Functions with Base b
Functions with base b play a fundamental role in various mathematical contexts, providing a versatile framework for expressing relationships and solving problems. In mathematics, a base b function involves raising the base to different powers, yielding a diverse set of outcomes. This concept is particularly prevalent in logarithmic and exponential functions, offering a powerful tool for analyzing growth, decay, and intricate mathematical patterns. Understanding functions with base b is crucial in fields like calculus, algebra, and computer science, making it an indispensable element for students and professionals alike.
Questions
- Given #log_3(5x^2+x−y)=1# then #y=ax^n+x+b#, what is #a#, #b#, #n#?
- How do you use the Change of Base Formula and a calculator to evaluate the logarithm #log (1/5)^3#?
- What does a logarithmic function look like?
- How can i solve the log for 6147x2903^2/437? Thanks
- What is the condensed form of #log_w 5 - 2log_w a + 3log_2b - 4log_wc#?
- What is the value of #((log_2 11)(log_3 12)(log_5 13))/((log_5 11)(log_8 12) (log_9 13)#?
- How do you use the Change of Base Formula and a calculator to evaluate the logarithm #log 4^20#?
- How do you solve #12^ { x - 6} = 9#?
- How do you calculate #log_6 73# with a calculator?
- Given that #log_b(N^4)=8#, what is #log_b(1/N)#?
- Express log2(6!) in form a + log2(b) where a and b are integers and b is the smallest possible value?
- How do you calculate #log_9 48# with a calculator?
- How do you use the Change of Base Formula and a calculator to evaluate the logarithm #log_(1/2) 15#?
- How do you use the Change of Base Formula and a calculator to evaluate the logarithm #log_5 10#?
- How do you calculate #log_5 (-28)# with a calculator?
- How do you solve #(e^(x+5) / e^(5)) = 3#?
- If #a=log_12 18# & #b = log_24 54#, wha tis the value of #ab+5(a-b)#?
- How are the logs coming about? thanks
- If #log(x)=4[7*log(a)-8*log(b)]+2*log(a)#, what is #x# as a function of #a# and #b#?
- How do you calculate #log_4 43# with a calculator?