Answer to Question #199723 in Atomic and Nuclear Physics for Sarpong Michael

Let us consider the conservation of momentum law. Before the impact the total momentum was

"p_1 = m_av_a + m_bv_b = 0.100\\,\\mathrm{kg}\\cdot v_a + 0.400\\,\\mathrm{kg}\\cdot 0, \\\\\np_1 = 0.100\\,\\mathrm{kg}\\cdot v_a."

After the impact the total momentum is

"p_2 = (m_a+m_b)\\cdot v_{\\text{tot}} = 0.500\\,\\mathrm{kg}\\cdot3.0\\,\\mathrm{m\/s} = 1.50\\,\\mathrm{kg\\cdot m\/s}."

Since "p_1=p_2," "\\;\\; v_a = \\dfrac{p_2}{0.100\\,\\mathrm{kg}} = \\dfrac{ 1.50\\,\\mathrm{kg\\cdot m\/s}}{0.100\\,\\mathrm{kg}} = 15\\,\\mathrm{m\/s}."