SOLUTION: log of 18 to the base 12=a and log of 54 to the base 24=b then 5(a-b)+ab is?
Algebra.Com
Question 791626: log of 18 to the base 12=a and log of 54 to the base 24=b then 5(a-b)+ab is?
Answer by ankor@dixie-net.com(22740) (Show Source): You can put this solution on YOUR website!
log of 18 to the base 12=a
exponent equiv of logs
a*log(12) = log(18)
a =
a = 1.16317
and
log of 54 to the base 24=b
b*log(24) = log(54)
b =
b = 1.25517
:
then 5(a-b) + ab is?
5(1.16317 - 1.25517) + (1.16317*1.25517) = ?, leave this math for you
see if you get about 1
RELATED QUESTIONS
my earlier submission looks to be jumbled. I have tried to put the same questions in a... (answered by CharlesG2)
if log base a of x equals c and log base b of x equals c, what is log base ab of x equal (answered by Alan3354)
Express as a difference of logarithms
log base b 5/w
Is log base b 5-log base b w
the... (answered by jim_thompson5910)
Please help me solve this question
Solve- a raised to the power of log base b( log N... (answered by Alan3354)
Solve for (x):
x = log base of b to the a * log base of c to the d * log base of d to... (answered by MathLover1)
How would you solve log of 54 base 3 and log of 48 base 4 without a calculator? I know if (answered by stanbon,herosz)
Using log rules
Loga = 0.3
Logb = -0.5
Solve
log(1000a^2)
log(4throot... (answered by Alan3354)
log 3=a and log 2=b then log 6 with base 5 in terms of a and b
(answered by lwsshak3)
What is log base 3 Radical b times log base 3 c to the exponent 3/2, divided by log a to... (answered by stanbon)