Let h be a function is such that h(0) = 3 and that the nth derivative...
4. Find the nth Maclaurin polynomial for the function. f(x) = e-x, n = 5 P5(x) = _______ 5. Find the nth Maclaurin polynomial for the function. f(x) = sin(x), n = 6 P6(x) = _______
Find the nth Maclaurin polynomial for the function. - 3x – 3 X + 1 n = 4 PA(X) =
11. Find the nth Maclaurin polynomial for the function a) f(x)e2,n 3 b) f(a)cos3x, n 4 12 Find the intommlc 11. Find the nth Maclaurin polynomial for the function a) f(x)e2,n 3 b) f(a)cos3x, n 4 12 Find the intommlc
How do you do this problem? 3. Let h be a function whose first derivative is h/(x) = S:* 3(In( + 3))? dt. For 6 < x < 12, which of the following is true? Oh is increasing and the graph of his concave down. Oh is increasing and the graph of h is concave up. Oh is decreasing and the graph of h is concave down. 0 h is decreasing and the graph of h is concave up. Oh...
3. (a) Let f be an infinitely differentiable function on R and define F(x) = [-vf(u) dy. Find and prove a formula for F(n), the nth derivative of F. (b) Show that if f is a polynomial then there exists a constant C such that F(n)(x) = Cea for sufficiently large n. Find the least n for which it is true.
Find the Maclaurin polynomial of degree 4 for the function. /(x) cos(3x) Find the Maclaurin polynomial of degree 4 for the function. /(x) cos(3x)
Let D P3P3 be the function that sends a polynomial of degree 3 to its derivative (a) Find an eigenvector for D or explain why no eigenvector exists Write your solution here (b) Let B 1 x, x + x2, x2 + x3,x3}. B is a basis for P3. Find MDB-B Here, MD.- is the unique matrix such that MD-xs = [D(x)]s Write your solution here Recall that D: P is polynomial differentiation. 1x, x +x2, x2 +x3,x3} and C...
Please do questions 21, 25, 29, and 33. Thanks! In Exercises 21 - 24, approximate the function value with the indicated Taylor polynomial and give approximate bounds on the error. 21. Approximate sin 0.1 with the Maclaurin polynomial of de- gree 3. Exercises 25 - 28 ask for an n to be found such that pn(x) ap- proximates f(x) within a certain bound of accuracy. 25. Find n such that the Maclaurin polynomial of degree n of f(x) = et...
n If f(x) = Σ a;x' is a polynomial in R[x], recall the derivative f'(x) is a polynomial as well i=0 (we'll talk more about the fact that derivatives are linear, in chapter 3). Recall I write R[x]n for the polynomials of degree < N. Let P(x) = aixº be degree N, N i=0 a.k.a. assume an # 0. Show that the derivatives P(x), P'(x), ...,P(N)(x) form a basis of R[x]n (where p(N) means the Nth derivative of P).
3. (a) Let f be an infinitely differentiable function on R and define х F(x) = e-y f(y) dy. Find and prove a formula for F(n), the nth derivative of F. (b) Show that if f is a polynomial then there exists a constant C such that F(n)(x) = Cem for sufficiently large n. Find the least n for which it is true.