Question 11 Find the constanta if the length of the curve given by the parametric equations...
Graph the curve whose parametric equations are given and show its orientation. Find the rectangular equation of the curve. x=5 cost. y 3 sint Osts 2x Choose the correct graph below ОА OB Ос OD Q Determine the rectangular equation of the curve. Choose the correct answer below. Ox+y? - 34 O 25x + 9 = 1
Graph the curve whose parametric equations are given and show its orientation. Find the rectangular equation of the curve x=7 cost. y sint Osts 2x Choose the correct graph below. OA OB Ос. OD @ Determine the rectangular equation of the curve. Choose the correct answer below. Oxy7:16 40 O o 36 40 1 0 40x3y1
Question 11 Find the length of the curve with parametric equations x = 2t, y = 3t, where 0 <t < 1. 10 42-2 O 4V2 - 1 22-1 4/ Question 12 True or false: y=x cos x is a solution of the differential equation y + y = -2 sin x True False
3) a) Sketch the curve represented by the given parametric equations. Label initial and terminal points. Use an arrow to show direction. x = 2cost y = 3 sint osts b) Find the area between the curve and the x axis.
14. Graph the curve whose parametric equations are given and show its orientation. Find the rectangular equation of the curve. x = -2 sint, y = 3 cost, OSISI
osts 1 = e' sint y=e' cost parametric equation of the curve part; a) find the length, b) Find the area of the surface formed by rotating it around the Ox- axis.
Question 20 0.1 p1 Find a rectangular equation for the plane curve defined by the parametric equations. x = 5 cost, y = -2 sint; Osts 21 4x2 + 25y2 = 100;-5 sxs 5 O 4x2 - 25y2 = 1;xzı 4x2 - 25y2 = 100; x 25 O 4x2 + 25y2 = 1;-} sxs O None Question 21 0.1 pts Solve.
Question 15 < > Find the length of the curve for the following parametric equations for 2 <t < 10. Find its exact value, no decimals. r(t) = e' - 36 ly(t) = 2461/2 Length =
find parametric equations for the tangent line to the curve with the given parametric equations at the specified point. x=10cost, y=10sint, z=8cos2t; (5sqrt3,5,4)
Find parametric equations for the tangent line to the curve with the given parametric equations at the specified point. x = 4 In(t), y = 6/t, z = t4; (0,6, 1) x(t), y(t), z(t) = X