To expand on Ignacio's answer:

Let

```
x = the tip of the cone
dir = the normalized axis vector, pointing from the tip to the base
h = height
r = base radius
p = point to test
```

So you project `p`

onto `dir`

to find the point's distance along the axis:

```
cone_dist = dot(p - x, dir)
```

At this point, you can reject values outside `0 <= cone_dist <= h`

.

Then you calculate the cone radius at that point along the axis:

```
cone_radius = (cone_dist / h) * r
```

And finally calculate the point's orthogonal distance from the axis to compare against the cone radius:

```
orth_distance = length((p - x) - cone_dist * dir)
is_point_inside_cone = (orth_distance < cone_radius)
```