SOLUTION: Magnitude of a star is modeled by M=6-5/2logI/Isubscript o. Determine the ratio of light intensities between a star of magnitude 1 and a star of magnitude 3. I need help to even

Algebra ->  Exponential-and-logarithmic-functions -> SOLUTION: Magnitude of a star is modeled by M=6-5/2logI/Isubscript o. Determine the ratio of light intensities between a star of magnitude 1 and a star of magnitude 3. I need help to even       Log On


   

Question 548116: Magnitude of a star is modeled by M=6-5/2logI/Isubscript o.
Determine the ratio of light intensities between a star of magnitude 1 and a star of magnitude 3.
I need help to even try to get started on this problem. I do not understand it at all and there is really ni help in the book.
Answer by stanbon(75887) About Me  (Show Source):
You can put this solution on YOUR website!
Magnitude of a star is modeled by M=6-5/2logI/Isubscript o.
Determine the ratio of light intensities between a star of magnitude 1 and a star of magnitude 3.
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M = 6-[5/[2log(I/Io)]]
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Mag 1: 1 = 6-[5/[2log(I/Io)]]
-5 = - [5/[2log(I/Io)]]
1 = 1/[2log(I/Io)]
2log(I/Io) = 1
log(I/Io) = 1/2
I/Io = 10^(1/2)
---
I = sqrt(10)Io
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Mag 3: 3 = 6-[5/[2log(I/Io)]]
---
3/5 = [1/[2log(I/Io)]]
6log(I/Io) = 5
log(I/Io) = 5/6
I/Io = 10^(5/6)
I = 10^(5/6)Io
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Cheers,
Stan H.
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