What is the slope of the line passing through the following points: (-9,1) , (7,3)(−9,1),(7,3)?
2 Answers
Explanation:
"to calculate the slope m use the "color(blue)"gradient formula"to calculate the slope m use the gradient formula
•color(white)(x)m=(y_2-y_1)/(x_2-x_1)∙xm=y2−y1x2−x1
"let "(x_1,y_1)=(-9,1)" and "(x_2,y_2)=(7,3)let (x1,y1)=(−9,1) and (x2,y2)=(7,3)
rArrm=(3-1)/(7-(-9))=2/16=1/8⇒m=3−17−(−9)=216=18
The slope of the line segment AB is
Explanation:
Slope is basically how steep a line is.
A slope is often denoted by the variable
A slope is Positive when the line is increasing when viewed from the left.
A slope is Negative when the line is decreasing when viewed from the left.
A Zero Slope means the line is neither increasing nor decreasing when viewed from the left.
A Horizontal Line is an example of having a Zero Slope.
An undefined slope is a unique situation:
Consider a Vertical Line.
A vertical line is neither moving to the left nor to the right.
Hence, the slope for a vertical line is undefined.
To find the SLOPE of the line passing through the Points
Join the points A and B and obtain a line segment AB.
If you observe the steepness of the line, you see that there is a shallow positive slope.
Find out how many units does it go up (Rise) ?
Next, find out how many units does it go side-to-side (Run)?
Observe in the sketch above, it goes up by 2 units.
Hence,
It moves to the right
Hence,
The next step shows these calculations in on a graph (image).
Slope (m) can be found by using the ratio
Hence,
Hence, the slope of the line segment AB is
