I am working on a homework problem for which I am supposed to make a function that interpolates sin(x) for n+1 interpolation points and compares the interpolation to the actual values of sin at those points. The problem statement asks for a function Lagrangian(x,points) that accomplishes this, although my current attempt at executing it does not use 'x' and 'points' in the loops, so I think I will have to try again (especially since my code doesn't work as is!) However, why I can't I access the items in the x_n array with an index, like x_n[k]? Additionally, is there a way to only access the 'x' values in the points array and loop over those for L_x? Finally, I think my 'error' definition is wrong, since it should also be an array of values. Is it necessary to make another for loop to compare each value in the 'error' array to 'max_error'? This is my code right now (we are executing in a GUI our professor made, so I think some of the commands are unique to that such as messages.write()):
def problem_6_run(problem_6_n, problem_6_m, plot, messages, **kwargs): n = problem_6_n.value m = problem_6_m.value messages.write('\n=== PROBLEM 6 ==========================\n') x_n = np.linspace(0,2*math.pi,n+1) y_n = np.sin(x_n) points = np.column_stack((x_n,y_n)) i = 0 k = 1 L_x = 1.0 def Lagrange(x, points): for i in n+1: for k in n+1: return L_x = (x- x_n[k] / x_n[i] - x_n[k]) return Lagrange = y_n[i] * L_x error = np.sin(x) - Lagrange max_error = 0 if error > max_error: max_error = error print.messages('Maximum error = &g' % max_error) plot.draw_lines(n+1,np.sin(x)) plot.draw_points(m,Lagrange) plots.draw_points(m,error)
Yes, the different things ThiefMaster mentioned are part of my (non CS) professor's environment; and yes, voithos, I'm using numpy and at this point have definitely had more practice with Matlab than Python (I guess that's obvious!). n and m are values entered by the user in the GUI; n+1 is the number of interpolation points and m is the number of points you plot against later.
Pseudocode: Given n and m
Generate x_n a list of n evenly spaced points from 0 to 2*pi Generate y_n a corresponding list of points for sin(x_n)
Define points, a 2D array consisting of these ordered pairs
Define Lagrange, a function of x and points
for each value in the range n+1 (this is where I would like to use points but don't know how to access those values appropriately)
evaluate y_n * (x - x_n[later index] / x_n[earlier index] - x_n[later index])
Calculate max error Calculate error interpolation Lagrange - sin(x)
plot sin(x); plot Lagrange; plot error
Does that make sense?