Horizontal force of 50N accelerates a block of mass 3.0 kg up an incline with an A=2.0ms^-2. The angle with horizontal is 30^o. Find a) force of friction between the box and the incline b) the coefficient of kinetic friction between box and the incline?

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Answer 1 · 2018-05-20T07:52:42

(a) Let us take the positive $x$ -axis as directed up the incline, and positive $y$ -axis as perpendicular to the incline.

The forces acting on the block along the $x$ -axis are

Therefore, net force equation along the $x$ -axis is

$sumF_x = 50\ cos30^@ - mg\ sin30^@ - f_k = ma_x$

Inserting given values we get

$50\ sqrt3/2 - 3xx9.81xx 1/2 - f_k = 3xx2$
$=> f_k = 50\ sqrt3/2 - 3xx9.81xx 1/2 -6$
$=> f_k = 22.6\ N$

(b) The forces acting on the block along the $y$ -axis which make up normal reaction $N$ are

Inserting various values we get

$N = 3xx9.81xxsqrt3/2+50xx1/2$
$N = 50.49\ N$

Now he equation relating the friction force and the coefficient of kinetic friction is

$f_k = mu_kN$
$=>mu_k = (f_k)/N$

Plugging in known values we get

$mu_k = (22.6)/50.49=0.45$