def evaluatePoly(poly, x): ''' Computes the value of a polynomial function at given value x. Returns that value as a float. poly: list of numbers, length > 0 x: number returns: float ''' for n in range(len(poly)): poly[n] = (poly[n]) * (x**n) return float(sum(poly[:])) def computeDeriv(poly): ''' Computes and returns the derivative of a polynomial function as a list of floats. If the derivative is 0, returns [0.0]. poly: list of numbers, length > 0 returns: list of numbers (floats) >>> print computeDeriv([-13.39, 0.0, 17.5, 3.0, 1.0]) [0.0, 35.0, 9.0, 4.0] >>> print computeDeriv([6, 1, 3, 0]) [1.0, 6.0, 0.0] >>> print computeDeriv() [0.0] ''' if len(poly) == 1: poly = [0.0] return poly for m in range(len(poly)): poly[m] = float(m) * poly[m] return poly[1:] def computeRoot(poly, x_0, epsilon): ''' Uses Newton's method to find and return a root of a polynomial function. Returns a list containing the root and the number of iterations required to get to the root. poly: list of numbers, length > 1. Represents a polynomial function containing at least one real root. The derivative of this polynomial function at x_0 is not 0. x_0: float epsilon: float > 0 returns: list [float, int] >>> print computeRoot([-13.39, 0.0, 17.5, 3.0, 1.0], 0.1, .0001) [0.806790753796352, 7] >>> print computeRoot([1, 9, 8], -3, .01) [-1.0000079170005467, 5] >>> print computeRoot([1, -1, 1, -1], 2, .001) [1.0002210630197605, 4] ''' x = x_0 iter = 0 list =  polyStart = poly[:] while abs(evaluatePoly(poly, x)) >= epsilon: poly = polyStart[:] l = evaluatePoly(poly,x) if abs(l) < epsilon: list.append(x) list.append(iter) return list else: poly = polyStart[:] d = computeDeriv(poly) dn = evaluatePoly(d, x) x = (x - (l/dn)) iter = iter + 1
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closed as not a real question by om-nom-nom, Brendan Long, Demian Brecht, Jon Clements, ρяσѕρєя K Oct 23 '12 at 5:11
It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.
I assume you mean this function is returning
How do I know? Because there's only one
So, you need to figure out what the correct return value is in that situation and add a
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