作业帮已知二次函数f(x)=ax^2+bx(a,b为常数,a不等于0)满足条件f(-x+5)=f(x-3),且方程f(x)=x有等根(1)求f(x)解析式 (2)函数f(x)在(x∈[t,t+1],t∈R)的最大值为u(t),求u(t)解析式
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![已知二次函数f(x)=ax^2+bx(a,b为常数,a不等于0)满足条件f(-x+5)=f(x-3),且方程f(x)=x有等根(1)求f(x)解析式 (2)函数f(x)在(x∈[t,t+1],t∈R)的最大值为u(t),求u(t)解析式](/uploads/image/z/1636501-13-1.jpg?t=%E5%B7%B2%E7%9F%A5%E4%BA%8C%E6%AC%A1%E5%87%BD%E6%95%B0f%28x%29%3Dax%5E2%2Bbx%28a%2Cb%E4%B8%BA%E5%B8%B8%E6%95%B0%2Ca%E4%B8%8D%E7%AD%89%E4%BA%8E0%EF%BC%89%E6%BB%A1%E8%B6%B3%E6%9D%A1%E4%BB%B6f%28-x%2B5%29%3Df%28x-3%29%2C%E4%B8%94%E6%96%B9%E7%A8%8Bf%28x%29%3Dx%E6%9C%89%E7%AD%89%E6%A0%B9%281%29%E6%B1%82f%28x%29%E8%A7%A3%E6%9E%90%E5%BC%8F+%282%29%E5%87%BD%E6%95%B0f%28x%29%E5%9C%A8%EF%BC%88x%E2%88%88%5Bt%2Ct%2B1%5D%2Ct%E2%88%88R%EF%BC%89%E7%9A%84%E6%9C%80%E5%A4%A7%E5%80%BC%E4%B8%BAu%28t%29%2C%E6%B1%82u%28t%29%E8%A7%A3%E6%9E%90%E5%BC%8F)
已知二次函数f(x)=ax^2+bx(a,b为常数,a不等于0)满足条件f(-x+5)=f(x-3),且方程f(x)=x有等根(1)求f(x)解析式 (2)函数f(x)在(x∈[t,t+1],t∈R)的最大值为u(t),求u(t)解析式
已知二次函数f(x)=ax^2+bx(a,b为常数,a不等于0)满足条件f(-x+5)=f(x-3),且方程f(x)=x有等根
(1)求f(x)解析式
(2)函数f(x)在(x∈[t,t+1],t∈R)的最大值为u(t),求u(t)解析式
已知二次函数f(x)=ax^2+bx(a,b为常数,a不等于0)满足条件f(-x+5)=f(x-3),且方程f(x)=x有等根(1)求f(x)解析式 (2)函数f(x)在(x∈[t,t+1],t∈R)的最大值为u(t),求u(t)解析式
(1)由f(-x+5)=f(x-3),
f(x)的图象关于x=(5-3)/2对称,
-b/2a=1.①
又方程f(x)=x有等根,
即ax^2+bx=x,
ax^2+(b-1)x=0有等根0,
x=(1-b)/a=0.②
由①②得
a=-1/2,b=1.
故f(x)=-1/2·x^2+x
(2)
函数f(x)=-1/2(x-1)^2+1/2
在(x∈[t,t+1],t∈R)的最大值,
是定抛物线y=-1/2·x^2+x在(动)区间上的最大值,
是关于t的(分段)函数.
分三种情况讨论:对称轴x=1在区间左,中,右.
当1≤t时,
f(x)在(x∈[t,t+1]上是减函数,
f(x)最大值=f(t)=-1/2·t^2+t.
当t
1.满足条件f(-x+5)=f(x-3),取特殊值代进,取x=1
f(x)=x有等根 用判别式=0
2.讨论t在f(x)的对称轴的左右方,分别得u(t)出解析式
1)
由f(-x+5)=f(x-3)可知对称轴为 x=1
所以b/(-2a)=1 b=-2a;
因为ax^2+bx=x 即 ax^2+(b-1)x=0有重根
显然x1=x2=0 所以 b=1 a=-1/2
所以f(x)=-1/2x^2+x;
2)
f(x)=-1/2(x^2-2x)=-1/2(x-1)^2+1/2 (化...
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1)
由f(-x+5)=f(x-3)可知对称轴为 x=1
所以b/(-2a)=1 b=-2a;
因为ax^2+bx=x 即 ax^2+(b-1)x=0有重根
显然x1=x2=0 所以 b=1 a=-1/2
所以f(x)=-1/2x^2+x;
2)
f(x)=-1/2(x^2-2x)=-1/2(x-1)^2+1/2 (化简,求最大值)
x=1为对称轴,
讨论t在f(x)的对称轴的左右方,分别得u(t)出解析式
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