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13 Nov 2019
Just Need 2,3,4,5 :) Thank you so much!
1) The velocity of a particle can be modeled by v(t) (4t3-15t2 + 1,3-t, 1-t-3 Find the particle's position when its acceleration is(-12.-1.-13), given that at time t-0 the particle's position is (1,-2, 3) 2) Two particles travel along r(t) = (t, t2.t*) and r2(t)-(1 + 2t, 1 + 6t, 1 + 14t). Find the coordinate(s) of their collision and path intersection. If neither is possible, explain why. 3) Find the point(s) where the radius of an osculating circle to the given space curve is 17. Round your final answers to 4 decimals. r(t)-(1 + 21,t2, 3-12ã 4) Find vectors u and u such that the vectors are perpendicular to each other and to ã2,-3,7). 5) Consider the curve f(x) = ex. Find the exact x-value where the radius of the osculating circle is a minimum.
Just Need 2,3,4,5 :) Thank you so much!
1) The velocity of a particle can be modeled by v(t) (4t3-15t2 + 1,3-t, 1-t-3 Find the particle's position when its acceleration is(-12.-1.-13), given that at time t-0 the particle's position is (1,-2, 3) 2) Two particles travel along r(t) = (t, t2.t*) and r2(t)-(1 + 2t, 1 + 6t, 1 + 14t). Find the coordinate(s) of their collision and path intersection. If neither is possible, explain why. 3) Find the point(s) where the radius of an osculating circle to the given space curve is 17. Round your final answers to 4 decimals. r(t)-(1 + 21,t2, 3-12ã 4) Find vectors u and u such that the vectors are perpendicular to each other and to ã2,-3,7). 5) Consider the curve f(x) = ex. Find the exact x-value where the radius of the osculating circle is a minimum.
Patrina SchowalterLv2
6 Apr 2019