$x ={ t}^2, y = t^3, t \ge 0$

A collection of quantities is defined as a function of one or more independent variables called parameters in a parametric equation.

(i) Consider the parametric equations,

$x=t^2,y=t^3,t\ge 0$

The goal is to remove the parameter and describe the motion in conjunction with the graph. Consider the parametric curves $x=t^2,y=t^3$

Take $x=t^2$ then

$$\begin{gathered} \sqrt{x}=t \\ t=\sqrt{x} \end{gathered}$$

Now substitute $t=\sqrt{x}$ in the equation $y=t^3$

$y=\left(\sqrt{x}{)}^3\right[$ since by substituting $t=\sqrt{x}]$

(ii) As a result, after removing the parameter, the needed equation is $t$ is $y=(\sqrt{x}{)}^3$

Consider the parametric equations $x=t^2,y=t^3$

The derivative of the function $x=t^2$is as follows,

Differentiate with respect to $t$ then,

$x^{\text{'}}=\frac{d}{dt}{t}^2$

Thus, the derivative $x^{\text{'}}=2t>0$

As a result, the curve follows the right-hand side of the parabola.

(iii) On the right side of the parabola, the curve moves.

The curve shifts to the right as the $t$ value rises.

Therefore, for the parametric curves $x=t^2,y=t^3$ the answer is

$y=x^2-1$ right half of the $\Theta$ parabola, the motion is to the right as $t$ increases

$x=t^2,y=t^3,t\ge 0$

(i Consider the parametric equations,

$x=t^2,y=t^3,t\ge 0$

The goal is to remove the parameter and characterize the graph's motion in terms of direction. Consider the parametric curves $x=t^2,y=t^3$

Take $x=t^2$ then

$$\begin{gathered} \sqrt{x}=t \\ t=\sqrt{x} \end{gathered}$$

Now substitute $t=\sqrt{x}$ in the equation $y=t^3$

$y=\left(\sqrt{x}{)}^3\right[$ since by substituting $t=\sqrt{x}]$

Thus, the required equation after eliminating the parameter $t$ is $y=(\sqrt{x}{)}^3$

ii. Consider the parametric equations $x=t^{2}, y=t^{3}$

The derivative of the function $x=t^{2}$ is as follows,

Differentiate with respect to $t$ then,

$x^1=\frac{d}{dt}{t}^2$

Thus, the derivative $x^1=2t>0$

As a result, the curve follows the right-hand side of the parabola.

iii. On the right side of the parabola, the curve moves.

The curve shifts to the right as the $t$ value rises.

As a result, for parametric curves, the answer is $y=x^2-1$right half of the parabola. As $\mathrm{t}$ grows, the motion is to the right.