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Find the slope of the line passing through the points (-6-9) and (9,-9)

Find the slope of the line passing through the points (4,1) and (4,-5).

User Koropok
by
2.6k points

2 Answers

16 votes
16 votes

Hello there! We're provided with two problems in one, but we can solve each of them by using the slope formula, which is this:


\stackrel\diamond{\boxed{\boxed{\bold{(y_2-y_1)/(x_2-x_1)}}}}

In this formula,


  • \sf{y_2=-9}

  • \sf{y_1=-9}

  • \sf{x_2=9}

  • \sf{x-1=-6}

Plug in the values:


  • \sf{(-9-(-9))/(9-(-6)) =(-9+9)/(9+6) =(0)/(15) =\boxed{0}}

So the slope is 0.

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The second problem can be solved the same way!

Once again, we'll use the formula


\stackrel\diamond{\boxed{\boxed{\bold{(y_2-y_1)/(x_2-x_1)}}}}

only this time, the values are different:


  • \sf{y_2=-5}

  • \sf{y_1=1}

  • \sf{x_2=4}

  • \sf{x_1=4}

Plug in the values:


  • \sf{(-5-1)/(4-4) =(-6)/(0) =\boxed{unde fined}

So the slope's undefined. I hope this helps, feel free to comment if you have any queries regarding the slope formula! ^^

User MelBurslan
by
3.0k points
12 votes
12 votes

9514 1404 393

Answer:

  • zero
  • undefined

Explanation:

The slope formula is useful for this.

m = (y2 -y1)/(x2 -x1)

__

First line:

m = (-9 -(-9))/(9 -(-6)) = 0/15 = 0

The slope of the first line is zero.

__

Second line:

m = (-5-1)/(4 -4) = -6/0 = undefined

The slope of the second line is undefined.

_____

It is always a good idea to apply a little critical thinking to the given information. Here, you observe that the y-coordinates of the first pair of points are the same. That means this is a horizontal line, with a slope of 0.

Similarly, you observe that the x-coordinates of the second pair of points are the same. That means this is a vertical line, with undefined slope.

User Brent Eicher
by
2.8k points