Question

Which expression is equivalent to ? Assume . m=0 n=0

Answer 1

hope this helps..........

Answer 2

Answer:

$\frac{n}{16m^{3}}=\frac{0}{0}$

NOT DEFINED

Step-by-step explanation:

In the question,

We have been given the equation,

$\left[\frac{4mn}{m^{-2}n^{6}}\right]^{-2}$

Now,

On simplifying the given equation, we get,

$\left[\frac{4mn}{m^{-2}n^{6}}\right]^{-2}=\frac{m^{-2}.n^{-2}}{4^{2}[(m^{-2/-2})(n^{6/-2})]}\\=\frac{m^{-2}.n^{-2}}{16.mn^{-3}}\\=\frac{n^{3-2}}{16.m^{3}}\\=\frac{n}{16m^{3}}$

Now, we have to assume the value of 'm' and 'n' as equal to 0.

Therefore, on putting the values of 'm' and 'n' = 0, we get,

$\frac{n}{16m^{3}}=\frac{0}{0}$

We can the fraction 0/0 which is not defined.

Therefore, the final value after putting the respective values of 'm' and 'n' is NOT DEFINED.