Solveeit Logo
Login

Question

Question: How do you convert \(xy = 4\) into polar form?...

How do you convert xy=4xy = 4 into polar form?

Explanation

Solution

In converting the system to polar form we have to make use the formulas r2=x2+y2{r^2} = {x^2} + {y^2}, where x=rcosθx = r\cos \theta , andy=rsinθy = r\sin \theta , now substitute the values in the given equation, then make use of the trigonometric formula 2sinθcosθ=sin2θ2\sin \theta \cos \theta = \sin 2\theta , we will get the required polar form.

Complete step by step solution:
To convert an equation given rectangular form (in xx andyy) into in polar form (in the variables rrandθ\theta ) we will use the transformation relationships between the two sets of coordinates:
r2=x2+y2{r^2} = {x^2} + {y^2}, where x=rcosθx = r\cos \theta , andy=rsinθy = r\sin \theta .
Polar coordinates are a complementary system to Cartesian coordinates, which are located by moving across an x-axis and up and down the y-axis in a rectangular fashion. While Cartesian coordinates are written as(x,y)\left( {x,y} \right), polar coordinates are written as(r,θ)\left( {r,\theta } \right).
Now given equation is xy=4xy = 4,
Now using the relationship formulas,
x=rcosθx = r\cos \theta , andy=rsinθy = r\sin \theta ,
By substituting these in then given equation we get,
(rcosθ)(rsinθ)=4\Rightarrow \left( {r\cos \theta } \right)\left( {r\sin \theta } \right) = 4,
Now simplifying we get,
r2sinθcosθ=4\Rightarrow {r^2}\sin \theta \cos \theta = 4,
Now multiplying both sides with 2, we get,
r22sinθcosθ=4×2\Rightarrow {r^2}2\sin \theta \cos \theta = 4 \times 2,
Now using the trigonometric formula 2sinθcosθ=sin2θ2\sin \theta \cos \theta = \sin 2\theta we get,
r2sin2θ=8\Rightarrow {r^2}\sin 2\theta = 8,
So, the polar form is r2sin2θ=8{r^2}\sin 2\theta = 8.

**
\therefore The polar form of the given rectangular form xy=4xy = 4 will be equal to r2sin2θ=8{r^2}\sin 2\theta = 8.**

Note:
In polar coordinates, a point in the plane is determined by its distance rr from the origin and the angle θ\theta (in radians) between the line from the origin to the point and the x-axis. The polar coordinate system is a two-dimensional coordinate system in which each point on a plane is determined by a distance from a reference point and an angle from a reference direction.
In polar coordinates the origin is often called the pole. Because we aren't actually moving away from the origin/pole we know that. However, we can still rotate around the system by any angle we want and so the coordinates of the origin/pole are.