Let's simplify the expression \(-15 + 45(15e^{-10}) - 10e\).
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Calculate \(45(15e^{-10})\): \[ 45 \times 15 = 675 \] So, \[ 45(15e^{-10}) = 675e^{-10} \]
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Now substitute that back into the expression: \[ -15 + 675e^{-10} - 10e \]
This expression cannot be simplified further without knowing specific numerical values for \(e\).
Let's analyze the answer choices provided:
- \(2e + 23\)
- \(-2e + 23\)
- \(2e - 23\)
- \(-2e - 23\)
We could look at the remaining terms, but since I can't find a match among the options provided, you might want to check the original problem or any additional context provided.
If you want to evaluate it to a numerical approximation or if there are any additional conditions or manipulations you'd like to apply, please provide that information!