SOLUTION: {{{log2 (1/32)}}}
I started by saying log2 (1/2^5)---->(5)(log2)1/2---->5(1/sqrt2)
Algebra.Com
Question 339937:
I started by saying log2 (1/2^5)---->(5)(log2)1/2---->5(1/sqrt2)
Answer by jim_thompson5910(35256) (Show Source): You can put this solution on YOUR website!
Hint: Let and then convert to exponential form to get . You can then rewrite as
If you need more help, email me at jim_thompson5910@hotmail.com
Also, feel free to check out my tutoring website
Jim
RELATED QUESTIONS
Log2... (answered by MathLover1,MathTherapy)
1 +... (answered by ikleyn)
log2 (x+1) + log2 (x-5) =... (answered by solver91311)
log2 (x + 1) + log2 (3.c - 5) = log2 (5x - 3)... (answered by ikleyn)
Solve the logarithmic equation showing step by step.... (answered by MathLover1,Timnewman)
How do you solve:
log2(3x+2)-log2(x)/log2(4)=3
3log2(x-1)+log2(4)=5
Logx(1/27)=3... (answered by stanbon)
log2(h-1)+log2(x+2)=1 (answered by Alan3354,Fombitz)
Solve... (answered by xachu4u)
2^log2^5-log2^6 (answered by stanbon)