What is the distance between #(-6 , (-5 pi)/12 )# and #(1 , pi )#?

1 Answer
Bdub
Dec 1, 2016

# d~~5.82#

Explanation:

Each point on a polar plane is represented by the ordered pair #(r,theta)#.

So lets call the coordinates of #P_1# as #(r_1,theta_1)# and coordinates of #P_2# as #(r_2,theta_2)# . To find the distance between two points on a polar plane use the formula #d=sqrt((r_1) ^2+(r_2)^2-2r_1r_2cos(theta_2-theta_1))#

Thererfore using the points #(-6,(-5pi)/12)# and #(1,pi)#, and the formula

#d=sqrt((r_1) ^2+(r_2)^2-2r_1r_2cos(theta_2-theta_1))#

we have

#d=sqrt((-6)^2+(1)^2-2*-6*1cos(pi-(-5pi)/12))#

#:. d~~5.82#

Related questions
See all questions in Polar Coordinates
Impact of this question
2019 views around the world
You can reuse this answer
Creative Commons License