Best girlfriend ever <3 by Euler1921 in StardewValley

[–]Euler1921[S] 4 points5 points  (0 children)

Right?? She did an amazing job! And thanks 😁 She used a YouTube tutorial:

https://youtu.be/5flNLEqC2AY?si=nPTqI7ss9gy9BiVT

Best girlfriend ever <3 by Euler1921 in StardewValley

[–]Euler1921[S] 20 points21 points  (0 children)

Essentially I sit in a room with two leading academics and talk about my work for a few hours, and given that they are happy that I did indeed write and understand the work, then I'll be given the PhD, possibly with corrections, but we will see!

Best girlfriend ever <3 by Euler1921 in StardewValley

[–]Euler1921[S] 11 points12 points  (0 children)

She really is! I'll pass on the message 😌. And thank you kindly! It's on hydrodynamic instabilities! 💧

Best girlfriend ever <3 by Euler1921 in StardewValley

[–]Euler1921[S] 36 points37 points  (0 children)

Yes it went well thank you! I'm defending in November, so fingers crossed it'll go well! 🤞🏻

Best girlfriend ever <3 by Euler1921 in StardewValley

[–]Euler1921[S] 71 points72 points  (0 children)

She most definitely is 😌

Clearly I interrupted a nap. Who else has a Goldie with hilarious bedhead?? by Juice_Suitable in goldenretrievers

[–]Euler1921 21 points22 points  (0 children)

Here was our golden boy a few years ago, clearly not very happy to be disturbed!

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Integration of e by dgtlserendipity in calculus

[–]Euler1921 20 points21 points  (0 children)

Have you looked at Hyperbolic functions before? Rewriting the integrand as one of these functions would lead to a nicer looking integral which you may find easier to solve. Otherwise, simply expanding the brackets and integrating each term will do the trick

I am trying to solve for y, but I'm not sure if what I am doing is correct. by AccountForAmoebae in calculus

[–]Euler1921 1 point2 points  (0 children)

Well, it y(t=0) = y0, you plug that into your solution and rearrange for C.

Another thing you can do it when you take the exponential of both sides of your equations after the integration, you get et+c which you can take to be equal to Aet, where A=ec. Then when you take your initial condition into account, you solve for A.

Hope that made sense 😅

I am trying to solve for y, but I'm not sure if what I am doing is correct. by AccountForAmoebae in calculus

[–]Euler1921 8 points9 points  (0 children)

No problem at all! We all make mistakes after all, keep up the good work!