Calculation of Resulting Acceleration for a Block

Calculation of Resulting Acceleration for a Block

The magnitude of each force is 208 N, the force on the right is applied at an angle 36°, and the mass of the block is 17 kg. The coefficient of friction is 0.149 and the acceleration of gravity is 9.8 m/s^2.

What is the magnitude of the resulting acceleration?

What is the magnitude of the resulting acceleration?

Answer:

11.06m/s²

Explanation:

According to Newton's second law of motion:

\[F_x = ma_x\] \[F_m - F_f = ma_x\] \[mg\sin\theta - \mu R mg\cos\theta = ma_x\]

Given:

Mass \(m = 17kg\)

Force \(F_m = 208N\)

Angle \(\theta = 36\) degrees

Acceleration due to gravity \(g = 9.8 m/s^2\)

Let \(a\) be the acceleration.

Substitute:

\(208 - 0.149(17)(9.8)\cos 36 = 17a\)

\(208 - 24.6568\cos36 = 17a\)

\(208 - 19.9478 = 17a\)

\(188.05 = 17a\)

\(a = 188.05/17\)

\(a = 11.06 m/s^2\)

Therefore, the magnitude of the resulting acceleration is 11.06 m/s^2.

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