# Efficient way to reduce a vectors magnitude by a specific length?

Lets say I have an arbitrary vector A. What is the most efficient way to reducing that vectors magnitude by arbitrary amount?

My current method is as follows:

``````Vector shortenLength(Vector A, float reductionLength) {

Vector B = A;
B.normalize();
B *= reductionLength;
return A - B;

}
``````

Is there a more efficent way to do this? Possibly removing the square root required to normalize B...

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Oh this is a math vector, not a C++ vector. I was confused. –  Mooing Duck Jan 8 '12 at 22:42
I don't think it's possible to normalize without doing a square root for the general case, and every other operation should be fast. I don't think you're going to beat that speed except by avoiding copies. –  Mooing Duck Jan 8 '12 at 22:43
It depends on how the vector is represented. If it were a 2-D vector stored as angle and magnitude, then this would be trivial. You don't say how your `Vector` class represents vectors internally or even if you have access to the data. The answer would depend on that. –  JohnPS Jan 8 '12 at 23:05
"by" or "to" an arbitrary amount? –  Kerrek SB Jan 8 '12 at 23:08

So if I understand you correctly, you have a vector `A`, and want another vector which points in the same direction as `A`, but is shorter by `reductionLength`, right?

Does the `Vector` interface have something like a "length" member function (returning the length of the vector)? Then I think the following should be more efficient:

``````Vector shortenLength(Vector A, float reductionLength)
{
Vector B = A;
B *= (1 - reduction_length/A.length());
return B;
}
``````
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Usually "normalizing" a vector means "same direction, but length of 1. His code is making a vector that is the same direction, with a length of "reductionlength". The text implies that the code is entirely wrong though. –  Mooing Duck Jan 9 '12 at 0:09
@MooingDuck: He is subtracting a vector which he obtained by first normalizing and then multiplying with `reductionLength` from the original vector. Which means he obtains a vector which points in the same direction, but is shorter by `reductionLength` (assuming the original vector was longer than `reductionLength` to begin with). –  celtschk Jan 9 '12 at 0:22
oh yeah, forgot that last line. Not sure how that happened. –  Mooing Duck Jan 9 '12 at 0:25

If you're going to scale a vector by multiplying it by a scalar value, you should not normalize. Not for efficiency reasons; because the outcome isn't what you probably want.

Let's say you have a vector that looks like this:

``````v = (3, 4)
``````

Its magnitude is `sqrt(3^2 + 4^2) = 5`. So let's normalize it:

``````n = (0.6, 0.8)
``````

This vector has magnitude 1; it's a unit vector.

So if you "shorten" each one by a factor of 0.5, what do you get?

``````shortened v = (3, 4) * 0.5 = (1.5, 2.0)
``````

Now let's normalize it by its magnitude sqrt(6.25):

``````normalized(shortened v) = (1.5/2.5, 2/2.5) = (0.6, 0.8)
``````

If we do the same thing to the unit vector:

``````shortened(normalized v) = (0.6, 0.8) * 0.5 = (0.3, 0.4)
``````

These are not the same thing at all. Your method does two things, and they aren't commutative.

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I can't imagine why this would be voted down. What's wrong with it? –  duffymo Jan 8 '12 at 23:48
Maybe it's the fact that he nowhere stated nor implied that he wants to multiply his vector by the scalar value `reductionLength`. In other words, your answer doesn't answer his question. (BTW, I'm not the one who voted you down.) –  celtschk Jan 9 '12 at 0:26
What do you imagine that "*=" operator is doing to that vector? It certainly is implied if you know something about vectors. –  duffymo Jan 9 '12 at 0:28
Just because at one step he multiplies an auxiliary vector by this number doesn't imply that his ultimate goal is to multiply the original vector by this amount. –  celtschk Jan 9 '12 at 0:30
In C, Java, and C# the "#=" operator works on the left-hand side object when # is +, -, *, /, and others. I'm assuming that it's how the *= operator was overloaded for this C++ Vector class. And the name of the method, shortenLength, is highly suggestive to me. –  duffymo Jan 9 '12 at 0:37