Functions with Base b - Page 3
Questions
- How do you evaluate #log_3(1/27)#?
- How do you solve # log _ { 4} x = 3#?
- How do you evaluate #log 10,000#?
- How do you use the Change of Base Formula and a calculator to evaluate #log_7 593#?
- What is the solution of #log_(3x-2)125 = 3#?
- How do you use the properties of logarithms to rewrite(contract) each logarithmic expression #2log_2(64) + log_2(2)#?
- How do you simplify #log_3 5 + 5log_3 2#?
- How do you use the properties of logarithms to rewrite(expand) each logarithmic expression #log_2 ((x^5)/ (y^3 z^4))#?
- How do you simplify #log_9 7x + log_9 x + log_9 5x#?
- How do you use the properties of logarithms to find the exact value of #log_2 6*log_6 4#?
- How do you solve #4log_4 7#?
- If #log_a 36=2.2265# and #log_a 4=.8614#, how do you evaluate #log_a 9#?
- How do you simplify # log_8 7 – log_8 s + log_8 t – log_8 4#?
- How do you write as a single logarithm #Log_b 5 +1/3 Log_bx#?
- How to find the rule of this logarithm graph, (2nd question)?
- How do you write as a single logarithm #1/2 Log _b3 +1/2 Log_bx - 3 Log_b Z#?
- How do you write as a single log for #log_460 - log_44 + log_4x #?
- How do you write as a single log for #1/3log_3x + 2/3log_3x #?
- If #log_3{5 + 4log_3 (x-1)} = 2#, then x is equal to?
- How do you solve #\log _ { ( x + 1) } 64= 3#?