A cubic block of mass is sliding down on an inclined plane at with an acceleration of , the value of coefficient of kinetic friction is:
- A
- B
- C
- D
A cubic block of mass is sliding down on an inclined plane at with an acceleration of , the value of coefficient of kinetic friction is:
Correct answer:A
Standard Method
Given: mass of block , angle of inclination , and acceleration down the plane .
Find: coefficient of kinetic friction .
Along the incline, the component of weight is and the normal reaction is . Since the block is sliding down, kinetic friction acts up the plane with magnitude .
Applying Newton's second law along the incline:
Substitute :
Cancel and :
Now use :
With and ,
Multiply by :
Hence,
Therefore, the coefficient of kinetic friction is , so the correct option is A.
Direct Equation Approach
Given: and .
Find: .
For a body sliding down a rough incline,
Substitute the given values:
So,
This works because the standard acceleration formula on a rough incline already combines the weight component and friction term. Therefore, the correct option is A.
Using friction as is incorrect because friction depends on the normal reaction, not the component of weight along the plane. Use instead.
Taking friction in the downward direction is wrong because kinetic friction always opposes the direction of motion. Since the block slides down the incline, friction acts up the incline.
Substituting the trigonometric values incorrectly can change the result. Here, use and before solving for .
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