Lesson 11
Evaluating Logarithmic Expressions
- Let’s find some logs!
Problem 1
Select all expressions that are equal to \(\log_2 8\).
A:
\(\log_5 20\)
B:
\(\log_5 125\)
C:
\(\log_{10} 100\)
D:
\(\log_{10} 1,\!000\)
E:
\(\log_3 27\)
F:
\(\log_{10} 0.001\)
Problem 2
Which expression has a greater value: \(\log_{10} \frac {1}{100}\) or \(\log_2 \frac {1}{8}\)? Explain how you know.
Problem 3
Andre says that \(\log_{10}(55) = 1.5\) because 55 is halfway between 10 and 100. Do you agree with Andre? Explain your reasoning.
Problem 4
An exponential function is defined by \(k(x)= 15 \boldcdot 2^x\).
- Show that when \(x\) increases from 1 to 1.25 and when it increases from 2.75 to 3, the value of \(k\) grows by the same factor.
- Show that when \(x\) increases from \(t\) to \(t+0.25\), \(k(t)\) also grows by this same factor.
Problem 5
How many times does $1 need to double in value to become $1,000,000? Explain how you know.
Problem 6
What values could replace the “?” in these equations to make them true?
- \(\log_{10} 10,\!000 = {?}\)
- \(\log_{10} 10,\!000,\!000 = {?}\)
- \(\log_{10} {?} = 5\)
- \(\log_{10} {?} = 1\)
Problem 7
- What value of \(t\) would make the equation \(2^t = 6\) true?
- Between which two whole numbers is the value of \(\log_2 6\)? Explain how you know.
Problem 8
For each exponential equation, write an equivalent equation in logarithmic form.
- \(3^4 = 81\)
- \(10^0 = 1\)
- \(4^\frac12= 2\)
- \(2^t = 5\)
- \(m^n = C\)