Find the following derivatives: ON Js, V.X1, X2....,XC-1 ON T,P.x1,x2,...,XC-1
Find the derivatives of the following functions (A) y=xt-x2 (B) y=x2 (C) y-3x3 + 4x -3 (D) y=x (F) f(x)- 100x100 (G) fx)- (H) f(x)=- 1-5r ) f(x)= (J f(x) - (x + 1)(x3 +5x + 2) (Requires quotient rule) 4+x For f(x) = 6x3, find f(x) and f"(x), and fm(x). For f(x)- 5x3 -3x2+x-20, find f(x), f"(x), and f""(x)
Please show all work Let f(x) = x2 + 3x + 5. a) Find all derivatives of f(x). b) Find the value of f(n) (2) for all derivatives. c). Find the Taylor's series for f(x) centered at c = 2.
Find the partial derivatives for the following function. Find the partial derivatives for the following function. of a. Ox of ду 3 ,,2 b. Reminder: Product Rule: AB'+A'B
1. (20 points) Find derivatives of the following functions. (a) f(x) = 1012 (b) g(x) = (ln(x2 + 3)] (c) h(x) = Vx+V2 (d) y=et +e? – x-e
2. Draw the slope fields for the following first-order differential equations (derivatives with respect to t) (a) x′ = x^2 − 4 (b) x'=2t-x+1 1-22-12, x2 + t2-1 x, = (c)
Question 5. Find the following indefinite integrals: 1. fre'de 4. .Js 3.f x In x dx 6.[(x+5) Ževæ#5dx 2. f x sin 8x dx -5 (1 + In x) sin(x Inx) dx Sin2x sin x cos x dx 5. 7. 5 2x(x2 + 4)5dx 8. dx
6. For the function y = X1 X2 find the partial derivatives by using definition 11.1. (w) with respect to the Definition 11.1 The partial derivative of a function y = f(x1,x2,...,xn) with respe variable x; is af f(x1, ..., X; + Axi,...,xn) – f(x1,...,,.....) axi Ax0 ΔΧ The notations ay/ax, or f(x) or simply fare used interchangeably. Notice that in defining the partial derivative f(x) all other variables, x;, j i, are held constant As in the case of...
Find all the first and second order partial derivatives for each of the following functions.(i.e. find fx, fy, fxx, fyy, fxy, and fyx). No need to simplify. (b) f(x, y) = x In V x2 + y2.
sin x aln3' nena) xln tan1 (x - Vx2 +1) Q1/Find the Derivatives: 1) y 2) = y ln3 c logs x2 b lnx 3) y ae* + sin x aln3' nena) xln tan1 (x - Vx2 +1) Q1/Find the Derivatives: 1) y 2) = y ln3 c logs x2 b lnx 3) y ae* +
a. Use the Chain Rule to find the indicated partial derivatives. z = x4 + x2y, x = s + 2t − u, y = stu2; ∂z ∂s ∂z ∂t ∂z ∂u when s = 1, t = 2, u = 3 b. Use the Chain Rule to find the indicated partial derivatives. w = xy + yz + zx, x = r cos(θ), y = r sin(θ), z = rθ; ∂w ∂r ∂w ∂θ when r = 8, θ = pi/2 c. Use the...