Objects A and B are at the origin. If object A moves to $(-4 ,7 )$ and object B moves to $(2 ,-3 )$ over $4 s$ , what is the relative velocity of object B from the perspective of object A?

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Answer 1 · 2018-03-03T16:48:32

Net displacement of $A$ from origin is $sqrt(4^2 + 7^2)=8.061 m$ and the net displacement of $B$ from origin is $sqrt(2^2+3^2)=3.605m$

considering that they moved with constant velocity,we get, velocity of $A$ is $8.061/4=2.015 ms^-1$ and that of $B$ is $3.605/4=0.090 ms^-1$

So,we have got velocity vector of $A$ (let, $vec A$ ) and velocity vector of $B$ (let, $vec B$ )

So,reative velocity of $B$ w.r.t $A$ is $vec R = vec B - vec A=vec B + (-vec A)$

Now,the angle between the two vectors is found as follows, enter image source here

So,angle between $vec B$ and $-vec A$ is $3.955^@$

So, $|vec R| = sqrt(0.90^2 + 2.015^2 + 2*0.90*2.015*cos 3.955)=2.914 ms^-1$

Answer 2 · 2018-03-03T17:23:02

The relative velocity is $=<3/2, -5/4> ms^-1$

![www.slideshare.net](useruploads.socratic.org)

The absolute velocity of $A$ is $v_A=1/4 <-4,7> = <-1, 7/4>$

The absolute velocity of $B$ is $v_B=1/4 <2,-3> = <1/2,-3/4>$

The relative velocity of $B$ with respect to $A$ is

$v_(B//A)=v_B - v_A$

$=<1/2,-3/4> -<-1, 7/4>$

$= <1/2+1, -3/4-7/4>$

$= <3/2, -5/4>$

Objects A and B are at the origin. If object A moves to (-4 ,7 )(-4 ,7 ) and object B moves to (2 ,-3 )(2 ,-3 ) over 4 s4 s, what is the relative velocity of object B from the perspective of object A?