![]() Basically, the X always remained since the negative exponents, it's always on the bottom of the fraction, so this would never go to zero. One x two native to that become native too positive to X to the negative three. When you have a negative derivative X the negative. But then there's this part to the negative one. And ah, the four groups you know, the forward end of going zero immediately x to the fourth power would go to zero after five derivatives. There's three different components, and according to the addition rule, these components would be derivative derived separately. So we'll start with the 1st 1 If you look at it. But that's 36 attributed ves, and there is a much simpler way to kind of just think through. So one way to do this would go be would be to go through each and every one of these six functions and take six derivatives. So, 6th 7th Everything after that is zero. So just to interpret this statement a little bit, it's asking which of these functions if you take six or more derivatives, will the drift of the zero so six derivative and beyond. Okay, here we were given the six different functions and were asked for which of these six would this statement be true? The K derivative of X equals zero for for all K values that are greater than or equal to six. ![]()
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