作业帮1.已知二次函数f(x)=ax2+bx,ab为常数且a≠0,满足条件f(1-x)=f(x+1)且方程f(x)=2x有等根当x为何值f(x)不大于-3
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1.已知二次函数f(x)=ax2+bx,ab为常数且a≠0,满足条件f(1-x)=f(x+1)且方程f(x)=2x有等根当x为何值f(x)不大于-3
1.已知二次函数f(x)=ax2+bx,ab为常数且a≠0,满足条件f(1-x)=f(x+1)且方程f(x)=2x有等根
当x为何值f(x)不大于-3
1.已知二次函数f(x)=ax2+bx,ab为常数且a≠0,满足条件f(1-x)=f(x+1)且方程f(x)=2x有等根当x为何值f(x)不大于-3
f(1-x)=f(x+1)说明函数的对称轴为x=1,也就是-b/2a=1
b = - 2a
f(x)=2x可化为:
4ax²+2bx-2x=0 ,因为b=-2a
所以
4ax²-4ax-2x=0
2ax²-2ax-x=0 因为方程有重根,
所以a=-1/2,b=1
f(x)= - (1/2)x²+x
f(x)≤ - 3 可化为:
- (1/2)x²+x≤ - 3
x²-2x-6≥0
x≥1+√7,或x≤1-√7
f(1-x) = a(1-x)² + b(1 -x) = ax² -(2a+b)x + a+b
f(x+1) = a(x+1)² + b(x+1) = ax² + (2a+b)x + a+b
f(1-x) = f(x+1)
(2a+b)x = - (2a+b)x
2a+b = 0, b = -2a
f(x) = ax...
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f(1-x) = a(1-x)² + b(1 -x) = ax² -(2a+b)x + a+b
f(x+1) = a(x+1)² + b(x+1) = ax² + (2a+b)x + a+b
f(1-x) = f(x+1)
(2a+b)x = - (2a+b)x
2a+b = 0, b = -2a
f(x) = ax² -2ax
f(x) = 2x, ax² -2ax = 2x
ax² -2(a+1)x = 0
x[x - 2(a+1)]= 0
x = 0, x = 2(a+1) = 0, a = -1
b = 2
f(x) = -x² +2x
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