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- Applications of Exponential and Logarithmic Functions

Still Confused?

Try reviewing these fundamentals first.

Still Confused?

Try reviewing these fundamentals first.

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Get Started NowStart now and get better math marks!

Get Started NowStart now and get better math marks!

Get Started NowStart now and get better math marks!

Get Started Now- Lesson: 14:12
- Lesson: 27:21

We now have a better understanding of how the compounding frequency will affect the amount we wish to grow or decay. But what if we are dealing with something, say, that compounds every minute, second, or even millisecond? This concept is also known as continuous compounding. In this section, we will see a slight variation of an exponential growth and decay formula that models continuous exponential growth/decay.

Related concepts: Derivative of inverse trigonometric functions, Derivative of logarithmic functions,

Continuous Growth/Decay: ${ A_f = A_i e^{rt}}$

${A_f}$: final amount

${A_i}$ : initial amount

${e }$ : constant = 2.718…

${r }$ : rate of growth/decay

• growth rate of 7% $\to {r = {7\over100} = 0.07}$

• growth rate of 15%$\to {r = - {15\over100} = - 0.15}$

${t }$ : total time given

${A_f}$: final amount

${A_i}$ : initial amount

${e }$ : constant = 2.718…

${r }$ : rate of growth/decay

• growth rate of 7% $\to {r = {7\over100} = 0.07}$

• growth rate of 15%$\to {r = - {15\over100} = - 0.15}$

${t }$ : total time given

- 1.On Aiden’s 10-year-old birthday, he deposited $20 in a savings account that

offered an interest rate of 4% compounded continuously. How much money

will Aiden have in the account when he retires at the age of 60? - 2.A radioactive substance decays continuously. If the half-life of the substance

is 5 years, determine the rate of decay.

8.

Applications of Exponential and Logarithmic Functions

8.1

Exponential growth and decay by a factor

8.2

Exponential decay: Half-life

8.3

Exponential growth and decay by percentage

8.4

Finance: Compound interest

8.5

Continuous growth and decay

8.6

Logarithmic scale: Richter scale (earthquake)

8.7

Logarithmic scale: pH scale

8.8

Logarithmic scale: dB scale

8.9

Finance: Future value and present value

We have over 770 practice questions in NZ Year 13 Maths for you to master.

Get Started Now8.1

Exponential growth and decay by a factor

8.2

Exponential decay: Half-life

8.3

Exponential growth and decay by percentage

8.4

Finance: Compound interest

8.5

Continuous growth and decay

8.6

Logarithmic scale: Richter scale (earthquake)

8.7

Logarithmic scale: pH scale

8.8

Logarithmic scale: dB scale

8.9

Finance: Future value and present value