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I need to draw a line in my website, actually a curve representing a third degree polynom. What is the easiest way of finding a third degree equation that fits two points with given slopes in javascript?

Find the third degree equation for(or find the coeffecient a,b,c,d in general formula ax^3+bx^2+cx+d = y):

startX, startY, startSlope

endX, endY, endSlope

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A line would be a first degree polynom y = ax+b, and have slope=a everywhere. A third degree polynom is a curve. –  MSalters Apr 7 '11 at 7:52
Ok I Fixed it.:) –  einstein Apr 7 '11 at 7:59
Isn't this overconstrained? You have 6 constraints (3 points plus 3 slopes) but only 4 unknowns. You may want a fifth degree polynomial instead. –  Laurence Gonsalves Apr 7 '11 at 8:18
It is now. It used to be just start and end, in which case the third degree equation was a precise fit. –  MSalters Apr 7 '11 at 15:11

2 Answers 2

up vote 0 down vote accepted

Essentially this is just straightforward math.

You've got an unknown expression y=ax3+bx2+cx+d. You can drop quite a few terms by defining x' = (x-startX)/endX (i.e. startX' = 0, endX' = 1). You'll also have to scale the slopes; startSlope' = startSlope * 1/(endX-startX).

From this it follows that d' = startY. That's your first free parameter.

Next, note that the slope is trivially obtained by differentiation. dy/dx' = 3a'x'2+2b'x'+c'. Therefore, c' is just startSlope'.

a' and b' take a pair of equations: endY = a'+b'+c'+d', and endSlope = 3a'+2b'+c'+d'. Therefore a' = endSlope' - 2*endY, and b' = 3*endY - endSlope'.

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MSalters: How do you get d'? –  einstein Apr 7 '11 at 14:45
Well, since startX' is 0 by definition, you have startY=a'*0³ + b'*0² + c'*0 + d' . –  MSalters Apr 7 '11 at 14:49
You could also apply a substitutions from y to y', but that doesn't help in this case. You'd eliminate d' (as startY` would be 0, by definition) and you'd get back two constants in the y-y' transformation. (You can perform X and Y substitutions independently) –  MSalters Apr 7 '11 at 14:59
BUt I do have to reverse d' to d right? –  einstein Apr 7 '11 at 15:03
No. For instance, when you have startX = 5 and endX=8, and you need y(6), then you calculate x' = 1/3, and therefore y(6)=a'*1/3³ + b'*1/3² + c'*1/3 + d' –  MSalters Apr 7 '11 at 15:09

Assuming a 3-deg polynomial is ax3+bx2+cx+d, you have four unknowns.

Take the derivative to find the slope. That gives three unknowns (the constant term drops out).

You have two deritive equations for the two slopes. Please two equations for the (x,y) pair on the original equation. Therefore you have a total of four equations for four unknowns.


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