Exponential Growth & Decay Equations & Examples

Identify the function as exponential growth or exponential decay. Then identify the growth or decay factor. $y=7\cdot {0.32}^x$

Tell whether the function represents exponential growth or exponential decay. Identify the percent increase or decrease. Then graph the function.
${\displaystyle f\left(x\right)={\left(\frac{1}{3}\right)}^x}$

Tell whether the function represents exponential growth or exponential decay. Explain your reasoning. $f(x)=4e^{-x}$

Radioactive substances decay exponentially. For example, a sample of Carbon$-14{(}^{14}C)$will lose half of its mass every 5730 years. (In other words, the half-life of ${14}_C$ is 5730 years.) Let A be the initial mass of the sample. Model the decay of ${ }^{14}C$ using a discrete-time model... (1) using ${\displaystyle \delta t=5730}$ years. (2) using Δt=1year.

Identify each function as exponential growth or decay, and find the growth or decay factor. $y=0,1\ast 2^x$

To model each circumstance, create an exponential growth or decay function. After the specified amount of time, determine the function's value. A new car costs $25,000, yet after six years, it loses 15% of its value.