作业帮已知二次函数f(x)=ax^2+x.已知二次函数f(x)=ax^2+x(a属于R,a≠0)(1)对任意x1,x2∈R,比较1/2*[f(x1)+f(x2)] 与f[(x1+x2)/2]的大小 (2)若x属于【0,1】,有绝对值f(x)≤1,求a 的取值范围
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![已知二次函数f(x)=ax^2+x.已知二次函数f(x)=ax^2+x(a属于R,a≠0)(1)对任意x1,x2∈R,比较1/2*[f(x1)+f(x2)] 与f[(x1+x2)/2]的大小 (2)若x属于【0,1】,有绝对值f(x)≤1,求a 的取值范围](/uploads/image/z/15225274-10-4.jpg?t=%E5%B7%B2%E7%9F%A5%E4%BA%8C%E6%AC%A1%E5%87%BD%E6%95%B0f%28x%29%3Dax%5E2%2Bx.%E5%B7%B2%E7%9F%A5%E4%BA%8C%E6%AC%A1%E5%87%BD%E6%95%B0f%28x%29%3Dax%5E2%2Bx%EF%BC%88a%E5%B1%9E%E4%BA%8ER%2Ca%E2%89%A00%EF%BC%89%EF%BC%881%EF%BC%89%E5%AF%B9%E4%BB%BB%E6%84%8Fx1%2Cx2%E2%88%88R%2C%E6%AF%94%E8%BE%831%2F2%2A%5Bf%28x1%29%2Bf%28x2%29%5D+%E4%B8%8Ef%5B%28x1%2Bx2%29%2F2%5D%E7%9A%84%E5%A4%A7%E5%B0%8F+%EF%BC%882%EF%BC%89%E8%8B%A5x%E5%B1%9E%E4%BA%8E%E3%80%900%2C1%E3%80%91%2C%E6%9C%89%E7%BB%9D%E5%AF%B9%E5%80%BCf%28x%29%E2%89%A41%2C%E6%B1%82a+%E7%9A%84%E5%8F%96%E5%80%BC%E8%8C%83%E5%9B%B4)
已知二次函数f(x)=ax^2+x.已知二次函数f(x)=ax^2+x(a属于R,a≠0)(1)对任意x1,x2∈R,比较1/2*[f(x1)+f(x2)] 与f[(x1+x2)/2]的大小 (2)若x属于【0,1】,有绝对值f(x)≤1,求a 的取值范围
已知二次函数f(x)=ax^2+x.
已知二次函数f(x)=ax^2+x(a属于R,a≠0)
(1)对任意x1,x2∈R,比较1/2*[f(x1)+f(x2)] 与f[(x1+x2)/2]的大小
(2)若x属于【0,1】,有绝对值f(x)≤1,求a 的取值范围
已知二次函数f(x)=ax^2+x.已知二次函数f(x)=ax^2+x(a属于R,a≠0)(1)对任意x1,x2∈R,比较1/2*[f(x1)+f(x2)] 与f[(x1+x2)/2]的大小 (2)若x属于【0,1】,有绝对值f(x)≤1,求a 的取值范围
(1)∵[f(x1)+f(x2)]/2 - f[(x1+x2)/2]
=[( ax1²+x1)+( ax2²+x2)]/2 - {a[(x1+x2)/2]²+ (x1+x2)/2}
=(ax1²+ ax2²)/2 - a(x1+x2)²/4
=(a/4)*[(2x1²+ 2x2²) - (x1+x2)²]
=(a/4)*(x1²+ x2²-2x1x2)
=(a/4)*(x1-x2)²
∴可见:
若a>0,则上式≥0,也即[f(x1)+f(x2)]/2 - f[(x1+x2)/2]≥0,所以f(x1)+f(x2)]/2≥f[(x1+x2)/2]
若a<0,则上式≤0,也即[f(x1)+f(x2)]/2 - f[(x1+x2)/2] ≤0,所以f(x1)+f(x2)]/2≤f[(x1+x2)/2]
2、依题意|f(x)|≤1,-1≤f(x)≤1
若a>0,则f(x)表示开口向上的二次函数,其对称轴x= -1/(2a)<0,
函数在[0,1]上是增函数,所以f(0)≤f(x)≤f(1),即0≤f(x)≤a+1,依题意得a+1≤1,解出a