Slope! The steepness of a line is called _____________! Circle the line with the biggest slope… The letter we use for slope is a lowercase ____! Why?! Because it comes from the French word monter which means to climb or to rise. FUN FACT! When given the graph of a line, we need to know a simple definition of slope: m= ** Slope is the ratio of a line’s ___________________ change to its __________________________ change. That’s what we mean by “rise over run”! How to find slope when given the graph of a line: 1) Mark some points on the line. 2) Start from the ______________ 3) Find the “rise” (or “fall”) π= Up is ____________________ Down is ____________________ 4) Find the “run” (we will always “run” right) Later in the lesson we will be using a formula to find slope. We will often get fractions that need to be reduced. The images below show four attempts at finding the slope of the line above. Can they all be correct…? 1 2 2 4 → 3 6 → 4 8 → © Eddie McCarthy, 2017. Graphs made with Desmos Let’s find the slope of the following lines! π= π= π= π= π= π= There are four types of slopes… As we travel left to right, the graph goes _______. As we travel left to right, the graph goes _______. Type of slope: Type of slope: __________________ __________________ This graph is not steep at all! This graph is so steep we can't even call it a slope! Type of slope: Type of slope: __________________ __________________ © Eddie McCarthy, 2017. Graphs made with Desmos Sometimes we are not given a graph, but instead we are given 2 points on the line. When this is the case, we must implement another definition of slope. The slope of the line containing two points (π₯1 , π¦1 ) and (π₯2 , π¦2 ) can be found using the formula below: Or in other words… π= π= πΆβππππ ππ πΆβππππ ππ Let’s find the slope of the line containing the points (−4, 1) and (2, 3). The images below explain what we just did… 2 2 − (−4) = 6 3−1=2 6 → 1 3 Before we start finding slopes, let’s practice rewriting some “weird” fractions… −3 9 4 −7 4 = = = 10 1 −8 = 4 = 1 0 12 = −7 1 0 −2 = = −2 = −3 12 0 = −1 −8 = −2 0 = Let’s find the slope of the lines containing the following points. (4, −1) & (6, 2) (3, −2) & (4, 3) (0, 4) & (−3, 12) (−1, 7) & (−3, 1) (3, 7) & (−11, 7) (−5, 4) & (−5, 10) © Eddie McCarthy, 2017. Graphs made with Desmos
