Definition (Unit Binormal Vector) The unit binormal vector, g, is the cross product of the unit tangent vector and the principal unit normal vector: B (t) = 7 (t) x (t) Continuing with the previous question, find the unit binormal vector to the curve above at the point where t = 13/6. This vector is a normal vector for the osculating plane, which is a plane passing through the point associated with (13/6) with normal vector the unit binormal vector at that point. Find the equation of this plane. Put your final answer in the form, 1x + by + cz = d, where b, c, and d are decimals rounded to 3-places. SHOW WORK. Use the equation editor (click on the pull-down menu next to an electric plug ( ), choose "View All" and then select MathType at the bottom of the menu).