# Example Find Equations Normal Plane Osculating Plane Helix R T Cost Sin T J Tk Point Q

This post categorized under Vector and posted on August 13th, 2019.

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Let vecr(t) (3 cos (2t) e2t 1 2t2 - t). Find the equation of the osculating plane at t 0. We note that t 0 corresponds to the point vecr(0) (3 e 0). We now need to find a vector that is perpendicular to this osculating plane.Find the equations of the normal plane and osculating plane of the helix r(t) 3 cos(t) i 3 sin(t) j tk at the point P(0 3 2).EXAMPLE 7 Find the equations of the normal plane and osculating plane of the helix r(t) 6 cost) i 6 sin(t) j tk at the point P(0 6 2).

Choose another point Q that is on the helix then we can find the equation of the osculating plane and the normal plane. endgroup DeepSea Dec 22 13 at 749 add a comment 1 Answer 121.02.2009 Find the equations of the normal plane and osculating plane of the curve at the given point. xt yt2 zt3 Point (111) For the normal plane I got x2y3z6 but I cant figure out how to do the osculating plane.Follower 1Antworten 2Status Offen16.12.2014 Find the equations of the tangent line normal plane and osculating plane to the curve r (t) -2sin(t) i 2cos(t) j 3 k at the point corresponding to t 4.

16.06.2013 Find equations of the normal plane and osculating plane of the curve at the given point. x 4sin3t y t z 4cos3t (0 4)Status OffenAntworten 106.05.2012 Find the equation of the normal plane and the osculating plane Let C be the curve parameterized by r(t) 4t 3cost 3sint. Find a) The unit tangent vector T(t).Status OffenAntworten 1