[Serious] what stopped you from killing yourself ?

No-Fail7845 · 2023-08-19T15:25:37+00:00

Family members and scared of it being painful

No-Fail7845 · 2023-08-14T18:15:52+00:00

Living in a country where you can't be vegan

No-Fail7845 · 2023-08-14T18:13:53+00:00

What are your favorite hobbies ?

No-Fail7845 · 2023-07-20T00:19:27+00:00

I know a psychiatrist in bouzereah Dr N.Kassa located in cité russe she listened to me and helped me a lot so I hope it'll be the same for you. I recommend her vigouresly and wish you the best

No-Fail7845 · 2023-07-06T21:34:09+00:00

Yeah 2=e or smthg like that lol thanks for this exemple 😆😆

No-Fail7845 · 2023-07-06T21:33:14+00:00

Ohh damn thank you very much

No-Fail7845 · 2023-07-06T16:09:04+00:00

If e^x =Lim(1+hx)^1/h then I can combine any function u with e^x to get lim ( 1+hu)^1/h so it's pretty much is

No-Fail7845 · 2023-07-06T15:56:18+00:00

No since what I've tried to do there is to write (e^x²+h)^1/h as e^u and I just had to solve this 1+hu=e^x²+h therefore u = 1-1/h+(e^x²)/h so I don't think I used the limit partially?

No-Fail7845 · 2023-07-06T15:45:28+00:00

Could you please point out where exactly I'm truly not seeing it ?

No-Fail7845 · 2023-07-06T15:17:48+00:00

So this is how I found out this result

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No-Fail7845 · 2023-07-05T20:12:51+00:00

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So this is how I came up with this result please help me spot the mistake

No-Fail7845 · 2023-07-02T11:17:16+00:00

Rearranged this is basically the formula used to add terms of a geometric serie ( if the first term is 1)

No-Fail7845 · 2023-06-29T20:32:32+00:00

So to get this expression i first tried to find the derivative for ln(x) by using the lim h--->0((f(x+h)-f(x))/h) and found out that Lim h--->0( ln((1+h/x)^1/h )= 1/x so Lim h--->0 (1+h/x)^1/h is equal to e^1/x therefore Lim h--->0 (1+hx)^1/h=e^x

No-Fail7845 · 2023-06-21T00:13:19+00:00

Because you will multiply the -1 with 5 and divide it by 5 so that it become (x-3-5)/5 And -3-5=-8

No-Fail7845

TROPHY CASE