Tensor |
Dragonmann wrote:
Q^Q=(Q^(Q+1))/Q
Q=?
Q^Q = (Q^(Q+1))/Q
log[Q^Q] = log[(Q^(Q+1))/Q]Q*log[Q] = log[(Q^(Q+1))] - log[Q]
Q*log[Q] = (Q+1)*log[Q] - log[Q]
Q = (Q+1) - 1
Q = Q + (1-1)
Q = Q
or
Q^Q = (Q^(Q+1))/Q
Q^Q = (Q^(Q+1)*(Q^(-1))
Q^Q = (Q^(Q+1-1))
Q^Q = Q^Q
log[Q^Q] = log[Q^Q]
Q*log[Q] = Q*log[Q]
Q = Q
or
Q^Q = (Q^(Q+1))/Q
(Q^Q)*Q = (Q^(Q+1))
(Q^(Q+1)) = (Q^(Q+1))
log[(Q^(Q+1)] = log[(Q^(Q+1))]
(Q+1)*log[Q] = (Q+1)*log[Q]
Q+1 = Q+1 [ also log[Q] = log[Q] => 10^log[Q] = 10^log[Q] => Q = Q ]
Q = Q
or
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