Answer to Question #317198 in Mechanics | Relativity for Quân Jason

Explanations & Calculations

1.

• Apply "\\small v^2=u^2+2as" upwards for the ball's motion.

"\\qquad\\qquad\n\\begin{aligned}\n\\small 0^2&=\\small (5\\sin45)^2+2(-9.8\\,ms^{-2})h\\\\\n\\small h&=\\small 0.64\\,m\n\\end{aligned}"

• Then from the height from the street is "\\small 0.64\\,m+3\\,m= 3.64\\,m(\\approx 3.6\\,m)"

2.

• Consider the conservation of mechanical energy from the start to end(street is the level of zero potential energy)

"\\qquad\\qquad\n\\begin{aligned}\n\\small p.e+k.e&=\\small p.e+k.e\\\\\n\\small mgh+\\Sigma\\Big(\\frac{1}{2}mv^2\\Big)&=\\small 0+\\frac{1}{2}mV^2\\\\\n\\small mgh+\\frac{1}{2}mv^2+\\frac{1}{2}mv_{boy}^2&=\\small \\frac{1}{2}mV^2\\\\\n\\small V&=\\small \\sqrt{2gh+v^2+v_b^2}\\\\\n&=\\small \\sqrt{2(9.8)(3)+5^2+5^2}\\\\\n&=\\small 10.4\\,ms^{-1}\n\\end{aligned}"