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For the below quardratic formula, I have multiple a but fixed b and c.

enter image description here

I wish to write a partial application function, which execute efficiently, i.e., my function doesn't recompute fixed values (because of b and c).

Here is my solution

let r b c = let z = b *. b in fun a -> (-.b +. sqrt (z-.4.0*.a*.c))/.(a*.2.0);;

I guess this solution can work, but I am not sure whether it is efficient enough. I just made b^2 to be fixed as I saw other parts are all with a.

Anyone can give me a better solution?

share|improve this question
Note that nowadays arithmetic operations are so cheap that unless you need to compute the formula a lot of times, the gain will be barely noticeable. The most expensive operation is sqrt, which you have to compute anyway. In this case, I'd rather prefer code readability over a minor optimization. – Petr Pudlák Dec 6 '12 at 11:00
up vote 2 down vote accepted

Yeah, that's a correct way to deal with the situation at hand. The alternate form doesn't help much (as long this obtains the accuracy you require). You may want to move the 4*c out as well,

let r b c = let z = b *. b and c4 = 4.0 *. c in
            fun a -> (-.b +. sqrt (z-.a*.c4))/.(a*.2.0);;
share|improve this answer
yeah, you are right. So no more improvement? – Jackson Tale Dec 5 '12 at 17:32
You may want to look at the compiled code to see if the floats are unboxed, but it may not improve much in this case. – nlucaroni Dec 5 '12 at 17:37
let r b c = let b2 = -.b /. 2.0 and z = b2 *. b2 in fun a -> (b2 +. sqrt (z-.a*.c))/.a – Sjoerd Visscher Dec 5 '12 at 22:53

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