City A had a population of 10000 in the year 1990. City A’s population grows at a constant rate of 3% per year. City B has a population that is growing exponentially. In the year 2000, there were half - QAmmunity.org

City A had a population of 10000 in the year 1990. City A’s population grows at a constant rate of 3% per year. City B has a population that is growing exponentially. In the year 2000, there were half

asked Sep 3, 2022 197k views

1 Answer

Answer:

City A and city B will have equal population 25years after 1990

Explanation:

Given

Let

$t \to$ years after 1990

$A_t \to$ population function of city A

$B_t \to$ population function of city B

City A

A_0 = 10000 ---- initial population (1990)

$r_A =3\%$ --- rate

City B

B_(10) = (1)/(2) * A_(10) ----- t = 10 in 2000

$A_(20) = B_(20) * (1 + 20\%)$ ---- t = 20 in 2010

Required

When they will have the same population

Both functions follow exponential function.

So, we have:

A_t = A_0 * (1 + r_A)^t

B_t = B_0 * (1 + r_B)^t

Calculate the population of city A in 2000 (t = 10)

A_t = A_0 * (1 + r_A)^t

$A_(10) = 10000 * (1 + 3\%)^(10)$

A_(10) = 10000 * (1 + 0.03)^(10)

A_(10) = 10000 * (1.03)^(10)

A_(10) = 13439.16

Calculate the population of city A in 2010 (t = 20)

A_t = A_0 * (1 + r_A)^t

$A_(20) = 10000 * (1 + 3\%)^(20)$

A_(20) = 10000 * (1 + 0.03)^(20)

A_(20) = 10000 * (1.03)^(20)

A_(20) = 18061.11

From the question, we have:

B_(10) = (1)/(2) * A_(10) and
$A_(20) = B_(20) * (1 + 20\%)$

B_(10) = (1)/(2) * A_(10)

B_(10) = (1)/(2) * 13439.16

B_(10) = 6719.58

$A_(20) = B_(20) * (1 + 20\%)$

$18061.11 = B_(20) * (1 + 20\%)$

18061.11 = B_(20) * (1 + 0.20)

18061.11 = B_(20) * (1.20)

Solve for B20

B_(20) = (18061.11)/(1.20)

B_(20) = 15050.93

B_(10) = 6719.58 and
B_(20) = 15050.93 can be used to determine the function of city B

B_t = B_0 * (1 + r_B)^t

For:
B_(10) = 6719.58

We have:

B_(10) = B_0 * (1 + r_B)^(10)

B_0 * (1 + r_B)^(10) = 6719.58

For:
B_(20) = 15050.93

We have:

B_(20) = B_0 * (1 + r_B)^(20)

B_0 * (1 + r_B)^(20) = 15050.93

Divide
B_0 * (1 + r_B)^(20) = 15050.93 by
B_0 * (1 + r_B)^(10) = 6719.58

(B_0 * (1 + r_B)^(20))/(B_0 * (1 + r_B)^(10)) = (15050.93)/(6719.58)

((1 + r_B)^(20))/((1 + r_B)^(10)) = 2.2399

Apply law of indices

(1 + r_B)^(20-10) = 2.2399

(1 + r_B)^(10) = 2.2399 --- (1)

Take 10th root of both sides

$1 + r_B = \sqrt[10]{2.2399}$

1 + r_B = 1.08

Subtract 1 from both sides

r_B = 0.08

To calculate
B_0 , we have:

B_0 * (1 + r_B)^(10) = 6719.58

Recall that:
(1 + r_B)^(10) = 2.2399

So:

B_0 * 2.2399 = 6719.58

B_0 = (6719.58)/(2.2399)

B_0 = 3000

Hence:

B_t = B_0 * (1 + r_B)^t

B_t = 3000 * (1 + 0.08)^t

B_t = 3000 * (1.08)^t

The question requires that we solve for t when:

A_t = B_t

Where:

A_t = A_0 * (1 + r_A)^t

$A_t = 10000 * (1 + 3\%)^t$

A_t = 10000 * (1 + 0.03)^t

A_t = 10000 * (1.03)^t

and

B_t = 3000 * (1.08)^t

A_t = B_t becomes

10000 * (1.03)^t = 3000 * (1.08)^t

Divide both sides by 10000

(1.03)^t = 0.3 * (1.08)^t

Divide both sides by
(1.08)^t

((1.03)/(1.08))^t = 0.3

(0.9537)^t = 0.3

Take natural logarithm of both sides

$\ln(0.9537)^t = \ln(0.3)$

Rewrite as:

$t\cdot\ln(0.9537) = \ln(0.3)$

Solve for t

$t = (\ln(0.3))/(ln(0.9537))$

t = 25.397

Approximate

t = 25

Saalon answered Sep 9, 2022

by Saalon

3.1k points

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