exactly
I think you can do this yourself. If not, why did you decide to do the problem?
AOPS tests your problem solving ability, not others'
You are welcome as long as you are not cheating your homework
\(11m^3\) simplified is \(\frac{11m}{m^-2}\) so 11*reciprocal 1/m^2 which is equal to m^2*11m= \(11m^3\)
That is SOOOOOO EZ \(\frac{happynumber}{happiness}\)
6^-6= 1/6^6 because a negative exponent gives you the reciprocal to the exponent power and t^5 is multiplying it so t^5*1/6^6 is equivalent to \(\frac{t^5}{6^6}\)
What do you mean by "more equivalent expressions"?
Isn't it 4 times?
