If you have a vector from the enemy > player, you basically have a translation that you can apply to the enemy to get it to jump to the players position. You need to get back to a 'unit' by normalising the vector which will set the vectors overall length to '1' but have it still point in the direction of the player, then you can multiply this value by the velocity you actually want to get a vector to translate the enemy by to move it towards the player
As people have already answered  to get a unit you need sum the products of both components of the vector and then take the square root. This ties to pythagoras theorem e.g.:
If you take the components of a vector say
(2,2)
Which would be this:
2
^


> 2
And then draw a line between the origin (0,0) and the point where the vector ends meet  you get a triangle...
2
^
/
/ 
> 2
This line represents the magnitude of the vector, you take the sum of the squares of both components and then sqrt it to get the length of this line:
2 * 2 + 2 * 2 = 8
sqrt(8) = 2.82
So this vector is 2.82 long  meaning the 2 and 2 values are 2.82 times the size of a single unit vector
To get components that are '1' long or a 'unit', we need to normalise the vector  we do this by dividing each component by the magnitude
2 / 2.82 = 0.70
Which sounds about right  I know the angle of this vector is 45 degrees (up 2 across 2 must be a perfect diagonal) so you can check it using cosine or sine since cosine/sine provides the horizontal or vertical unit length of a vectors component for the given angle
sin(45) or cos(45) = 0.70
Spot on
So now you know that the angle towards the player uses a 1 length vector with the following components
(0.7, 0.7)
To move the enemy 3 units towards the player, you'd simply multiply the components by 3
0.7 * 3 = 2.1
So
(2.1, 2.1)
Would move the enemy 3 units towards the player in this physics step
Does this help at all?