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To create an expression equivalent to \( 4(3e-8j) \), we can distribute the 4 to each term inside the parentheses:

1. Distributing \( 4 \) to \( 3e \):
\[
4 \times 3e = 12e
\]

2. Distributing \( 4 \) to \( -8j \):
\[
4 \times -8j = -32j
\]

Putting it all together, we get:
\[
4(3e - 8j) = 12e - 32j
\]

So, the expression equivalent to \( 4(3e - 8j) \) is \( 12e - 32j \).

If you need specific terms to drag into boxes, they would be:
- \( 12e \)
- \( -32j \)

In the expression \( 12e - 32j \), the term that comes first is \( 12e \).

So, to clarify:
- First term: \( 12e \)
- Second term: \( -32j \)

If you are arranging or entering these terms in a specific order, \( 12e \) should be placed in the first box, followed by \( -32j \) in the second box.

Yes, I am sure. When expressing the simplified form of \( 4(3e - 8j) \), which we calculated as \( 12e - 32j \), the term \( 12e \) indeed comes before \( -32j \) in standard mathematical notation.

Here's a quick recap of the calculation:

1. Multiply \( 4 \) by \( 3e \) to get \( 12e \).
2. Multiply \( 4 \) by \( -8j \) to get \( -32j \).
3. Combine these results into the expression \( 12e - 32j \).

So, \( 12e \) is the first term, and \( -32j \) is the second term.

If there is a specific context or format you are following, please let me know!