subject
Mathematics, 08.10.2019 04:30 gonzalezant8428

Consider the following equation. 3x4 βˆ’ 8x3 + 6 = 0, [2, 3] (a) explain how we know that the given equation must have a root in the given interval. let f(x) = 3x4 βˆ’ 8x3 + 6. the polynomial f is continuous on [2, 3], f(2) = < 0, and f(3) = > 0, so by the intermediate value theorem, there is a number c in (2, 3) such that f(c) = . in other words, the equation 3x4 βˆ’ 8x3 + 6 = 0 has a root in [2, 3]. (b) use newton's method to approximate the root correct to six decimal places.

ansver
Answers: 2

Another question on Mathematics

question
Mathematics, 21.06.2019 18:30
Dakota earned $7.50 in interest in account a and $18.75 in interest in account b after 15 months. if the simple interest rate is 4% for account a and 5% for account b, which account has the greater principal? explain. to make it a little easier, there is an image. good luck!
Answers: 1
question
Mathematics, 21.06.2019 19:10
If you answer 2+2 you will get over 80 points
Answers: 2
question
Mathematics, 21.06.2019 20:00
Find the value of x. round the length to the nearest tenth
Answers: 1
question
Mathematics, 21.06.2019 21:30
Rhombus adef is inscribed into a triangle abc so that they share angle a and the vertex e lies on the side bc . what is the length of the side of the rhombus if ab=c, and ac=b.
Answers: 1
You know the right answer?
Consider the following equation. 3x4 βˆ’ 8x3 + 6 = 0, [2, 3] (a) explain how we know that the given eq...
Questions
question
Mathematics, 06.05.2020 00:31
question
Chemistry, 06.05.2020 00:31
question
History, 06.05.2020 00:31
Questions on the website: 13722367