Given,

Mass of the bullet, m = 0.012 kg

Horizontal speed (initial speed) of bullet, u = 70 m/s

Mass of wood block, M = 0.4 kg

Initial speed of the block, u’ = 0

After collision, the bullet sticks to the block. Let the final velocity of bullet and block after collision be v.

According to law of conservation of linear momentum,

mu + Mu’ = (m+M)v

⇒

⇒

⇒ v = 2.039 m/s

For the bullet-wooden block system,

Mass of the system, m_t = 0.012 kg + 0.4 kg = 0.412 kg

Velocity of the system, v = 2.039 m/s

Applying the law of conservation of energy, the potential energy at the highest point is equal to the kinetic energy at the lowest point.

Hence, m_tgh = (1/2)m_tv²

⇒ h = v²/2g

⇒ h = (2.039 ms^-1)²/(2×9.8 ms^-2)

⇒ h = 0.212m

So, the block will rise to a height of 0.212 m or 21.2 cm.

Heat produced (H) = Kinetic energy of the bullet – Kinetic energy of the system

⇒ H = (1/2)mu² – (1/2)m_tv²

⇒ H=(1/2)×0.012 kg×(70 ms^-1)² – (1/2)×0.412 kg×(2.039 ms^-1)²

⇒ H = 29.4 J – 0.856 J

⇒ H = 28.54 J