Find the first and second derivatives of the function. g(x) = -2x3 + 10x2 + 7x - 70 g'(x) = g"(x) = Type here to search o
Find the first and second derivatives of the function. g(x) = -2x3 + 10x2 + 7x - 70 g'(x) = -61? + 20u+7 9"(x) = –12x + 20 Type here to search o
3x+2 f(x) =( :) (x-> +1) Your problem: using the rules of differentiation, find the derivatives of the collowing: f)-(3442) fool(3x+2) (-5x + x + 1) - 2 1 =(-15x 10x" + (-2x = 2) =>15x410x5 - 2x = = 3x -3x- 27 (X)(3+0)-(3x+2)(1) x² g'=(x) =F12x15x4_2 = -5x6 xb * please check my work, if wrong, please write out correct solation! Chain Rule: When functions are composed, to take the derivative involves both the outside function and the inside...
exercise #1 Find the derivatives of f(x) g(x) = sin(t) exz FLX) = G(X) = cs fbxned with Camsex
(1 point) (a) Find as a function of t for the given parametric equations. dx x t-ps у 4 - 31 dy dx = (b) Find dy as a function of t for the given parametric equations. dx X 5 - 4 -1 у dy dx =
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
Dose 1.50) dx =7 (862) dx=15 (50) dx=9. 1'e() dv=3 14F(x)-2 g(x)) dx = is an odd function and is an even function Evaluate to (103dx = $(x) dx = 59(2) de T I Arial 3 (12pt] · TE E 5.00 1. P Question Completion Status: > A Moving to another question will save this response. Question 9 a , it Use Second Fundamental Theorem to find a Jo 0 ਨੰ: it = ਦੈਤ 0 , it = ਰੈੱਡ ©...
g(x)dx = 5, find the following Problem 4 (12 points). Given ( g(x)dx = 10 and integrals: (a) [(39(x) + 5x)dx (b) ["o() der
(1 point) Let [ f(z)dx=-13, 5° f(x) dx = 3, $*g(x) dx = 6, §*9(a) dx = 1, J2 Use these values to evaluate the given definite integrals. a) ["{$(2) + 9()) dx = 6 .) – g(x)) dx = * (31(2) + 29(2) de = (af(x) + g()) dc = 0. d) Find the value a such that a=
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