MAT136H1 Lecture Notes - Lecture 2: Riemann Sum

In the following problems, we are the cyclic groups (Z_n, t) to investigate rules for integer divisibility. In what follows, we let m = a_k 10^k + a_k-1 10^k-1 + ... + a_2 10^2 + a_1 middot 10 + a_infinity be a positive integer written in decimal notation, so each a_j is a digit {0, 1, 2, 3, 4, 5, 6, 7, 8, 9}. Devise a rule for divisibility by n = 5 Devise a rule for divisibility by n = 4 Devise a rule for divisibility by n = 11

Recall that if fis integrable on [a, b], then the Definite Integral of f from a to b is given by f(x)dx = lim f(xǐJAxk for any partition of [a, b] and any pointsx. To simplify these calculations, we use equally spaced grid points and right Riemann sums. That is, for each value of n, wlet AxkAand = a + kax, for k = 1,2, , n. Then as n → oo and Δ→ 0, k=1 In exercises #1-5, use the definition of the Definite Integral and right Riemann sums to evaluate the following definite integrals. Check your solutions using the Fundamental Theorem of Calculus. (1) x3)dx (2) (2x -4)dx (3) x?dx (4) (x3)dx (5) (2x2-1)dx The following Sums will be of help. Forn a positive integer and c a real number: c=cn k 1 k" = n(n+1)(2n + 1) nn 1)2

2-6 Use Stokes' Theorem to evaluate is curl F dS. 2. F(x, y, z) = x2 sin z i + y 2 j + xy k, y that lies S is the part of the paraboloid z1 above the xy-plane, oriented upward 3, F(x, y, z) ze i + x cos y j + xz sin y k, S is the hemisphere x2 + y2 + z2 = 16, y the direction of the positive y-axis 0, oriented in 4. F(x, y, z) tan-i (xyz?) i + x2yj + x":-k, S is the cone x-v/y2 + Z2, 0 direction of the positive x-axis 2, oriented in the 5, F(x, y, z) = xyz i + xy j + x2yz k, S consists of the top and the four sides (but not the bottom) of the cube with vertices (+1, +1, t1), oriented outward 6. F(x, y, z) = e"i + ex: j + x": k, S is the half of the ellipsoid 4x2 y +4z2 4 that lies to the right of the xz-plane, oriented in the direction of the positive y-axis 7-10 Use Stokes' Theorem to evaluate c F dr. In each case is oriented counterclockwise as viewed from above. 7. F(x, y, z) = (x + y*) i + (y + z?) j + (z + x*) k, C is the triangle with vertices (1,00 0