Figure 1 shows a typical normal probability density function, so called because most observations fall into this sort of distribution.
The square modulus of the wave function is proportional to the probability density of finding the system at each point in the configuration space.
probability density distribution
The general expression of joint probability density of total cost is given.
Through the analysis of their probability density function and mean trajectory, it shows that this system in these two cases can occur chaotic stochastic motion.
So, again we can use these probability density plots, which are just a plot of psi squared, where the density of the dots is proportional to the density, the probability density, at that point.
Figure 1: Normal probability density function, which illustrates that actual observations may vary from the expected (or average).
So, that's probability density, but in terms of thinking about it in terms of actual solutions to the wave function, let's take a little bit of a step back here.
Based on the concepts of randomness and fuzziness, a fuzzy reliability analysis method of probability density function equivalent is proposed in this article.
We get the accumulation of the electron probability density between the two nuclei.
Because it is a probability density, it must be a single value.
And so, the radial probability density at the nucleus is going to be zero, even though we know the probability density at the nucleus is very high, that's actually where is the highest.
By means of the equivalent nonlinear system met hod, the analytical solution of the joint probability density function of steady- state responses of Coulomb sliding friction rigid structures to vertical Gauss ian white noises is derived.
The analytic solutions of the probability density of the steady-state responses of Coulomb sliding systems with gradually strong springs to Gaussian white noise are derived.
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