证明:由已知f(a+b)+f(a-b)=2f(a)•f(b),
令a=b=0,得f(0)+f(0)=2[f(0)]^2
∵f(0)≠0得f(0)=1.
又令a=0,得f(b)+f(-b)=2f(0)f(b),
∴f(b)=f(-b) 即f(x)=f(-x),
∴函数f(x)为偶函数.
证明:由已知f(a+b)+f(a-b)=2f(a)•f(b),
令a=b=0,得f(0)+f(0)=2[f(0)]^2
∵f(0)≠0得f(0)=1.
又令a=0,得f(b)+f(-b)=2f(0)f(b),
∴f(b)=f(-b) 即f(x)=f(-x),
∴函数f(x)为偶函数.