2:04 LTE 34 myopenmath.com Part 1 of 4 Consider the following scenario. The population of a certain type of tree in a forest is represented by $$ A(t)=111(1.022)^{t} $$, where $$ t $$ is the number of years elapsed. In a neighboring forest, the population of the same type of tree is represented by $$ B(t)=76(1.026)^{t} $$. (a) Which forest's population is growing at a faster rate? The second forest $$ 0^{8} $$ Part 2 of 4 (b) Which forest had a greater number of this type of tree initially? The first forest $$ 0^{8} $$ By how many? 35 Part 3 of 4 (c) Assuming the population growth models continue to apply, which forest will have the greater population after 20 years? The first forest $$ 0^{8} $$ By how many? (Round to the nearest whole number.) $$ \square $$ Submit Part Question 19

Question

UpStudy AI · Accepted Answer

To determine which forest will have the greater population after 20 years and by how many, we'll evaluate both population models at $$ t = 20 $$ years.

**Population Models:**
- **First Forest:** $$ A(t) = 111 \times (1.022)^{t} $$
- **Second Forest:** $$ B(t) = 76 \times (1.026)^{t} $$

**Calculations:**

1. **First Forest after 20 years:**
   $$
   A(20) = 111 \times (1.022)^{20}
   $$
   $$
   \approx 111 \times 1.537 \approx 170.56
   $$

2. **Second Forest after 20 years:**
   $$
   B(20) = 76 \times (1.026)^{20}
   $$
   $$
   \approx 76 \times 1.668 \approx 126.93
   $$

**Difference:**
$$
170.56 - 126.93 \approx 43.63
$$
Rounding to the nearest whole number:
$$
\approx 44
$$

**Conclusion:**
After 20 years, **the first forest** will have a greater population than the second forest by **44 trees**.

**Final Answer:**
After 20 years, the first forest will have a greater population by 44 trees.
After 20 years, the first forest will have 44 more trees than the second forest.

Real Tutor Solution

Answer

Solution

The Deep Dive

Related Questions

Latest Pre Calculus Questions