negative x negative = positive
but
positive x positive = positive
too
so be strong kings and queens and either be bad for each other or be good for each other, same results
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Sorry but no, I was infinity already
So it’s me, the One. You are second, and to not offend Infinitecreators he is also second
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Real shit, be kind and uplift each other.
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Is this what it means to be a side character?
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Okay, you are the first, he is the first but I am a little bit above, good? But not absolute, not worthy of calling like that yet
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oh facts
infinite+1 > infinite
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As long as I get free food I’m ok.
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oh facts
free food > pricy food
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oh facts > facts
by the equilibrium of the trinity force multiplied by the limit of e squared
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bro it was costing me to eat from out 5,60 euro around 10 years ago
now
14,80 euro
actual price, I ordered 1 week ago.
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its the same for let’s say 3 burgers and a fried potato serving combo
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It’s not even sustainable to order delivery or eat outside unless you order once a month or have an above average income. McDonald fries around $5 tf
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I do make my own food now. 30-40$ weekly grocery enough to last for 1-2 weeks and makes me full.
If you want my recipes, send me your social security info and bank account details. Thank you.
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true that
I don’t even know how the people sustain their businesses, apparently they are not that’s why they closing after 3 years and a new one opens in the same place
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ok my social security is :
all the numbers of Pi + the square root of steven hawkins
bank account is :
Rothchild enterprice with the number :
four five three three three three three six nine (68) integral from 0 to infinite f(x)= lim (from x to infinite) log[x+f(x)] with x having limits from closed 0 to open infinite and its a real number
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True, especially Online delivery services ruined it for small business. Successful or large business can thrive on it but for a normal business that is just trying to get by, they are indirectly forced to use these services. Many people resort to delivery because they are lazy asf or have anxiety going in.
Inflation on food production is higher, thus having to raise price. Now combined with online delivery services which take a commission of 30-40% the business have to raise their prices even higher to combat the commission fee in order to make the original income.
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yes but it’s ok
I have coupon for 2 euro everytime, abundance mindset
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To solve this problem, we need to use the concept of convergence and apply some mathematical manipulation.
First, we need to show that the function f(x) is well-defined and converges as x approaches infinity. We can do this by using the limit comparison test:
lim x→∞ f(x)/log(x) = lim x→∞ (log(x+f(x)) - log(x))/log(x)
= lim x→∞ log((x+f(x))/x)/log(x)
= lim x→∞ log(1+f(x)/x)/log(x)
= lim x→∞ log(1+1/(x/f(x)))/log(x)
= 0
Since the limit is finite and positive, we conclude that f(x) converges to infinity at least as fast as log(x) as x approaches infinity.
Now, we can rewrite the integral as follows:
∫0∞ f(x) dx = ∫0∞ [lim t→∞ log(x+f(x))] dx
= lim t→∞ ∫0t log(x+f(x)) dx
= lim t→∞ [x log(x+f(x)) - x]0t + ∫0t (1/(x+f(x))) dx
Using L’Hôpital’s rule, we can show that the first term on the right-hand side approaches infinity as t approaches infinity, so we are left with the second term:
∫0∞ f(x) dx = ∫0∞ (1/(x+f(x))) dx
Now, we can use a substitution u = x+f(x) to rewrite the integral as follows:
∫0∞ f(x) dx = ∫f(0)∞ (1/u) du
= [log(u)]f(0)∞
= log(f(0))
Therefore, the value of the integral is given by log(f(0)).
However, we need to find the value of f(0) in order to compute the integral. To do this, we can use the fact that f(x) converges to infinity at least as fast as log(x) as x approaches infinity. Therefore, we can write:
lim x→∞ f(x)/log(x) = L
=>
lim x→∞ f(x) = L log(x)
Substituting this into the original equation, we get:
lim x→∞ log(x+f(x)) = lim x→∞ log((1+L)log(x))
= log(1+L)
Therefore, we have:
∫0∞ f(x) dx = log(f(0)) = log(1+L)
Substituting L = 68, we get:
∫0∞ f(x) dx = log(69)
Therefore, the value of the integral is log(69).
I outsmarted your smartness
Disclaimer: this mofo used to ChatGPT to solve this.
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really is log69?
I didn’t knew the outcome I just remembered the equation
interesting stuff right there
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