For the following problem we want to find a linear equation that passes through the following two points: (-5,8), (7,-9). The general equation for a line is: y = mx + b a Create two symbolic variables, m and b. Looking at the general equation above, we can subtract y from both sides to get the following expression: 0= mx + b-y. Now that our equation is in this format, we can create two equations, eqn1 and eqn2 using the two (x,y) coordinates given above. Use the solve function to solve the system of equations. Call these solutions sol m and sol b. Plot the solution of the line that passes through the two points (create the line using sol m and sol b and define a new symbolic variable, x). Label the axes and give the plot a title. Change the line to a magenta dash-dotted line and limit both x and y axes from - 10 to 10

For the following problem we want to find a linear equation that passes through the following two points: (-5,8), (7,-9). The general equation for a line is: y = mx + b a Create two symbolic variables, m and b. Looking at the general equation above, we can subtract y from both sides to get the following expression: 0= mx + b-y. Now that our equation is in this format, we can create two equations, eqn1 and eqn2 using the two (x,y) coordinates given above. Use the solve function to solve the system of equations. Call these solutions sol m and sol b. Plot the solution of the line that passes through the two points (create the line using sol m and sol b and define a new symbolic variable, x). Label the axes and give the plot a title. Change the line to a magenta dash-dotted line and limit both x and y axes from - 10 to 10

Database System Concepts

7th Edition

ISBN:9780078022159

Author:Abraham Silberschatz Professor, Henry F. Korth, S. Sudarshan

Publisher:Abraham Silberschatz Professor, Henry F. Korth, S. Sudarshan

Chapter1: Introduction

Section: Chapter Questions

Problem 1PE

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