Find the value of the limit:
L=limx→0∫0xcos(t2) dt−sin(x)+x36x5L = \lim_{x \to 0} \frac{\int_0^x \cos(t^2) \, dt - \sin(x) + \frac{x^3}{6}}{x^5}L=limx→0x5∫0xcos(t2)dt−sin(x)+6x3
−13120-\frac{13}{120}−12013
−11120-\frac{11}{120}−12011
−18-\frac{1}{8}−81
−340-\frac{3}{40}−403