# Matlab Bessel function and interpolation

I am trying to finish an assignment and I don't really know how to do what the question asks. I am not looking for a complete answer, but just an understanding on what I need to use/do to solve the question. Here is the question:

We are asked to provide an interpolant for the Bessel function of the first kind of order zero, J0(x).

(a) Create a table of data points listed to 7 decimal places for the interpolation points x1 = 1.0, x2 = 1.3, x3 = 1.6, x4 = 1.9, x5 = 2.2. [Hint: See Matlab's help on BesselJ.]

(b) Fit a second-degree polynomial through the points x1, x2, x3. Use this interpolant to estimate J0(1.5). Compute the error.

What exactly does BesselJ do? And how do I fit a second degree polynomial through the three points?

Thanks,

Mikeshiny

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Here's the zeroth order Bessel function of the first kind:

http://mathworld.wolfram.com/BesselFunctionoftheFirstKind.html

Bessel functions are to differential equations in cylindrical coordinates as sines and cosines are to ODEs in rectangular coordinates.

Both have series representations; both have polynomial approximations.

Here's a general second-order polynomial:

``````y = a0 + a1*x + a2*x^2
``````

Substitute in three points `(x1, y1)`, `(x2, y2)`, and `(x3, y3)` and you'll have three equations for three unknown coefficients `a0`, `a1`, and `a2`. Solve for those coefficients.

Take a look at the plot of `y = J0(x)` in the link I gave you. You want to fit a 2nd order poly through some range. So - pick one. The first point is (0, 1). Pick two more - maybe x = 1 and x = 2. Look up the values for y at those values of x from a J0 table and evaluate your coefficients.

Here are my three points: (0,1), (1, 0.7652), (2.4048, 0).

When I calculate the coefficients, here's the 2nd order polynomial I get:

``````J0(x) = 1 -0.105931124*x -0.128868876*x*x
``````
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But what do I use for y1, y2, and y3? – MikeShiny Feb 24 '13 at 23:09
The values of the function you're trying to interpolate at x1, x2, and x3 of course. – duffymo Feb 24 '13 at 23:10
is that the first three values I get from besselj? – MikeShiny Feb 24 '13 at 23:51
"First three"? It's a continuous function. – duffymo Feb 24 '13 at 23:58
Thanks for the help, I figured it out – MikeShiny Feb 25 '13 at 1:08