Quiz:Sliding motion along an inclined plane: Difference between revisions

Latest revision as of 23:39, 27 April 2024

See sliding motion along an inclined plane for background information.

Force diagram and acceleration analysis

1 Consider a situation where $\mu _{s}=mu_{k}=\mu$ is the coefficient of static as well as kinetic friction between the block and the incline. What can we say about the normal force between the block (of mass $m$ ) and the incline as a function of the angle of incline $\theta$ (this is the angle that the incline makes with the horizontal)?

	The magnitude of normal force equals $mg$ and is independent of $\theta$
	The magnitude of normal force decreases from $mg$ to 0 as $\theta$ increases from 0 to $\pi /2$
	The magnitude of normal force increases from 0 to $mg$ as $\theta$ increases from 0 to $\pi /2$
	The magnitude of normal force increases for $\theta$ increasing from 0 to $\tan ^{-1}(\mu )$ and decreases for $\theta$ increasing from $\tan ^{-1}(\mu )$ to $\pi /2$
	The magnitude of normal force decreases for $\theta$ increasing from 0 to $\tan ^{-1}(\mu )$ and increases for $\theta$ increasing from $\tan ^{-1}(\mu )$ to $\pi /2$

2 Consider a situation where $\mu _{s}=\mu _{k}=\mu$ is the coefficient of static as well as kinetic friction between the block and the incline. Once the angle of the incline (denoted $\theta$ ) exceeds $\tan ^{-1}(\mu _{s})$ , the magnitude of downward acceleration $a$ is an increasing function of $\theta$ . What is its derivative with respect to $\theta$ ?

	$g(\sin \theta +\mu \cos \theta )$
	$g(\sin \theta -\mu \cos \theta )$
	$g(\cos \theta -\mu \sin \theta )$
	$g(\cos \theta +\mu \sin \theta )$

@@ Line 13: / Line 13: @@
 - The magnitude of normal force decreases for <math>\theta</math> increasing from 0 to <math>\tan^{-1}(\mu)</math> and increases for <math>\theta</math> increasing from <math>\tan^{-1}(\mu)</math> to <math>\pi/2</math>
-{Consider a situation where <math>\mu_s = mu_k = \mu</math> is the coefficient of static as well as kinetic friction between the block and the incline. Once the angle of the incline (denoted <math>\theta</math>) exceeds <math>\tan^{-1}(\mu_s)</math>, the magnitude of downward acceleration <math>a</math> is an increasing function of <math>\theta</math>. What is its derivative with respect to <math>\theta</math>?
+{Consider a situation where <math>\mu_s = \mu_k = \mu</math> is the coefficient of static as well as kinetic friction between the block and the incline. Once the angle of the incline (denoted <math>\theta</math>) exceeds <math>\tan^{-1}(\mu_s)</math>, the magnitude of downward acceleration <math>a</math> is an increasing function of <math>\theta</math>. What is its derivative with respect to <math>\theta</math>?
 |type="()"}
 - <math>g(\sin \theta + \mu \cos \theta)</math>