A particle moves in the xyxyxy-plane such that x(t)=∫0tcos(u2)dux(t) = \int_0^t \cos(u^2) dux(t)=∫0tcos(u2)du and y(t)=∫0tsin(u2)duy(t) = \int_0^t \sin(u^2) duy(t)=∫0tsin(u2)du. Find the speed (x′(t))2+(y′(t))2\sqrt{(x'(t))^2 + (y'(t))^2}(x′(t))2+(y′(t))2.
111
t2t^2t2
2t2t2t
cos(t2)+sin(t2)\sqrt{\cos(t^2) + \sin(t^2)}cos(t2)+sin(t2)