Atividade de Introducao

(x - x0) = x0 + vt + \\frac{1}{2} (v - v0) t^2 : (x - x0) = vt + (v - v0)t\n(x - x0) = v0t + \\frac{1}{2} (v - v0) t\n(x - x0) = \\frac{1}{2} (v0 + v)t\n[x - x0] = 1 (v0t + 1vt - 1 / 2)\n(x - x0) = \\frac{1}{2} (v0 + v)t\n(x - x0) = \\frac{1}{2} (vt + 1at)\n(x - x0) = \\frac{1}{2} (v + vt + at^2)\n(x) = x0 + vt + \\frac{1}{2} at^2 Atividade\nAluno Ana Paula da Silva\nv = v0 + at (I) x = x0 + vt + \\frac{1}{2} a t^2 (II)\n1) DE(I) v = v0 + at => t = \\frac{v - v0}{a}\nSubstituindo t em II x = x0 + vt + \\frac{1}{2} a t^2\nx - x0 = \\frac{v - v0}{a} + 1 \\frac{(v - v0)}{a^2} (x - x0)\n\nx - x0 = \\frac{1}{a} (2v0(v - v0)) + (v - v0)^2\na(x - x0) = 2v0(v - v0) + (v - v0)^2\n2a(x - x0) = 2v0v - 2v0^2 + v^2 - 2vv0 + v0^2