# distance from a point to a hyperplane

I have an n-dimensional hyperplane: $w'x + b = 0$ and a point $x_0$. The shortest distance from this point to a hyperplane is $d = \frac{|w \cdot x_0+ b|}{||w||}$. I have no problem to prove this for 2 and 3 dimension space using algebraic manipulations, but fail to do this for an n-dimensional space. Can someone show a nice explanation for it?

There are many ways to solve this problem. In principal one can use Lagrange multipliers and solve a large system of equations, but my attempt to do so met with a road block. However, since you are working in $\mathbb{R}^n$ we have the privilege of orthogonal projection via the dot product. To this end we need to construct a vector from the plane to $x_0$ to project onto a vector perpendicular to the plane. Then we compute the length of the projection to determine the distance from the plane to the point.

First, you have an affine hyperplane defined by $w \cdot x + b=0$ and a point $x_0$. Suppose that $X \in \mathbb{R}^n$ is a point satisfying $w \cdot X+b=0$, i.e. it is a point on the plane. You should construct the vector $x_0 - X$ which points from $X$ to $x_0$ so that you can project it onto the unique vector perpendicular to the plane. Some quick reasoning should tell you that this vector is, in fact, $w$. So we want to compute $\| \text{proj}_{w} (x_0-X)\|$. Some handy formulas give us $$d=\| \text{proj}_{w} (x_0-X)\| = \left\| \frac{(x_0-X)\cdot w}{w \cdot w} w \right\| = |x_0 \cdot w - X \cdot w|\frac{\|w\|}{\|w\|^2} = \frac{|x_0 \cdot w - X \cdot w|}{\|w\|}$$ We chose $X$ such that $w\cdot X=-b$ so we get $$d=\| \text{proj}_{w} (x_0-X)\| = \frac{|x_0 \cdot w +b|}{\|w\|}$$ as desired.

This almost seems like cheating and purely heuristic based on Euclidean geometry. Indeed, I would be more satisfied with a solution via Lagrange multipliers since it would not have required the fact that $\mathbb{R}^n$ has an inner product and just needed the topology of $\mathbb{R}^n$ instead. But we have the inner product, so maybe geometry will suffice for us this time.

To make this argument more concrete you should do each step in $\mathbb{R}^2$ for a line $y=mx+b$ and a point $(x_0,y_0)$.

• Can you please clarify how from $\left\| \frac{(x_0-X)\cdot w}{w \cdot w} w \right\|$ you ended up with $|x_0 \cdot w - X \cdot w|\frac{\|w\|}{\|w\|^2}$? In fact I am interested how $w$ became $||w||$. Mar 29 '15 at 4:07
• The dot product of two vectors is a real number. For any scalar $\lambda \in \mathbb{R}$ it is true that $\| \lambda w \| = |\lambda| \| w \|$. You can verify this via the definition of the norm on $\mathbb{R}^n$. That is $\|w\| = \sqrt{\sum_{i=1}^n w_i^2}$. Mar 29 '15 at 4:18
• oh, sorry, I have missed that the whole expression is in $|| ... ||$. Now everything is clear. Thank you. Mar 29 '15 at 4:27
• Thanks for your wonderful answer. Could you please help me solve the similar question which is in here but with matrix form? @Yeldarbskich Nov 4 at 10:55

Here is a Lagrange multiplier based solution.

The goal is to minimize $(x_0 - x)'(x_0 - x)$ subject to $w'x + b = 0$

The Lagrangian is $(x_0 - x)'(x_0 - x) - L(w'x + b)$

The derivative of the Lagrangian is $2(x_0 - x) - Lw = 0$

Dot with $w$, we get $2w'(x_0 - x) - Lw'w = 0 \implies L = \frac{2w'(x_0 - x)}{w'w}$

Dot with $(x_0 - x)$, we get $2(x_0 - x)'(x_0 - x) - L(x_0 - x)'w = 0 \implies 2(x_0 - x)'(x_0 - x) = \frac{2w'(x_0 - x)}{w'w} (x_0 - x)'w \implies (x_0 - x)'(x_0 - x) = \frac{\left(w'(x_0 - x)\right)^2}{w'w} \implies (x_0 - x)'(x_0 - x) = \frac{\left(w'x_0 + b\right)^2}{w'w}$

Taking square root gives the answer we wanted.

• A solution based of Lagrange multiplier - Yeldarbskich Jul 17 '18 at 3:37
• Is there something that led you to dot with $w$ and $(x_0-x)$ other than that it happens to work out?
– Alex
Mar 11 '19 at 0:34
• The problem with solving these vector equations is that you can't move the 'factor' to the other side if it is not a scalar. We can remedy that by computing the dot product with itself. After doing so, it turns scalar, and then we can move it. That's the idea anyway. Mar 12 '19 at 1:24

The problem has a simple solution via elementary geometry. Indeed, consider the line via $$x_0$$ and parallel to the vector $$w$$, namely $$L := \{x_0 + tw \mid t \in \mathbb R\} \subseteq \mathbb R^n$$. This line cuts your hyperplane when $$w^\top(x_0+tw) + b = 0$$, i.e $$t = -(w^\top x_0 + b)/\|w\|^2$$. The distance between this point of intersection and starting point $$x_0$$ is $$d := \|x_0 + tw - x_0\| = \|tw\|=|t|\|w\| = \frac{|w^\top x_0+b|}{\|w\|^2}\cdot\|w\| = \frac{|w^\top x_0 + b|}{\|w\|},$$ as claimed.