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Consider the following x= sin(2). y= cos3). -#585 (a) Eliminate the parameter to find a Cartesian...
Consider the following. x = sin(t) y = csc(t) 0<t</2 (a) Eliminate the parameter to find a Cartesian equation of the curve. 1 y = X y
Eliminate the parameter to sketch the curve: 2 = sin -0, 1 y = cos -0, 20, - <O<a
Consider the following. x = sin zo, y = cos ze, isesi (a) Eliminate the parameter to find a Cartesian equation of the curve.
1. 2. 3. 4. (1 point) Eliminate the parametert to find a Cartesian equation for I=+2 y= 10 + 2t 2 = Ay? + By+C where A= and B = and C = (1 point) Consider the parametric curve: 2 = 8 sin 0, y = 8 cos 0, 0<<A The curve is (part of) a circle and the cartesian equation has the form 2? + y2 = R2 with R= The initial point has coordinates: 3 = !!! ,y=...
1) Given X = 3t2, y = 2tº, eliminate the parameter to find a Cartesian equation.. 2) Given x = 5 sin t, y = 2 cost, find Žr.
Write the parametric equations x=2siny=4cos0 in the given Cartesian form. y^2/16= with x0. Write the parametric equations x=2sin2y=5cos2 in the given Catesian form. y= with 0x2. Write the parametric equations x=4ety=8e−t as a function of x in Cartesian form. y= with x0. Write the parametric equations x = 2 sin 0, y = 4 cos 0, 0<O< in the given Cartesian form. = with x > 0. 16 Write the parametric equations x = 2 sin’e, y = 5 cos?...
1. For x = tanht , y = sech^2 , a. Eliminate the parameter to find a Cartesian equation of the curve. b. Sketch the curve with orientation. 1. For x = tanht, y=sech? t , a. Eliminate the parameter to find a Cartesian equation of the curve. b. Sketch the curve with orientation.
(2 points) Find the exact length of the curve y = In(sin(x)) for #/6 <</2. Arc Length Hint: You will need to use the fact that ſesc(x) dx = In|csc() - cot(3) + C.
Eliminate the parameter to find a Cartesian equation of the curve. Then sketch the curve and be sure to indicate the direction of the curve. x = tan(θ)+ sec(θ) , y = tan(θ)-sec(θ)
Eliminate the parameter t to find a simplified Cartesian equation of the form y = mx + b for 1 (t) = - 16 - 7 ( g(t) = – 4 – 4t The Cartesian equation is y = Question Help: Message instructor Check Answer a. b. . 1 (t) = t cos(4) 1 vịt) = tsink) 1 (t) = 2 + cos(t) 18(t) = sin(t) = + + cos(t) (t) = + + sin(t) c. 9 d. 2 1...