solve (-025e^-0.25(0))-9
You asked:
Evaluate the expression: \(-\left( 025 \cdot {e}^{-0.25} \cdot 0 \right) - 9\)
MathBot Answer:
\[-\left( 025 \cdot {e}^{-0.25} \cdot 0 \right) - 9 = -9\]
\[\begin{aligned}-\left( 025 \cdot {e}^{-0.25} \cdot 0 \right) - 9& = - 25 \cdot e^{- \frac{25}{100}} \cdot 0 - 9\\& = - 25 \cdot e^{\frac{-1}{4}} \cdot 0 - 9\\& = - 25 \cdot \frac{1}{\sqrt[4]{e}} \cdot 0 - 9\\& = - 25 \cdot e^{- \frac{1}{4}} \cdot 0 - 9\\& = - 0 - 9\\& = 0 - 9\\& = -9\end{aligned}\]
\(e\) is Euler's number, a mathematical constant that is approximately \(2.71828\).
asked 12 days ago
active 12 days ago