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A template for displaying common fractions of the form int+num/den nicely. It supports 0–3 anonymous parameters with positional meaning. Template parameters Parameter Description Type Status leftmost part 1 Denominator if only parameter supplied. Numerator if 2 parameters supplied. Integer if 3 parameters supplied. If no parameter is specified the template will render a fraction slash only ...
[[Category:Fraction templates]] to the <includeonly> section at the bottom of that page. Otherwise, add <noinclude>[[Category:Fraction templates]]</noinclude> to the end of the template code, making sure it starts on the same line as the code's last character.
A template for displaying common fractions of the form int+num/den nicely. It supports 0–3 anonymous parameters with positional meaning. Template parameters [Edit template data] Parameter Description Type Status leftmost part 1 Denominator if only parameter supplied. Numerator if 2 parameters supplied. Integer if 3 parameters supplied. If no parameter is specified the template will render a ...
Please note that these templates do not handle preceding integers (or succeeding units) and the spacing in between, use {} for that: Bake for {{frac|2|1|2}} hours. Bake for 2 + 1 ⁄ 2 hours. As with {}, these templates should not be used in science or mathematical articles.
Ford circles. A circle rests upon each fraction in lowest terms. The circles for the fractions 0/1, 1/1, 1/2, 1/3, 2/3, 1/4, 3/4, 1/5, 2/5, 3/5, 4/5 are shown. Each circle touches, but does not cross, the line and some neighboring circles. Fractions with the same denominator have circles of the same size. Date: 2006: Source
A geometry template is a piece of clear plastic with cut-out shapes for use in mathematics and other subjects in primary school through secondary school. It also has various measurements on its sides to be used like a ruler. In Australia, popular brands include Mathomat and MathAid.
If 0 < p / q < 1 then the Ford circles that are tangent to C[p/q] are precisely the Ford circles for fractions that are neighbours of p / q in some Farey sequence. Thus C[2/5] is tangent to C[1/2], C[1/3], C[3/7], C[3/8], etc. Ford circles appear also in the Apollonian gasket (0,0,1,1). The picture below illustrates this ...
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