Initial axioms:To grow as a human, one must self-reflect.Let the extent of self-reflection be R, then:R ~ T (R is proportional to T, where T is time spent on self-reflection)Calculations:T=t-w-s-r (time available for self-reflection is nothing other than life time minus time spent on work, time spent on sleep, time spent on recreation)We assume t-w is a constant, as a person doesn’t have much power to change their life time in a positive direction and their work time in a negative direction. However, we must immediately infer that unemployment = personal growth from the above equation and axioms provided. As proof is trivial, it is left as an exercise to the reader.r=k/s, as the less one sleeps, the more time they spend on escapism.There is no strong correlation between s and w, as one who sleeps poorly just works the same amount of time but less efficiently and takes more breaks which is r, not w.Differentiating T with respect to independent variable s yields:dT/ds=-1+k/s2Obviously it is DNE at s=0, but that does not interest us, as s>0.-1+k/s2=0 to find relative extrema:k=s2s=k^½Let’s find a second derivative to see if it’s max or min:-2k/s3 < 0, at s=k^½, so it’s a max.So:sr=ksr=s2s2-sr=0s(s-r)=0s=r (one must sleep, such that they recreate as much as they sleep).However, we worked under the assumption that r=k/s correctly models the correlation between sleep and recreation (and we will continue, as it is easier).If suppose r=k/(s^n), s=r/n (the proof is left to the reader as an exercise).However, what if R ~ s?Calculations Part II:What I mean by R ~ s is something like R=KTs meaning that the less one sleeps, the less efficient is their process of self-reflection.Thus, R max, when is Ts max.Recall T definition:T=(C-s-k/s)C is just a constant that is equal to t-w.Differentiating Ts yields:T+s(dT/ds)C-s-k/s-s+k/sC-2sSecond derivative is obviously negative, so:C-2s=0 (max of T)C=2ss=C/2
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