If `f(x)=x^2+2bx+2c^2`, `g(x)=-x^2-2cx+b^2` and `minf(x)>maxg(x)` then

If f(x) = x^2+2bx+2c^2, g(x)=-x^2-2cx+b^2 , such that min f(x)gytmaxg(x) ,then

If f(x)=x^2+2bx=2c^2 and g(x)=-x^2-2cx+b^2 are such that min f(x)gtmaxg(x), then the relation between b and c is

If f(x)=x^(2)+2bx+2c^(2)and g(x)=-x^(2)-2cx+b^(2), such that minf(x)gtmaxg(x), then the relation between b and c, is

If (x)=x^(2)+2bx+2c^(2) and g(x)=-x^(2)-2cx+b^(2) such that min f(x)>max g(x), then the relation between a and c is (1) Non real value of b and c(2)0 |b|sqrt(2)

If f(x)=x^2+2b x+2c^2 and g(x)= -x^2-2c x+b^2 are such that min f(x)> m a x g(x) , then the relation between b and c is

If non-zero real number b and c are such that min f(x) gt max g(x) where f(x) =x^(2) + 2bx + 2c^(2) and g(x) = -x^(2) - 2cx + b^(2) (x in R) " then " |(c )/(b)| lies in the interval

If non-zer real numbers b and c are such that min f(x) gt max (g)x, where f(x)=x^(2)+2bx+2c^(2) and g(x)=-x^(2)-2cx+b^(2)(x in R) , Then |(c)/(b)| lies in the interval