Ordering fractions with the same denominator

3 randFromArray([3, 4, 6, 8]) randRangeUnique(1, DENOMINATOR, NUM_ITEMS) NUMERATORS.slice().sort() NUMS_SORTED.join(",") $.map(NUMS_SORTED, function(el) { return "\\dfrac{" + el + "}{" + DENOMINATOR + "}"; }).join(",") createSorter() [["blue", BLUE], ["green", GREEN], ["purple", PURPLE]]

Order the following fractions from least to greatest:

N \dfrac{N}{DENOMINATOR}

SORTER.init("sortable")

Drag the fractions left and right so they are in order from least to greatest

SORTER.getContent()

if (SORTER.hasAttempted) { return guess.join(",") === SORTED_LIST; } else { return ""; }

SORTER.setContent(guess);

Each fraction has a denominator of DENOMINATOR. We can show this by dividing a whole into DENOMINATOR equal-sized pieces of \dfrac{1}{DENOMINATOR}.

init({ range: [[-2, 1], [-1,1]], scale: [50,50] }); piechart([0, DENOMINATOR], [GREEN, "#bbb"], 1);

The numerator tells us how many of the DENOMINATOR pieces are shaded.

init({ range: [[-2, 1], [-1,1]], scale: [50,50] }); piechart([numer, DENOMINATOR - numer], [COLORS[i][1], "#bbb"], 1); label([-2,0], "\\" + COLORS[i][0] + "{\\dfrac{" + numer + "}{" + DENOMINATOR + "}}=", "right")

So we just order the numerators.

The fractions from least to greatest are:

ANSWER.

randFromArray([3, 4, 6, 8]) randRange(1, DENOMINATOR) randRangeExclude(1, DENOMINATOR, [NUMERATOR_1]) NUMERATOR_1 < NUMERATOR_2 ? "<" : ">"

Compare.

\dfrac{NUMERATOR_1}{DENOMINATOR} ____ \dfrac{NUMERATOR_2}{DENOMINATOR}

SOLUTION

Both fractions have a denominator of DENOMINATOR. We can show this by dividing a whole into DENOMINATOR equal-sized pieces of \dfrac{1}{DENOMINATOR}.

init({ range: [[-2, 1], [-1, 1]], scale: [50, 50] }); piechart([0, DENOMINATOR], [GREEN, "#bbb"], 1);

The numerator tells us how many of the DENOMINATOR pieces are shaded.

init({ range: [[0, 8], [-1, 1]], scale: [50, 50] }); piechart([NUMERATOR_1, DENOMINATOR-NUMERATOR_1], [GREEN, "#bbb"], 1, false, 2); piechart([NUMERATOR_2, DENOMINATOR-NUMERATOR_2], [PURPLE, "#bbb"], 1, false, 7); label([0, 0], "\\green{\\dfrac{" + NUMERATOR_1 + "}{" + DENOMINATOR + "}}=", "right") label([5, 0], "\\purple{\\dfrac{" + NUMERATOR_2 + "}{" + DENOMINATOR + "}}=", "right")

So, we just need to compare the numerators.

\green{\dfrac{NUMERATOR_1}{DENOMINATOR}} SOLUTION \purple{\dfrac{NUMERATOR_2}{DENOMINATOR}}

randFromArray([2, 3, 4, 6, 8]) randRange(1, 10) randRangeExclude(1, 10, [NUMERATOR_1]) ceil(max(NUMERATOR_1, NUMERATOR_2) / DENOMINATOR) randFromArray(["A", "B"])

Which number line correctly shows \dfrac{NUMERATOR_1}{DENOMINATOR} and \dfrac{NUMERATOR_2}{DENOMINATOR}?

init({ range: [[-0.15, 1.1], [0, 7]], scale: [400, 25] }); var tick = 0.25; var labels = [ 0, "\\dfrac{" + NUMERATOR_1 + "}{" + DENOMINATOR + "}", "\\dfrac{" + NUMERATOR_2 + "}{" + DENOMINATOR + "}" ]; var drawNumberLine = function(y, name, numbers) { // Seems this only adds an arrow to one end line([-0.05, y], [1.05, y], { arrows: "<->" }); line([1.05, y], [-0.05, y], { arrows: "<->" }); label([-0.1, y], name); for (var i = 0; i < numbers.length; i++) { var x = numbers[i] / DENOMINATOR / MAX_NUM; line([x, y - tick], [x, y + tick]); label([x, y - 0.2], labels[i], "below"); } }; if (SOLUTION === "A") { drawNumberLine(6, "A", [0, NUMERATOR_1, NUMERATOR_2]); drawNumberLine(2, "B", [0, NUMERATOR_2, NUMERATOR_1]); } else { drawNumberLine(6, "A", [0, NUMERATOR_2, NUMERATOR_1]); drawNumberLine(2, "B", [0, NUMERATOR_1, NUMERATOR_2]); }

Number line SOLUTION

Number line A
Number line B

We can draw a number line showing each whole divided into DENOMINATOR equal lengths of \dfrac{1}{DENOMINATOR}.

init({ range: [[-0.1, 1.1], [-1, 1]], scale: [400, 25] }); var y = -0.5; line([-0.05, y], [1.05, y], { arrows: "<->" }); line([1.05, y], [-0.05, y], { arrows: "<->" }); var tick = 0.25; for (var i = 0; i <= MAX_NUM * DENOMINATOR; i++) { var x = i / DENOMINATOR / MAX_NUM; if (i % DENOMINATOR === 0) { label([x, y], roundTo(1, i / DENOMINATOR), "above"); line([x, y - tick], [x, y + tick], { strokeWidth: 3 }); } else { line([x, y - tick], [x, y + tick], { strokeWidth: 2 }); } }

We move \dfrac{1}{DENOMINATOR} on the number line \blue{NUMERATOR_1} time to reach \blue{\dfrac{NUMERATOR_1}{DENOMINATOR}}.

We move \dfrac{1}{DENOMINATOR} on the number line \blue{NUMERATOR_1} times to reach \blue{\dfrac{NUMERATOR_1}{DENOMINATOR}}.

We move \dfrac{1}{DENOMINATOR} on the number line \pink{NUMERATOR_2} time to reach \pink{\dfrac{NUMERATOR_2}{DENOMINATOR}}.

We move \dfrac{1}{DENOMINATOR} on the number line \pink{NUMERATOR_2} times to reach \pink{\dfrac{NUMERATOR_2}{DENOMINATOR}}.

Number line SOLUTION is correct.