作业帮g(x)=a^x求证:g[(x1+x2)/2]小于等于[g(x1)+g(x2)/2]
来源:学生作业帮助网 编辑:作业帮 时间:2024/05/11 12:25:21
![g(x)=a^x求证:g[(x1+x2)/2]小于等于[g(x1)+g(x2)/2]](/uploads/image/z/6765226-34-6.jpg?t=g%28x%29%3Da%5Ex%E6%B1%82%E8%AF%81%EF%BC%9Ag%5B%28x1%2Bx2%29%2F2%5D%E5%B0%8F%E4%BA%8E%E7%AD%89%E4%BA%8E%5Bg%28x1%29%2Bg%28x2%29%2F2%5D)
g(x)=a^x求证:g[(x1+x2)/2]小于等于[g(x1)+g(x2)/2]
g(x)=a^x
求证:
g[(x1+x2)/2]小于等于[g(x1)+g(x2)/2]
g(x)=a^x求证:g[(x1+x2)/2]小于等于[g(x1)+g(x2)/2]
g(x1)+g(x2)
=a^x1+a^x2
由基本不等式
a^x1+a^x2
≥2√(a^x1*a^x2)
=2a^[(x1+x2)/2]
=2g[(x1+x2)/2]
即[g(x1)+g(x2)]/2≥g[(x1+x2)/2]