prove : s=ut+1/2 at^2 with proof and consider
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Method 1
Consider a velocity-time graph where the object is moving at constant acceleration
(where u denotes initial velocity and v denotes final velocity)
The area of a velocity-time graph gives the displacement, therefore:
ss=Area of AOCD+Area of ADB=ut+12×t×(v−u)=ut+12×t×at∵v=u+at=ut+12at2
Method 2 (uses calculus)
Displacement is the integral of velocity with respect to time:
s=∫vdt
Substitute v=u+at into the integral:
ss=∫(u+at)dt=∫udt+∫atdt=ut+a∫tdt=ut+12at2+C
When t=0 , s=0∴C=0 , so our equation reduces to
s=ut+12at2.
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