$\text{ population mean and standard deviation: }{\mu }_{\overline{x}}=\mu \text{ and }{\sigma }_{\overline{x}}=\sigma /\sqrt{n}\text{. }$

We know that if a population variable has a mean of $\mu$ and a standard deviation of $\sigma$, then the sample mean has a mean of $\mu$ and a standard deviation of $\frac{\sigma }{\sqrt{n}}$, where $n$ is the sample size.

As a result, the mean of sample means is equal to the population mean $\mu$ and is independent of sample size, i.e., the mean of sample means is always equal to $\mu$ regardless of sample size.

All three curves are located at the same spot because the normal curves are centered at the mean $\mu$

The higher sample size is shown by curve $B$

Because the square root of sample size $n$ is inversely related to the standard deviation of sample mean ${\sigma }_{\overline{x}}$ That is, the larger the sample size, the lower the standard deviation of the sample mean, and hence the smaller the spread of the normal curve. Curve $B$ has the lower spread in this case. As a result, curve $B$ represents the greater sample size.

We know that the standard deviation of the sample mean is proportional to the sample size ${\sigma }_{\overline{x}}=\frac{\sigma }{\sqrt{n}}$

As a result, ${\sigma }_{\overline{x}}$ differs depending on the sample size.

As a result, the spread of each normal curve varies depending on the standard deviation of sample means ${\sigma }_{\overline{x}}$

Because curve $B$ has the lesser standard deviation of the two sampling distributions ($A$ and $B$), it has less sampling error. We know that the smaller the standard deviation of sample means, the smaller the sampling error tends to be.

Because of the population variable, sample mean follows normal distribution regardless of sample size for a normally distributed population variable.