The function \( f(x)=500(0.92)^{x} \) gives the number of milligrams of the active ingredient in a medication in a dog's consumed a chewable tablet. Which statements about this situation are true? Select all that apply. \( \square \) There are 500 milligrams of the active ingredient in the dog's body immediately after it consumes the tablet. \( \square \) The amount of active ingredient in the dog's body changes by 500 milligrams per hour. \( \square \) The amount of active ingredient decreases by 0.92 milligrams per hour. The amount of active ingredient decreases by \( 8 \% \) per hour. The amount of active ingredient decreases by \( 92 \% \) per hour.

Let's analyze each statement based on the function \( f(x) = 500(0.92)^x \), where \( x \) represents the number of hours: 1. **There are 500 milligrams of the active ingredient in the dog's body immediately after it consumes the tablet.** - **True.** When \( x = 0 \): \[ f(0) = 500(0.92)^0 = 500 \times 1 = 500 \, \text{milligrams} \] This represents the initial amount of the active ingredient. 2. **The amount of active ingredient in the dog's body changes by 500 milligrams per hour.** - **False.** The function describes an exponential decay, not a linear change. The amount does not decrease by a fixed number of milligrams each hour. 3. **The amount of active ingredient decreases by 0.92 milligrams per hour.** - **False.** The decay is multiplicative, not additive. The amount decreases by a certain percentage each hour, not a fixed milligram amount. 4. **The amount of active ingredient decreases by \( 8\% \) per hour.** - **True.** Each hour, the amount is multiplied by 0.92, meaning it retains 92% of the previous hour's amount. Therefore, it decreases by: \[ 100\% - 92\% = 8\% \text{ per hour} \] 5. **The amount of active ingredient decreases by \( 92\% \) per hour.** - **False.** As established, the amount retains 92% each hour, meaning it only decreases by 8%. **Correct Statements:** - There are 500 milligrams of the active ingredient in the dog's body immediately after it consumes the tablet. - The amount of active ingredient decreases by \( 8\% \) per hour. **Final Answer:** Only the first and the fourth statements are true.