A vector at an angle of 30° can be thought as the sum of a horizontal and a vertical vector, which we will call [tex] v_h,v_v[/tex].
In particular, you have
[tex] v = v_{h}+v_{v} [/tex]
and moreover, we have
[tex] v_{h} = v\cos(\alpha),\quad v_{v}=v\sin(\alpha) [/tex]
So, if we are only interested in the vertical component of the bird's flight, we have to consider a velocity of
[tex] 6\sin(30) = 6\cdot 0.5 = 3 [/tex]
This means that the bird rises with a constant speed of 3m/s, and thus his equation is
[tex] h = 3t [/tex]
where [tex]h[/tex] is the height in meters and [tex]t[/tex] is the time in seconds
