QuestionUse the given conditions to write an equation for the line in point-slope form. 12) Passing through and
Studdy Solution
STEP 1
What is this asking?
We need to find the equation of a line that goes through two specific points, and we want that equation in point-slope form.
Watch out!
Don't mix up the and coordinates!
Also, remember point-slope form is , not .
STEP 2
1. Find the slope.
2. Write the equation.
STEP 3
Alright, let's **start** by finding the slope!
The slope, which we usually call , tells us how steep our line is.
The formula for the slope between two points and is:
STEP 4
Our two points are and .
Let's **label** these points to avoid confusion!
We'll call our and our .
So, , , , and .
STEP 5
Now, let's **plug** these values into our slope formula:
STEP 6
**Calculate** the differences:
STEP 7
**Simplify** the fraction by dividing both numerator and denominator by : So, our **slope** is !
STEP 8
Now that we have our slope, we can use the **point-slope form** of a linear equation, which is:
STEP 9
We already have our slope and we can use either of our points for .
Let's use , so and .
STEP 10
**Substitute** these values into the point-slope form: And there we have it!
STEP 11
The equation of the line in point-slope form passing through and is .
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