Use this information to complete the statements below. Use the drop-down menus to complete each statement.



The model of the data has an initial value of Select the correct option
degrees.



The model of the data has a decay rate of Select the correct option
percent.



According to the model, the internal temperature of the cake was around Select the correct option
degrees after 5 minutes in the freezer.

I don't have the model or the data you see, so I can't pick the exact dropdown answers. Paste the model equation (or the fitted formula shown in your problem) and I will fill in the three answers.

If you want to check them yourself, here are how to read the common model forms:

1. If the model is T(t) = A · b^t (discrete exponential)
- Initial value (temperature at t = 0) = A degrees.
- Decay rate (per minute) = (1 − b) · 100%.
- Temperature after 5 minutes = A · b^5 degrees.

2. If the model is T(t) = A · e^(−k t) (continuous exponential)
- Initial value = A degrees.
- Decay constant = k (units: per minute). If they want a percent decay per minute, convert by: percent decrease per minute = (1 − e^(−k)) · 100% (or sometimes k is given directly as the “continuous” decay rate).
- Temperature after 5 minutes = A · e^(−k·5) degrees.

Give me the model (for example “T(t) = 180(0.92)^t” or “T(t) = 180 e^(−0.083t)”) and I’ll compute the three dropdown answers exactly.