4 point Clipart
https://openclipart.org
A media feed of 4 point clipart.en-UShttps://openclipart.org/image/144px/svg_to_png/193993/Openclipart-Scissors-Logo-in-Green.png
https://openclipart.org
4 point Clipart144144Pointing Finger (#4)
https://openclipart.org/detail/297829/pointing-finger-4
Wed, 07 Mar 2018 01:50:30 -0400oksmithAdapted from a CC0 image uploaded to Pixabay.com by user My_Graphic_Tabletshttps://openclipart.org/detail/297829/pointing-finger-4http://creativecommons.org/licenses/publicdomain/Retro Pattern 4
https://openclipart.org/detail/295146/retro-pattern-4
Fri, 26 Jan 2018 10:39:42 -0400Arvin61r58Pattern from the original (circa 1980s) Print Shophttps://openclipart.org/detail/295146/retro-pattern-4http://creativecommons.org/licenses/publicdomain/Quadratic Bezier Curves: Symmetrical - SVG Optimization 03
https://openclipart.org/detail/294948/quadratic-bezier-curves-symmetrical-svg-optimization-03
Tue, 23 Jan 2018 17:58:00 -0400SunKing2Inkscape cannot create Quadratic Bezier curves without modifying XML, but it can display them. They are an overlooked SVG tool and easier to work with than the default Bezier curves.
Section 1: Six quadratic Bezier curves. A simple quadratic curve can be created with a starting point, the letter "q", a control point and and ending point. If the control point is midway between the start and end, you get a nice symmetrical curve. For example, in a path tag, use this d attribute:
d="m0,100 q50,50, 100,0"
Section2: Same thing but the starting point is on top, and ending point is on the bottom.
Section 3: a. A simple quadratic Bezier curve. b. To create repeating curves, you can use a shortcut syntax which requires the letter q only once, followed by a set of coordinates. The q is implied between each coordinate. c. This can be repeated as many times as you like.
Section 3: a. To create two curves where the second curve is a reflection of the first curve, you can use a further shortcut. Just specify the letter "t" followed by a coordinate. b. horizontal c.You can repeat this for a longer curve.
Section 4: This writing was created only with quadratic Bezier curves. It contains only the curves on this page, scaled down, and appended to each other to make a single path.
Inkscape will allow you to read files with quadratic Bezier curves, and in some cases, you can move them, and they remain quadratic. But modifying of them may cause Inkscape to turn them into cubic Bezier curves - which is unfortunate because the syntax of quadratic Bezier curves is shorter and easier to work with.
https://openclipart.org/detail/294948/quadratic-bezier-curves-symmetrical-svg-optimization-03http://creativecommons.org/licenses/publicdomain/Spacing in Perspective
https://openclipart.org/detail/294899/spacing-in-perspective
Tue, 23 Jan 2018 04:17:25 -0400SunKing2Perfect equal distances between objects.
Let's draw a perfectly divided sidewalk in one-point perspective.
1. Draw two points anywhere on the page. These will be the end points of your first sidewalk segment. Draw lines from it to an arbitrary vanishing point.
2. Connect the first two points. Then connect the center of this segment with the vanishing point. This will be your "center" line.
3. Draw the beginning of the next sidewalk segment using a line parallel to the first segment. Its location is arbitrary.
4. Draw a line from the end of the first segment, to the center of the second segment. Draw the other line. The locations of where these lines end is the end points of the third segment. Draw it.
5. Repeat as long as is practical. (I quit early).
6. Remove the supporting lines and center line.
(This diagram is centered and perfectly horizontal and symmetrical, but one-point perspective works with any two starting points anywhere, and any vanishing point anywhere.)https://openclipart.org/detail/294899/spacing-in-perspectivehttp://creativecommons.org/licenses/publicdomain/two sided ring 4
https://openclipart.org/detail/291971/two-sided-ring-4
Wed, 13 Dec 2017 20:02:06 -0400Lazur URHTwo concentric circles connected by an evolvent of a circle.
With anti-aliasing rendering issues eliminated -using clipping (thus the rendering is not fluent in chrome compared to the thumbnail...)
Gradient fill is following two arms, going from an inner point to an outer one.https://openclipart.org/detail/291971/two-sided-ring-4http://creativecommons.org/licenses/publicdomain/Pointing hand 4
https://openclipart.org/detail/291565/pointing-hand-4
Wed, 06 Dec 2017 18:48:23 -0400FirkinFrom a drawing in 'Canadian forest industries July-December 1923', 1923.https://openclipart.org/detail/291565/pointing-hand-4http://creativecommons.org/licenses/publicdomain/Background pattern 227 (colour 4)
https://openclipart.org/detail/286562/background-pattern-227-colour-4
Sun, 10 Sep 2017 15:27:30 -0400FirkinA seamless background drawn in Paint.net and vectorised with Vector Magic. The starting point was a photograph of drinking straws from Pixabay.https://openclipart.org/detail/286562/background-pattern-227-colour-4http://creativecommons.org/licenses/publicdomain/Sine Curve
https://openclipart.org/detail/280319/sine-curve
Fri, 26 May 2017 03:29:19 -0400AdamStanislavWhile it is impossible to draw an exact sine curve using cubic Bézier curves, it is possible to come close by using the values I calculated so the X-coordinates are a straight line and the first Y control point of the first quadrant of the size curve occupying a 1x1 space is equal to 4*(sqrt(2)-1)/3, or roughly 0.55228474983. This is explained in my free e-book available for download at https://www.smashwords.com/books/view/483578 and at most e-book retailers, including the Apple store (for free).
See SVG source code for more details.
P.S. I did this mostly to answer the question found at https://forums.adobe.com/thread/2237600 (the Adobe forum)https://openclipart.org/detail/280319/sine-curvehttp://creativecommons.org/licenses/publicdomain/Infinite Arrows 4
https://openclipart.org/detail/279170/infinite-arrows-4
Fri, 05 May 2017 17:10:25 -0400GDJInfinite Arrows 4https://openclipart.org/detail/279170/infinite-arrows-4http://creativecommons.org/licenses/publicdomain/Arrow 4 Left 250 Length
https://openclipart.org/detail/272502/arrow-4-left-250-length
Fri, 10 Feb 2017 19:21:30 -0400AdamStanislavA left-pointing arrow.https://openclipart.org/detail/272502/arrow-4-left-250-lengthhttp://creativecommons.org/licenses/publicdomain/Arrow 4 Left 400 Length
https://openclipart.org/detail/272501/arrow-4-left-400-length
Fri, 10 Feb 2017 19:20:53 -0400AdamStanislavA left-pointing arrow.https://openclipart.org/detail/272501/arrow-4-left-400-lengthhttp://creativecommons.org/licenses/publicdomain/Arrow 4 Left 600 Length
https://openclipart.org/detail/272500/arrow-4-left-600-length
Fri, 10 Feb 2017 19:20:22 -0400AdamStanislavA left-pointing arrow.https://openclipart.org/detail/272500/arrow-4-left-600-lengthhttp://creativecommons.org/licenses/publicdomain/Arrow 4 Left 800 Length
https://openclipart.org/detail/272499/arrow-4-left-800-length
Fri, 10 Feb 2017 19:19:40 -0400AdamStanislavA left-pointing arrow.https://openclipart.org/detail/272499/arrow-4-left-800-lengthhttp://creativecommons.org/licenses/publicdomain/Arrow 4 Left 1000 Length
https://openclipart.org/detail/272498/arrow-4-left-1000-length
Fri, 10 Feb 2017 19:19:07 -0400AdamStanislavA left-pointing arrow.https://openclipart.org/detail/272498/arrow-4-left-1000-lengthhttp://creativecommons.org/licenses/publicdomain/08 Exodus 12:5-14 01
https://openclipart.org/detail/270940/08-exodus-12514-04
Mon, 16 Jan 2017 13:11:24 -0400CCX1 of 4 pictures for Exodus 12:5-14https://openclipart.org/detail/270940/08-exodus-12514-04http://creativecommons.org/licenses/publicdomain/Arrows Frame 4
https://openclipart.org/detail/255081/arrows-frame-4
Wed, 13 Jul 2016 19:00:27 -0400GDJArrows Frame 4https://openclipart.org/detail/255081/arrows-frame-4http://creativecommons.org/licenses/publicdomain/Marineris 4
https://openclipart.org/detail/247628/marineris-4
Wed, 27 Apr 2016 05:00:07 -0400FirkinA design with approximate rotational symmetry the starting point for which was a NASA photograph of the Velles Marineris on Mars.https://openclipart.org/detail/247628/marineris-4http://creativecommons.org/licenses/publicdomain/Polycyttaria 4
https://openclipart.org/detail/246685/polycyttaria-4
Thu, 14 Apr 2016 14:53:23 -0400FirkinA design with approximate rotational symmetry formed from a drawing of radiolaria by Ernst Haeckel. The design was drawn as a PNG in Paint.net by repeated rotation of wedges of the drawing around a centre point. It was vectorized in Vector Magichttps://openclipart.org/detail/246685/polycyttaria-4http://creativecommons.org/licenses/publicdomain/Chiroptera 4
https://openclipart.org/detail/246432/chiroptera-4
Tue, 12 Apr 2016 20:51:46 -0400FirkinA design with approximate rotational symmetry formed from a drawing of bats by Ernst Haeckel. The design was drawn as a PNG in Paint.net by repeated rotation of wedges of the drawing around a centre point. It was vectorized in Vector Magichttps://openclipart.org/detail/246432/chiroptera-4http://creativecommons.org/licenses/publicdomain/Gamochonia 4
https://openclipart.org/detail/246190/gamochonia-4
Sun, 10 Apr 2016 07:50:06 -0400FirkinA design with approximate rotational symmetry formed from a drawing of octopus by Ernst Haeckel. The design was drawn as a PNG in Paint.net by repeated rotation of wedges of the drawing around a centre point. It was vectorized in Vector Magichttps://openclipart.org/detail/246190/gamochonia-4http://creativecommons.org/licenses/publicdomain/