# All Educational Materials for ENG235H1 at University of Toronto St. George (UTSG)

- About UTSG

## ENG235H1 Study Guide - Final Guide: Daniel Clowes, Christopher Sorrentino, David Boring

3 Page

29 Apr 2013

Creates a story recovery of older narrative forms 3 act play father"s comic. David"s history and his father"s history. Clowes speaks to the making of a

View Document## Final Notes for ENG235

8 Page

8 Feb 2012

Bj likes n. as time goes by he forgets what she looks like. Panel structured as subway cart & poles act as gutter. Bj is trying to familiarize & scramb

View Document## Trending

Frequently-seen exam questions from 2014 - 2018.

UTSGFall

## MAT135H1 Lecture Notes - Lecture 1: Differential Calculus

2 Page

22 Sep 2020

Intro to calculus: what is calculus, two simple geometric problems: I: given a function y f x. The problem of tangents [differential calculus: what is

View DocumentUTSGFall

## MAT135H1 Lecture 1: 4.1 Increasing and Decreasing Functions

2 Page

22 Sep 2020

2 f x is decreasing (falls) on an interval if, x for any value of 1 x< , determine the intervals where f x is increasing and decreasing increasing when

View DocumentUTSGFall

## MAT135H1 Lecture Notes - Lecture 2: Maxima And Minima

1 Page

22 Sep 2020

4. 2 critical points, local maxima, and local minima: recall from chapter 3, when we set f x = and solve for x", we determine critical points which cou

View DocumentUTSGFall

## MAT135H1 Lecture Notes - Lecture 3: Inflection, If And Only If

3 Page

22 Sep 2020

4. 4 concavity and points of inflection: a function, a function f x is concave up on an interval if, the graph of the function is above the tangent on

View DocumentUTSGFall

## MAT135H1 Lecture 10: 3.4 Optimization in Economics and Science (3)

2 Page

22 Sep 2020

In business, optimization involves maximizing profits and minimizing costs. Revenue = (price per unit) x (number of units sold) Example 1: a commuter t

View DocumentUTSGFall

## MAT135H1 Lecture 9: 3.3 Optimization Problems (3)

2 Page

22 Sep 2020

3. 3 optimization problems: optimization is a procedure used in many fields to determine the best possible solution given a set of restrictions. [ex. d

View DocumentUTSGFall

## MAT135H1 Lecture 8: 3.2 Max and Min Values on an Interval

3 Page

22 Sep 2020

For f x on an interval [a, b: find the derivative, find all points in the interval [a, b] where, evaluate, compare the value is step 3: x f f. 0 x = f

View DocumentUTSGFall

## MAT135H1 Lecture Notes - Lecture 6: Function Composition

2 Page

22 Sep 2020

Composite function: given two functions f x and ( )g x , a composite function is defined as: f glad of gcfcx. Example 1: given f x x= and g x x= + , de

View DocumentUTSGFall

## MAT135H1 Lecture Notes - Lecture 3: If And Only If

3 Page

22 Sep 2020

2. 2 derivatives of polynomial functions: constant function rule: k= , where k" is a constant, then _________________________ f"cx o. Example 1: find t

View Document