Display Title

Math Example--Coordinate Geometry--Slope Formula: Example 13

Math Example--Coordinate Geometry--Slope Formula: Example 13

Slope Formula Example 13

Topic

Slope Formula

Description

This example demonstrates the calculation of slope for a line connecting two points: (-10, 6) and (-1, -1) on a Cartesian plane. The line crosses quadrants II and III. Applying the slope formula, we find that the slope is (6 - (-1)) / (-10 - (-1)) = 7 / -9 = -7 / 9.

The slope formula is a crucial concept in coordinate geometry, helping us understand the steepness and direction of lines. This example shows how to handle points in different quadrants and with negative coordinates when calculating slope.

By providing multiple examples like this, students can see how the slope formula applies in various scenarios, including those involving different quadrants and negative coordinates. This helps reinforce the concept and improves their ability to calculate slopes accurately in more complex situations.

Teacher's Script: Let's examine this example closely. Notice that the points are in different quadrants and have negative coordinates. When calculating the slope, we need to be careful with the signs. The resulting negative slope (-7/9) tells us that the line is decreasing as we move from left to right. For every 9 units we move horizontally to the right, the line falls by 7 units. Can you visualize how this line would look on the graph? How does this slope compare to some of the others we've seen?

For a complete collection of math examples related to Slope Formula click on this link: Math Examples: Slope Formula Collection.

Common Core Standards CCSS.MATH.CONTENT.8.EE.B.5, CCSS.MATH.CONTENT.7.RP.A.2.D
Grade Range 6 - 8
Curriculum Nodes Algebra
    • Linear Functions and Equations
        • Slope
Copyright Year 2013
Keywords slope, rise over run, slope formula