"If x is t, then nearly 0 to the power of number 1 or above makes the number get even smaller because a root would make near zero approach a tiny ways toward one (and this is a power, not a root.)But the numerator is also getting smaller by m power and the sin(t) in radians is approximately t for small t near zero.Oh maybe I was right, if n is way bigger than m, then perhaps there is a value, like" . . . .