by e^iπ the magnitude of complex number?

Remains unchanged

half

Increases two times

What is the result of adding ae^iθ in a complex number here θ is argument of both complex numbers?

Magnitude increases by a

no change in magnitude

magnitude decreases

When a complex number multiplied by 1 in exponential form, what happens?

The magnitude decreases

The magnitude increases

The complex number remains unchanged

What is the result of multiplying a complex number by its conjugate?

Complex number become its magnitude squared

Complex number becomes 1

Complex number become its magnitude

What happened to the argument of a complex number if it’s divided by its magnitude?

no change

rotates by angle θ

magnitude becomes 1

The magnitude of complex number represents the distance from?

origin

x-axis

y-axis

What is the result of dividing a complex number by its conjugate?

Complex number become its magnitude squared

Complex number becomes 1

Complex number become its magnitude

What is the result of multiplying a complex number by eⁱ^θ, here θ is argument

Questions

Time

Score

Properties Of Complex Numbers In Exponential Form

What is the result of multiplying two complex numbers in exponential form?

The magnitudes add, and the arguments multiply

The magnitudes multiply, and the arguments add.

The magnitudes multiply, and the arguments multiply

Multiplying a complex number by eiπ the magnitude of complex number?

Remains unchanged

half

Increases two times

What is the result of adding aeiθ in a complex number here θ is argument of both complex numbers?

Magnitude increases by a

no change in magnitude

magnitude decreases

When a complex number multiplied by 1 in exponential form, what happens?

The magnitude decreases

The magnitude increases

The complex number remains unchanged

What is the result of multiplying a complex number by its conjugate?

Complex number become its magnitude squared

Complex number becomes 1

Complex number become its magnitude

What happened to the argument of a complex number if it’s divided by its magnitude?

no change

rotates by angle θ

magnitude becomes 1

The magnitude of complex number represents the distance from?

origin

x-axis

y-axis

What is the result of dividing a complex number by its conjugate?

Complex number become its magnitude squared

Complex number becomes 1

Complex number become its magnitude

What is the result of multiplying a complex number by eiθ, here θ is argument

no change

rotates by angle θ

magnitude decreases

Multiplying a complex number by eiπ rotate the complex number?

180 degrees

360 degrees

45 degrees

Incorrect

Great!

Multiplying a complex number by e^iπ the magnitude of complex number?

What is the result of adding ae^iθ in a complex number here θ is argument of both complex numbers?

What is the result of multiplying a complex number by eⁱ^θ, here θ is argument

Multiplying a complex number by eⁱ^π rotate the complex number?