What is the distance between the origin and the midpoint of #(1, 2)# and #(-3, 6)#?

1 Answer
Feb 25, 2017

#sqrt(17)# or #4.123# rounded to the nearest thousandth.

Explanation:

First, we use this formula to find the midpoint of these two points:

#M = ((color(red)(x_1) + color(blue)(x_2))/2 , (color(red)(y_1) + color(blue)(y_2))/2)#

Where #M# is the midpoint and the given points are:

#color(red)((x_1, y_1))# and #color(blue)((x_2, y_2))#

Substituting the values from the points in the problem gives:

#M = ((color(red)(1) + color(blue)(-3))/2 , (color(red)(2) + color(blue)(6))/2) = (-2/2 , 8/2) = (-1, 4)#

Next, we can use the distance formula to find the distance between the origin, which is (0, 0) and (-1, 4). The formula for calculating the distance between two points is:

#d = sqrt((color(red)(x_2) - color(blue)(x_1))^2 + (color(red)(y_2) - color(blue)(y_1))^2)#

Substituting the values from the points in the problem gives:

#d = sqrt((color(red)(-1) - color(blue)(0))^2 + (color(red)(4) - color(blue)(0))^2) = sqrt((-1)^2 + 4^2) = sqrt(1 + 16) = #

#sqrt(17)# or #4.123# rounded to the nearest thousandth.