283 次の関数を微分せよ。ただし,aは定数で, a > 0, a≠1 とする。 *(3)_y=log|x²-4| y=log(x²+2)y=log|2x+1 *(6) _y=(xlogx-x)² (9)_y=x²ex *(12) y=x²+2x 279 (4) y=log (sinx) (7) y=e4x *(10) y=e*cos x (13) y=log₁2x - *(5)_y=(logx)³ *(8) y=(x+3) e¯x -x (11) y=e*tanx *(14) y=loga(x²-1) (3) *(15) y=a3x qi

(x²+2)' 2x -(4+ x² +2 x² +2 (2) y=log|2x-1| − log|2x+1| よって 283 (1) y'= = (2x-1) y' = 2x-1 7) 8) = (3) y'= (x² - 4)' x²-4 (4)_y'= (sin x) sin x = 2(2x+1) — 2(2x − 1) _ _ ( 4 – 0 = (2x-1)(2x+1) 4x² -1 = (2x+1) 2x+1 2x x²-4 . COS X sin x = 2 2x-1 (5) y'=3(log x)². (log x)' = -S (6) y'=2(xlog x - x)(xlog x − x) = 2(xlog x − x)log x - 7=11111 3(log x)² mil = 2(xlog x − x)(log x + x· (-1) - X y'=e4x (4x)' = 4e 4x y'=(x+3)'e *+ (x+3)(e¯*) =1:6=3-(x) X-S=\ 2 2x+1 √(x+3)=x__(x+2)6-² ーー