In this post I’ll be proving to you that:

Firstly, I’ll say that:

And also that:

If this is the case, then:

And as this is in the form:

I would have to conclude that:

Hence, I have my proof.

In this post I’ll be proving to you that:

Firstly, I’ll say that:

And also that:

If this is the case, then:

And as this is in the form:

I would have to conclude that:

Hence, I have my proof.

In this post I’ll be proving why:

Let’s say that:

And also that:

This would imply that:

Now if we multiply and together, we get:

Which is thanks to what we know about **trigonometric identities**.

As we can see above, we’ve formed another complex number:

And this is in the form of:

And because of the rules of complex numbers, we can say that:

Hence, we have our proof.

In this post I’ll be showing you how to prove that:

Firstly, let’s say that:

If this is the case, then according to the rules of complex numbers:

Secondly, let’s determine what is…

As you can see, we get the result above – which is another complex number.

This means that:

Therefore we’ve proven that:

You can watch a video related to this proof below…

In this post, I’ll be proving that:

First of all, let’s say that:

Whereby, .

And also that:

Whereby, .

If this is the case, this means that:

Therefore:

Hence we’ve proven that: