What is the moment about point C?

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To find the moment about point C=(-1, 2, 1) for a vector from A=(2, 0, 4) to B=(5, 1, 1) with a magnitude of 100 units, the moment M is calculated using the formula M = r x F. The direction of the vector is defined by the parametric equations x=3t+2, y=t, z=-3t+4. The next step involves determining the perpendicular distance from points O=(0, 0, 0) and C to the line defined by the vector. Assistance is requested to verify the calculations and provide hints for finding the distances needed to complete the solution.
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Homework Statement


Find the moment about the origin of a vector of magnitude 100 units acting from
A=(2, 0, 4) to B=(5, 1, 1). What is the moment about the point C=(−1, 2, 1)?


Homework Equations


M= r x F


The Attempt at a Solution


I did the quesion, but I'm not sure if it's correct. Can anyone check it for me?
attachment.php?attachmentid=25347&d=1272109619.jpg
 

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The "moment of a vector about a point" is the magnitude of the vector times the length of a line segment from the given point perpendicular to the line of the vector.

Since the vector acts "from (2, 0, 4) to (5, 1, 1)", its line of direction is given by x= 3t+ 2, y= t, z= -3t+ 4. You need to find the distance from (0, 0, 0) to that line and from (-1, 2, 1) to that line . Then multiply those by 100.
 
So I need to find |OL| where O = (0, 0, 0) and L = (2+3t, t, 4-3t), thus
attachment.php?attachmentid=25353&d=1272111831.jpg


Making a moment of
attachment.php?attachmentid=25350&d=1272111706.jpg


Simillary to Q = (-1, 2, 1)
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  • QL Mql.jpg
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Ahhh come on guys help me out here! Any hints?
 

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