e=! 1-2 すると 2 一般 (4){(logz)2}′ = 2log™(1 問2.20 次の関数を微分せよ. (1)y= = log 5x (2)y=log (5)y (5) y = log (4) y = log 1 3x 指数関数の微分 指数関数の微 2.20 指数関数の微分公 (e)'=e,a>0, a≠1の 明日 粉粉 - exについて

(1) y' = e²x+1. (2x+1)' = 2e2x+1 3x (2) y'a loga (3x)' = 3a3x log a Let's TRY 問2.21 次の関数を微分せよ. (1) y = e5x+3 (2) y = ex² (3) y = 32x (4) y = (ex + e¯x) 2 (5) y = e²x sin x (6 y = e³x (x² - 2) 次に,実数α に対して, y= x (x > 0) の導関数を求めてみよう. x = elog x h a log x a a log x

5 (3) y' = (4) cos² (5x-1) (5) y' -2x sin(x2) (6) y' = y' = sin 2x 2 tan x Cos² x (2) y' 2x (5) y' = 1 (6) y' 2.20 (1) y' = 1 2.21 (1) y = 5e5x+3 (4) y' = 2(e2 - e-2x) (6) y' = e3 (3x² + 2x-6) 2.22 (1) y' = x (1+ log x) (3) y' = x+7 4(x-2)3 = 4(x+1)(x-2) | (x+1)2 (2) y' = (x-1) (5-x) (x+1)4 = (3) y' = 4x²-1 (4) y' = x log 2 3 = 2(3x-1) (2) y' = 2xex² (3) y' = 2.32 log 3 (5) y'e2 (2 sin x + cos x)