This math topic focuses on calculating the run of a line, given the slope formula (slope = rise/run) with integers. It forms part of a broader introduction to slope. Each question requires determining how far a line extends horizontally based on the slope and rise given. This practice allows for mastery in handling linear equations and understanding how changes in rise and slope affect the horizontal run of a line, vital for understanding linear relationships and graphing linear equations.
Work on practice problems directly here, or download the printable pdf worksheet to practice offline.
morePractice:
Run of a Line from Slope and Rise - Integer
Complete these online problems with 80% or 4 correct answers in a row. Results are immediate.
Calculate the run (how far over) of the line given that slope is rise/run
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Run of a Line from Slope and Rise - Integer Worksheet
| Math worksheet on 'Run of a Line from Slope and Rise - Integer (Level 2)'. Part of a broader unit on 'Slope - Intro' Learn online: app.mobius.academy/math/units/slope_intro/ |
| Calculate the run (how far over) of the line given that slope is rise/run |
| -2 |
| -2.2 |
| -0.4 |
| -1 |
| -4 |
| -2.6 |
| Calculate the run (how far over) of the line given that slope is rise/run |
| -1.2 |
| -0.33 |
| -2.1 |
| -3 |
| -0.6 |
| -1.5 |
| Calculate the run (how far over) of the line given that slope is rise/run |
| 1.5 |
| 0.9 |
| 1 |
| 0.7 |
| 0.2 |
| 1.9 |
| Calculate the run (how far over) of the line given that slope is rise/run |
| 0 |
| -3.4 |
| -1.6 |
| -1.4 |
| -0.8 |
| -2 |
| Calculate the run (how far over) of the line given that slope is rise/run |
| -1.1 |
| -1.9 |
| -1.2 |
| -1.8 |
| -1.5 |
| -1 |
| Calculate the run (how far over) of the line given that slope is rise/run |
| -0.8 |
| -0.4 |
| -1.2 |
| -1.7 |
| 0 |
| -1 |
| Calculate the run (how far over) of the line given that slope is rise/run |
| -3.9 |
| -1.8 |
| -0.6 |
| -3 |
| -2.1 |
| -5.1 |