Question 71665
(25/49) to the -3/2 power
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You have made a few mistakes in your description of your work.  First you said that the
cube root of 25 is 5. Actually the square root of 25 is 5.  The same goes for 49. You said
the cube root of 49 is 7.  And actually the square root of 49 is 7.  However, it seems that
the only mistake here was in saying that the square root was the cube root. I think where 
you mistake occurred was in how you handled the negative exponents. The way to do negative
exponents is to use the form:
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{{{x^(-a) = 1/x^(+a)}}}
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You can treat this as a definition of negative exponents.
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In this problem {{{5^(-3) = 1/5^(+3) = 1/125}}}
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A similar thing takes place with the 49.  The square root of 49 is 7 and then when you
raise 7 to the -3 power it tracks as follows: {{{7^(-3) = 1/7^(+3) = 1/343}}}
and the
answer to you problem is obtained by dividing {{{1/125}}} by {{{1/343}}}. Recall that when
you divide by a fraction, you invert the divisor and multiply the inverted form by the
number you are dividing.  So in this case you invert {{{1/343}}} to get {{{343/1}}}
and then you multiply that times {{{1/125}}}.  The result is:
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{{{(1/125)*(343/1) = 343/125}}}
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This answer agrees with the book.  It appears to me that you understood that the exponent
of {{{-3/2}}} was applied to the entire fraction {{{25/49}}} but that you could then apply
that exponent to the numerator and then apply it again to the denominator.
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It also appeared to me that you understood that {{{(25)^(-3/2)}}} could be written 
either as 
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{{{((25)^(-3))^(1/2)}}} 
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or as
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{{{((25)^(1/2))^(-3)}}}
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and in both of these two formats the minus sign could also be put on the {{{1/2}}} 
leaving the 3 with a + sign.  So there are four possible ways to work this problem and 
each of them works if you do them correctly.
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You chose for both the 25 and the 49 to use the format:
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{{{((25)^(1/2))^(-3)}}} and {{{((49)^(1/2))^(-3)}}}
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but just canceled the minus signs on the 3's instead of using the method of eliminating
negative exponents by making a fraction with 1 as the numerator and the number now 
raised to a positive exponent in the denominator.
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Hope this helps a little to correct how you handle negative exponents.  You were on the
right track with everything else.