(3 points) Letſ be defined by 4x2 - 2m, XS-1 (a) Find (in terms of m)...
1. (25 points) Evaluate the limit, if it exists. lim (x3 + 3x² 3 1+ 4x2 + 3.14) 2+1 (b) lim 29- - 9 x² - x - 20 (c) lim 1- -5 5
3. (10 marks) Find the limit and prove it using the definition. 4x2 + 13 lim x+ x2 + x + 1 4. (10 marks) Find the limit and prove it using the definition. 4x3 + 13 lim *40x2 + x + 1
3. (10 marks) Find the limit and prove it using the definition. 4x2 + 13 lim x2 + x +1 X-700
2. Find the limits of the following functions if they exist. Show all necessary work. If the limit is co or -00, then state this rather than that it does not exist: (2 points each) a. lim x+3 V6x-2-4 x-3 b. lim arctan(3x) x sin(x) 3. Find the average value of the function f(x) = 4x2 + 8x -1 on (-1, 3).
1. Find the first and second partial derivatives: A. z=f(x,y) = x2y3 - 4x2 + x2y-20 B. z=f(x,y) = x+ y - 4x2 + x2y-20 2. Find w w w x2 - 4x-z-5xw + 6xyz2 + wx - wz+4 = 0 Given the surface F(x,y) = 3x2 - y2 + z2 = 0 3. Find an equation of the plane tangent to the surface at the point (-1,2,1) a. Find the gradient VF(x,y) b. Find an equation of the plane...
3. The sequence (Fn) of Fibonacci numbers is defined by the recursive relation Fn+2 Fn+1+ F for all n E N and with Fi = F2= 1. to find a recursive relation for the sequence of ratios (a) Use the recursive relation for (F) Fn+ Fn an Hint: Divide by Fn+1 N (b) Show by induction that an 1 for all n (c) Given that the limit l = lim,0 an exists (so you do not need to prove that...
1. Suppose the a function g(x) is defined according to the formula f(c) 3(x + 2) +2 for – 3 <x< -2 (x+2)+1 for-2<x< -1 (+2)+1 for - 1<x<1 2 for r=1 for > 1 y 3+ 21 11 1 -2 1 2 (a) Compute f(a) for each of a = -2, -1,0,1,2. (b) Determine lim f(x) and lim f(x) for each of a = -2,-1,0,1,2. (c) Determine lim f(a) for each of a = -2,-1,0,1,2. If the limit fails...
(a) Find the slope m of the tangent to the curve y = 2 + 4x2 − 2x3 at the point where x = a. m = (b) Find equations of the tangent lines at the points (1, 4) and (2, 2). y(x) = (at the point (1, 4)) y(x) = (at the point (2, 2)) (c) Graph the curve and both tangents on a common screen. say and the sose m of the target to the survey * 2...
nc = 13 1. Find the charge in the volume defined by 1<r<2m, in the spherical coordinates if pv = (No cos?0)/r* (uC/mº). 2. Given that D = 7r2 a, + Nc sin 0 ag in spherical coordinates, find the charge density. 3. Find the work done in moving a point charge Q = - 20 uC from (4,2,0)m to the origin in the field E = (x/2 + 2y) ax + Nc xay (V/m). 1
20+21 20. 1 points StitzPreCalc3 1.4.022e Let f(x) 4x2+ 4x 3. Find and simplify the following. f(a + 3) f(a + 3) Additional Materials Reading 21. points StitzPreCalc3 14.022. Let f(x) = 3x2 + 3x-4. Find and simplify the following. fa) + f(2) f(a) + f( 2) = Additional Materials LReacing