To analyze the statement and determine which option is true, we first need to compute the value of \(3,657 + 16.33\).

Calculating this gives:

\[ 3,657 + 16.33 = 3,673.33 \]

Now, we can evaluate each of the options in relation to this result:

A. The given expression is four less than \(3,673.33\).

If we subtract 4:

\[ 3,673.33 - 4 = 3,669.33 \]

B. The given expression is four times as large as \(3,673.33\).

This would mean multiplying \(3,673.33\) by 4:

\[ 3,673.33 \times 4 = 14,693.32 \]

C. The given expression is four times less than \(3,673.33\).

This typically means that the given expression is \(\frac{3,673.33}{4}\):

\[ \frac{3,673.33}{4} = 918.3325 \]

D. The given expression is four more than \(3,673.33\).

If we add 4:

\[ 3,673.33 + 4 = 3,677.33 \]

Since we do not have an explicit "given expression" provided to compare against our calculations, it's impossible to conclude which statement is true without that information.

If you have a specific expression to compare, please provide that so we can evaluate which of the options is true.