An object with a mass of $7 kg$ is pushed along a linear path with a kinetic friction coefficient of $u_k(x)= 1+x-xcos(x)$ . How much work would it take to move the object over #x in [0, 4pi], where x is in meters?

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Answer 1 · 2016-06-29T21:33:11

$= 7g ( 4 pi (1+ 2 pi ))$

the simple idea here is that Work = Force $times$ Distance [or more specifically $W = int_C \ vec F * d vec x$ ]

The work is being done against friction, and here, we have for the friction force....

$F_f = mu R = mu m g = 7g mu$

where $mu(x) = 1+x-xcos x$

so

$F_{f} (x) = 7g (1+x-xcos x)$

The work is being done against friction along a linear path ; and thus...

$W = 7g \ int_{x = 0}^{4 pi} dx qquad \ 1+x- color{red}{xcos x}$

The red term can be done by IBP, ie

$int u v' = uv - int u' v$

We have

$u = x, u' = 1$
$v' = cos x, v = sin x$

so

$int dx qquad x cos x = x sin x - int dx quad sin x$
$= x sin x + cos x$

So

$W = 7g \ int_{x = 0}^{4 pi} dx qquad \ 1+x- xcos x$

$= 7g [x+x^2/2- x sin x - cos x]_{x = 0}^{4 pi}$

$= 7g { [4 pi+(4 pi)^2/2 - 1] - [ -1]}$

$= 7g ( 4 pi (1+(4 pi)/2 ))$

$= 7g ( 4 pi (1+ 2 pi )) \ J$

An object with a mass of 7 kg7 kg is pushed along a linear path with a kinetic friction coefficient of u_k(x)= 1+x-xcos(x) u_k(x)= 1+x-xcos(x) . How much work would it take to move the object over #x in [0, 4pi], where x is in meters?