A study was done on the population of a certain species of birds in a park. Suppose the population size, $$ P(t) $$, after $$ t $$ years is given by the following exponential function: $$ P(t)=623(1.13)^{t} $$ Answer the following questions. What is the initial population size? [Select] Does the function represent growth or decay? [Select] By what percentage does the population size change yearly? [Select ]

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**Step 1: Determine the Initial Population Size**

The exponential function is given by  
$$
P(t) = 623(1.13)^t.
$$  
The initial population size is the value of $$ P(t) $$ when $$ t = 0 $$. Substitute $$ t = 0 $$:

$$
P(0) = 623(1.13)^0 = 623 \times 1 = 623.
$$

Thus, the initial population size is **623**.

**Step 2: Determine if the Function Represents Growth or Decay**

In the function  
$$
P(t) = 623(1.13)^t,
$$  
the base of the exponent is $$ 1.13 $$. Since $$ 1.13 > 1 $$, this indicates that the population increases over time.

Thus, the function represents **growth**.

**Step 3: Determine the Yearly Percentage Change in Population**

The factor $$ 1.13 $$ in the exponential function means that each year the population is multiplied by $$ 1.13 $$. This represents a yearly increase. To find the percentage increase, subtract 1 from the growth factor and then multiply by 100%:

$$
(1.13 - 1) \times 100\% = 0.13 \times 100\% = 13\%.
$$

Thus, the population size increases by **13%** yearly.
- **Initial Population Size:** 623 - **Growth or Decay:** Growth - **Yearly Percentage Change:** 13%

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