MAT136H1 Lecture 2: MAT136-LEC02-Sections 6.1~6.3

F. irnorbounds suppose f is either increasing or decreasing over. I left sum right svml bf fit dt ffctldtlclwpperbomd lowe. irbound1. Lflti y fca l f b fctill. tl ot comparison of integral a b m e f x e m on f g are continuous functions on a closed interval. If m b a ef fcxldx emlb. cn f mdx a b. Iab hit t. io at iot a tn b take average fdfuyl. e. tt t. tz. n. tn iniflt. lt t fhn f cts on t i t. fltilott. ntfltnlo ttrightkiemannsumb ale. tn. In b_d we have a new so average of the function quantity over interval a. bg. Let y be the line joining two points fly sin x off cpvg value a flail f bi flb la a bib. F is an antiderivative of f is also an antiderivative of f c_constant is. F x fly suppose f is an antiderivative of f. Fix decreasing down rateof slows if increasingly i 4 concaveup.