Using the change of base formula, how do you evaluate #log_3 12 # (round to the nearest hundredth)?

2 Answers
Nov 11, 2017

#color(blue)(2.26)#

Explanation:

Change of base:

Let #color(white)(88)y=log_b(a)#

#y=log_b(a)=> b^y=a#

Taking logs of #b^y=a# with a different base log:

#ylog_c(b)=log_c(a)#

#y= (log_c(a))/log_c(b)#

But #y= log_b(a)#

#:.#

#log_b(a)=(log_c(a))/log_c(b)#

So to change base we take the log of the number divided by the log of the base.

Using base 10 logs:

#log_3(12)=log_10(12)/log_10(3)~~2.261859#

To nearest hundredth: #color(blue)(color(white)(88)2.26)#

Nov 11, 2017

#log_3 12=2.262#

Explanation:

According to the change of base formula #log_b a=loga/logb#

Hence #log_3 12#

= #log12/log3#

= #1.0792/0.4771#

= #2.262#