Distance Between 2 Points

distance by pythagoras

When we know the horizontal and vertical distances between two points we can calculate the straight line distance like this:

distance = √ a² + b²

graph 2 points

Imagine you know the location of two points (A and B) like here.

What is the distance between them?

graph 2 points

We can run lines down from A, and along from B, to make a Right Angled Triangle.

And with a little help from Pythagoras we know that:

a² + b² = c²

graph 2 points

Now label the coordinates of points A and B.

x_A means the x-coordinate of point A
y_A means the y-coordinate of point A

The horizontal distance a is (x_A − x_B)

The vertical distance b is (y_A − y_B)

Now we can solve for c (the distance between the points):

Start with:c² = a² + b²

Put in the calculations for a and b:c² = (x_A − x_B)² + (y_A − y_B)²

Square root of both sides:c = √(x_A − x_B)² + (y_A − y_B)²

Done!

Examples

graph 2 points

Fill in the values: c = √(9 − 3)² + (7 − 2)²

Calculate: c = √6² + 5²
c = √36 + 25
c = √61
c = 7.8102...

It doesn't matter what order the points are in, because squaring removes any negatives:

graph 2 points

Fill in the values: c = √(3 − 9)² + (2 − 7)²

Calculate: c = √(−6)² + (−5)²
c = √36 + 25
c = √61
c = 7.8102...

And here is another example with some negative coordinates ... it all still works:

graph 2 points

Fill in the values: c = √(−3 − 7)² + (5 − (−1))²

Calculate: c = √(−10)² + 6²
c = √100 + 36
c = √136
c = 11.66...

(Note √136 can be further simplified to 2√34 if you want)

Drag the points:

images/dist2pts.js

It works perfectly well in 3 (or more!) dimensions.

Square the difference for each axis, then sum them up and take the square root:

Distance = √(x_A − x_B)² + (y_A − y_B)² + (z_A − z_B)²

distance between (9,2,7) and (4,8,10) in 3d

= √(8−3)² + (2−5)² + (6−7)²
= √5² + (−3)² + (−1)²
= √25 + 9 + 1
= √35

Which is about 5.9