Tag: turning effects of forces

Questions Related to turning effects of forces

Multiple choice physics turning effects of forces stability and centre of mass center of mass centre of mass

Centre of mass is a point 

  1. Which is geometric centre of a body

  2. From which distance of particles are same

  3. Where the whole mass of the body is supposed the

  4. none of these

Reveal answer Fill a bubble to check yourself
C Correct answer
Explanation

The center of mass is the unique point where the weighted relative position of the distributed mass sums to zero. It is the point at which the entire mass of the body can be considered to be concentrated for the purpose of translational motion analysis.

Multiple choice physics turning effects of forces stability and centre of mass center of mass centre of mass

The centre of mass of a rigid body always lies inside the body. Is this statement true or false?

  1. True

  2. False

Reveal answer Fill a bubble to check yourself
B Correct answer
Explanation
No it's not necessary that the centre of mass of a body should lie inside the body. Consider a circular ring, its centre of mass lies at the center of the ring where there is no content of the body. So it can also lie outside the body .
Multiple choice physics turning effects of forces stability and centre of mass center of mass centre of mass

A football rolls through the ground. The path followed by center of mass of football is:

  1. linear

  2. circular

  3. rotational

  4. all the above

Reveal answer Fill a bubble to check yourself
A Correct answer
Explanation

When a football rolls through the ground, the path followed by center of mass of ball is linear as the center of mass remains always at a fixed height from the ground when the football rolls and moves in a straight line if the ball does not changes its direction of rolling which is assumed in this case.

The correct option is A.

Multiple choice physics turning effects of forces stability and centre of mass center of mass centre of mass

A flexible chain of length 2m and mass 1 kg initially held in vertical position such that its lower end just touches a horizontal surfaces, is released from rest at time t=0, Assuming that any part of chain which strike the plane immediately comes to rest and that the portion of chain lying on horizontal surface does not form  any heap, the height of its center of mass above surface at any instant $t=1/\sqrt { 5 } $(before it completely comes to rest) is

  1. 1 m

  2. 0.5 m

  3. 1.5 m

  4. 0.25 m

Reveal answer Fill a bubble to check yourself
A Correct answer
Explanation

As the chain falls, the velocity of the falling part increases. The center of mass of the chain is determined by the position of the part still in the air and the part already on the surface, accounting for the loss of potential energy.

Multiple choice physics turning effects of forces stability and centre of mass center of mass centre of mass

A metallic ball has spherical cavity at its centre. If the ball is heated, what happens to the cavity?

  1. its volume increases

  2. its volume decreases

  3. its volume remains unchanged

  4. its volume may decreased or increase depending upon the nature of metal

Reveal answer Fill a bubble to check yourself
A Correct answer
Explanation

Thermal expansion affects the entire material uniformly, including the boundaries of any cavities. As the metal expands outward, the cavity effectively expands as if it were made of the same material.

Multiple choice physics turning effects of forces stability and centre of mass center of mass centre of mass

A body having it's center of mass  at the origin. Then,

(The question having a multiple answers).

  1. x co-ordinates of the particles may be all positive.

  2. total KE must be conserved.

  3. total KE must very.

  4. total momentum shall vary.

Reveal answer Fill a bubble to check yourself
C,D Correct answer
Explanation

If all the particles have positive x  co-ordinates then their COM can't be at the origin. Total KE may not be conserved because of internal forces. Its not given that there is no external force acting on the system, so its momentum may also change.

Multiple choice physics turning effects of forces stability and centre of mass center of mass centre of mass

Where will be the centre of mass on combining two masses $m$ and $M(M>m)$ ?

  1. $Towards \ m$

  2. $Towards \ M$

  3. $ exactly \ between \ m \ and \ M $

  4. $None \ of \ the \ above$

Reveal answer Fill a bubble to check yourself
B Correct answer
Explanation

As we can see that the center of mass will be at $r _c=\dfrac{mr+MR}{m+M}$,


where $r$ and $R$ are the position of the masses $m$ and $M$ respectively.

From the formula we notice that it will be between $m$ and $M$ and $nearer $ to the higher mass $M$.

Multiple choice physics turning effects of forces stability and centre of mass center of mass centre of mass

A body has its center of mass at the origin. The x-axis coordinates of the particles :

  1. may be all positive

  2. may be all negative

  3. should be all at zero

  4. may be positive for some case and negative in other cases.

Reveal answer Fill a bubble to check yourself
D Correct answer
Explanation

All co-ordinates positive will make the co-ordinate of com positive.
All co-ordinates negative will make the co-ordinates of com negative.
If all the co-ordinates are zero(0), co-ordinate of com is zero(0).
If  co-ordinate of com can be zero,  co-ordinates of some are positive and co-ordinates of some are negative.

Multiple choice physics turning effects of forces stability and centre of mass center of mass centre of mass

If the linear density of a rod of length L varies as $\lambda =A+B _x$, compute its centre of mass.

  1. $[\cfrac {L(3A+2BL)}{3(2A+BL},0,0]$

  2. $[0,\cfrac {(3A+2B)L}{(2A+3L},\cfrac L 2]$

  3. $[0,0\cfrac {L(3A+2BL)}{3(2A+BL}]$

  4. $[\cfrac L 2,00]$

Reveal answer Fill a bubble to check yourself
A Correct answer
Explanation

The center of mass for a non-uniform rod is found by integrating x*lambda*dx divided by the total mass. With lambda = A + Bx, the integral of x(A+Bx) from 0 to L yields the numerator, and the integral of (A+Bx) yields the denominator.