Find the unit tangent vector T(t) given r(t)= ============================================= This is what I did so far: T(t)= ()/ (sqrt cos2t2 - sin2t2) then I found it into separate vectors components. cost/ (cost-sint) and -sint/(cost-sint) T(t)=
Vector Arithmetic
Vectors are those objects which have a magnitude along with the direction. In vector arithmetic, we will see how arithmetic operators like addition and multiplication are used on any two vectors. Arithmetic in basic means dealing with numbers. Here, magnitude means the length or the size of an object. The notation used is the arrow over the head of the vector indicating its direction.
Vector Calculus
Vector calculus is an important branch of mathematics and it relates two important branches of mathematics namely vector and calculus.
Find the unit tangent vector T(t) given r(t)= <cost, sint>
=============================================
This is what I did so far:
T(t)= (<cost, -sint>)/ (sqrt cos2t2 - sin2t2)
then I found it into separate
cost/ (cost-sint) and -sint/(cost-sint)
T(t)= <cost/ (cost-sint) , -sint/(cost-sint)>
Trending now
This is a popular solution!
Step by step
Solved in 2 steps with 2 images
