thefrogman: Sometimes people wonder, “Should I learn photoshop?” The answer is yes. Yes you should. 

thefrogman:

Sometimes people wonder, “Should I learn photoshop?” The answer is yes. Yes you should. 

5,789 notes from thefrogman - (reblog) 1 week ago

1ucasvb: The familiar trigonometric functions can be geometrically derived from a circle. But what if, instead of the circle, we used a regular polygon? In this animation, we see what the “polygonal sine” looks like for the square and the hexagon. The polygon is such that the inscribed circle has radius 1. We’ll keep using the angle from the x-axis as the function’s input, instead of the distance along the shape’s boundary. (These are only the same value in the case of a unit circle!) This is why the square does not trace a straight diagonal line, as you might expect, but a segment of the tangent function. In other words, the speed of the dot around the polygon is not constant anymore, but the angle the dot makes changes at a constant rate. Since these polygons are not perfectly symmetrical like the circle, the function will depend on the orientation of the polygon. More on this subject and derivations of the functions can be found in this other post Now you can also listen to what these waves sound like. This technique is general for any polar curve. Here’s a heart’s sine function, for instance

1ucasvb:

The familiar trigonometric functions can be geometrically derived from a circle.

But what if, instead of the circle, we used a regular polygon?

In this animation, we see what the “polygonal sine” looks like for the square and the hexagon. The polygon is such that the inscribed circle has radius 1.

We’ll keep using the angle from the x-axis as the function’s input, instead of the distance along the shape’s boundary. (These are only the same value in the case of a unit circle!) This is why the square does not trace a straight diagonal line, as you might expect, but a segment of the tangent function. In other words, the speed of the dot around the polygon is not constant anymore, but the angle the dot makes changes at a constant rate.

Since these polygons are not perfectly symmetrical like the circle, the function will depend on the orientation of the polygon.

More on this subject and derivations of the functions can be found in this other post

Now you can also listen to what these waves sound like.

This technique is general for any polar curve. Here’s a heart’s sine function, for instance

153,039 notes from fuckyeahmath - (reblog) 1 week ago

(Source: everytanglehasastory)

75,236 notes from thefacci - (reblog) 1 week ago

thefacci:

 

(Source: the-butt-prince-ike)

231,937 notes from thefacci - (reblog) 1 week ago

hadarlikestoblog: Hussein Chalayan A/W 13

hadarlikestoblog:

Hussein Chalayan A/W 13

(Source: halogenic)

77,891 notes from tyleroakley - (reblog) 1 week ago

enochliew:

Urbicande Lamp by Cédric Dequidt

An LED lamp with a play on perspective.

569 notes from enochliew - (reblog) 1 week ago

(Source: hollywouldyouturnmeon-)

386,298 notes from tessaviolet - (reblog) 1 week ago

thefrogman: [via tastefullyoffensive | cheezburger]

thefrogman:

[via tastefullyoffensive | cheezburger]

29,466 notes from thefrogman - (reblog) 1 week ago

thingsandschemes:

Ken To uses wire to create these wonderful miniature bonsai trees.

854 notes from lookatthislittlething - (reblog) 1 week ago

staceythinx:

Isom Tables by Sebastian Scherer

586 notes from proofmathisbeautiful - (reblog) 1 week ago