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132 lines
4.5 KiB
Python
132 lines
4.5 KiB
Python
"""
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@author: MatteoRaso
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"""
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from collections.abc import Callable
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from math import pi, sqrt
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from random import uniform
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from statistics import mean
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def pi_estimator(iterations: int):
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"""
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An implementation of the Monte Carlo method used to find pi.
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1. Draw a 2x2 square centred at (0,0).
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2. Inscribe a circle within the square.
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3. For each iteration, place a dot anywhere in the square.
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a. Record the number of dots within the circle.
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4. After all the dots are placed, divide the dots in the circle by the total.
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5. Multiply this value by 4 to get your estimate of pi.
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6. Print the estimated and numpy value of pi
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"""
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# A local function to see if a dot lands in the circle.
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def is_in_circle(x: float, y: float) -> bool:
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distance_from_centre = sqrt((x**2) + (y**2))
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# Our circle has a radius of 1, so a distance
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# greater than 1 would land outside the circle.
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return distance_from_centre <= 1
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# The proportion of guesses that landed in the circle
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proportion = mean(
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int(is_in_circle(uniform(-1.0, 1.0), uniform(-1.0, 1.0)))
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for _ in range(iterations)
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)
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# The ratio of the area for circle to square is pi/4.
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pi_estimate = proportion * 4
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print(f"The estimated value of pi is {pi_estimate}")
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print(f"The numpy value of pi is {pi}")
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print(f"The total error is {abs(pi - pi_estimate)}")
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def area_under_curve_estimator(
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iterations: int,
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function_to_integrate: Callable[[float], float],
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min_value: float = 0.0,
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max_value: float = 1.0,
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) -> float:
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"""
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An implementation of the Monte Carlo method to find area under
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a single variable non-negative real-valued continuous function,
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say f(x), where x lies within a continuous bounded interval,
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say [min_value, max_value], where min_value and max_value are
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finite numbers
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1. Let x be a uniformly distributed random variable between min_value to
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max_value
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2. Expected value of f(x) =
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(integrate f(x) from min_value to max_value)/(max_value - min_value)
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3. Finding expected value of f(x):
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a. Repeatedly draw x from uniform distribution
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b. Evaluate f(x) at each of the drawn x values
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c. Expected value = average of the function evaluations
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4. Estimated value of integral = Expected value * (max_value - min_value)
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5. Returns estimated value
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"""
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return mean(
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function_to_integrate(uniform(min_value, max_value)) for _ in range(iterations)
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) * (max_value - min_value)
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def area_under_line_estimator_check(
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iterations: int, min_value: float = 0.0, max_value: float = 1.0
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) -> None:
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"""
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Checks estimation error for area_under_curve_estimator function
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for f(x) = x where x lies within min_value to max_value
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1. Calls "area_under_curve_estimator" function
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2. Compares with the expected value
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3. Prints estimated, expected and error value
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"""
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def identity_function(x: float) -> float:
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"""
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Represents identity function
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>>> [function_to_integrate(x) for x in [-2.0, -1.0, 0.0, 1.0, 2.0]]
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[-2.0, -1.0, 0.0, 1.0, 2.0]
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"""
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return x
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estimated_value = area_under_curve_estimator(
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iterations, identity_function, min_value, max_value
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)
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expected_value = (max_value * max_value - min_value * min_value) / 2
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print("******************")
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print(f"Estimating area under y=x where x varies from {min_value} to {max_value}")
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print(f"Estimated value is {estimated_value}")
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print(f"Expected value is {expected_value}")
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print(f"Total error is {abs(estimated_value - expected_value)}")
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print("******************")
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def pi_estimator_using_area_under_curve(iterations: int) -> None:
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"""
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Area under curve y = sqrt(4 - x^2) where x lies in 0 to 2 is equal to pi
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"""
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def function_to_integrate(x: float) -> float:
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"""
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Represents semi-circle with radius 2
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>>> [function_to_integrate(x) for x in [-2.0, 0.0, 2.0]]
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[0.0, 2.0, 0.0]
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"""
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return sqrt(4.0 - x * x)
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estimated_value = area_under_curve_estimator(
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iterations, function_to_integrate, 0.0, 2.0
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)
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print("******************")
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print("Estimating pi using area_under_curve_estimator")
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print(f"Estimated value is {estimated_value}")
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print(f"Expected value is {pi}")
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print(f"Total error is {abs(estimated_value - pi)}")
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print("******************")
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if __name__ == "__main__":
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import doctest
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doctest.testmod()
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