Basic Definitions (from your trigonometry book):
cos ϴ = x/h, sin ϴ = y/h
Gratuitous ASCII art to describe x,y,and H :
_
/\ assume we're going this way
/
/
/ 
h / 
/  Y
/ 
/ϴ 
+
X
A vector can be split into a sum of two vectors. (you can think of this in the diagram as going northeast for H meters is the same as going east for X meters and north for Y meters)
H in this case corresponds to your current thrust. You want to find the X and Y components of that thrust.
since cos ϴ = X / H (basic definition of cosine), we can say (via simple algebra)
X = H * cos ϴ
however, ϴ is assumed to be a radian measure. if you're using degrees, you have to multiply by Math.PI / 180 to get the correct value. hence, you have
ϴ = angle * Math.PI / 180
We're very close! Now our classic definitionofcosine formula (when translated to our terms) looks like
cos (angle * Math.PI / 180) = X / H
H being our Thrust vector, X being only the horizontal part of our thrust vector.
"Now, wait a minute," you say. "why am I using cosine to calculate the vertical velocity then? Your axes seem flipped to me." Ah, yes. This is standard geometric orientation  angles are measured as a counterclockwise rotation from >
directly to the right. Your axes are flipped because you are storing your angle as a "clockangle", i.e. 0 degrees is at 12:00. In order to use the standard geometric equation, we have to mirror our entire universe so that the X and Y axes are flipped. Luckily, the mathematical way to do this is simply to switch all your X's and Y's around in the equations.
standard 'math' coordinate system
_
/\
/
/
/  angles increase counterclockwise
h / 
/  Y
/ 
/ϴ 
+ (zero degrees starts here)
(0,0) X
your coordinate system
(zero degrees starts here)
^
 angles increase clockwise
 /
 /
ϴ/
/
+
Finally, why is there a negative in the cosine? Because here is the cartesian system where we do our math in
^ yaxis


+> xaxis
here is the cartesian system that you are drawing to (probably a canvas)
+> xaxis


v yaxis
since the yaxis is facing the other direction, you multiply all yvalues by a negative 1 to get the correct orientation