determine whether each function represents exponential growth or exponential decay.
exponential growth
exponential decay
:: $y = \frac{1}{2}e^{-x}$
:: $f(x) = 0.25e^{3x}$
:: $f(x) = 5e^{-0.5x}$
:: $y = 8e^{0.1x}$

Question

Accepted Answer

# Explanation: ## Step1: Recall growth/decay rule An exponential function in the form $y = ae^{kx}$ represents exponential growth if $k>0$, and exponential decay if $k<0$. ## Step2: Analyze $y=\frac{1}{2}e^{-x}$ Here, $k=-1<0$, so it is decay. ## Step3: Analyze $f(x)=0.25e^{3x}$ Here, $k=3>0$, so it is growth. ## Step4: Analyze $f(x)=5e^{-0.5x}$ Here, $k=-0.5<0$, so it is decay. ## Step5: Analyze $y=8e^{0.1x}$ Here, $k=0.1>0$, so it is growth. # Answer: ### Exponential Growth: - $f(x)=0.25e^{3x}$ - $y=8e^{0.1x}$ ### Exponential Decay: - $y=\frac{1}{2}e^{-x}$ - $f(x)=5e^{-0.5x}$

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Question

Explanation:

Step1: Recall growth/decay rule

Step2: Analyze $y=\frac{1}{2}e^{-x}$

Step3: Analyze $f(x)=0.25e^{3x}$

Step4: Analyze $f(x)=5e^{-0.5x}$

Step5: Analyze $y=8e^{0.1x}$

Answer:

Exponential Growth:

Exponential Decay: