Does the t distribution have a mean of zero, or is it a continuous distribution?

Its not an either/or answer.

Yes, the t distribution has a mean of years.
and Yes, it is a continuous distribution in the sense that the tails of the distribution go on to infinity (or neg. infinity)

sorry, yes it has a mean of zero

The t-distribution is a continuous probability distribution that is symmetric around zero and is similar to the standard normal distribution. However, unlike the normal distribution, the t-distribution has more probability in the tails and wider tails. The mean of the t-distribution is indeed zero.

The t-distribution is a continuous probability distribution that is similar to the normal distribution. However, unlike the normal distribution, the t-distribution does not have a fixed mean of zero.

To understand the properties of the t-distribution, it is important to recognize that there are different variations of the t-distribution that depend on the degrees of freedom. The degrees of freedom are related to the sample size and affect the shape of the distribution.

To determine if the t-distribution has a mean of zero or not, we would need to specify the degrees of freedom. In general, when the degrees of freedom increase, the t-distribution approaches a standard normal distribution with a mean of zero.

To find more specific information on the mean and other properties of the t-distribution, we can refer to statistical tables or use statistical software. These resources provide detailed information based on different degrees of freedom and can help us understand and analyze data using the t-distribution.