Answer:
m2 = 0·52 kg
Explanation:
As the pulley is massless and frictionless the tension in the string on both sides of the pulley will be the same
Given that both have same acceleration a = 0·5 m/s²
Forces acting on mass m1 is tension and force of gravity
You can observe the direction of forces acting on two blocks in the file attached
And in the file attached the force of gravity acting on mass m2 is resolved into two perpendicular components of which one acts along the wedge and the other perpendicular to the wedge
Let the tension in the string be T N
And the frictional force acting on mass m2 is μ×N as sliding is taking place
By applying Newton's second law to the block of mass m1
m1×g - T = m1 × a
⇒ T = m1×(g - a)
⇒T = 0·5×(9·8-0·5)
⇒ T= 4·65 N
Let the normal reaction acting on mass m2 be N
By applying Newton's second law to the block of mass m2 in the direction perpendicular to the wedge
we get
N = m2×g×cosθ
By applying Newton's second law to the block of mass m2 along the wedge
T - μ×N - m2×g×sinθ = m2×a
Substitute N = m2×g×cosθ in the above equation
T - μ×m2×g×cosθ - m2×g×sinθ = m2×a
⇒ T = m2 × ( μ×g×cosθ + g×sinθ + a)
By the substituting the corresponding values
4·65 = m2 × 8·8
⇒ m2 = 0·52 kg
