Exponential Functions Logarithms Properties of Logarithms Natural Logarithms
- Slides: 27
Exponential Functions Logarithms Properties of Logarithms Natural Logarithms Solving Exponential Equations 100 100 100 200 200 200 300 300 300 400 400 400 500 500 500
Exploring Exponential and Logarithmic Functions COOL JEOPARDY Precalc Chapter 4 Review
Exponential Functions 100 √ 3 √ 5 (8 ) A: What is √ 15 8 ?
Exponential Functions 200 √ 7 64 / A: What is √ 7 2 5√ 7 2 ?
Exponential Functions 300 4 x 3 = 3 -x 27 A: What is x = 9/7?
Exponential Functions 400 n 16 > n+1 8 A: What is an n > 3?
Exponential Functions 500 x 2 * x+5 4 = 2 x-1 4 A: What is x = 12?
Logarithms 100 Write 3 3 = 27 in logarithmic form. A: What is Log 327 = 3?
Logarithms 200 Write log 84 = 2/3 in exponential form. A: Where is 2/3 8 = 4?
Logarithms 300 log 25 5 5 A: What is 25?
Logarithms 400 Solve logb 64 = 3 A: What is b = 4?
Logarithms 500 Log 4(log 216) = y A: What is y = 1?
Properties of Logarithms 100 Log x + 4 Log y. A: What is log x(y^4)?
Properties of Logarithms 200 Ln x – 2[ln(x + 2) + ln(x – 2). A: What is ln x/(x^2 -4)^2?
Properties of Logarithms 300 Ln x/[(x^2 + 1)^3] A: What is a ln x – 3 ln (x^2 + 1)?
Properties of Logarithms 400 Log (x^3)/[y(z^4)] What is 3 log x – log y – 4 log z?
Properties of Logarithms 500 Ln(x-2) + ln(2 x-3) = 2 ln x A: What is 6?
Natural Logarithms 100 e is approximately what number (To the nearest Thousandth)? A: What is 2. 718?
Natural Logarithms 200 Ln(2. 68) A: What is. 9858?
Natural Logarithms 300 Find “X” if Ln. X=5. 4 A: What is X = 221. 4064?
Natural Logarithms 400 7 Lne A: What is 7 ?
Natural Logarithms 500 Given 500 = 230 e-1 t, What is the value of t? A: What is t = 125. 2?
Solving Exponential Equations 100 Find the Value of Logarithm log 516 (to 3 decimal places) A: What is 1. 723?
Solving Exponential Equations 200 Use Logarithm to solve Equation, 9 b = 45 (to 3 decimal places) A: What is 1. 732?
Solving Exponential Equations 300 Use Logarithm to solve Equation, log 1664 A: What is 1. 5?
Solving Exponential Equations 400 The half-life of radioactive radium is 1620 years. If the initial quantity is 10 grams, how much will remain after 1000 years? A: What is 6. 5 grams?
Solving Exponential Equations 500 Use Logarithm to solve Equation, 7 t-2 = 5 t (to 3 decimal places) A: What is 11. 567?
- How to convert to exponential form
- 7-7 base e and natural logarithms
- Single natural logarithm
- Condensing logarithmic functions
- Log a - log b formula
- Properties of logs
- Te warm
- 7-4 properties of logarithms
- 5 properties of logarithms
- Properties of common logarithms
- How to do log base in desmos
- 5 properties of logarithms
- 7-4 properties of logarithms
- Properties of common logarithms
- Exponential differentiation
- Quiz 7-2 logarithmic expressions and functions
- 7-3 logarithms and logarithmic functions
- Exponential and log form
- Natural log to exponential form
- Natural logarith
- Exponential properties
- Logarithm formula
- What is the constant ratio in an exponential function
- Unit 8 review logarithms
- All real numbers graph
- Unit 5: exponential and logarithmic functions answers
- Linear exponential and quadratic functions
- Explicit vs recursive