The question is (in parametric equations):
$$x = 2\sin(t)$$ $$y = \cos(t)$$
for $0 \le t \le \pi/2$
I need to eliminate the parameter and the sketch the curve... any ideas?
The question is (in parametric equations):
$$x = 2\sin(t)$$ $$y = \cos(t)$$
for $0 \le t \le \pi/2$
I need to eliminate the parameter and the sketch the curve... any ideas?
Hint: The parametric equation (almost) looks like that of a circle and in particular we have $$\frac{x^2}{2^2} + y^2 = 1$$ Do you know what kind of curve this describes? How much of the curve is traversed? In what direction?
For further reference, see here.