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## Logarithms - Show that the expression is true

1. The problem statement, all variables and given/known data

Show that the following expression is true:

0.2*0.8 = -14dB + (-1.94dB)

2. Relevant equations

1 dB = 10log10(x) (where x is a ratio of two quantities)

10log10(ab) = 10log10(a) + 10log10(b)

3. The attempt at a solution

0.2*0.8 = -14dB + (-1.94dB)

0.16 = -15.94dB

___________________________

10log10(x)=-15.94

x=10-15.94/10=0.0255
___________________________

0.16 ≠ 0.0255 (so either my math is wrong or the expression is not true...)

Mentor
 Quote by JJBladester 1. The problem statement, all variables and given/known data Show that the following expression is true: 0.2*0.8 = -14dB + (-1.94dB)
This doesn't make any sense. The left side is .16 with no units and the right side is -15.94, in units of dB.

Is this actually how the problem is presented?
 Quote by JJBladester 2. Relevant equations 1 dB = 10log10(x) (where x is a ratio of two quantities) 10log10(ab) = 10log10(a) + 10log10(b) 3. The attempt at a solution 0.2*0.8 = -14dB + (-1.94dB) 0.16 = -15.94dB ___________________________ 10log10(x)=-15.94 x=10-15.94/10=0.0255 ___________________________ 0.16 ≠ 0.0255 (so either my math is wrong or the expression is not true...)

Recognitions:
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 Quote by Mark44 This doesn't make any sense. The left side is .16 with no units and the right side is -15.94, in units of dB. Is this actually how the problem is presented?
Yes. I'm enrolled in an online college and just about every test, quiz, or homework I attempt, I find a plethora of inexplicable things like this. I'll go back to the professor to get an idea of what is missing, because something IS missing...

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## Logarithms - Show that the expression is true

On your note about units... Decibels are unitless (dimensionless)... So aside from that, am I missing something else?
 Mentor I guess that the idea is to convert each dB value using the conversion formula, and see if the two dB values add up to .16.
 JJBladestr, let's start with the logarithm of 0.2. What do you get for that? What do you get for the logarithm of 0.8? Now let's multiply each of those by 10, not 20. Add the dB values together. and take the anti-log of the sum.

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 Quote by skeptic2 JJBladester, let's start with the logarithm of 0.2. What do you get for that? What do you get for the logarithm of 0.8? Now let's multiply each of those by 10, not 20. Add the dB values together. and take the anti-log of the sum.
10log10(0.2) = -6.9897 dB
10log10(0.8) = -0.9691 dB

-6.9897 dB + -0.9691 dB = -7.9588 dB

10-7.9588/10=0.16

But that has not proven anything about the left side equaling the right side. It has merely manipulated the left side and we are back to the original question.
 You're right. Where did the -14 dB and the -1.94 dB come from? If they are part of the problem then either they are not equal or you should have used 20*Log instead of 10*Log, but I see nothing in the problem to indicate that.
 Recognitions: Gold Member I asked the professor what was going on with the problem and he said that the math I did was right but the problem was not formed properly. The thing with online schools is some of them have a group of staff members who create the homework/labs/tests and a separate group who instructs. This is an ABET-accredited school, which is good because I'm going to be an Electrical Engineer at the end of it all. I see what you mean about 20*log(something). The "20" would indicate that two voltage levels were being compared because the formula for voltage gain has a "20" in it.

 Tags decibel, expression, logarithm, true