Asked by eyerubsareaddictive

To simplify the expression \(2 \times 3^6\):

First, calculate \(3^6\):

\[
3^6 = 729
\]

Now, multiply this result by \(2\):

\[
2 \times 729 = 1458
\]

Thus, \(2 \times 3^6 = 1458\).

Let's double-check the calculations.

The expression is \(2 \times 3^6\).

1. First, calculate \(3^6\):
\[
3^6 = 3 \times 3 \times 3 \times 3 \times 3 \times 3
\]
Breaking that down:
- \(3^2 = 9\)
- \(3^3 = 27\)
- \(3^4 = 81\)
- \(3^5 = 243\)
- \(3^6 = 729\)

So, \(3^6 = 729\).

2. Now multiply by \(2\):
\[
2 \times 729 = 1458
\]

Your calculation of \(46656\) likely originates from \(6^6\) (which is \(6 \times 6 \times 6 \times 6 \times 6 \times 6 = 46656\)).

So, to clarify:

- \(3^6 = 729\)
- \(2 \times 3^6 = 1458\)

If you have any other calculations in mind or would like clarification on other items, feel free to ask!

It appears that you may have accidentally calculated \(6^6\) instead of \(3^6\). Let's clarify that:

1. **Calculating \(6^6\)**:
\[
6^6 = 6 \times 6 \times 6 \times 6 \times 6 \times 6
\]
To break this down:
- \(6^2 = 36\)
- \(6^3 = 216\)
- \(6^4 = 1296\)
- \(6^5 = 7776\)
- \(6^6 = 46656\)

That is indeed how you would arrive at \(46656\).

2. **Calculating \(3^6\)**, as we previously discussed:
\[
3^6 = 729
\]

So the distinction is crucial. If you were calculating \(3^6\) as part of \(2 \times 3^6\), you would get \(1458\), but if you calculated \(6^6\), you would get \(46656\).

If you have any more questions or need further clarification, just let me know!