Easy-acceleration with unit vectors

AI Thread Summary
The discussion revolves around calculating the acceleration of a saucer using kinematic equations in vector form. Participants clarify that the provided equations are applicable to each component of displacement, velocity, and acceleration separately. The equations can be broken down into x and y components for accurate calculations. The original poster seeks assistance in determining the saucer's acceleration in both unit vector form and in terms of magnitude and direction. The conversation concludes with a request for the final answers derived from these calculations.
PEZenfuego
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Homework Statement



untitled.jpg


r1=(0m)
r2=(2000i + 1000j)m
v1=(200j)m/s
v2=(200i-100j)m/s

Homework Equations


tantheta=vy/vx

v2^2=v1^2+2ax
v2=v1+at
x2=x1+v1t+1/2at^2

The Attempt at a Solution



IMG_20120909_150513.jpg


Thank you for any help
 
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So what do we have to find??
 
find the saucer's acceleration in unit vectors and in terms of magnitude and direction.
 
PEZenfuego said:

Homework Statement



View attachment 50618

r1=(0m)
r2=(2000i + 1000j)m
v1=(200j)m/s
v2=(200i-100j)m/s

Homework Equations


tantheta=vy/vx

v2^2=v1^2+2ax
v2=v1+at
x2=x1+v1t+1/2at^2

The Attempt at a Solution



View attachment 50617

Thank you for any help
Are those kinematic equations for components of vectors, or for vectors themselves?
 
SammyS said:
Are those kinematic equations for components of vectors, or for vectors themselves?

If you click the first picture, you will have an understanding equal to mine. I'm sorry.
 
PEZenfuego said:
If you click the first picture, you will have an understanding equal to mine. I'm sorry.
Sorry for the slow response.

I should have been more direct with my earlier response.

The set of kinematic equations you have
(v2)2=(v1)2+2ax
(v2)=(v1)+at
x2=x1+(v1)t+1/2at2
are valid for each component of displacement, velocity, and acceleration.

So you have two such sets of kinematic equations:
(v2)x2 = (v1)x2 + 2axx
(v2)x = (v1)x + axt
x2 = x1 + (v1)xt + 1/2axt2

(v2)y2 = (v1)y2 + 2ayy
(v2)y = (v1)y + ayt
y2 = y1 + (v1)yt + 1/2ayt2
 
SammyS said:
Sorry for the slow response.

I should have been more direct with my earlier response.

The set of kinematic equations you have
(v2)2=(v1)2+2ax
(v2)=(v1)+at
x2=x1+(v1)t+1/2at2
are valid for each component of displacement, velocity, and acceleration.

So you have two such sets of kinematic equations:
(v2)x2 = (v1)x2 + 2axx
(v2)x = (v1)x + axt
x2 = x1 + (v1)xt + 1/2axt2

(v2)y2 = (v1)y2 + 2ayy
(v2)y = (v1)y + ayt
y2 = y1 + (v1)yt + 1/2ayt2

It makes sense now. thank you.
 
PEZenfuego said:
It makes sense now. thank you.
What did you get for answers?
 

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