Name DateWORKSHEET 4.16: USING THE DISTANCE FORMULA TO FIND
THE DISTANCE BETWEEN TWO POINTS
-------------------------------------------------------------------------------------To find the distance between two points, follow the steps below:- Use the distance formula:d=
√
(x 2 −x 1 )^2 +(y 2 −y 1 )^2- Replace each variable with the correctx-ory-coordinate.
- Solve using the order of operations.
1
1
EXAMPLE
Find the distance between (1, 4) and (2, 3). In this problem, (1, 4) represents the first ordered
pair(x 1 ,y 1 )and (2, 3) represents the second ordered pair(x 2 ,y 2 ).d=√
(2−1)^2 +(3−4)^2
d=√
(1)^2 +(−1)^2
d=√
1 + 1
d=√
2 ≈ 1. 414
Rounded to the nearest hundredth, the distance between (1, 4) and (2, 3) is about 1.41.DIRECTIONS: Use the distance formula to find the distance between each pair of points.
Round to the nearest hundredth if necessary.- (2, 0), (7, 2) 2. (6, 1), (8, 5)
- (3,−1), (0, 4) 4.(5, 4), (8, 2)
5.(−4,−5), (−2,−3) 6.(−2,−3), (6, 3)
7.(2,−7), (3,−3) 8.(−2, 3), (−1, 5)
CHALLENGE:Sammie said that the distance formula cannot be used to find
the distance between two points on a vertical line. Instead, she said that
you can subtract they-coordinates of two points on the vertical line. For
example, (0,3) and (0,10) are 7 units apart because 10− 3 =7. Do you
agree with her? Explain your answer.169Copyright
©
2011 by Judith A. Muschla, Gary Robert Muschla, and Erin Muschla. All rights reserved.