To find the product of the multiplication \((5 - 3i)(-2 + 6i)\), we can use the distributive property (also known as the FOIL method for binomials).
Here’s how the multiplication works:
\[ (5 - 3i)(-2 + 6i) = 5 \cdot (-2) + 5 \cdot 6i - 3i \cdot (-2) - 3i \cdot 6i \]
Calculating each term:
- \(5 \cdot (-2) = -10\)
- \(5 \cdot 6i = 30i\)
- \(-3i \cdot (-2) = 6i\)
- \(-3i \cdot 6i = -18i^2\) (Recall that \(i^2 = -1\), so this becomes \(+18\))
Now, combine all the calculated terms together:
\[ -10 + 30i + 6i + 18 \]
Combine the real parts and the imaginary parts:
Real part: \(-10 + 18 = 8\)
Imaginary part: \(30i + 6i = 36i\)
Putting it all together, we have:
\[ 8 + 36i \]
So, the final answer is:
\[ \boxed{8 + 36i} \]
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