SOLUTION: Given log b 3= 0.6826 and log b 7 + 1.2091, evaluate log b 63.

SOLUTION: Given log b 3= 0.6826 and log b 7 + 1.2091, evaluate log b 63.

Algebra.Com

Question 32486: Given log b 3= 0.6826 and log b 7 + 1.2091, evaluate log b 63.
Answer by mukhopadhyay(490) (Show Source): You can put this solution on YOUR website!
log b 63 = log(baseb)[3*3*7]=log(baseb)3 + log(baseb)3 +log(baseb)7
=2(0.6826) + 1.2091 = 2.5743
RELATED QUESTIONS
given log b 2= 0.3562, log b 3=0.5646, log b 5=0.8271 and log b 11=1.2323 evaluate:... (answered by vleith)

11) Given log a = 0.3010 and log b = 0.4771, evaluate log 24... (answered by josgarithmetic,greenestamps)

Given log(b)5=1.2301, and log(b)7=1.4873.Can you find log(b)squrt(b^3)?... (answered by nerdybill)

Given that log 5=0.6990 and log 7=0.8451, evaluate a) log 35 (b) log 2.8 (c) Given... (answered by josgarithmetic,ikleyn)

Given that log 5=0.6990 and log 7=0.8451, find log 0.035. b. log... (answered by ikleyn)

Given log b 3 = 3.6887 and log b 7 = 1.4873. Find... (answered by rapaljer)

Given Log 2=.3010 and log 3 =.4771, find: a. log (240) b. log... (answered by jsmallt9)

Use log[b]3=1.099 and/or log[b]7=1.946 to find... (answered by solver91311)

a^3+b^3=0 then log (a+b) =1/2 (log a + log b + log... (answered by ikleyn)