So negative three is going to become our final answer. So this is like, what's data? Three times? One, which is just negative. Then, from there, we can see that we have, um, negative three times one. So we know that the exponents must also be equal. And six is the pretty much same thing as having an imaginary one up here. Because the only way for our basis to be the same is if the exponents are the same. So then, from here, we know that that value is going to become one. You can change it up that way, and we right as an exponents get rid the logs altogether. So I just used if you're confused right here, all I did is I used log Base AFB is equal to see a raise. But we know any time that we have the same value and base and value, that's just gonna become one, because we could rewrite this situation right here as six to the what power is equal to six. And now we just have negative three times log based six of six. And at this point now, we couldn't see that we have our base and our value the same, with the exception of this power here, but by a powerful I could effectively take this power and bring it down to the beginning. Then I could simplify things to say, Law based, six of six to the negative three power. So now I could multiply these two values so I could do three times negative one, which is negative three. Well, now, at this point, I have an exponent raced to an exponent power. So if I just take this right here and substituted in right there, I would have logged based six of six Cube to the negative one power. Well, we know that six times 6, 36 36 times six is to 16, so to 16 is just gonna be six times six times six, which is six. Then, from there, I could say I could try to find what to 16 would be. So we know that one over to 16 is the same exact thing as to 16 race. 16 to the negative one power because we know that whenever we take the navigate, if one reciprocal, all that means is that we are taking the reciprocal of them because we have that negative power. So whenever you have one over something, the first thing that I like to do is first turned that into, um basically get rid of the faction and turn it into a negative exponents. But if we try to find the similarities between six and 1/1 to 16, it's pretty easy. So currently, we have some numbers that don't really look that nice. So we've got Log based, six of one over to 16. Okay, so this is gonna be the second example out of our evaluating look, Siri's.
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