What is Gaussian distribution: Definition and 73 Discussions
In probability theory, a normal (or Gaussian or Gauss or Laplace–Gauss) distribution is a type of continuous probability distribution for a real-valued random variable. The general form of its probability density function is
{\displaystyle \mu }
is the mean or expectation of the distribution (and also its median and mode), while the parameter
σ
{\displaystyle \sigma }
is its standard deviation. The variance of the distribution is
σ
2
{\displaystyle \sigma ^{2}}
. A random variable with a Gaussian distribution is said to be normally distributed, and is called a normal deviate.
Normal distributions are important in statistics and are often used in the natural and social sciences to represent real-valued random variables whose distributions are not known. Their importance is partly due to the central limit theorem. It states that, under some conditions, the average of many samples (observations) of a random variable with finite mean and variance is itself a random variable—whose distribution converges to a normal distribution as the number of samples increases. Therefore, physical quantities that are expected to be the sum of many independent processes, such as measurement errors, often have distributions that are nearly normal.Moreover, Gaussian distributions have some unique properties that are valuable in analytic studies. For instance, any linear combination of a fixed collection of normal deviates is a normal deviate. Many results and methods, such as propagation of uncertainty and least squares parameter fitting, can be derived analytically in explicit form when the relevant variables are normally distributed.
A normal distribution is sometimes informally called a bell curve. However, many other distributions are bell-shaped (such as the Cauchy, Student's t, and logistic distributions).
Going over my Lecture Notes my Lecturer as Started with
Show that a Gaussian Distribution Corresponds to a CTS random variable.
Then she has
i) Taken the f(x) = [p.d.f] and shown a) f(x) >= 0 for all x member of real numbers. b) Integral over all real numbers = 1
ii) Found the M.G.F then...
I am studying the Gaussian distribution and am doing one of the problems for practice. The problem states that the standard deviation is equal to 15 and the actual value recorded in the experiment is 385.0. It then asks what is the probability that a single measurement lies in the range of the...
I have a 3d data cube. For every point I measure the property A which is a gaussian variable of mean m and variance s and it's also a function of the density d at every point.
A(x,y,z)=f(d(x,y,z))e^(-(X-m)^2/(2\sigma^2))
X is a random number.
Now let's say I want to sample the...
I'm wondering if there was a table of moments for a Gaussian Distribution, I found one up to the fourth moment
U \sim N(\mu, \sigma^2)
E[U^2]=\mu^2+\sigma^2
E[U^3]=\mu^3+3\mu\sigma^2
E[U^4]=\mu^4+6\mu\sigma^2+3\sigma^4
I'm doing a problem right now and i need the 8th moment.
I have been calibrating a sub-micron particle sizer with 1 um (1000 nm) standard.
After testing the standard, the test results on my print-out:
(X25 = 812.7 nm, X50 = 977.7 nm, X90 = 1389.0 nm)
According to USP, the limits are +/- 6% of the reference standard values for X25, X50, and X90...
Hi,
Suppose that an n-dimensional vector \mathbf{z}=\begin{pmatrix}z_1&z_2&\cdots & z_n\end{pmatrix}^T is characterized as a zero-mean circularly symmetric complex Gaussian random vector. What is the distribution (the probability distribution function PDF) of this vector in both: complex and...
Statistical "Error" of Centroid of Gaussian Distribution
If I have L data samples, distributed randomly (3D real Gaussian distibution, unity variance) about the origin in 3D real space, how can I derive an expression for the "origin estimation error" (i.e. the distance between the true origin...
Hi,
I currently have a Gaussian distribution (Normalized Frequency on the y-axis and a value we can just call x on the x-axis).
So for the sake of simplicity, let's say that I ignore any values below 0 and any values above 1 on the x-axis. Then what I will do is take 10 equal segments...
Hi,
I currently have a Gaussian distribution (Normalized Frequency on the y-axis and a value we can just call x on the x-axis).
So for the sake of simplicity, let's say that I ignore any values below 0 and any values above 1 on the x-axis. Then what I will do is take 10 equal segments...
The conc.of molecules in two ultra-high-vacuum chambers of volumes V1=V2=0.1m^3 is 10^6 molecules/m3
You count the # of molecules N1 and N2, in each chamber at some moment of time.
a.find the expectation value and the SD of N1 and N2 . calc \sigma_{N1}, sketch the prob distribution of N1...
Can you please give me formulas which give intersection of two gaussian function
f(x, mu, sigma) = 1/sqrt(2*pi*sigma^2) * exp(-(x-mu)^2 / (2*sigma^2))
for the case variances are different.
(Note: I think it is time I learn how to use "tex" tags, do you know a good tutorial?)
Q.
(Something), (Something) and (Something) is at the centre of distribution.(bell curve)
The mean? And i don't know - I've read through my maths book(s) and several other sources of information and can not find any information.
Thanks.
Hello everyone,
I am trying to understand situations under which Gaussian distribution would apply. For example, I read somewhere that if you have some ink drop on a porous paper, then the distribution of the displacement of ink particles is approximately gaussian.
I am trying to figure...
Homework Statement
integrate
\int_{-\infty}^\infty\! e ^{(x-a)^{2}}\, dx
Homework Equations
\int \! e^u\, du = e^u + C
The Attempt at a Solution
i just know that du = 2(x-a), but there is no x to make use of substitution, so I am confused on how to go about solving this since I...
Hi there,
I have very naive to statistics.
I have a set of data points. that can be like
10, 12, 13, 14 ,15 , 15, 12, 13 17, 18, 19, 12, 19, 20 ....
Now i need to know if these days points follows any gaussian distribution / normal distribution or not?
IS chi -square test the right...
Homework Statement
Derive the equation for the Gaussian distribution.
Homework Equations
The probability density function for the Gaussian distribution:
f(x) = \frac{1}{\sigma \sqrt{2\pi} } e^{ -\frac{(x-\mu)^2}{2\sigma ^2} }
The Attempt at a Solution
It is my understanding that the...
Problem
Let us define a wave function \phi = A \exp \(\frac{-(x-x_0)^2}{4a^2}\) \exp \(\frac{i p_0 x}{\hbar}\) \exp(-i \omega_0 t). Show that (\Delta x)^2 = a^2. Also, calculate the uncertainty \delta p for a particle in the given state.
Attempt at a solution
I honestly have no idea as to...
please help me with Gaussian Distribution and central limit theorem in matlab!
:cry:I am trying to generate a random variable with a approximate gaussian distribution using the rand function and central limit theorem, got stuck when trying it. Please help me. Also want to know how to produce a...
Hello, I am attaching what was an extra credit question in my physics class which I didn't understand at all. The topic isn't in the book and all the internet searchs I read confuse me. I was hoping someone might give me a walk through.
Thanks!
So I was having a conversation with the guy I share an office with and I brought up the gaussian distribution to show the probability distribution of energies of electrons generated by a filament. He mentioned that it 'looks like a sine wave', and I said 'sorta, but it's not a sine wave'. He...