Acceleration

Acceleration, abbreviated as a, is the rate of change of velocity.  Whenever a mass experiences a force, an acceleration is acting.  Acceleration is a vector quantity having magnitude and direction, some of these include displacement, drag, force, lift, momentum, thrust, torque, velocity and weight.

 

Acceleration Calculator

Acceleration formulas \(\large{ a = \frac{ \Delta v }{ t } }\)    \(\large{ a = \frac{ v_f \;-\; v_i }{ t } }\)    \(\large{ a = \frac{ v_f \;-\; v_i }{ t_f \;-\; t_i } }\)    \(\large{ a = \frac{ F }{ m } }\)   \(\large{ a = \frac{ F }{ p } }\)   Where: Units  US SI \(\large{ a }\) = acceleration \(\large{\frac{ft}{sec^2}}\) \(\large{\frac{m}{sec^2}}\)  \(\large{ F }\) = force  \(\large{lb_f}\)  \(\large{N}\) \(\large{ m }\) = mass  \(\large{lb_m}\)  \(\large{kg}\) \(\large{ t }\) = time  \(\large{seconds}\) \(\large{ t_f }\) = final time  \(\large{seconds}\) \(\large{ t_i }\) = initial time  \(\large{seconds}\) \(\large{ p }\) = pressure  \(\large{\frac{lb_f}{in^2}}\) \(\large{Pa}\) \(\large{\frac{N}{m^2}}\)  \(\large{ v }\) = velocity \(\large{\frac{ft}{sec}}\)  \(\large{\frac{m}{sec}}\)  \(\large{ \Delta v }\) = velocity differential \(\large{\frac{ft}{sec}}\)  \(\large{\frac{m}{sec}}\)  \(\large{ v_f }\) = final velocity \(\large{\frac{ft}{sec}}\)  \(\large{\frac{m}{sec}}\)  \(\large{ v_i }\) = initial velocity \(\large{\frac{ft}{sec}}\)  \(\large{\frac{m}{sec}}\)