Respuesta :
Answer:
Since the parametric equation is given as
[tex]x(t)=4cos(\pt t),y(t)=4sin(\pi t)\\\\\therefore x(t)^{2}+y(t)^{2}=16cos^{2}(\pi t)+16sin^{2}(\pi t)\\\\x(t)^{2}+y(t)^{2}=16\\\\[/tex]
[tex]\therefore \frac{x^{2}}{4^{2}}+\frac{y^{2}}{4^{2}}=1\\\\comparingwith\\\\\frac{x^{2}}{a^{2}}+\frac{y^{2}}{b^{2}}=1\\\\\therefore a=4,b=4[/tex]
x(t)=4cos(πt) -divide by 4
y(t)=3sin(πt) -divide by 3
x(t)/4 = cos(πt) -to the square
y(t)/3 = sin(πt) -to the square
x(t)²/16 = cos²(πt)
y(t)²/9 = sin²(πt)
Sum this:
x(t)²/16 + y(t)²/9 = cos²(πt)+sin²(πt)
x²/16 + y²/9 = 1.
a² is 16 and b² is 9 therefore a=4 and b=3.
Parametric equation of elipse is generally:
x(t) = a cos(f(t))
y(t) = b sin (f(t))
