bleh, still seems like you can throw too hard, try a bit o' math to create less fuss

for example:

the farther away the value is from the average of "min" and "max", the bigger the change will be; for example, if the "expected" range is 0-2:Quote:

//max=the larger value you will expect

//min=the smaller value you will expect

//actualvalue=the actual value recieved

//newvalue=god it speaks for itself!!

newvalue=max*Math.sqrt(2*(actualvalue-min)/max)/2+min;

0=well actually i suppose it would be 0

0.25=0.5

0.5=0.7071067

0.75=0.8660254

1=1

1.25=1.1180339

1.5=1.2247448

1.75=1.3228756

2=1.4142135