Complex Numbers and Their Properties

The complex number itself

The imaginary part of the complex number

The real part of the complex number

The modulus squared of the complex number

Assuming the complex number is on the unit circle

Using the wrong base for exponentiation

Ignoring the imaginary part

Assuming the modulus is always 1

It is squared when a complex number is multiplied by its conjugate

It is irrelevant to the conjugate

It is halved when a complex number is multiplied by its conjugate

It determines the angle of the complex number

The modulus of the product of two complex numbers

The real part of the product of two complex numbers

The imaginary part of the product of two complex numbers

The real part of the product of a complex number and its conjugate

To avoid using real numbers

To provide multiple perspectives for different problems

To make calculations more complex

To confuse the students

It is equal to the modulus of their sum

It is less than or equal to the modulus of their sum

It is always greater than the modulus of their sum

It is always less than the modulus of their sum

Because 'y' being real makes the modulus negative

Because 'y' being real makes the modulus zero

Because 'y' being real ensures y^2 is non-negative

Because 'y' can be any complex number

It is the modulus of x

It is always equal to -x

It is the absolute value of x

It is always equal to x

It demonstrates a unique property of complex numbers

It proves that complex numbers are always positive

It connects complex numbers to Euclidean geometry

It shows that complex numbers behave like real numbers

It helps find the area of the triangle

It helps find the least and greatest possible values of a side

It helps find the perimeter of the triangle

It helps find the exact side lengths