How do you simplify $\frac{343 u^{4} c^{- 5}}{{(7 u^{6} c^{- 3})}^{- 5}}$ $(343 u^4 c^-5) /(7 u^6 c^-3)^-5$ ?

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How do you simplify $\frac{343 u^{4} c^{- 5}}{{(7 u^{6} c^{- 3})}^{- 5}}$ $(343 u^4 c^-5) /(7 u^6 c^-3)^-5$ ?

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Answer 1 · 2018-08-08T22:24:43

$\frac{5764801 u^{34}}{c^{20}}$ $(5764801u^34)/(c^20)$

Explanation:

There is a negative exponent rule, I'm not quite sure if it has a name, but it says that a negative exponent in the numerator can be moved to the denominator and become positive, and vice versa.
An example would be $x^{- 2} = \frac{1}{x^{2}}$ $x^-2=1/x^2$

So using this

$\frac{{(7 u^{6} c^{- 3})}^{5} (343 u^{4})}{c^{5}}$ $((7u^6c^-3)^5(343u^4))/c^5$

Then we can distribute the exponent, $5$ $5$ , in the numerator
$\frac{16807 u^{30} c^{- 15} (343 u^{4})}{c^{5}}$ $(16807u^30c^-15(343u^4))/c^5$

Now we can move the $c^{- 15}$ $c^-15$ to the denominator using the negative exponent rule
$\frac{16807 u^{30} (343 u^{4})}{c^{5} \cdot c^{15}}$ $(16807u^30(343u^4))/(c^5*c^15)$

We can now combine like bases

$\frac{5764801 u^{34}}{c^{20}}$ $(5764801u^34)/(c^20)$

Answer 2 · 2018-08-09T07:12:35

${(x^{a})}^{b} = x^{a \times b}$ $(x^a)^b=x^(axxb)$

$\frac{343 u^{4} c^{- 5}}{{(7 u^{6} c^{- 3})}^{- 5}} = \frac{7^{3} u^{4} c^{- 5}}{7^{- 5} u^{- 30} c^{15}}$ $[343u^4c^-5]/(7u^6c^-3)^-5=[7^3u^4c^-5]/(7^-5u^-30c^15)$

$\frac{x^{a}}{x^{b}} = x^{a - b}$ $x^a/x^b=x^(a-b)$

$7^{8} u^{34} c^{- 20}$ $7^8u^34c^-20$

or $\frac{7^{8} u^{34}}{c^{20}}$ $[7^8u^34]/c^20$

Answer 3 · 2018-08-09T19:29:51

$\frac{7^{8} u^{34}}{c^{20}}$ $(7^8u^34)/(c^20)$

Explanation:

$\frac{343 u^{4} c^{- 5}}{{(7 u^{6} c^{- 3})}^{- 5}}$ $(343u^4c^-5)/(7u^6c^-3)^-5$

Use the law of indices for negative indices:

$x^{- m} = \frac{1}{x^{m}}$ $x^-m = 1/x^m$

$= \frac{343 u^{4} \times {(7 u^{6} c^{- 3})}^{5}}{c^{5}}$ $=(343u^4xx(7u^6c^-3)^5)/c^5$

Note that $343 = 7^{3}$ $343 = 7^3$

It is better to keep the numbers in index form.

$= \frac{7^{3} u^{4} \times 7^{5} u^{30} c^{- 15}}{c^{5}}$ $=(7^3u^4 xx 7^5u^30c^-15)/c^5$

$= \frac{7^{3} u^{4} \times 7^{5} u^{30}}{c^{5} \times c^{15}}$ $=(7^3u^4 xx 7^5u^30)/(c^5 xxc^15)$

Add the indices of like bases:

$= \frac{7^{8} u^{34}}{c^{20}}$ $=(7^8u^34)/(c^20)$

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How do you simplify $\frac{343 u^{4} c^{- 5}}{{(7 u^{6} c^{- 3})}^{- 5}}$ $(343 u^4 c^-5) /(7 u^6 c^-3)^-5$ ?

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How do you simplify 343u4c−5(7u6c−3)−5(343 u^4 c^-5) /(7 u^6 c^-3)^-5?

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How do you simplify $\frac{343 u^{4} c^{- 5}}{{(7 u^{6} c^{- 3})}^{- 5}}$ $(343 u^4 c^-5) /(7 u^6 c^-3)^-5$ ?