Please do vote:-
(1 point) Find a possible formula for a polynomialſ that has degree 2 or less, f(-1)...
(1 point) Find a possible formula for a polynomíalf that has degree 2 or less,f(-2) = f(5) = 0, and f(2) =-24 x2x2+6x+20 help (formulas)
The polynomial of degree 3, P(x), has a root of multiplicity 2 at5 and a root of multiplicity 1 at z3. The y- intercept is y37.5. Find a formula for P(z). P(x)- Preview Get help: Videc License Points possible: 1 Unlimited attempts. Submit Write an equation for the polynomial graphed below -2 -3 y(x)- Preview Get help: Video Points possible: 1 Unlimited attempts. Submit Search or type URL calculus Section 22 Spring 2019> Assessment Write an equation for the polynomial...
(1 point) Find a possible formula for the function graphed below. The z-intercepts are marked with points located at (3,0) and (-6,0). while the y-intercept is marked with a point located at (0,-). The asymptotes are y = :-1,2 = -5, and 2. Give your formula as a reduced rational function f(x) = I help (formulas) 9 y X2 X T-6
(a) Find the degree 1 interpolating P(x) through the points (a, f(a)) and (b, f(b)) (b) Develop the following formula by using the interpolating polynomial P1 (x), (c) Find the degree of precision of the approximation, T1 (f) = f(1) + f(-1), for f(r)dr. (a) Find the degree 1 interpolating P(x) through the points (a, f(a)) and (b, f(b)) (b) Develop the following formula by using the interpolating polynomial P1 (x), (c) Find the degree of precision of the approximation,...
The polynomial of degree 5, P(2) has leading coefficient 1, has roots of multiplicity 2 at I = 1 and I = 0, and a root of multiplicity 1 at I = - 3 Find a possible formula for P(x). P(x) = Question Help: Video Submit Question
(1 point) Find the Taylor polynomials (centered at zero) of degree h 2, 3, and 4 of f(x) = ln(3x + 7). Taylor polynomial of degree 1 is Taylor polynomial of degree 2 is Taylor polynomial of degree 3 is Taylor polynomial of degree 4 is
Need answer of part b solve part b using this formula [A] Find the 3rd degree Taylor Polynomial for f(x) = V centered at x = 8. Clearly show all derivatives involved as well as the values obtained from those derivatives as was done in Example 2 from Section 11.1 of the book and Examples 1 and 2 in the Unit 4.1 Summary Notes. Simplify the coefficients in your final answer (no factorials in the final answer; do not use...
(1 point) Let F(z) = [" sin(4t) dt. Find the MacLaurin polynomial of degree 7 for FC). 0.66 Use this polynomial to estimate the value of Š sin(4x²) dr.
(1 point) Find the polynomial of degree 9 (centered at zero) that best approximates f(x) = ln(° +5). Hint: First find a Taylor polynomial for g(x) = ln(x + 5), then use this to find the Taylor polynomial you want 1/2 Now use this polynomial to approximate L'iniz? +5) da. -1/2 Lis(z) dx =
(1 point) Find the polynomial of degree 9 (centered at zero) that best approximates f(x) 71 +23 Hint: First find a Taylor polynomial for g(2) vite then use this to find the Taylor polynomial you want. 1/2 Now use this polynomial to approximate 1 dx. 1+ 3 Do" s(2) de