3.08 Further applications of growth and decay

A diving vessel descends below the surface of the water at a constant rate so that the depth of the vessel after 1 minute, 2 minutes and 3 minutes is 50 metres, 100 metres and 150 metres respectively.

A paver needs to pave a floor with an area of 800 square metres. He can pave 50 square metres a day.

For a fibre-optic cable service, Christa pays a one off amount of \$200 for installation costs and then a monthly fee of \$30.

A scuba diver descends below the surface of the water at a constant rate so that his depth after 4 minutes, 8 minutes and 12 minutes is 15 metres, 30 metres and 45 metres respectively.

Luigi starts his career with a monthly wage of \$5400. At the beginning of each year that follows he receives a raise and his monthly wage for that year will be \$120 greater than the previous year.

A telecommunications company sells 1700 mobile phones in the first month of its operation. The company plans to increase its sales by 150 mobile phones each month.

A ball starts rolling down a slope. It has rolled 23\text{ cm} after the first second, 44\text{ cm} after the second, 65\text{ cm} after the third second and so on.

A termite treatment will cost \$260 for the first half hour, \$250 for the second half hour, \$240 for the third half hour and so on.

What will be the cost of a treatment that takes 5 hours?

A roof restoration company charges \$250 for the first half hour, \$245 for the second half hour, \$240 for the third half hour and so on.

What will be the cost of a restoration that takes 6 hours?

A worker at a factory is stacking cylindrical-shaped pipes which are stacked in layers. Each layer contains one pipe less than the layer below it. There are 6 pipes in the topmost layer, 7 pipes in the next layer, and so on.

For a sprint training exercise, a number of balls are placed in a straight line. The first ball is 2 metres from the start, and there is a 3 metre distance between each of the remaining consecutive balls. There are n balls placed out in the line. Pauline must run from the start, collect the nearest ball and run back to the start, depositing the ball into a box. She must run back to collect the next ball, returning with it to the start. She continues this until all n balls have been collected.

Eileen starts training for a 3.75\text{ km} charity trail run by running every week for 25 weeks. She runs 1\text{ km} of the course in the first week and each week after that she runs 250\text{ m} more than the previous week. She continues this until she runs the same distance as the trail run. She then continues to run this distance each week.

A fishing trawler spends several days netting crabs. On the first day, it nets 530\text{ kg} of crabs, on the next day it nets 512\text{ kg}, and the amount netted continues to decrease by the same amount each day.

A car bought at the beginning of 2009 is worth \$1500 at the beginning of 2015. The value of the car has depreciated by a constant amount of \$50 each year since it was purchased.

A rare figurine was purchased for \$60 and ten years later it is worth \$460.

The balance of a savings account earning simple interest each year is given by the explicit rule V_n = 2100 + 400 \left(n - 1\right), where V_n is the balance after n years.

A mobile phone depreciates in value by a constant amount per month and its value is given by the explicit rule V_n = 1200 - 25 n, where V_n is the balance after n months.

When a new school first opened, a students started at the school. Each year, the number of students increases by the same amount, d.

Due to favourable market conditions, a company's annual costs are expected to decrease by 5\% per year for the next few years. Their annual costs for the current financial year are \$322\,000.

The local rodent population, numbering approximately 840, is decreasing at a rate of 4\% per year.

The number of taekwondo clubs worldwide was approximately 2310 in 1988 and has been decreasing at a rate of 2.6\% per year since.

Justin purchased a piece of sports memorabilia for \$2900, and it is expected to increase in value by 9\% per year.

A car enthusiast purchases a vintage car for \$220\,000. Each year, its value increases at a rate of 12 percent of its value at the beginning of the year. Find its value after 7 years, to two decimal places.

A ball dropped from a height of 21 metres will bounce back off the ground to 50\% of the height of the previous bounce (or the height from which it is dropped when considering the first bounce).

Average annual salaries are expected to increase by 5 percent each year. If the average annual salary this year is found to be \$49\,000:

Suppose you save \$1 the first day of a month, \$2 the second day, \$4 the third day, \$8 the fourth day, and so on. That is, each day you save twice as much as you did the day before.

Suppose you save \$1 the first day of a month, \$2 the second day, \$4 the third day, \$8 the fourth day, and so on. That is, each day you save twice as much as you did the day before.

The number of members at the local club is expected to increase by 19\% per year from the current number of 160. The manager of the club is set to receive a bonus when the number of members rises above 727.

A sample of 2600 bacteria was taken to see how rapidly the bacteria would spread. After 1 day, the number of bacteria was found to be 2912.

A conveyor belt is being used to remove materials from a quarry. Every thirty minutes, the conveyor belt empties out \dfrac{1}{5} of whatever material remains in the quarry. The quarry initially holds 14\,000 \text{ m}^3 of materials.

A scientist observed that a certain species of bacteria grew by 13\% each hour. How many bacteria will be present after 17 hours if there were 79 initially? Round your answer to the nearest whole number.

A country's population of 18 million people is expected to increase by 2.1\% p.a. over the next 38 years.

Calculate the expected population in 38 years time. Round your answer to the nearest whole number.

The population of a town is expected to double in the next 20 years. At what rate, r, will it grow each year, assuming growth is constant? Round your answer as a percentage rounded to two decimal places.

State whether the following scenarios involve a limiting value:

The zoom function in a camera multiplies the dimensions of an image. In an image, the height of waterfall is 30 mm. After the zoom function is applied once, the height of the waterfall in the image is 36 mm. After a second application, its height is 43.2 mm.

The zoom function in a camera multiplies the dimensions of an image by a constant amount. In an image, the height of waterfall is 35\text{ mm} . After the zoom function is applied once, the height of the waterfall in the image is 66.5 mm. After a second application, its height is 126.35\text{ mm}.

The annual output of a coal mine decreases by twenty percent each year. The output in the first year is 274\,000 cubic metres.

To test the effectiveness of a new antibiotic, a certain bacteria is introduced to a body and the number of bacteria is monitored. Initially, there are 14 bacteria in the body, and after four hours the number is found to quadruple.

The perimeter of a triangle is x cm. A second triangle is formed by joining the midpoints of the three sides. A third, fourth and fifth triangle are formed in the same way (ie by joining the midpoints of the three sides of the preceding triangle). The perimeter of the 4th triangle is 3 cm. Determine:

A car’s brakes failed and the driver immediately turned the engine of the car off. In the first second after the engine was shut off, the car travelled 20 metres. Every successive second, the car travelled eighty percent of the distance covered in the previous second.

The first blow of a hammer drives a post a distance of 64\text{ cm} into the ground. Each successive blow drives the post \dfrac{3}{4} as far as the preceding blow.

In order for the post to become stable, it needs to be driven \dfrac{781}{4}\text{ cm} into the ground. If n is the number of hammer strikes needed for the pole to become stable, find n.

The population of some native bees is declining at a rate of 10\% per year.

The government wants to decrease its spending on job creation. Currently it is spending \$11 million and will decrease it by 6.85\% each year over the next 6 years.

An online business that sells shoes online has been growing very quickly over the last year. They have asked you to model their growth over the next three quarters, and further into the future.

The population of cows at a free range farm has a growth rate of 17\% each year. If the farm originally has 140 cows, how many will there be after 4 years?

Tina currently follows 174 people on Twitter. The number of people she follows is growing at a rate of 5\% per month. How many people will she be following in 6 months?

The population of Joanne's home town is 27\,400 and has a growth rate of 6\% each year. What is the estimated population after 7 years?

The area covered by an ice shelf was measured over some warmer months. At the beginning of the first month the ice shelf was spread over an area of 1437 square kilometres, and it was found that this area decreased by 2\% each month over the recording period.

This year, 640 people are expected to enter the workforce as registered nurses. This number is expected to increase by 2 percent next year, and increase by the same percentage every year after that.

Cinema ticket sales for a new movie increased by 5\% per day for the first 10 days after its release date, and then decreased by 7\% per day for the next 5 days. \$275\,000 in ticket sales were made on the release date.

A gym trainer posts Monday's training program on the board, along with how you should progress each day that follows based on your level of fitness. The information is below:

MONDAY TRAINING PROGRAM

• 9 single rope skips

• Weight lift 6\dfrac{1}{2} kg

• Rest 2 minutes

• Row \dfrac{1}{4} mile

BEGINNER LEVEL: Each day, increase the numbers and time by \dfrac{1}{3} of the first day.

INTERMEDIATE LEVEL: Each day, increase the numbers and time by \dfrac{1}{3} of the previous day.

Consider the following sequences:

• 1, x and y are the first three terms of an arithmetic sequence.

• 1, y and x are also the first three terms in a geometric sequence.

A piece of machinery depreciated at a constant rate per hour of use. After 170 hours of use, it was worth \$23\,980. After 230 hours of use, it was worth \$23\,620.

The average annual rate of inflation in Kazakhstan is 2.6\%. Bread cost \$3.65 in 2015.

Each day, Namika withdraws \$5 from her bank account to spend on lunch. Before she withdraws this amount on January 1, she has \$3000 in her bank account.

Zuber is a taxi service that charges a \$1.50 pick-up fee and \$1.25 per kilometre of travel.

The value of Beirut Bank shares is decreasing by \$2.05 each day. At the beginning of today's trading, the shares are worth \$42.54.

Tabitha is a salesperson and is paid a travel allowance of \$45 for each business trip she takes to demonstrate the use of the product she sells. Each week she is also paid a retainer of \$230.

Jack is learning to drive. His first lesson is 28 minutes long, and each subsequent lesson is 4 minutes longer than the lesson before.

A mobile phone depreciates in value by a constant amount per month and its value is given by the explicit rule V_n = 1200 - 20 n, where V_n is the balance after n months.

A motorbike depreciates in value by a constant amount each year and its value is modelled by the recurrence relation:

V_{n+1} = V_n - 1200, \text{ } V_0 = 15000

where V_{n+1} is the value of the motorbike, in dollars, after n+1 years.

A piece of jewellery appreciates in value by a constant amount each year and its value is modelled by the recurrence relation:

V_n = V_{n - 1} + 320, \text{ } V_0 = 2000

where V_n is the value of the jewellery, in dollars, after n years.

Wildlife authorities are trying to control the spread of cane toads in a reserve. Each year there is a 22\% increase in the population size of the cane toads due to breeding and the wildlife authorities aim to capture and remove 500 cane toads each year. At the start of 2015 the cane toad population in the reserve was 2200.

Anna's garden has 5000 weeds in it whose population is increasing at a rate of 0.4\% per month. At the end of each month Anna kills 750 weeds with herbicide.

The volume of water in a pond is being monitored to ensure that it does not dry out. The pond initially contained 70\,000\text{ L} but it appears that 20\%of water is lost through evaporation each day. This is compensated for by 2000\text{ L} being pumped into the pond each day from a nearby dam.