You know about how integrals work, right? One way to think of integrals is in terms of the area under the integrated curve. For functions that are strictly positive, that definition works great, but when the function becomes negative at some point, there is a problem because then you have to take the absolute value, right?
That is not always so, actually, and it can be quite useful in some contexts to leave the curve negative. Think back to what was said earlier: the area under the curve. All that space between negative infinity and our function. Clearly, that is absurd, right? A better way to think of it is as the difference between the area under the curve, and the area under the x axis. That way, when the function is positive, our curve is gaining more area, and when it is negative, it is gaining less than the x axis.
The same thing applies to plane figures that are not strict functions. In order to really determine this, we have to define which direction our edge is going as it travels around the figure. We can define it so that all the area on the right of our curve is inside the region, and all the area to the left is outside (or we can define it the other way around, but I will use the first way).
So our figure includes all the area from there to the edge at infinity of the plane that is directly to our right. Regions enclosed clockwise really include their conventional interior twice. Regions enclosed counterclockwise don't include their conventional interior at all. The area, then, is the difference between our region and the whole plane.
The application of this to concavity is fairly simple, if you understand what it actually means to be concave or convex. The triangle you are given is concave if it is cutting an area out from the plane, and it is convex if you are adding extra area to it. That is the exact same thing we were doing to determine the our area, so positive area corresponds to a convex shape, and negative area corresponds to a concave shape.
You can also do other weird things with this conceptual model. For instance, you can turn a region 'inside out' by reversing the edge direction.
I'm sorry if this has been a little hard to follow, but this is the actual way I understand negative area.