次の不定積分を求めよ. X dx (1) √√√√2+1 (3) S 1 dx ex+1 0+1+ (2) S X3 √√√1+x² dx (4) tan d x

(4) tanx=t とおくと, dt 1 2 dx Cos²x dx= ゆえに = =1+tan²x=1+ t² ₤ h dt 1+t2 3 Stan rdz=1+d t z ) d t 1+t2 dt = log(1++C 2 2 1-2 tan² x 1½-log (1+tan²x)+C 2 tanx+log|cosx+C 08

Stanix dx = 1 cost t = -sinx dx = dt = 1053x da dr = 1 COSX sina da とおくと より √ Locos x sinxdx = ft² = dt =fer dt = √(t-boldt log (t) + ± ±²² + C 03 = flt-éldt = log | cosal + = cos³ x + c #