The solutions to this polynomial are x = 1 and x = -2. Find zeros and state multiplicities and describe multiplicities. The solutions to this polynomial are x = 1 and x = -2. The zero at x =1 has a multiplicity of 1. The graph will cross the x-axis at 1. The zero at x = ...
A polynomial function is continuous and differentiable for all inputs. True or false? True or False. \lim_{x \rightarrow 9} \frac{2x^{3} - 5}{x^{3} - 27} = \lim_{x \rightarrow 9} \frac{6x^{2{3x^{2 = 2 True or false? All continuous functions are ...
If f(x) is a polynomial function and the remainder r, obtained in synthetic dyvision of f(x) and if r=0 then () A. (0,k) is a y-intercept of f(x) B. f(r)=k C. (x-k) is a factor of f(x) D. x=k 相关知识点: ...
Show that a function p is a polynomial function is continuous. 02:08 Differentiate w.r.t.x the function in Exercises 1 to 11. (3x^(2)-9x+... 04:01 Differentiate w.r.t.x the function. sin^(3)x+ cos^(6)x 02:56 Differentiate w.r.t.x the function (5x)^( 3 cos 2x) 05:...
when p(x) in divided by x-5,the remainder is 4.find the remainder .when p(x) in divided by (x-2)(x+5). 相关知识点: 试题来源: 解析 一个多项式函数P(X)÷(X-2)=25.当P(X)÷(X-5)时等于4.求P(X)÷(X-2)(X-5)等于几?
One of the type of function is polynomial function, it can be defined as the the function which consists of polynomials. For example - {eq}f(x) = 3x^2 + 2x + 3 {/eq}Answer and Explanation: An abstract function polynomial can be defined as the polynomial function which is used to ...
利用分步积分法:∫(0,2)xp''(x)dx=∫(0,2)xd(p'(x))=[xp'(x)]''上限x=2,下限x=0''-∫(0,2)p'(x)dx=2p'(2)-0-[P(2)-P(0)]=-2
Suppose that f is a polynomial of degree 3 and that f^(x)!=0 at any of... 03:16 A function g(x) is defined as g(x)=1/4f(2x^2-1)+1/2f(1-x^2) and f(x) i... 04:20 If varphi(x) is a polynomial function and varphi^(prime)(x)>varphi(x)A... 02:02 If f''(...
Approximate the value of f(4.1). Explain why this is a good approximation of the true value of f(4.1). 相关知识点: 试题来源: 解析 y=-6.6 结果一 题目 The derivative of a polynomial function, , is given by the equation .Approximate the value of . Explain why this is a good ...
When implementing regular enough functions (e.g., elementary or specialfunctions) on a computing system, we frequently use polynomial approximations.In most cases, the polynomial that best approximates (for a given distance andin a given interval) a function has coefficients that are not exactly...