{cloak:id=moda}Point Particle Dynamics].{cloak}
{toggle-cloak:id=appa} *Approach:*
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{toggle-cloak:id=diaga} {color:red} *Diagrammatic Representation* {color}
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The free body diagram for this situation is:
!skydiver_accelerateFBD.png!
{note}When drawing a free body diagram for an object moving vertically under the influence of gravity and some other force(s), it is important to try to decide whether gravity is "winning" over the other force(s) or not. In this case, we know that the skydiver is accelerating toward the ground, so we expect that the force of gravity is larger than the force of air resistance. If you can come to such a conclusion, it is a good idea to represent it in your free body diagram.{note}
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{toggle-cloak:id=matha} {color:red} *Mathematical Representation* {color}
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The x-direction is unimportant in this problem, so we write only the y-component equation of Newton's Second Law:
{latex}\begin{large}\[ \sum F_{y} = F_{\rm air} - mg = ma_{y} \] \end{large}{latex}
This equation has only one unknown, so we can solve for _F_~air~.
{latex}\begin{large}\[ F_{\rm air} = mg+ma_{y} = 735\:{\rm N} + (75\:{\rm kg})(-2.0\:{\rm m/s}^{2}) = 590\:{\rm N}\] \end{large}{latex}
{warning}This problem illustrates the importance of choosing a coordinate system. Only by explicitly choosing the y-direction (as we did in the free body diagram) will you remind yourself that the acceleration is downward, and so an appropriate sign must be applied. In our case, because we chose the positive y-direction to be upward, the acceleration must be negative.{warning}
{tip}As we predicted in the note above, the force of air resistance is smaller than the force of gravity on the skydiver in this case.{tip}
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