An ice glider is traveling 35 degrees W of S at 6 m/s when the wind exerts a force of 860 N 18 degrees N of W for three seconds. The mass of the glider is 215 kg. Complete the chart below and then answer the questions that follow.
t(s): 0, 1, 2, 3
East v (m/s): --3.44, t = 1, t = 2, t = 3
North v (m/s): --4.92, t = 1, t = 2, t = 3
What is the glider's initial kinetic energy?
What is the glider's kinetic energy at t = 2?
How much energy does the wind put into the glider in the 3 s interval?
What is the glider's average speed for the three second interval?
What is the glider's average velocity for the three second interval?
"v_0 = 6\\frac{m}{s}"
"\\text{We introduce a coordinate system with the basis: }\\vec E,\\vec N"
"v_{0E}= -\\sin35\\degree *v_0=-3.44"
"v_{0N}= -\\cos35\\degree *v_0=-4.92"
"F= ma"
"a = \\frac{F}{m}=\\frac{860}{215}= 4"
"a_{E}= -\\sin18\\degree *a=-1.24"
"a_{N}= -\\cos18\\degree *a=-3.80"
"v= v_0+at"
"v_E= v_{0\u0415}+a_\u0415t=-3.44-1.24t"
"v_N= v_{0N}+a_Nt=-4.92-3.80t"
"\\begin{matrix}\n t(s) & 0 &1&2&3\\\\\n v_E& -3.44&-4.68&-5.92&-7.16\\\\\n v_N& -4.92&-8.72&-12.52&-16.32\\\\\n\\end{matrix}"
"EK_0 =\\frac{mv_0^2}{2}= \\frac{215*6^2}{2}= 3870J"
"v_2 = \\sqrt{v_{2E}^2+v_{2N}^2}= \\sqrt{5.92^2+12.52^2}=13.85\\frac{m}{s}"
"EK_2 =\\frac{mv_2^2}{2}= \\frac{215*13.85^2}{2}= 20621J"
"v_3 = \\sqrt{v_{3E}^2+v_{3N}^2}= \\sqrt{7.16^2+16.32^2}=17.82\\frac{m}{s}"
"EK_3 =\\frac{mv_3^2}{2}= \\frac{215*17.82^2}{2}= 34123J"
"\\Delta EK = EK_3-EK_0= 30253J"
"v_{avg}= \\frac{v_0+v_3}{3}= 7.94\\frac{m}{s}"
"\\text{Answer:}"
"EK_0 = 3870J"
"EK_2 =20621J"
"\\Delta EK = 30253J"
"v_{avg}= 7.94\\frac{m}{s}"
Comments
Leave a comment