Graphing a line given point and slope | Linear equations & graphs | Algebra I | Khan Academy
Summary
TLDRThe instructor guides students through the process of graphing a line with a slope of negative two that passes through the point (4, -3). The lesson emphasizes understanding the slope by demonstrating how the line can be graphed by identifying a second point based on the slope. The instructor shows two methods: increasing x by one while decreasing y by two, or decreasing x by one while increasing y by two. Both approaches yield the same line, reinforcing the concept of slope and how it affects the line's direction.
Takeaways
- đ The task is to graph a line with a slope of negative two, containing the point (4, -3).
- đ The first step is to plot the point (4, -3) on the graph by moving 4 units to the right and 3 units down from the origin.
- đ To find another point on the line, we use the slope of negative two, which means as x increases by 1, y decreases by 2.
- đ Using the slope, another point can be found by moving from (4, -3) to (5, -5).
- đ Graphing two points, like (4, -3) and (5, -5), is sufficient to define the entire line.
- đ An alternative method is to move in the opposite direction: if x decreases by 1, y increases by 2, due to the slope of negative two.
- đĄ Slope is the ratio of change in y to change in x (change in y / change in x).
- âïž Regardless of direction (positive or negative changes), the same line is created.
- â The key to graphing the line is understanding how to apply the slope from a known point to find another.
- đ This process demonstrates two ways to find additional points for graphing using a known slope and point.
Q & A
What is the first step in graphing a line with a slope of -2 through the point (4, -3)?
-The first step is to locate the point (4, -3) on the graph. This is done by moving 4 units to the right and 3 units down from the origin.
How does the slope of -2 affect the movement of points on the graph?
-A slope of -2 means that for every increase of 1 in the x-direction, the y-coordinate decreases by 2.
What is the second point on the line if the slope is -2 and one point is (4, -3)?
-Starting from (4, -3), if x increases by 1 to 5, y decreases by 2, giving the point (5, -5) as another point on the line.
Can you move in the opposite direction to plot the line? If so, how?
-Yes, you can move in the opposite direction. If x decreases by 1, then y will increase by 2. For example, moving left from (4, -3) to (3, -1) gives another point on the line.
What does the slope of a line represent in terms of changes in x and y?
-The slope represents the ratio of the change in y to the change in x. A slope of -2 means that for every 1 unit increase in x, y decreases by 2 units.
Why is finding a second point necessary to graph a line?
-A line is determined by two points. Once two points are found, the line connecting them can be drawn, representing all possible points on that line.
What happens to y when x increases by 1 for a slope of -2?
-When x increases by 1, y decreases by 2, following the slope of -2.
How would you describe a slope of -2 in terms of rise over run?
-A slope of -2 can be described as a rise of -2 (downward) for every run of 1 (rightward).
What alternative method can be used to graph the line if moving right isn't possible?
-If space doesn't allow moving right, you can move left by decreasing x by 1 and increasing y by 2, which still follows the slope of -2.
Is the line the same whether you increase x or decrease x when plotting points based on the slope?
-Yes, the line remains the same whether you move to the right or left. The relationship between x and y dictated by the slope ensures the same line is graphed.
Outlines
đ How to Graph a Line with a Given Slope and Point
The instructor demonstrates how to graph a line with a slope of -2 that passes through the point (4, -3) using a graphing tool on Khan Academy. He encourages viewers to attempt graphing on their own before following along. The process involves identifying a second point on the line by understanding the slope: as the x-value increases by 1, the y-value decreases by 2. The instructor shows how to use this information to plot the line and provides alternative approaches, such as going in the opposite direction, where a decrease in x by 1 results in an increase in y by 2. This flexibility helps when there isn't enough space to graph in the original direction.
Mindmap
Keywords
đĄGraph
đĄSlope
đĄPoint
đĄCoordinate Plane
đĄChange in x
đĄChange in y
đĄNegative Slope
đĄPlotting Points
đĄOrigin
đĄWidget
Highlights
We are tasked with graphing a line that has a slope of negative two and contains the point (4, -3).
The graphing process begins by identifying the point (4, -3), which can be easily plotted by moving 4 units to the right and 3 units down from the origin.
The next step is to find a second point on the line, which can be achieved using the slope of negative two.
Slope of negative two indicates that as x increases by 1, y decreases by 2, helping to plot the next point.
Starting from the point (4, -3), when x increases to 5, y decreases from -3 to -5, giving us the point (5, -5).
Two points are sufficient to graph a line, so the line can now be drawn using these two points.
The graphing tool or widget can automatically draw the line once two points are identified.
Another approach is to consider a negative change in x, where if x decreases by 1, y increases by 2.
In this approach, if x decreases from 4 to 3, y will increase from -3 to -1, providing another point (3, -1).
The slope is defined as the change in y over the change in x, helping to understand how to plot points consistently.
Both methodsâeither increasing x and decreasing y, or decreasing x and increasing yâresult in the same line.
Graphing the line involves understanding that slopes guide the relationship between x and y coordinates.
This method can be applied without any graphing tools, using just paper and pencil, by calculating slope and plotting points.
The process reinforces the understanding of how slope affects the direction and steepness of a line.
The key takeaway is that a negative slope means that as x increases, y decreases, and vice versa.
Transcripts
- [Instructor] We are told graph a line
with the slope of negative two,
that contains the point four comma negative three.
And we have our little Khan Academy graphing widget
right over here, where we just have to find
two points on that line,
and then that will graph the line for us.
So pause this video and even if you don't have access
to the widget right now,
although it's all available on Khan Academy,
at least think about how you would approach this.
And if you have paper and pencil handy,
I encourage you to try to graph this line on your own,
before I work through it with this little widget.
All right, now let's do it together.
So we do know that it contains
point four comma negative three.
So that's I guess you could say the easy part,
we just have to find the point
x is four y is negative three.
So it's from the origin four to the right, three down.
But then we have to figure out where could another point be?
Because if we can figure out another point,
then we would have graphed the line.
And the clue here is that they say a slope of negative two.
So one way to think about it is, we can start at the point
that we know is on the line, and a slope of negative two
tells us that as x increases by one, y goes down by two.
The change in why would be negative two.
And so this could be another point on that line.
So I could graph it like this is x goes up by one,
as x goes from four to five, y will go,
or y will change by negative two.
So why we'll go from negative three to negative five.
So this will be done, we have just graphed that line.
Now another way that you could do it,
because sometimes you might not have space on the paper,
or on the widget to be able to go to the right
for x to increase, is to go the other way.
If you have a slope of negative two,
another way to think about it is, if x goes down by one,
if x goes down by one, then y goes up by two.
'Cause remember, slope is change of y over change in x.
So you could either say you have a positive change
in y of two when x has a negative one change,
or you could think of it when x is a positive one change,
y has a negative two change.
But either way notice, you got the same line.
Notice this line is the same thing,
as if we did the first way is we had x going up by one
and y going down by two,
it's the exact same line.
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