Solve the following differential equation Select all the correct answers. x(t): = 12 x(t) = 1/2 -(±√√/13t+C−t - 26) where C is an arbitrary constant. The ODE can be solved relying on the separation of variables method (separable form method). The ODE can be solved relying on the dx/dt=f(x/t) method ·(±√/12t+C −t – 13) where C is an arbitrary constant. dx dt 1 12 x(t): t + 12x t + 12x + 13 1 = 12 (± √√26t+C-t-13) where C is an arbitrary constant.

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Solve the following differential equation x(t) Select all the correct answers. x(t) x (t) = (±√√13t+C − t − 26) where C is an arbitrary constant. The ODE can be solved relying on the separation of variables method (separable form method). The ODE can be solved relying on the dx/dt=f(x/t) method (±√√12t + C − t − 13) where C is an arbitrary constant. = 1 12 = 12 1 12 dx dt 12 t + 12x t + 12x + 13 (±√√26t+C − t − 13) where C is an arbitrary constant. - -