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Reblogged from cosimicflux06

Matilda

I was rewatching this movie the other day and got up to the point where she and Miss Honey meet for the first time in the classroom, and she mentions that her favorite author is Charles Dickens.

And, like, I always thought they namedropped him in order to make her sound intellectual, but it occurred to me really suddenly and violently that the reason she loves Dickens is because he writes about children who live in abusive systems and who’ve been orphaned or abandoned and she finds comfort and solidarity in it. Miss Honey’s reacts the way she does because Dickens is special to her, likely for the same exact reason. WOW DUH.

ONLY GETTING THIS LIKE 15 YEARS LATER. ALL ABOARD THE SLOW MOBILE.

omG

If it’s any consolation, I’m pretty sure 70% of the people reblogging this also didn’t realise this until you said it. Myself included.

Oh my god. Another tumblr revolution

DARLES CHICKENS T_T

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Reblogged from kzkite

This legitimately upsets me.

… Y’see, now, y’see, I’m looking at this, thinking, squares fit together better than circles, so, say, if you wanted a box of donuts, a full box, you could probably fit more square donuts in than circle donuts if the circumference of the circle touched the each of the corners of the square donut.

So you might end up with more donuts.

But then I also think… Does the square or round donut have a greater donut volume? Is the number of donuts better than the entire donut mass as a whole?

Hrm.

HRM.

A round donut with radius R

_{1}occupies the same space as a square donut with side 2R_{1}. If the center circle of a round donut has a radius R_{2}and the hole of a square donut has a side 2R_{2}, then the area of a round donut is πR_{1}^{2}- πr_{2}^{2}. The area of a square donut would be then 4R_{1}^{2}- 4R_{2}^{2}. This doesn’t say much, but in general and throwing numbers, a full box of square donuts has more donut per donut than a full box of round donuts.

The interesting thing is knowing exactly how much more donut per donut we have. Assuming first a small center hole (R_{2}= R_{1}/4) and replacing in the proper expressions, we have a 27,6% more donut in the square one (Round: 15πR_{1}^{2}/16 ≃ 2,94R_{1}^{2}, square: 15R_{1}^{2}/4 = 3,75R_{1}^{2}). Now, assuming a large center hole (R_{2}= 3R_{1}/4) we have a 27,7% more donut in the square one (Round: 7πR_{1}^{2}/16 ≃ 1,37R_{1}^{2}, square: 7R_{1}^{2}/4 = 1,75R_{1}^{2}). This tells us that, approximately, we’ll have a 27% bigger donut if it’s square than if it’s round.

tl;dr: Square donuts have a 27% more donut per donut in the same space as a round one.god i love this site

can’t argue with science. Heretofore, I want my donuts square.

more donut per donut

(Source: nimstrz)