设函数f(x)在x=0的某邻域具有一阶连续导数,且f(0)f′(0)≠0,当h→0时,若af(h)+bf(2h)-f(0)=0(h),试求a,b的值.
<p>问题:设函数f(x)在x=0的某邻域具有一阶连续导数,且f(0)f′(0)≠0,当h→0时,若af(h)+bf(2h)-f(0)=0(h),试求a,b的值.<p>答案:↓↓↓<p class="nav-title mt10" style="border-top:1px solid #ccc;padding-top: 10px;">韩星的回答:<div class="content-b">网友采纳 由题设条件知:limh→0h=limh→0(a+b−1)f(0)h=0,∴(a+b-1)f(0)=0,由于:f(0)f′(0)≠0,故必有:a+b-1=0.…①又由洛必达法则知:limh→0af(h)+bf(2h)−f(0)h=limh→0af′(h)+2bf...
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