Parametric Equation Calculator




Parametric Equation Calculator

How to use the Parametric Equation calculator?

There are large numbers of equations and formulas available in mathematics that is used for different kinds of mathematical problems. However, these theorems and equations are also helpful for real-world applications. Among them, the easiest to use and essential to learn a concept is this equation. As if you find out complexity to calculate equations manually, you can also use such online tools like a parametric equation calculator. No matter, there are several online calculators available; this kind of tool is still used for a specific purpose and their respective methods and equations.

For using a parametric equations calculator, it is needed to know about the exact meaning of all terms. This word is used to define and describe the techniques in mathematics that introduce and discuss extra and independent variables known as a parameter to make them work. This equation defines a collection or group of quantities (which is considered as functions) of the independent variables known as parameters. It is mostly used to explore the coordinates of the points that define a geometric object. To get a clear picture of this term and its equation, go through the below example. Let's take an example of these equations of a circle, which is defined as given below using two equations.

X = r cos (t)
Y = r sin (t).

In the above equations, t is the parameter which is a variable but not the real part of the circle. Still, parameter T will generate the value of X and Y value pair that depends on the circle radius r. You can use any geometric shape to define these equations. Added to that, you can use it into a parametric equations calculator.

Steps to Use Parametric Equations Calculator

The steps given are required to be taken when you are using a parametric equation calculator.

  1. Step 1: Find a set of equations for the given function of any geometric shape.
  2. Step 2: Then, Assign any one variable equal to t, which is a parameter.
  3. Step 3: Find out the value of a second variable concerning variable t.
  4. Step 4: Then, you will get the set or pair of these equations.
  5. Step 5: Enter both equations in the parametric equations calculator.
  6. Step 6: Click the submit button, and you will get the solution.

You can get the graph of output in a separate window of a parametric equation solver.

Why use a parametric form calculator?

As you are changing the form of the standard equation to this form, the tool is also used as a parametric form calculator, which defines the circumferential way concerning variable t. Initially, you may find this conversion process a little much complex, but after the use of a parametric equation calculator; it will convert into a simple procedure in less time.

After the conversion of function into this process, you can revert this also through eliminating this calculator. In the elimination, you will eliminate the parameter that is used in the parametric equation calculator.

It is also known as the process of transformation. As you are converting these equations to a normal one, you need to eliminate or remove the parameter t which is added to find out the pair or set that is used to calculate for the different shapes in the parametric equations calculator.

To do the elimination, first, you have to solve the x=f (t) equation and remove it from it using the derivation process and then put the value of t into the Y. Then, you will get the value of X and Y. The output will be a normal function consisting of only x and y in which y is based on the x which can be found on the separate window of the parametric equation solver.

Use of Parametric Equation Calculator

Moreover, the parametric representation calculator displays the graph of a given input with their calculated output. You can find it in graphical form in the separate window after converting the standard format to such a shape. This form calculator is required to find out such a form when derivation of standard functions is needed.

Apart from that, other uses or such equation solvers are-

  1. To explore the coordinates of points that defines a geometric object such as curve, surface, or line.
  2. It is also used in kinematics, computer-aided design, integer geometry, and many more.

Bottom Line

However, its primary purpose is to find out the coordination. This representation calculator offers the functionality of a graphical display of coordinator points as per the given input in this form.