How do you take the reciprocal of a vector?

I am working in C# and I am trying to figure out how to take the reciprocal of the vector velocity.

I tried:

``````Vector2 Velocity;

Vector2 Reciprocal = 1 / Velocity;
``````

But I cannot do this because I cannot take an int and divide it by a vector. I have tried to look for an answer to this, but I have not fared well...

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Is this a custom vector-type under your control? The one from XNA? Something else? – Ani Mar 21 '11 at 3:18
What does the reciprocal of a vector mean? – Gabe Mar 21 '11 at 3:22
@Ani - I am using Visual Studio with XNA. – user658096 Mar 21 '11 at 3:24
@Gabe: I imagine the OP wants a new vector with the individual components being reciprocals of the original. – Ani Mar 21 '11 at 3:24
@Ani: I was thinking normal, but your guess is as good too. – Gabe Mar 21 '11 at 3:27

``````Vector2 Velocity
Vector2 Reciprocal
Reciprocal.X = Reciprocal.Y = Math.Sqrt(Math.Pow((1.0/Velocity.Length()),2)/2)
``````
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Wishing extension operator coming soon – Martheen Mar 21 '11 at 3:42

Mathematically speaking, the reciprocal of a vector is not well-defined. You can take the reciprocal of the magnitude of a vector, and you can create a new vector whose components are the reciprocals of the components of the original vector, but the notion of the reciprocal of a vector itself isn't meaningful.

Depending on which operation you want to do, the code will be different.

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I just want the magnitude, because the direction does not matter to me for this problem. – user658096 Mar 21 '11 at 3:25
@Ryan Then you don't want the reciprocal of a vector , which, as templatetypedef wrote, is not defined. – Dr. belisarius Mar 21 '11 at 3:56
In any application I can think of, the vector would stay pointing the same direction and you just divide by the magnitude. It's true that you can't "divide by a vector" although you actually can with directional derivative, but the reciprocal of a vector can be commonly understood as `1/mag * unit vec pointing in the original direction`. I think this even appears in Stewart. – isomorphismes May 5 '11 at 17:11
@Lao Tsu- I have not seen this notation before. I see why it might be intuitive, but since a Google search for "reciprocal vector" turns up pages primarily pertaining to lattice cryptography, I'm not sure that it's standardized. – templatetypedef May 5 '11 at 18:54