diff --git a/05_numbers_00_lecture.ipynb b/05_numbers_00_lecture.ipynb index 771a0ad..3f0bdb3 100644 --- a/05_numbers_00_lecture.ipynb +++ b/05_numbers_00_lecture.ipynb @@ -1,5 +1,53 @@ { "cells": [ + { + "cell_type": "markdown", + "metadata": { + "slideshow": { + "slide_type": "skip" + } + }, + "source": [ + "A **video presentation** of the contents in this chapter is shown below. A playlist with *all* chapters as videos is linked [here](https://www.youtube.com/playlist?list=PL-2JV1G3J10lQ2xokyQowcRJI5jjNfW7f)." + ] + }, + { + "cell_type": "code", + "execution_count": 1, + "metadata": { + "slideshow": { + "slide_type": "skip" + } + }, + "outputs": [ + { + "data": { + "image/jpeg": 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\n", + "text/html": [ + "\n", + " \n", + " " + ], + "text/plain": [ + "" + ] + }, + "execution_count": 1, + "metadata": {}, + "output_type": "execute_result" + } + ], + "source": [ + "from IPython.display import YouTubeVideo\n", + "YouTubeVideo(\"nB00WGCnVjg\", width=\"60%\")" + ] + }, { "cell_type": "markdown", "metadata": { @@ -8,7 +56,7 @@ } }, "source": [ - "# Chapter 5: Bits & Numbers" + "# Chapter 5: Numbers & Bits" ] }, { @@ -23,7 +71,7 @@ "\n", "We start with the \"simple\" ones: Numeric types in this chapter and textual data in [Chapter 6](https://nbviewer.jupyter.org/github/webartifex/intro-to-python/blob/master/06_text_00_lecture.ipynb). An important fact that holds for all objects of these types is that they are **immutable**. To reuse the bag analogy from [Chapter 1](https://nbviewer.jupyter.org/github/webartifex/intro-to-python/blob/master/01_elements_00_lecture.ipynb#Objects-vs.-Types-vs.-Values), this means that the $0$s and $1$s making up an object's *value* cannot be changed once the bag is created in memory, implying that any operation with or method on the object creates a *new* object in a *different* memory location.\n", "\n", - "[Chapter 7](https://nbviewer.jupyter.org/github/webartifex/intro-to-python/blob/master/07_sequences_00_lecture.ipynb), [Chapter 8](https://nbviewer.jupyter.org/github/webartifex/intro-to-python/blob/master/08_mappings_00_lecture.ipynb), and [Chapter 9](https://nbviewer.jupyter.org/github/webartifex/intro-to-python/blob/master/09_arrays_00_lecture.ipynb) then cover the more \"complex\" data types, including, for example, the `list` type. Finally, Chapter 10 completes the picture by introducing language constructs to create custom types.\n", + "[Chapter 7](https://nbviewer.jupyter.org/github/webartifex/intro-to-python/blob/master/07_sequences_00_lecture.ipynb), [Chapter 8](https://nbviewer.jupyter.org/github/webartifex/intro-to-python/blob/master/08_mfr_00_lecture.ipynb), and [Chapter 9](https://nbviewer.jupyter.org/github/webartifex/intro-to-python/blob/master/09_mappings_00_lecture.ipynb) then cover the more \"complex\" data types, including, for example, the `list` type. Finally, Chapter 10 completes the picture by introducing language constructs to create custom types.\n", "\n", "We have already seen many hints indicating that numbers are not as trivial to work with as it seems at first sight:\n", "\n", @@ -60,7 +108,7 @@ }, { "cell_type": "code", - "execution_count": 1, + "execution_count": 2, "metadata": { "slideshow": { "slide_type": "slide" @@ -82,30 +130,6 @@ "Just like any other object, the `42` has an identity, a type, and a value." ] }, - { - "cell_type": "code", - "execution_count": 2, - "metadata": { - "slideshow": { - "slide_type": "fragment" - } - }, - "outputs": [ - { - "data": { - "text/plain": [ - "94784085682240" - ] - }, - "execution_count": 2, - "metadata": {}, - "output_type": "execute_result" - } - ], - "source": [ - "id(a)" - ] - }, { "cell_type": "code", "execution_count": 3, @@ -118,7 +142,7 @@ { "data": { "text/plain": [ - "int" + "94381541328960" ] }, "execution_count": 3, @@ -127,7 +151,7 @@ } ], "source": [ - "type(a)" + "id(a)" ] }, { @@ -142,7 +166,7 @@ { "data": { "text/plain": [ - "42" + "int" ] }, "execution_count": 4, @@ -150,6 +174,30 @@ "output_type": "execute_result" } ], + "source": [ + "type(a)" + ] + }, + { + "cell_type": "code", + "execution_count": 5, + "metadata": { + "slideshow": { + "slide_type": "fragment" + } + }, + "outputs": [ + { + "data": { + "text/plain": [ + "42" + ] + }, + "execution_count": 5, + "metadata": {}, + "output_type": "execute_result" + } + ], "source": [ "a" ] @@ -167,7 +215,7 @@ }, { "cell_type": "code", - "execution_count": 5, + "execution_count": 6, "metadata": { "slideshow": { "slide_type": "slide" @@ -180,7 +228,7 @@ "1000000" ] }, - "execution_count": 5, + "execution_count": 6, "metadata": {}, "output_type": "execute_result" } @@ -202,7 +250,7 @@ }, { "cell_type": "code", - "execution_count": 6, + "execution_count": 7, "metadata": { "slideshow": { "slide_type": "fragment" @@ -215,7 +263,7 @@ "123456789" ] }, - "execution_count": 6, + "execution_count": 7, "metadata": {}, "output_type": "execute_result" } @@ -237,7 +285,7 @@ }, { "cell_type": "code", - "execution_count": 7, + "execution_count": 8, "metadata": { "slideshow": { "slide_type": "fragment" @@ -246,10 +294,10 @@ "outputs": [ { "ename": "SyntaxError", - "evalue": "invalid token (, line 1)", + "evalue": "invalid token (, line 1)", "output_type": "error", "traceback": [ - "\u001b[0;36m File \u001b[0;32m\"\"\u001b[0;36m, line \u001b[0;32m1\u001b[0m\n\u001b[0;31m 042\u001b[0m\n\u001b[0m ^\u001b[0m\n\u001b[0;31mSyntaxError\u001b[0m\u001b[0;31m:\u001b[0m invalid token\n" + "\u001b[0;36m File \u001b[0;32m\"\"\u001b[0;36m, line \u001b[0;32m1\u001b[0m\n\u001b[0;31m 042\u001b[0m\n\u001b[0m ^\u001b[0m\n\u001b[0;31mSyntaxError\u001b[0m\u001b[0;31m:\u001b[0m invalid token\n" ] } ], @@ -270,7 +318,7 @@ }, { "cell_type": "code", - "execution_count": 8, + "execution_count": 9, "metadata": { "slideshow": { "slide_type": "slide" @@ -283,7 +331,7 @@ "42" ] }, - "execution_count": 8, + "execution_count": 9, "metadata": {}, "output_type": "execute_result" } @@ -294,7 +342,7 @@ }, { "cell_type": "code", - "execution_count": 9, + "execution_count": 10, "metadata": { "slideshow": { "slide_type": "fragment" @@ -307,7 +355,7 @@ "42" ] }, - "execution_count": 9, + "execution_count": 10, "metadata": {}, "output_type": "execute_result" } @@ -329,7 +377,7 @@ }, { "cell_type": "code", - "execution_count": 10, + "execution_count": 11, "metadata": { "slideshow": { "slide_type": "fragment" @@ -342,7 +390,7 @@ "-42" ] }, - "execution_count": 10, + "execution_count": 11, "metadata": {}, "output_type": "execute_result" } @@ -364,10 +412,10 @@ }, { "cell_type": "code", - "execution_count": 11, + "execution_count": 12, "metadata": { "slideshow": { - "slide_type": "slide" + "slide_type": "fragment" } }, "outputs": [ @@ -377,7 +425,7 @@ "42" ] }, - "execution_count": 11, + "execution_count": 12, "metadata": {}, "output_type": "execute_result" } @@ -388,10 +436,10 @@ }, { "cell_type": "code", - "execution_count": 12, + "execution_count": 13, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -402,7 +450,7 @@ "traceback": [ "\u001b[0;31m---------------------------------------------------------------------------\u001b[0m", "\u001b[0;31mValueError\u001b[0m Traceback (most recent call last)", - "\u001b[0;32m\u001b[0m in \u001b[0;36m\u001b[0;34m\u001b[0m\n\u001b[0;32m----> 1\u001b[0;31m \u001b[0mint\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;34m\"42.0\"\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m", + "\u001b[0;32m\u001b[0m in \u001b[0;36m\u001b[0;34m\u001b[0m\n\u001b[0;32m----> 1\u001b[0;31m \u001b[0mint\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;34m\"42.0\"\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m", "\u001b[0;31mValueError\u001b[0m: invalid literal for int() with base 10: '42.0'" ] } @@ -413,10 +461,10 @@ }, { "cell_type": "code", - "execution_count": 13, + "execution_count": 14, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -426,7 +474,7 @@ "42" ] }, - "execution_count": 13, + "execution_count": 14, "metadata": {}, "output_type": "execute_result" } @@ -448,7 +496,7 @@ }, { "cell_type": "code", - "execution_count": 14, + "execution_count": 15, "metadata": { "slideshow": { "slide_type": "skip" @@ -461,7 +509,7 @@ "1" ] }, - "execution_count": 14, + "execution_count": 15, "metadata": {}, "output_type": "execute_result" } @@ -525,7 +573,7 @@ }, { "cell_type": "code", - "execution_count": 15, + "execution_count": 16, "metadata": { "slideshow": { "slide_type": "slide" @@ -538,7 +586,7 @@ "'0b11'" ] }, - "execution_count": 15, + "execution_count": 16, "metadata": {}, "output_type": "execute_result" } @@ -558,41 +606,6 @@ "We may pass a `str` object formatted this way as the argument to the [int()](https://docs.python.org/3/library/functions.html#int) built-in, together with `base=2`, to create an `int` object, for example, with the value of `3`." ] }, - { - "cell_type": "code", - "execution_count": 16, - "metadata": { - "slideshow": { - "slide_type": "fragment" - } - }, - "outputs": [ - { - "data": { - "text/plain": [ - "3" - ] - }, - "execution_count": 16, - "metadata": {}, - "output_type": "execute_result" - } - ], - "source": [ - "int(\"0b11\", base=2)" - ] - }, - { - "cell_type": "markdown", - "metadata": { - "slideshow": { - "slide_type": "skip" - } - }, - "source": [ - "Moreover, we may also use the contents of the returned `str` object as a **literal** instead: Just like we type, for example, `3` without quotes (i.e., \"literally\") into a code cell to create the `int` object `3`, we may type `0b11` to obtain an `int` object with the same value." - ] - }, { "cell_type": "code", "execution_count": 17, @@ -614,7 +627,7 @@ } ], "source": [ - "0b11" + "int(\"0b11\", base=2)" ] }, { @@ -625,7 +638,7 @@ } }, "source": [ - "It is convenient to use the underscore `_` to separate the `\"0b\"` prefix from the bits." + "Moreover, we may also use the contents of the returned `str` object as a **literal** instead: Just like we type, for example, `3` without quotes (i.e., \"literally\") into a code cell to create the `int` object `3`, we may type `0b11` to obtain an `int` object with the same value." ] }, { @@ -649,7 +662,7 @@ } ], "source": [ - "0b_11" + "0b11" ] }, { @@ -1472,7 +1485,7 @@ } ], "source": [ - "0x_7b" + "0x7b" ] }, { @@ -1491,7 +1504,7 @@ "execution_count": 43, "metadata": { "slideshow": { - "slide_type": "skip" + "slide_type": "slide" } }, "outputs": [ @@ -1515,7 +1528,7 @@ "execution_count": 44, "metadata": { "slideshow": { - "slide_type": "skip" + "slide_type": "fragment" } }, "outputs": [ @@ -1550,7 +1563,7 @@ "execution_count": 45, "metadata": { "slideshow": { - "slide_type": "skip" + "slide_type": "fragment" } }, "outputs": [ @@ -1869,7 +1882,7 @@ "execution_count": 55, "metadata": { "slideshow": { - "slide_type": "slide" + "slide_type": "skip" } }, "outputs": [ @@ -1893,7 +1906,7 @@ "execution_count": 56, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -1987,7 +2000,7 @@ "execution_count": 59, "metadata": { "slideshow": { - "slide_type": "slide" + "slide_type": "fragment" } }, "outputs": [ @@ -2062,7 +2075,7 @@ "execution_count": 61, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2086,7 +2099,7 @@ "execution_count": 62, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2121,7 +2134,7 @@ "execution_count": 63, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2156,7 +2169,7 @@ "execution_count": 64, "metadata": { "slideshow": { - "slide_type": "slide" + "slide_type": "fragment" } }, "outputs": [ @@ -2180,7 +2193,7 @@ "execution_count": 65, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2204,7 +2217,7 @@ "execution_count": 66, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2239,7 +2252,7 @@ "execution_count": 67, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2274,7 +2287,7 @@ "execution_count": 68, "metadata": { "slideshow": { - "slide_type": "slide" + "slide_type": "skip" } }, "outputs": [ @@ -2298,7 +2311,7 @@ "execution_count": 69, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2322,7 +2335,7 @@ "execution_count": 70, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2357,7 +2370,7 @@ "execution_count": 71, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2394,7 +2407,7 @@ "execution_count": 72, "metadata": { "slideshow": { - "slide_type": "slide" + "slide_type": "fragment" } }, "outputs": [ @@ -2418,7 +2431,7 @@ "execution_count": 73, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2442,7 +2455,7 @@ "execution_count": 74, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2466,7 +2479,7 @@ "execution_count": 75, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2538,7 +2551,7 @@ "execution_count": 77, "metadata": { "slideshow": { - "slide_type": "slide" + "slide_type": "skip" } }, "outputs": [ @@ -2562,7 +2575,7 @@ "execution_count": 78, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2586,7 +2599,7 @@ "execution_count": 79, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2610,7 +2623,7 @@ "execution_count": 80, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2645,7 +2658,7 @@ "execution_count": 81, "metadata": { "slideshow": { - "slide_type": "slide" + "slide_type": "skip" } }, "outputs": [ @@ -2669,7 +2682,7 @@ "execution_count": 82, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2693,7 +2706,7 @@ "execution_count": 83, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2717,7 +2730,7 @@ "execution_count": 84, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -2789,7 +2802,7 @@ { "data": { "text/plain": [ - "139663468493296" + "139960518791696" ] }, "execution_count": 86, @@ -3113,7 +3126,7 @@ "execution_count": 97, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -3487,7 +3500,7 @@ } ], "source": [ - "float(\"inf\") # same as float(\"+inf\")" + "float(\"inf\") # also float(\"+inf\")" ] }, { @@ -3836,7 +3849,7 @@ "execution_count": 120, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -3871,7 +3884,7 @@ "execution_count": 121, "metadata": { "slideshow": { - "slide_type": "slide" + "slide_type": "fragment" } }, "outputs": [ @@ -4125,7 +4138,7 @@ } }, "source": [ - "A popular workaround is to benchmark the difference between the two numbers to be checked for equality against a pre-defined `threshold` *sufficiently* close to `0`, for example, `1e-15`." + "A popular workaround is to benchmark the absolute value of the difference between the two numbers to be checked for equality against a pre-defined `threshold` *sufficiently* close to `0`, for example, `1e-15`." ] }, { @@ -4162,7 +4175,7 @@ } ], "source": [ - "(sqrt(2) ** 2) - 2 < threshold" + "abs((sqrt(2) ** 2) - 2) < threshold" ] }, { @@ -4186,7 +4199,7 @@ } ], "source": [ - "(0.1 + 0.2) - 0.3 < threshold" + "abs((0.1 + 0.2) - 0.3) < threshold" ] }, { @@ -5021,7 +5034,7 @@ } ], "source": [ - "Decimal(0.1) # do not do this" + "Decimal(0.1) # do not do this!" ] }, { @@ -5182,7 +5195,7 @@ "execution_count": 166, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -5206,7 +5219,7 @@ "execution_count": 167, "metadata": { "slideshow": { - "slide_type": "slide" + "slide_type": "fragment" } }, "outputs": [ @@ -5241,7 +5254,7 @@ "execution_count": 168, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -5265,7 +5278,7 @@ "execution_count": 169, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -5300,7 +5313,7 @@ "execution_count": 170, "metadata": { "slideshow": { - "slide_type": "slide" + "slide_type": "fragment" } }, "outputs": [ @@ -5436,7 +5449,7 @@ "execution_count": 174, "metadata": { "slideshow": { - "slide_type": "slide" + "slide_type": "fragment" } }, "outputs": [ @@ -5471,7 +5484,7 @@ "execution_count": 175, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -5879,7 +5892,7 @@ } ], "source": [ - "Fraction(1, 3) # 1/3 with \"full\" precision" + "Fraction(1, 3) # 1 / 3 with \"full\" precision" ] }, { @@ -5903,7 +5916,7 @@ } ], "source": [ - "Fraction(\"1/3\") # 1/3 with \"full\" precision" + "Fraction(\"1/3\") # 1 / 3 with \"full\" precision" ] }, { @@ -5927,7 +5940,7 @@ } ], "source": [ - "Fraction(\"0.3333333333\") # 1/3 with a precision of 10 significant digits" + "Fraction(\"0.3333333333\") # 1 / 3 with a precision of 10 significant digits" ] }, { @@ -5970,7 +5983,7 @@ "execution_count": 191, "metadata": { "slideshow": { - "slide_type": "slide" + "slide_type": "skip" } }, "outputs": [ @@ -5994,7 +6007,7 @@ "execution_count": 192, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -6222,7 +6235,7 @@ } ], "source": [ - "10.0 * Fraction(1, 100) # do not do this" + "10.0 * Fraction(1, 100) # do not do this!" ] }, { @@ -6348,7 +6361,7 @@ { "data": { "text/plain": [ - "139663415663408" + "139960519210800" ] }, "execution_count": 202, @@ -6556,7 +6569,7 @@ } }, "source": [ - " The arguments to [complex()](https://docs.python.org/3/library/functions.html#complex) may be any numeric type." + "The arguments to [complex()](https://docs.python.org/3/library/functions.html#complex) may be any numeric type or properly formated `str` object." ] }, { @@ -6623,7 +6636,7 @@ "execution_count": 211, "metadata": { "slideshow": { - "slide_type": "slide" + "slide_type": "skip" } }, "outputs": [], @@ -6637,7 +6650,7 @@ "execution_count": 212, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -6661,7 +6674,7 @@ "execution_count": 213, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -6781,7 +6794,7 @@ "execution_count": 218, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -6805,7 +6818,7 @@ "execution_count": 219, "metadata": { "slideshow": { - "slide_type": "fragment" + "slide_type": "skip" } }, "outputs": [ @@ -6832,7 +6845,7 @@ } }, "source": [ - "The absolute value of a `complex` number $x$ is defined with the Pythagorean Theorem where $\\lVert x \\rVert = \\sqrt{a^2 + b^2}$ and $a$ and $b$ are the real and imaginary parts. The [abs()](https://docs.python.org/3/library/functions.html#abs) built-in function implements that in Python." + "A `complex` number comes with two **attributes** `real` and `imag` that return the two parts as `float` objects on their own." ] }, { @@ -6847,7 +6860,7 @@ { "data": { "text/plain": [ - "5.0" + "0.0" ] }, "execution_count": 220, @@ -6856,18 +6869,7 @@ } ], "source": [ - "abs(3 + 4j)" - ] - }, - { - "cell_type": "markdown", - "metadata": { - "slideshow": { - "slide_type": "skip" - } - }, - "source": [ - "A `complex` number comes with two **attributes** `real` and `imag` that return the two parts as `float` objects on their own." + "x.real" ] }, { @@ -6891,31 +6893,7 @@ } ], "source": [ - "c1.real" - ] - }, - { - "cell_type": "code", - "execution_count": 222, - "metadata": { - "slideshow": { - "slide_type": "fragment" - } - }, - "outputs": [ - { - "data": { - "text/plain": [ - "2.0" - ] - }, - "execution_count": 222, - "metadata": {}, - "output_type": "execute_result" - } - ], - "source": [ - "c1.imag" + "x.imag" ] }, { @@ -6931,7 +6909,7 @@ }, { "cell_type": "code", - "execution_count": 223, + "execution_count": 222, "metadata": { "slideshow": { "slide_type": "fragment" @@ -6941,16 +6919,16 @@ { "data": { "text/plain": [ - "(1-2j)" + "-1j" ] }, - "execution_count": 223, + "execution_count": 222, "metadata": {}, "output_type": "execute_result" } ], "source": [ - "c1.conjugate()" + "x.conjugate()" ] }, { @@ -6993,7 +6971,7 @@ "- $\\mathbb{R}$: [Real numbers](https://en.wikipedia.org/wiki/Real_number) are all numbers that can be represented as a distance along a line, and negative means \"reversed,\" e.g., $\\sqrt{2}, \\pi, \\text{e}, ...$\n", "- $\\mathbb{C}$: [Complex numbers](https://en.wikipedia.org/wiki/Complex_number) are all numbers of the form $a + b\\textbf{i}$ where $a$ and $b$ are real numbers and $\\textbf{i}$ is the [imaginary number](https://en.wikipedia.org/wiki/Imaginary_number), e.g., $0, \\textbf{i}, 1 + \\textbf{i}, ...$\n", "\n", - "In the listed order, the five sets are perfect subsets of the respective following sets, and $\\mathbb{C}$ is the largest set (cf., the figure below illustrates that observation as well). To be precise, all sets are infinite, but they still have a different number of elements." + "In the listed order, the five sets are perfect subsets of the respective following sets, and $\\mathbb{C}$ is the largest set. To be precise, all sets are infinite, but they still have a different number of elements." ] }, { @@ -7015,7 +6993,7 @@ } }, "source": [ - "The data types introduced in this chapter are all *imperfect* models of *abstract* mathematical ideas.\n", + "The data types introduced in this chapter are all *(im)perfect* models of *abstract* mathematical ideas.\n", "\n", "The `int` and `Fraction` types are the models \"closest\" to the idea they implement: Whereas $\\mathbb{Z}$ and $\\mathbb{Q}$ are, by definition, infinite, every computer runs out of bits when representing sufficiently large integers or fractions with a sufficiently large number of decimals. However, within a system-dependent range, we can model an integer or fraction without any loss in precision.\n", "\n", @@ -7032,7 +7010,7 @@ }, { "cell_type": "code", - "execution_count": 224, + "execution_count": 223, "metadata": { "slideshow": { "slide_type": "slide" @@ -7045,7 +7023,7 @@ }, { "cell_type": "code", - "execution_count": 225, + "execution_count": 224, "metadata": { "slideshow": { "slide_type": "slide" @@ -7073,7 +7051,7 @@ " 'abstractmethod']" ] }, - "execution_count": 225, + "execution_count": 224, "metadata": {}, "output_type": "execute_result" } @@ -7082,286 +7060,6 @@ "dir(numbers)" ] }, - { - "cell_type": "markdown", - "metadata": { - "slideshow": { - "slide_type": "skip" - } - }, - "source": [ - "As a reminder, the built-in [help()](https://docs.python.org/3/library/functions.html#help) function is always our friend.\n", - "\n", - "The ABCs' docstrings are unsurprisingly similar to the corresponding data types' docstrings. For now, let's not worry about the dunder-style names in the docstrings.\n", - "\n", - "For example, both `numbers.Complex` and `complex` list the `imag` and `real` attributes shown above." - ] - }, - { - "cell_type": "code", - "execution_count": 226, - "metadata": { - "scrolled": true, - "slideshow": { - "slide_type": "skip" - } - }, - "outputs": [ - { - "name": "stdout", - "output_type": "stream", - "text": [ - "Help on class Complex in module numbers:\n", - "\n", - "class Complex(Number)\n", - " | Complex defines the operations that work on the builtin complex type.\n", - " | \n", - " | In short, those are: a conversion to complex, .real, .imag, +, -,\n", - " | *, /, abs(), .conjugate, ==, and !=.\n", - " | \n", - " | If it is given heterogeneous arguments, and doesn't have special\n", - " | knowledge about them, it should fall back to the builtin complex\n", - " | type as described below.\n", - " | \n", - " | Method resolution order:\n", - " | Complex\n", - " | Number\n", - " | builtins.object\n", - " | \n", - " | Methods defined here:\n", - " | \n", - " | __abs__(self)\n", - " | Returns the Real distance from 0. Called for abs(self).\n", - " | \n", - " | __add__(self, other)\n", - " | self + other\n", - " | \n", - " | __bool__(self)\n", - " | True if self != 0. Called for bool(self).\n", - " | \n", - " | __complex__(self)\n", - " | Return a builtin complex instance. Called for complex(self).\n", - " | \n", - " | __eq__(self, other)\n", - " | self == other\n", - " | \n", - " | __mul__(self, other)\n", - " | self * other\n", - " | \n", - " | __neg__(self)\n", - " | -self\n", - " | \n", - " | __pos__(self)\n", - " | +self\n", - " | \n", - " | __pow__(self, exponent)\n", - " | self**exponent; should promote to float or complex when necessary.\n", - " | \n", - " | __radd__(self, other)\n", - " | other + self\n", - " | \n", - " | __rmul__(self, other)\n", - " | other * self\n", - " | \n", - " | __rpow__(self, base)\n", - " | base ** self\n", - " | \n", - " | __rsub__(self, other)\n", - " | other - self\n", - " | \n", - " | __rtruediv__(self, other)\n", - " | other / self\n", - " | \n", - " | __sub__(self, other)\n", - " | self - other\n", - " | \n", - " | __truediv__(self, other)\n", - " | self / other: Should promote to float when necessary.\n", - " | \n", - " | conjugate(self)\n", - " | (x+y*i).conjugate() returns (x-y*i).\n", - " | \n", - " | ----------------------------------------------------------------------\n", - " | Data descriptors defined here:\n", - " | \n", - " | imag\n", - " | Retrieve the imaginary component of this number.\n", - " | \n", - " | This should subclass Real.\n", - " | \n", - " | real\n", - " | Retrieve the real component of this number.\n", - " | \n", - " | This should subclass Real.\n", - " | \n", - " | ----------------------------------------------------------------------\n", - " | Data and other attributes defined here:\n", - " | \n", - " | __abstractmethods__ = frozenset({'__abs__', '__add__', '__complex__', ...\n", - " | \n", - " | __hash__ = None\n", - "\n" - ] - } - ], - "source": [ - "help(numbers.Complex)" - ] - }, - { - "cell_type": "code", - "execution_count": 227, - "metadata": { - "slideshow": { - "slide_type": "skip" - } - }, - "outputs": [ - { - "name": "stdout", - "output_type": "stream", - "text": [ - "Help on class complex in module builtins:\n", - "\n", - "class complex(object)\n", - " | complex(real=0, imag=0)\n", - " | \n", - " | Create a complex number from a real part and an optional imaginary part.\n", - " | \n", - " | This is equivalent to (real + imag*1j) where imag defaults to 0.\n", - " | \n", - " | Methods defined here:\n", - " | \n", - " | __abs__(self, /)\n", - " | abs(self)\n", - " | \n", - " | __add__(self, value, /)\n", - " | Return self+value.\n", - " | \n", - " | __bool__(self, /)\n", - " | self != 0\n", - " | \n", - " | __divmod__(self, value, /)\n", - " | Return divmod(self, value).\n", - " | \n", - " | __eq__(self, value, /)\n", - " | Return self==value.\n", - " | \n", - " | __float__(self, /)\n", - " | float(self)\n", - " | \n", - " | __floordiv__(self, value, /)\n", - " | Return self//value.\n", - " | \n", - " | __format__(...)\n", - " | complex.__format__() -> str\n", - " | \n", - " | Convert to a string according to format_spec.\n", - " | \n", - " | __ge__(self, value, /)\n", - " | Return self>=value.\n", - " | \n", - " | __getattribute__(self, name, /)\n", - " | Return getattr(self, name).\n", - " | \n", - " | __getnewargs__(...)\n", - " | \n", - " | __gt__(self, value, /)\n", - " | Return self>value.\n", - " | \n", - " | __hash__(self, /)\n", - " | Return hash(self).\n", - " | \n", - " | __int__(self, /)\n", - " | int(self)\n", - " | \n", - " | __le__(self, value, /)\n", - " | Return self<=value.\n", - " | \n", - " | __lt__(self, value, /)\n", - " | Return self complex\n", - " | \n", - " | Return the complex conjugate of its argument. (3-4j).conjugate() == 3+4j.\n", - " | \n", - " | ----------------------------------------------------------------------\n", - " | Static methods defined here:\n", - " | \n", - " | __new__(*args, **kwargs) from builtins.type\n", - " | Create and return a new object. See help(type) for accurate signature.\n", - " | \n", - " | ----------------------------------------------------------------------\n", - " | Data descriptors defined here:\n", - " | \n", - " | imag\n", - " | the imaginary part of a complex number\n", - " | \n", - " | real\n", - " | the real part of a complex number\n", - "\n" - ] - } - ], - "source": [ - "help(complex)" - ] - }, { "cell_type": "markdown", "metadata": { @@ -7370,7 +7068,7 @@ } }, "source": [ - "### Duck Typing" + "### Duck Typing (continued)" ] }, { @@ -7383,14 +7081,14 @@ "source": [ "The primary purpose of ABCs is to classify the *concrete* data types and standardize how they behave. This guides us as the programmers in what kind of behavior we should expect from objects of a given data type. In this context, ABCs are not reflected in code but only in our heads.\n", "\n", - "For, example, as all numeric data types are `Complex` numbers in the abstract sense, they all work with the built-in [abs()](https://docs.python.org/3/library/functions.html#abs) function (cf., [documentation](https://docs.python.org/3/library/numbers.html#numbers.Complex)). While it is intuitively clear what the [absolute value](https://en.wikipedia.org/wiki/Absolute_value) (i.e., \"distance\" to $0$) of an integer, a fraction, or any real number is, [abs()](https://docs.python.org/3/library/functions.html#abs) calculates the equivalent of that for complex numbers. That concept is called the [magnitude](https://en.wikipedia.org/wiki/Magnitude_%28mathematics%29) of a number, and is really a *generalization* of the absolute value.\n", + "For, example, as all numeric data types are `Complex` numbers in the abstract sense, they all work with the built-in [abs()](https://docs.python.org/3/library/functions.html#abs) function (cf., [documentation](https://docs.python.org/3/library/numbers.html#numbers.Complex)). While it is intuitively clear what the [absolute value](https://en.wikipedia.org/wiki/Absolute_value) (i.e., \"distance\" from $0$) of an integer, a fraction, or any real number is, [abs()](https://docs.python.org/3/library/functions.html#abs) calculates the equivalent of that for complex numbers. That concept is called the [magnitude](https://en.wikipedia.org/wiki/Magnitude_%28mathematics%29) of a number, and is really a *generalization* of the absolute value.\n", "\n", - "Relating back to the concept of **duck typing** mentioned in [Chapter 4](https://nbviewer.jupyter.org/github/webartifex/intro-to-python/blob/master/04_iteration_00_lecture.ipynb#Type-Checking-&-Input-Validation), `int`, `float`, and `complex` objects \"walk\" and \"quack\" alike in context of the [abs()](https://docs.python.org/3/library/functions.html#abs) function." + "Relating back to the concept of **duck typing** mentioned in [Chapter 4](https://nbviewer.jupyter.org/github/webartifex/intro-to-python/blob/master/04_iteration_00_lecture.ipynb#Duck-Typing), `int`, `float`, and `complex` objects \"walk\" and \"quack\" alike in context of the [abs()](https://docs.python.org/3/library/functions.html#abs) function." ] }, { "cell_type": "code", - "execution_count": 228, + "execution_count": 225, "metadata": { "slideshow": { "slide_type": "slide" @@ -7403,7 +7101,7 @@ "1" ] }, - "execution_count": 228, + "execution_count": 225, "metadata": {}, "output_type": "execute_result" } @@ -7414,7 +7112,7 @@ }, { "cell_type": "code", - "execution_count": 229, + "execution_count": 226, "metadata": { "slideshow": { "slide_type": "fragment" @@ -7427,7 +7125,7 @@ "42.87" ] }, - "execution_count": 229, + "execution_count": 226, "metadata": {}, "output_type": "execute_result" } @@ -7436,9 +7134,20 @@ "abs(-42.87)" ] }, + { + "cell_type": "markdown", + "metadata": { + "slideshow": { + "slide_type": "skip" + } + }, + "source": [ + "The absolute value of a `complex` number $x$ is defined with the Pythagorean Theorem where $\\lVert x \\rVert = \\sqrt{a^2 + b^2}$ and $a$ and $b$ are the real and imaginary parts." + ] + }, { "cell_type": "code", - "execution_count": 230, + "execution_count": 227, "metadata": { "slideshow": { "slide_type": "fragment" @@ -7451,13 +7160,13 @@ "5.0" ] }, - "execution_count": 230, + "execution_count": 227, "metadata": {}, "output_type": "execute_result" } ], "source": [ - "abs(4 - 3j)" + "abs(3 + 4j)" ] }, { @@ -7473,7 +7182,7 @@ }, { "cell_type": "code", - "execution_count": 231, + "execution_count": 228, "metadata": { "slideshow": { "slide_type": "slide" @@ -7486,7 +7195,7 @@ "100" ] }, - "execution_count": 231, + "execution_count": 228, "metadata": {}, "output_type": "execute_result" } @@ -7497,7 +7206,7 @@ }, { "cell_type": "code", - "execution_count": 232, + "execution_count": 229, "metadata": { "slideshow": { "slide_type": "fragment" @@ -7510,7 +7219,7 @@ "42" ] }, - "execution_count": 232, + "execution_count": 229, "metadata": {}, "output_type": "execute_result" } @@ -7532,7 +7241,7 @@ }, { "cell_type": "code", - "execution_count": 233, + "execution_count": 230, "metadata": { "slideshow": { "slide_type": "fragment" @@ -7546,7 +7255,7 @@ "traceback": [ "\u001b[0;31m---------------------------------------------------------------------------\u001b[0m", "\u001b[0;31mTypeError\u001b[0m Traceback (most recent call last)", - "\u001b[0;32m\u001b[0m in \u001b[0;36m\u001b[0;34m\u001b[0m\n\u001b[0;32m----> 1\u001b[0;31m \u001b[0mround\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m1\u001b[0m \u001b[0;34m+\u001b[0m \u001b[0;36m2j\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m", + "\u001b[0;32m\u001b[0m in \u001b[0;36m\u001b[0;34m\u001b[0m\n\u001b[0;32m----> 1\u001b[0;31m \u001b[0mround\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m1\u001b[0m \u001b[0;34m+\u001b[0m \u001b[0;36m2j\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m", "\u001b[0;31mTypeError\u001b[0m: type complex doesn't define __round__ method" ] } @@ -7581,7 +7290,7 @@ }, { "cell_type": "code", - "execution_count": 234, + "execution_count": 231, "metadata": { "slideshow": { "slide_type": "slide" @@ -7594,7 +7303,7 @@ "True" ] }, - "execution_count": 234, + "execution_count": 231, "metadata": {}, "output_type": "execute_result" } @@ -7616,7 +7325,7 @@ }, { "cell_type": "code", - "execution_count": 235, + "execution_count": 232, "metadata": { "slideshow": { "slide_type": "fragment" @@ -7629,7 +7338,7 @@ "True" ] }, - "execution_count": 235, + "execution_count": 232, "metadata": {}, "output_type": "execute_result" } @@ -7640,7 +7349,7 @@ }, { "cell_type": "code", - "execution_count": 236, + "execution_count": 233, "metadata": { "slideshow": { "slide_type": "fragment" @@ -7653,7 +7362,7 @@ "True" ] }, - "execution_count": 236, + "execution_count": 233, "metadata": {}, "output_type": "execute_result" } @@ -7664,7 +7373,7 @@ }, { "cell_type": "code", - "execution_count": 237, + "execution_count": 234, "metadata": { "slideshow": { "slide_type": "fragment" @@ -7677,7 +7386,7 @@ "True" ] }, - "execution_count": 237, + "execution_count": 234, "metadata": {}, "output_type": "execute_result" } @@ -7699,7 +7408,7 @@ }, { "cell_type": "code", - "execution_count": 238, + "execution_count": 235, "metadata": { "slideshow": { "slide_type": "fragment" @@ -7712,7 +7421,7 @@ "False" ] }, - "execution_count": 238, + "execution_count": 235, "metadata": {}, "output_type": "execute_result" } @@ -7729,12 +7438,12 @@ } }, "source": [ - "However, if we model `1 / 10` as a `Fraction`, it is recognized as a `Rational` number." + "However, if we model `1 / 10` as a `Fraction` object, it is recognized as a `Rational` number." ] }, { "cell_type": "code", - "execution_count": 239, + "execution_count": 236, "metadata": { "slideshow": { "slide_type": "skip" @@ -7747,7 +7456,7 @@ "True" ] }, - "execution_count": 239, + "execution_count": 236, "metadata": {}, "output_type": "execute_result" } @@ -7764,7 +7473,7 @@ } }, "source": [ - "Replacing *concrete* data types with ABCs is particularly valuable in the context of input validation: The revised version of the `factorial()` function below allows its user to take advantage of *duck typing*: If a real but non-integer argument `n` is passed in, `factorial()` tries to cast `n` as an `int` object with the [int()](https://docs.python.org/3/library/functions.html#int) built-in.\n", + "Replacing *concrete* data types with ABCs is particularly valuable in the context of \"type checking:\" The revised version of the `factorial()` function below allows its user to take advantage of *duck typing*: If a real but non-integer argument `n` is passed in, `factorial()` tries to cast `n` as an `int` object with the [int()](https://docs.python.org/3/library/functions.html#int) built-in.\n", "\n", "Two popular and distinguished Pythonistas, [Luciano Ramalho](https://github.com/ramalho) and [Alex Martelli](https://en.wikipedia.org/wiki/Alex_Martelli), coin the term **goose typing** to specifically mean using the built-in [isinstance()](https://docs.python.org/3/library/functions.html#isinstance) function with an ABC (cf., Chapter 11 in this [book](https://www.amazon.com/Fluent-Python-Concise-Effective-Programming/dp/1491946008) or this [summary](https://dgkim5360.github.io/blog/python/2017/07/duck-typing-vs-goose-typing-pythonic-interfaces/) thereof)." ] @@ -7782,7 +7491,7 @@ }, { "cell_type": "code", - "execution_count": 240, + "execution_count": 237, "metadata": { "slideshow": { "slide_type": "slide" @@ -7808,7 +7517,7 @@ " if not isinstance(n, numbers.Integral):\n", " if isinstance(n, numbers.Real):\n", " if n != int(n) and strict:\n", - " raise TypeError(\"n is not integer-like; it has decimals\")\n", + " raise TypeError(\"n is not integer-like; it has non-zero decimals\")\n", " n = int(n)\n", " else:\n", " raise TypeError(\"Factorial is only defined for integers\")\n", @@ -7833,7 +7542,7 @@ }, { "cell_type": "code", - "execution_count": 241, + "execution_count": 238, "metadata": { "slideshow": { "slide_type": "slide" @@ -7846,7 +7555,7 @@ "1" ] }, - "execution_count": 241, + "execution_count": 238, "metadata": {}, "output_type": "execute_result" } @@ -7855,6 +7564,102 @@ "factorial(0)" ] }, + { + "cell_type": "code", + "execution_count": 239, + "metadata": { + "slideshow": { + "slide_type": "fragment" + } + }, + "outputs": [ + { + "data": { + "text/plain": [ + "6" + ] + }, + "execution_count": 239, + "metadata": {}, + "output_type": "execute_result" + } + ], + "source": [ + "factorial(3)" + ] + }, + { + "cell_type": "code", + "execution_count": 240, + "metadata": { + "slideshow": { + "slide_type": "fragment" + } + }, + "outputs": [ + { + "data": { + "text/plain": [ + "6" + ] + }, + "execution_count": 240, + "metadata": {}, + "output_type": "execute_result" + } + ], + "source": [ + "factorial(3.0)" + ] + }, + { + "cell_type": "markdown", + "metadata": { + "slideshow": { + "slide_type": "skip" + } + }, + "source": [ + "With the keyword-only argument `strict`, we can control whether or not a passed in `float` object may come with decimals that are then truncated. By default, this is not allowed and results in a `TypeError`." + ] + }, + { + "cell_type": "code", + "execution_count": 241, + "metadata": { + "slideshow": { + "slide_type": "slide" + } + }, + "outputs": [ + { + "ename": "TypeError", + "evalue": "n is not integer-like; it has non-zero decimals", + "output_type": "error", + "traceback": [ + "\u001b[0;31m---------------------------------------------------------------------------\u001b[0m", + "\u001b[0;31mTypeError\u001b[0m Traceback (most recent call last)", + "\u001b[0;32m\u001b[0m in \u001b[0;36m\u001b[0;34m\u001b[0m\n\u001b[0;32m----> 1\u001b[0;31m \u001b[0mfactorial\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m3.1\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m", + "\u001b[0;32m\u001b[0m in \u001b[0;36mfactorial\u001b[0;34m(n, strict)\u001b[0m\n\u001b[1;32m 17\u001b[0m \u001b[0;32mif\u001b[0m \u001b[0misinstance\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mn\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mnumbers\u001b[0m\u001b[0;34m.\u001b[0m\u001b[0mReal\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m:\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[1;32m 18\u001b[0m \u001b[0;32mif\u001b[0m \u001b[0mn\u001b[0m \u001b[0;34m!=\u001b[0m \u001b[0mint\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mn\u001b[0m\u001b[0;34m)\u001b[0m \u001b[0;32mand\u001b[0m \u001b[0mstrict\u001b[0m\u001b[0;34m:\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0;32m---> 19\u001b[0;31m \u001b[0;32mraise\u001b[0m \u001b[0mTypeError\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;34m\"n is not integer-like; it has non-zero decimals\"\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m\u001b[1;32m 20\u001b[0m \u001b[0mn\u001b[0m \u001b[0;34m=\u001b[0m \u001b[0mint\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mn\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[1;32m 21\u001b[0m \u001b[0;32melse\u001b[0m\u001b[0;34m:\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n", + "\u001b[0;31mTypeError\u001b[0m: n is not integer-like; it has non-zero decimals" + ] + } + ], + "source": [ + "factorial(3.1)" + ] + }, + { + "cell_type": "markdown", + "metadata": { + "slideshow": { + "slide_type": "skip" + } + }, + "source": [ + "In non-strict mode, the passed in `3.1` is truncated into `3` resulting in a factorial of `6`." + ] + }, { "cell_type": "code", "execution_count": 242, @@ -7875,102 +7680,6 @@ "output_type": "execute_result" } ], - "source": [ - "factorial(3)" - ] - }, - { - "cell_type": "code", - "execution_count": 243, - "metadata": { - "slideshow": { - "slide_type": "fragment" - } - }, - "outputs": [ - { - "data": { - "text/plain": [ - "6" - ] - }, - "execution_count": 243, - "metadata": {}, - "output_type": "execute_result" - } - ], - "source": [ - "factorial(3.0)" - ] - }, - { - "cell_type": "markdown", - "metadata": { - "slideshow": { - "slide_type": "skip" - } - }, - "source": [ - "With the keyword-only argument `strict`, we can control whether or not a passed in `float` object may come with decimals that are then truncated. By default, this is not allowed and results in a `TypeError`." - ] - }, - { - "cell_type": "code", - "execution_count": 244, - "metadata": { - "slideshow": { - "slide_type": "slide" - } - }, - "outputs": [ - { - "ename": "TypeError", - "evalue": "n is not integer-like; it has decimals", - "output_type": "error", - "traceback": [ - "\u001b[0;31m---------------------------------------------------------------------------\u001b[0m", - "\u001b[0;31mTypeError\u001b[0m Traceback (most recent call last)", - "\u001b[0;32m\u001b[0m in \u001b[0;36m\u001b[0;34m\u001b[0m\n\u001b[0;32m----> 1\u001b[0;31m \u001b[0mfactorial\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m3.1\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m", - "\u001b[0;32m\u001b[0m in \u001b[0;36mfactorial\u001b[0;34m(n, strict)\u001b[0m\n\u001b[1;32m 17\u001b[0m \u001b[0;32mif\u001b[0m \u001b[0misinstance\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mn\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mnumbers\u001b[0m\u001b[0;34m.\u001b[0m\u001b[0mReal\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m:\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[1;32m 18\u001b[0m \u001b[0;32mif\u001b[0m \u001b[0mn\u001b[0m \u001b[0;34m!=\u001b[0m \u001b[0mint\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mn\u001b[0m\u001b[0;34m)\u001b[0m \u001b[0;32mand\u001b[0m \u001b[0mstrict\u001b[0m\u001b[0;34m:\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0;32m---> 19\u001b[0;31m \u001b[0;32mraise\u001b[0m \u001b[0mTypeError\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;34m\"n is not integer-like; it has decimals\"\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m\u001b[1;32m 20\u001b[0m \u001b[0mn\u001b[0m \u001b[0;34m=\u001b[0m \u001b[0mint\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mn\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[1;32m 21\u001b[0m \u001b[0;32melse\u001b[0m\u001b[0;34m:\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n", - "\u001b[0;31mTypeError\u001b[0m: n is not integer-like; it has decimals" - ] - } - ], - "source": [ - "factorial(3.1)" - ] - }, - { - "cell_type": "markdown", - "metadata": { - "slideshow": { - "slide_type": "skip" - } - }, - "source": [ - "In non-strict mode, the passed in `3.1` is truncated into `3` resulting in a factorial of `6`." - ] - }, - { - "cell_type": "code", - "execution_count": 245, - "metadata": { - "slideshow": { - "slide_type": "fragment" - } - }, - "outputs": [ - { - "data": { - "text/plain": [ - "6" - ] - }, - "execution_count": 245, - "metadata": {}, - "output_type": "execute_result" - } - ], "source": [ "factorial(3.1, strict=False)" ] @@ -7988,7 +7697,7 @@ }, { "cell_type": "code", - "execution_count": 246, + "execution_count": 243, "metadata": { "slideshow": { "slide_type": "slide" @@ -8002,8 +7711,8 @@ "traceback": [ "\u001b[0;31m---------------------------------------------------------------------------\u001b[0m", "\u001b[0;31mTypeError\u001b[0m Traceback (most recent call last)", - "\u001b[0;32m\u001b[0m in \u001b[0;36m\u001b[0;34m\u001b[0m\n\u001b[0;32m----> 1\u001b[0;31m \u001b[0mfactorial\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m1\u001b[0m \u001b[0;34m+\u001b[0m \u001b[0;36m2j\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m", - "\u001b[0;32m\u001b[0m in \u001b[0;36mfactorial\u001b[0;34m(n, strict)\u001b[0m\n\u001b[1;32m 20\u001b[0m \u001b[0mn\u001b[0m \u001b[0;34m=\u001b[0m \u001b[0mint\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mn\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[1;32m 21\u001b[0m \u001b[0;32melse\u001b[0m\u001b[0;34m:\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0;32m---> 22\u001b[0;31m \u001b[0;32mraise\u001b[0m \u001b[0mTypeError\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;34m\"Factorial is only defined for integers\"\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m\u001b[1;32m 23\u001b[0m \u001b[0;34m\u001b[0m\u001b[0m\n\u001b[1;32m 24\u001b[0m \u001b[0;32mif\u001b[0m \u001b[0mn\u001b[0m \u001b[0;34m<\u001b[0m \u001b[0;36m0\u001b[0m\u001b[0;34m:\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n", + "\u001b[0;32m\u001b[0m in \u001b[0;36m\u001b[0;34m\u001b[0m\n\u001b[0;32m----> 1\u001b[0;31m \u001b[0mfactorial\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m1\u001b[0m \u001b[0;34m+\u001b[0m \u001b[0;36m2j\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m", + "\u001b[0;32m\u001b[0m in \u001b[0;36mfactorial\u001b[0;34m(n, strict)\u001b[0m\n\u001b[1;32m 20\u001b[0m \u001b[0mn\u001b[0m \u001b[0;34m=\u001b[0m \u001b[0mint\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mn\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[1;32m 21\u001b[0m \u001b[0;32melse\u001b[0m\u001b[0;34m:\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0;32m---> 22\u001b[0;31m \u001b[0;32mraise\u001b[0m \u001b[0mTypeError\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;34m\"Factorial is only defined for integers\"\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m\u001b[1;32m 23\u001b[0m \u001b[0;34m\u001b[0m\u001b[0m\n\u001b[1;32m 24\u001b[0m \u001b[0;32mif\u001b[0m \u001b[0mn\u001b[0m \u001b[0;34m<\u001b[0m \u001b[0;36m0\u001b[0m\u001b[0;34m:\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n", "\u001b[0;31mTypeError\u001b[0m: Factorial is only defined for integers" ] } @@ -8072,7 +7781,7 @@ }, { "cell_type": "code", - "execution_count": 247, + "execution_count": 244, "metadata": { "slideshow": { "slide_type": "skip" @@ -8094,22 +7803,21 @@ " " ], "text/plain": [ - "" + "" ] }, - "execution_count": 247, + "execution_count": 244, "metadata": {}, "output_type": "execute_result" } ], "source": [ - "from IPython.display import YouTubeVideo\n", "YouTubeVideo(\"RgklPQ8rbkg\", width=\"60%\")" ] }, { "cell_type": "code", - "execution_count": 248, + "execution_count": 245, "metadata": { "slideshow": { "slide_type": "skip" @@ -8131,10 +7839,10 @@ " " ], "text/plain": [ - "" + "" ] }, - "execution_count": 248, + "execution_count": 245, "metadata": {}, "output_type": "execute_result" } @@ -8156,7 +7864,7 @@ }, { "cell_type": "code", - "execution_count": 249, + "execution_count": 246, "metadata": { "slideshow": { "slide_type": "skip" @@ -8178,10 +7886,10 @@ " " ], "text/plain": [ - "" + "" ] }, - "execution_count": 249, + "execution_count": 246, "metadata": {}, "output_type": "execute_result" } @@ -8203,7 +7911,7 @@ }, { "cell_type": "code", - "execution_count": 250, + "execution_count": 247, "metadata": { "slideshow": { "slide_type": "skip" @@ -8225,10 +7933,10 @@ " " ], "text/plain": [ - "" + "" ] }, - "execution_count": 250, + "execution_count": 247, "metadata": {}, "output_type": "execute_result" } @@ -8250,7 +7958,7 @@ }, { "cell_type": "code", - "execution_count": 251, + "execution_count": 248, "metadata": { "slideshow": { "slide_type": "skip" @@ -8272,10 +7980,10 @@ " " ], "text/plain": [ - "" + "" ] }, - "execution_count": 251, + "execution_count": 248, "metadata": {}, "output_type": "execute_result" } diff --git a/05_numbers_01_review.ipynb b/05_numbers_01_review.ipynb index 01d88fe..cb297bb 100644 --- a/05_numbers_01_review.ipynb +++ b/05_numbers_01_review.ipynb @@ -5,7 +5,7 @@ "metadata": {}, "source": [ "\n", - "# Chapter 5: Bits & Numbers" + "# Chapter 5: Numbers & Bits" ] }, { @@ -19,7 +19,9 @@ "cell_type": "markdown", "metadata": {}, "source": [ - "Read [Chapter 5](https://nbviewer.jupyter.org/github/webartifex/intro-to-python/blob/master/05_numbers_00_lecture.ipynb) of the book. Then, work through the questions below." + "The questions below assume that you have read [Chapter 5](https://nbviewer.jupyter.org/github/webartifex/intro-to-python/blob/master/05_numbers_00_lecture.ipynb) in the book.\n", + "\n", + "Be concise in your answers! Most questions can be answered in *one* sentence." ] }, { @@ -47,7 +49,7 @@ "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { @@ -61,28 +63,14 @@ "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "**Q3**: Why is it *inefficient* to store `bool` objects in bits resembling a **hexadecimal representation**?" - ] - }, - { - "cell_type": "markdown", - "metadata": {}, - "source": [ - " " - ] - }, - { - "cell_type": "markdown", - "metadata": {}, - "source": [ - "**Q4**: Colors are commonly expressed in the **hexadecimal system** in websites (cf., the [HTML](https://en.wikipedia.org/wiki/HTML) and [CSS](https://en.wikipedia.org/wiki/Cascading_Style_Sheets) formats).\n", + "**Q3**: Colors are commonly expressed in the **hexadecimal system** in websites (cf., the [HTML](https://en.wikipedia.org/wiki/HTML) and [CSS](https://en.wikipedia.org/wiki/Cascading_Style_Sheets) formats).\n", "\n", "For example, $#000000$, $#ff9900$, and $#ffffff$ turn out to be black, orange, and white. The six digits are read in *pairs of two* from left to right, and the *three pairs* correspond to the proportions of red, green, and blue mixed together. They reach from $0_{16} = 0_{10}$ for $0$% to $\\text{ff}_{16} = 255_{10}$ for $100$% (cf., this [article](https://en.wikipedia.org/wiki/RGB_color_model) for an in-depth discussion).\n", "\n", @@ -93,77 +81,77 @@ "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "**Q5**: What does it mean for a code fragment to **fail silently**?" + "**Q4**: What does it mean for a code fragment to **fail silently**?" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "**Q6**: Explain why the mathematical set of all real numbers $\\mathbb{R}$ can only be **approximated** by floating-point numbers on a computer!" + "**Q5**: Explain why the mathematical set of all real numbers $\\mathbb{R}$ can only be **approximated** by floating-point numbers on a computer!" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "**Q7**: How do we deal with a `float` object's imprecision if we need to **check for equality**?" + "**Q6**: How do we deal with a `float` object's imprecision if we need to **check for equality**?" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "**Q8**: What data type, built-in or from the [standard library](https://docs.python.org/3/library/index.html), is best suited to represent the [transcendental numbers](https://en.wikipedia.org/wiki/Transcendental_number) $\\pi$ and $\\text{e}$?" + "**Q7**: What data type, built-in or from the [standard library](https://docs.python.org/3/library/index.html), is best suited to represent the [transcendental numbers](https://en.wikipedia.org/wiki/Transcendental_number) $\\pi$ and $\\text{e}$?" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "**Q9**: How can **abstract base classes**, for example, as defined in the **numerical tower**, be helpful in enabling **duck typing**?" + "**Q8**: How can **abstract base classes**, for example, as defined in the **numerical tower**, be helpful in enabling **duck typing**?" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { @@ -184,63 +172,63 @@ "cell_type": "markdown", "metadata": {}, "source": [ - "**Q10**: The precision of `int` objects depends on how we choose to represent them in memory. For example, using a **hexadecimal representation** gives us $16^8$ digits whereas with a **binary representation** an `int` object can have *at most* $2^8$ digits." + "**Q9**: The precision of `int` objects depends on how we choose to represent them in memory. For example, using a **hexadecimal representation** gives us $16^8$ digits whereas with a **binary representation** an `int` object can have *at most* $2^8$ digits." ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "**Q11**: With the built-in [round()](https://docs.python.org/3/library/functions.html#round) function, we obtain a *precise* representation for any `float` object if we can live with *less than* $15$ digits of precision." + "**Q10**: With the built-in [round()](https://docs.python.org/3/library/functions.html#round) function, we obtain a *precise* representation for any `float` object if we can live with *less than* $15$ digits of precision." ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "**Q12**: As most currencies operate with $2$ or $3$ decimals (e.g., EUR $9.99$), the `float` type's limitation of *at most* $15$ digits is *not* a problem in practice." + "**Q11**: As most currencies operate with $2$ or $3$ decimals (e.g., EUR $9.99$), the `float` type's limitation of *at most* $15$ digits is *not* a problem in practice." ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "**Q13**: The [IEEE 754](https://en.wikipedia.org/wiki/IEEE_754) standard's **special values** provide no benefit in practice as we could always use a **[sentinel](https://en.wikipedia.org/wiki/Sentinel_value)** value (i.e., a \"dummy\"). For example, instead of `nan`, we can always use `0` to indicate a *missing* value." + "**Q12**: The [IEEE 754](https://en.wikipedia.org/wiki/IEEE_754) standard's **special values** provide no benefit in practice as we could always use a **[sentinel](https://en.wikipedia.org/wiki/Sentinel_value)** value (i.e., a \"dummy\"). For example, instead of `nan`, we can always use `0` to indicate a *missing* value." ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "**Q14**: The following code fragment raises an `InvalidOperation` exception. That is an example of code **failing loudly**.\n", + "**Q13**: The following code fragment raises an `InvalidOperation` exception. That is an example of code **failing loudly**.\n", "```python\n", "float(\"inf\") + float(\"-inf\")\n", "```" @@ -250,63 +238,63 @@ "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "**Q15**: Python provides a `scientific` type (e.g., `1.23e4`) that is useful mainly to model problems in the domains of physics or astrophysics." + "**Q14**: Python provides a `scientific` type (e.g., `1.23e4`) that is useful mainly to model problems in the domains of physics or astrophysics." ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "**Q16**: From a practitioner's point of view, the built-in [format()](https://docs.python.org/3/library/functions.html#format) function does the *same* as the built-in [round()](https://docs.python.org/3/library/functions.html#round) function." + "**Q15**: From a practitioner's point of view, the built-in [format()](https://docs.python.org/3/library/functions.html#format) function does the *same* as the built-in [round()](https://docs.python.org/3/library/functions.html#round) function." ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "**Q17**: The `Decimal` type from the [decimal](https://docs.python.org/3/library/decimal.html) module in the [standard library](https://docs.python.org/3/library/index.html) allows us to model the set of the real numbers $\\mathbb{R}$ *precisely*." + "**Q16**: The `Decimal` type from the [decimal](https://docs.python.org/3/library/decimal.html) module in the [standard library](https://docs.python.org/3/library/index.html) allows us to model the set of the real numbers $\\mathbb{R}$ *precisely*." ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - "**Q18**: The `Fraction` type from the [fractions](https://docs.python.org/3/library/fractions.html) module in the [standard library](https://docs.python.org/3/library/index.html) allows us to model the set of the rational numbers $\\mathbb{Q}$ *precisely*." + "**Q17**: The `Fraction` type from the [fractions](https://docs.python.org/3/library/fractions.html) module in the [standard library](https://docs.python.org/3/library/index.html) allows us to model the set of the rational numbers $\\mathbb{Q}$ *precisely*." ] }, { "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] } ], diff --git a/05_numbers_02_exercises.ipynb b/05_numbers_02_exercises.ipynb index ff5e9a8..8eaeaac 100644 --- a/05_numbers_02_exercises.ipynb +++ b/05_numbers_02_exercises.ipynb @@ -4,8 +4,7 @@ "cell_type": "markdown", "metadata": {}, "source": [ - "\n", - "# Chapter 5: Bits & Numbers" + "# Chapter 5: Numbers & Bits" ] }, { @@ -19,7 +18,9 @@ "cell_type": "markdown", "metadata": {}, "source": [ - "Read [Chapter 5](https://nbviewer.jupyter.org/github/webartifex/intro-to-python/blob/master/05_numbers_00_lecture.ipynb) of the book. Then, work through the exercises below. The `...` indicate where you need to fill in your answers. You should not need to create any additional code cells." + "The exercises below assume that you have read [Chapter 5](https://nbviewer.jupyter.org/github/webartifex/intro-to-python/blob/master/05_numbers_00_lecture.ipynb) in the book.\n", + "\n", + "The `...`'s in the code cells indicate where you need to fill in code snippets. The number of `...`'s within a code cell give you a rough idea of how many lines of code are needed to solve the task. You should not need to create any additional code cells for your final solution. However, you may want to use temporary code cells to try out some ideas." ] }, { @@ -80,7 +81,7 @@ "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { @@ -94,7 +95,7 @@ "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { @@ -110,7 +111,7 @@ "cell_type": "markdown", "metadata": {}, "source": [ - " " + " < your answer >" ] }, { @@ -238,7 +239,7 @@ "\n", "Enable **duck typing** by allowing the function to be called with various numeric types as the arguments, in particular, `quantity` may be a non-integer as well: Use an appropriate **abstract base class** from the [numbers](https://docs.python.org/3/library/numbers.html) module in the [standard library](https://docs.python.org/3/library/index.html) to verify the arguments' types and also that they are both positive!\n", "\n", - "It is considered a *best practice* to only round towards the *end* of the calculations." + "Hint: It is considered a *best practice* to only round towards the *end* of the calculations." ] }, { @@ -256,8 +257,43 @@ "metadata": {}, "outputs": [], "source": [ - "def discounted_price(...):\n", - " ..." + "def discounted_price(unit_price, quantity):\n", + " \"\"\"Calculate the price of a line item in an order.\n", + "\n", + " Args:\n", + " unit_price (numbers.Real): price of an ordered item; must be positive\n", + " quantity (numbers.Real): number of items ordered; must be positive\n", + "\n", + " Returns:\n", + " line_item_price (decimal.Decimal): precision of 2 decimals\n", + " \"\"\"\n", + " # Basic input validation.\n", + " ...\n", + " ...\n", + " ...\n", + " ...\n", + "\n", + " # Calculate the final price if only\n", + " # the first discount scheme is applied.\n", + " ...\n", + " ...\n", + " ...\n", + " ...\n", + "\n", + " # Calculate the final price if only\n", + " # the second discount scheme is applied.\n", + " # \"One in every five\" means we need to figure out\n", + " # how many full groups of five are contained.\n", + " ...\n", + " ...\n", + " ...\n", + " ...\n", + " ...\n", + "\n", + " # Choose the better option for the customer.\n", + " ...\n", + " # Round correctly for pricing purposes.\n", + " return ..." ] }, {