Mathematics, 29.09.2019 04:30 deepspy599otchpd
Give an example of a continuous function whose derivative does not exist at x = 0. (hint: this would be relatively easy to do with a piecewise function, but you have to think of a function that uses formula that maple ta recognises. check the syntax guide for examples of the functions that are accepted by maple ta.) (b) give an example of a function which is continuous at x 2 but whose derivative does not exist at x = 2 3 but whose derivative does not exist at any of those points. (c) give an example of a function that is continuous at x = -2, x = 0 and x
Answers: 1
Mathematics, 21.06.2019 17:00, landenDfisher
For the rule of 78, for a 12-month period, the last term in the sequence is 12 and the series sums to 78. for an 10 month period, the last term is and the series sum is . for a 15 month period, the last term is and the series sum is . for a 20 month period, the last term is and the series sum is
Answers: 2
Give an example of a continuous function whose derivative does not exist at x = 0. (hint: this woul...