Parabola: Difference between revisions
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*'''Curve Stitching''''' (or '''String Art''')'' is a craft technique used to create patterns from parabolas and other curves by sewing threads between points along two intersecting lines. | *'''Curve Stitching''''' (or '''String Art''')'' is a craft technique used to create patterns from parabolas and other curves by sewing threads between points along two intersecting lines. | ||
* The technique was invented by [https://en.wikipedia.org/wiki/Mary_Everest_Boole '''Mary Everest Boole'''] at the end of the 19th Century to make maths more interesting to children and became very popular during the 1960's to decorate gift cards for example.</span> | * The technique was invented by [https://en.wikipedia.org/wiki/Mary_Everest_Boole '''Mary Everest Boole'''] at the end of the 19th Century to make maths more interesting to children and became very popular during the 1960's to decorate gift cards for example.</span> | ||
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<span style="color: green">'''Note:''' | |||
The idea of creating curves using straight lines is put to practical use to design and build curved roofs and curve-sided towers using straight pieces of material - see [https://en.wikipedia.org/wiki/Saddle_roof '''Saddle Roofs'''] and [https://en.wikipedia.org/wiki/Cooling_tower '''Cooling Towers''' or ][https://en.wikipedia.org/wiki/Hyperboloid_structure '''Hyperboloid structures'''] for examples. | |||
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| [[File:Parabola3.jpg|350px|right]] | | [[File:Parabola3.jpg|350px|right]] | ||
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* Number equi-spaced divisions on the double ordinate, say 0 to 8, and back again as shown. | * Number equi-spaced divisions on the double ordinate, say 0 to 8, and back again as shown. | ||
* The height of each Abscissa is given as the products of the two numbers that result - i.e. 0x8, 1x7, 2x6, etc. | * The height of each Abscissa is given as the products of the two numbers that result - i.e. 0x8, 1x7, 2x6, etc. | ||
* Set the height of the parabola vertex as required, and divide this into a number of equal parts up to the maximum resulting product ''(i.e. 16 in this example)''.</span> | * Set the height of the parabola vertex as required, and divide this into a number of equal parts up to the maximum resulting product ''(i.e. 16 in this example)'' - constructing a '''[[Scale]]''' is a convenient way of doing this.</span> | ||
| [[File:Parabola1.jpg|350px|right]] | | [[File:Parabola1.jpg|350px|right]] | ||
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Revision as of 14:56, 18 February 2015
A Parabola is a Conic Section and describes the path (or trajectory) taken by a ball as it is thrown in the air.
An important characteristic of a parabola-shaped reflector is that any beam of light, sound or other energy which enters travelling parallel to its main axis is reflected through a single point called its focus. Conversely, light that originates from a point source at the focus is reflected into a parallel beam. This makes parabolic forms (i.e. parabloids) very useful for microphones and spotlight reflectors for example.
Parabolas can be drawn as the graph of y=x2 but there are other ways of drawing a parabola which exploit its various mathematical properties.
| Drawing a Parabola within a Rectangle |
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| Curve Stitching |
Note: The idea of creating curves using straight lines is put to practical use to design and build curved roofs and curve-sided towers using straight pieces of material - see Saddle Roofs and Cooling Towers or Hyperboloid structures for examples. |
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| Using measured Abscissae |
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Note: Parabolas may also be drawn by more precise methods and the position of the Focus given. Tangents and Normals may also be drawn if needed - see Conic Sections for more details.