Find all polar coordinates of point P where P = ordered pair 6 comma negative pi divided by 5.

Question

asked Feb 18, 2020 44.7k views

2 Answers

Ryan Stein · Answer 1 · 2020-02-18T21:32:28+0000

Answer:

P(6,-π/6) = (6, -π/6 + 2nπ) and P(-6,-π/6) = (-6, -π/6 + (2n+1)π)

Explanation:

We need to find all polar coordinates of

$P = (6,(-\pi )/(6))$

The polar coordinates of any point can be reresented by (r,Ф)

where

(r,Ф) = (r, Ф+2nπ) where n is any integer and r is positive

and

(r,Ф) = (-r, Ф+(2n+1)π) where n is any integer and r is negative.

So, in the question given, r = 6 and Ф = -π/6

So, Polar coordinates will be:

P(6,-π/6) = (6, -π/6 + 2nπ) where where n is any integer and r is positive

and

P(-6,-π/6) = (-6, -π/6 + (2n+1)π) where n is any integer and r is negative.

Marc Ziss · Answer 2 · 2020-02-21T17:15:55+0000

Answer:

All polar coordinates of point P are
$(6,-(\pi)/(5)+2n\pi)$ and
$(-6,-(\pi)/(5)+(2n+1)\pi)$ , where n is an integer.

Explanation:

The given point is

$P=(6,-(\pi)/(5))$

If a point is
$P=(r,\theta)$ , then all polar coordinates of point P are defined as

$(r,\theta)=(r,\theta+2n\pi)$

$(r,\theta)=(-r,\theta-(2n+1)\pi)$

where n is an integer.

In the given point
r=6 and
$\theta=-(\pi)/(5)$ . So all polar coordinates of point P are defined as

$(6,-(\pi)/(5))=(6,-(\pi)/(5)+2n\pi)$

$(6,-(\pi)/(5))=(-6,-(\pi)/(5)+(2n+1)\pi)$

Therefore all polar coordinates of point P are
$(6,-(\pi)/(5)+2n\pi)$ and
$(-6,-(\pi)/(5)+(2n+1)\pi)$ , where n is an integer.