Answer to Question #111630 in Vector Calculus for Felix Coleman

(a) average velocity from t = 2 to t = 3,

"r = ti + (8t \u2212 t^2)j"

"average\\phantom{i}velocity=\\frac{r(3)-r(2)}{3-2}\\\\"

"r(3) = 3i + (8(3) \u2212 (3)^2)j\\\\r(3) = 3i + 15j\\\\r(2)= 2i + (8(2) \u2212(2)^2)j\\\\r(2) = 2i + 12j"

hence

"average\\phantom{i}velocity=\\frac{r(3)-r(2)}{3-2}\\\\average\\phantom{i}velocity=\\frac{(3i+15j)-(2i+12j)}{3-2}\\\\average\\phantom{i}velocity=\\frac{i+3j}{1}\\\\average\\phantom{i}velocity=i+3j"

(b) velocity, speed and direction of motion when t = 4,

velocity function

"r = ti + (8t \u2212 t^2)j"

"velocity=\\frac{dr}{dt}\\\\velocity=\\frac{dr}{dt}=i+(8-2t)j"

hence at t=4

"velocity=i+0j\\implies velocity=i"

for speed

"speed=|\\frac{dr}{dt}|\\\\\\frac{dr}{dt}=i"

hence speed

"speed=\\sqrt{1^2}\\implies speed=1"

direction of motion

"direction=\\frac{v(t)}{|v(t)|}\\\\direction=\\frac{i}{1}\\\\direction=i"

"tan\\theta=\\frac{y-component}{x-component}\\phantom{i}of\\phantom{i}the\\phantom{i}velocity\\\\\n\\theta=tan^{-1}(\\frac{0}{1})\\\\\\theta=0^{0}"

both methods implies the particle is moving along the x-axis

c.) position vector when it is moving parallel to the vector i − 2j

"\\begin{pmatrix}\n t \\\\\n 8t-t^2\n\\end{pmatrix}=k\\begin{pmatrix}\n 1 \\\\\n -2\n\\end{pmatrix}\\\\\\implies t=k\\\\8t-t^2=-2k\\\\"

solving the two equations simultaneously by substitution

"8t-t^2=-2t\\\\hence\\\\t=10\n\\\\\\therefore r=10i-20j"

d.) acceleration vector

"acceleration=\\frac{dv}{dt}\\\\\\frac{dv}{dt}=-2j"

2.) initial velocity

"r = 5(1 + 4t)i + 5(19 + 2t \u2212 t^2)j. \\\\velocity=\\frac{dr}{dt}\\\\\\frac{dr}{dt}=20i+5(2-2t)j\\\\velocity=20i+5(2-2t)j\n\\\\at\\phantom{i}t=0"

initial velocity

"v=20i-10tj"

value of T

"r = 5(1 + 4t)i + 5(19 + 2t \u2212 t^2)j"

two vectors are said to be perpendicular if their dot product is equal to zero

initial displacement is when t=0

"t=0\\\\r = 5i + 95j"

at t=T

"r = 5(1 + 4T)i + 5(19 + 2T \u2212 T^2)j"

then

"(5(1 + 4T)i + 5(19 + 2t \u2212 T^2)j).(5i+95j)=0\\\\(5(1 + 4T)5)+(5(19 + 2T\u2212 T^2)95)=0"

open the bracket and solve for T

"25+100T+9025+950T-475T^2=0\\\\475T^2-1050T-9050=0"

solving quadratic

T=5.6080

"distance\\phantom{i}t=5.6080\\\\""\\\\r = 5(1 + 4t)i + 5(19 + 2t \u2212 t^2)j\\\\r=r = 5(1 + 4(5.6080))i + 5(19 + 2(5.6080) \u2212 (5.6080)^2)j\\\\\nr=117.16i-6.16832j\\\\distance=\\sqrt{(117.16)^2+(-6.16832)^2}\\\\distance=\\sqrt{13764.51377}\\\\distance=117.322"