Asked by lunamoon

Let's simplify the expression step-by-step using the order of operations, which is Parentheses, Exponents, Multiplication and Division (from left to right), Addition and Subtraction (from left to right).

The original expression is:

\[
(8 - 5) \cdot 3 - 11
\]

1. **First, evaluate the expression inside the parentheses:**

\[
(8 - 5) = 3
\]

Now substitute this value back into the expression:

\[
3 \cdot 3 - 11
\]

2. **Next, perform the multiplication:**

\[
3 \cdot 3 = 9
\]

Now substitute this value back into the expression:

\[
9 - 11
\]

3. **Finally, perform the subtraction:**

\[
9 - 11 = -2
\]

Thus, the simplified expression is:

\[
\boxed{-2}
\]

It seems I misunderstood your original expression. Let's simplify the expression with the power included accurately. The expression you provided is:

\[
(8 - 5) \cdot 3 - 11
\]

If you meant the expression to be:

\[
(8 - 5)^3 - 11
\]

Let’s simplify that step by step:

1. **Evaluate the expression inside the parentheses:**

\[
(8 - 5) = 3
\]

2. **Now raise it to the power of 3:**

\[
3^3 = 27
\]

3. **Now substitute that back into the expression:**

\[
27 - 11
\]

4. **Finally, perform the subtraction:**

\[
27 - 11 = 16
\]

So, the simplified expression is:

\[
\boxed{16}
\]