问答题
设函数y=f(x)在(-∞,+∞)内可导,且对任意实数a,b均满足f(a+6)=eaf(6)+ebf(a),又f'(0)=1,试求f(x)及f'(x).
【正确答案】由于对任意a,b,等式f(a+b)=eaf(b)+ebf(a)均成立,故建立微分方程.根据导数的定义,利用导数的定义式f(x+Δx)展开.
令a=b=0,由f(a+b)=eaf(b)+ebf(a)得,f(0)=0,又f'(0)=1故f'(x)=exf'(0)+f(x)=ex+f(x)即f(x)的微分方程为f'(x)-f(x)=ex,f(0)=0两边乘e-x,得(e-xf(x))'=1,两边积分,得
令a=b=0,由f(a+b)=eaf(b)+ebf(a)得,f(0)=0,又f'(0)=1故f'(x)=exf'(0)+f(x)=ex+f(x)即f(x)的微分方程为f'(x)-f(x)=ex,f(0)=0两边乘e-x,得(e-xf(x))'=1,两边积分,得【答案解析】