Therefore, rectangular coordinates (x, y) = (6.06, 3.5)Ĭonvert polar coordinates (4, 60°) into rectangular coordinates. Therefore, rectangular coordinates (x, y) = (3.536, 3.536)Ĭonvert polar coordinates (7, 30°) into rectangular coordinates. To convert polar to rectangular coordinates,
With Cuemath, find solutions in simple and easy steps.īook a Free Trial Class Solved Examples on Polar to Rectangular CalculatorĬonvert polar coordinates (5, 45°) into rectangular coordinates. Use our free online calculator to solve challenging questions. Where (r, θ) are polar coordinates and (x, y) are rectangular coordinates The formula's for converting polar coordinates to rectangular coordinates: Polar coordinates are expressed as (r, θ) while rectangular coordinates are expressed as (x,y)Ĭonverting polar to rectangular coordinates means expressing the polar coordinates in the form of rectangular coordinates.
How to Find Polar to Rectangular Calculator? Step 3: Click on the "Reset" button to clear the fields and enter the different values.Step 2: Click on the "Convert" button to convert polar to rectangular coordinates.
Step 3: Finally, the conversion of polar to rectangular coordinate will be displayed in the output field. Step 2: Now click the button Calculate Rectangular Coordinates to get the result. Step 1: Enter the polar coordinates(r, θ) in the given input boxes. The procedure to use polar to rectangular calculator is as follows: Step 1: Enter the polar coordinate values in the respective input field. Summary: to convert from Cartesian Coordinates (x,y) to Polar Coordinates (r,): r ( x2 + y2 ) tan-1 ( y / x ).Please follow the below steps to convert polar to rectangular coordinates: How to Use Polar to Rectangular Calculator? ' Polar to Rectangular Calculator' is an online tool that helps to convert polar to rectangular coordinates. Online Polar to Rectangular Calculator helps you to convert polar to rectangular coordinates in a few seconds. Polar coordinates, on the other hand, come in the form (r, θ), points are identified by their angle on the unit circle and their distance from the origin. Rectangular coordinates, or cartesian coordinates, come in the form (x, y), points are identified by their distances from the x and y axes.