Learn on PengiBig Ideas Math, Algebra 1Chapter 6: Exponential Functions and Sequences

Lesson 4: Exponential Growth and Decay

Property.

Section 1

Exponential Growth and Decay Function Graphs

Property

For exponential growth and decay functions of the form f(x)=abxf(x) = a \cdot b^x:

  • When b>1b > 1, the function represents exponential growth and the graph is increasing.
  • When 0<b<10 < b < 1, the function represents exponential decay and the graph is decreasing.
  • The initial value aa determines the y-intercept at (0,a)(0, a).
  • The x-axis (y=0y = 0) is a horizontal asymptote for all exponential functions.

Examples

Section 2

Writing Exponential Growth/Decay Functions

Property

To write an exponential function from given information:
For growth: y=a(1+r)ty = a(1 + r)^t where aa is initial value and rr is growth rate as decimal
For decay: y=a(1r)ty = a(1 - r)^t where aa is initial value and rr is decay rate as decimal

Examples

Section 3

Converting Growth Rates to Growth Factors

Property

To convert a growth rate percentage to a growth factor: Growth Factor = 1+growth rate percent1001 + \frac{\text{growth rate percent}}{100}
For exponential growth function y=a(1+r)ty = a(1 + r)^t, the growth factor is (1+r)(1 + r) where rr is the decimal form of the growth rate.

Examples

Section 4

Rewriting Exponential Functions

Property

Exponential functions can be rewritten using exponent properties to reveal different time periods or rates. The key property is (am)n=amn(a^m)^n = a^{mn}, which allows us to transform y=a(b)ty = a(b)^t into equivalent forms like y=a(b12)t12y = a(b^{12})^{\frac{t}{12}} to show monthly rates from annual rates.

Examples

Lesson overview

Expand to review the lesson summary and core properties.

Expand

Section 1

Exponential Growth and Decay Function Graphs

Property

For exponential growth and decay functions of the form f(x)=abxf(x) = a \cdot b^x:

  • When b>1b > 1, the function represents exponential growth and the graph is increasing.
  • When 0<b<10 < b < 1, the function represents exponential decay and the graph is decreasing.
  • The initial value aa determines the y-intercept at (0,a)(0, a).
  • The x-axis (y=0y = 0) is a horizontal asymptote for all exponential functions.

Examples

Section 2

Writing Exponential Growth/Decay Functions

Property

To write an exponential function from given information:
For growth: y=a(1+r)ty = a(1 + r)^t where aa is initial value and rr is growth rate as decimal
For decay: y=a(1r)ty = a(1 - r)^t where aa is initial value and rr is decay rate as decimal

Examples

Section 3

Converting Growth Rates to Growth Factors

Property

To convert a growth rate percentage to a growth factor: Growth Factor = 1+growth rate percent1001 + \frac{\text{growth rate percent}}{100}
For exponential growth function y=a(1+r)ty = a(1 + r)^t, the growth factor is (1+r)(1 + r) where rr is the decimal form of the growth rate.

Examples

Section 4

Rewriting Exponential Functions

Property

Exponential functions can be rewritten using exponent properties to reveal different time periods or rates. The key property is (am)n=amn(a^m)^n = a^{mn}, which allows us to transform y=a(b)ty = a(b)^t into equivalent forms like y=a(b12)t12y = a(b^{12})^{\frac{t}{12}} to show monthly rates from annual rates.

Examples