Suppose that we have two parallel vectors and want to find all the unit vectors that are orthogonal to these vectors.
Then it suffices to find all the unit vectors that are orthogonal to one of these vectors, let d.
If we find two non-collinear vectors, a and b, that are orthogonal to d , does it hold that all the vectors that are orthogonal to the initial two vectors are $t \cdot a+s \cdot b, t,s \in \mathbb{R}$? If so, why does this hold?

Oh sorry , it means perpendicular @TedShifrin
But what can we say geometrically?

I want to show that $\text{Aut}(\mathbb{Z}_p)$ is isomorphic to $\mathbb{Z}_{p-1}$.

The group $\mathbb{Z}_p$ is cylcic and is generated by one element. The possible generators are $1,2,\dots ,p-1$.

Each automorphism maps each of the element of the set $\{1,2,\dots ,p-1\}$ to one of the element $\{1,2,\dots ,p-1\}$, right?

But how can we show that that the automorphism group of $\mathbb{Z}_p$ is isomorphic to $\mathbb{Z}_{p-1}$ ?

All the possible generators of $\mathbb{Z}_p$ are the elements $\{1,2,\dots , p-1\}$. The automorphisms map each of the elements $\{1,2,\dots , p-1\}$ to one of the element of $\{1,2,\dots , p-1\}$.
That means that $\text{Aut}(\mathbb{Z}_p)$ contains $p-1$ automorphisms, right?
But how do we continue to show the isomorphism?
Could you give me a hint? @Danu