# Shader Syntax vector = vec3(a,b,c) in C++?

One simple question: I like the simple creation of vectors in OpenGL Shader language:

``````vector = vec3(a,b,c);
``````

How would you code the C++-struct or class that would allow this exact code in C++?

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If you're only concerned by the constructor, it's trivial. The real interest in this datatype is the operations you can do with them (addition, products, permutations, normalisation, etc.). –  didierc Feb 12 '13 at 19:19

This could be achieved by writing a `vec3` constructor that accepts three floats.

``````class vec3
{
public:
vec3( float x_, float y_, float z_ )
: x(x_)
, y(y_)
, z(z_)
{}

vec3( const vec3 &src )
{
*this = src;
}

vec3& operator =( const vec3 &src )
{
x = src.x;
y = src.y;
z = src.z;
return *this;
}

float x;
float y;
float z;
};
``````

What is more interesting is how to achieve permutation behaviour, like

``````vec3 a( 1, 2, 3 );
vec3 b = a.yzx; // 2, 3, 1
vec3 c = a.yyx; // 2, 2, 1
``````
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By the way, you needn't underscore. `:x(x), y(y), z(z)` works too –  RiaD Feb 12 '13 at 17:26
Hello @infact, thanks a lot! I realised there is one line missing to have it behave like in GLSL: after Public: `vec3() : x(0), y(0), z(0) {}` With this line you can also say e.g. `vec3 my_variable;` –  Kenobi Feb 12 '13 at 19:50
Yes. There is really no limit to the number of ways you might want to construct a vector. For performance reasons I would not initialize the members to any particular value automatically. Don't forget to add a copy constructor and assignment operator! –  user1157123 Feb 13 '13 at 9:05
Hi @infact, I'm pretty new to constructors and such stuff, but what you say seems promising. If you could provide a copy and assignment operator? Also one of the greatest things about what should be possible would be an add-operator (vec3 = vec3 + vec3) –  Kenobi Feb 17 '13 at 18:01
Hey, I got the constructors right: `bool operator== (vec3 v2) { return(x == v2.x && y == v2.y && z == v2.z); }; bool operator!= (vec3 v2) { return (x != v2.x | y != v2.y | z != v2.z); }; vec3 operator+ (vec3 v2) { return vec3(x+v2.x, y+v2.y,z+v2.z); }; vec3 operator- (vec3 v2) { return vec3(x-v2.x, y-v2.y,z-v2.z); }` –  Kenobi Feb 17 '13 at 19:52

All this work has been done, no need to rewrite it all yourself. You could use GLMmath

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thanks, @Aaluned, but for me that overshoots the mark :-) –  Kenobi Feb 17 '13 at 19:51