I) The maximum value of `c + 2bx -x^(2)` is `c+b^(2)`
II) The minimum value of `x^(2) + 2bx + c` is `c-b^(2)`
Which of the above statements is true ?

Assertion (A) : The maximum value of quadratic function -x^(2)+3x+1 is (11)/(4) Reason (R ) : The maximum value of ax^(2)+bx+c is (4ac-b^(2))/(4a) if alt0

the minimum value of the quadratic expression x^2+2bx + c is

For real number x, if the minimum value of f(x) =x^(2) +2bx +2c^(2) is greater than the maximum value of g(x) =-x^(2)-2cx+b^(2) , then

IF A,B,C, are the minimum value of x^2 -8x +17 , 2x^2 +4x -5 , 3x ^2 -7x +1 then the ascending order of A,B,C is

If a=c=4b , then the roots of ax ^(2) + 4 bx + c =0 are

The circles x^(2) +y^(2) + 2ax +c =0 and x^(2) +y^(2) +2bx +c =0 have no common tangent if

The roots of ax^(2) + 2bx + c = 0 and bx^(2)- 2sqrt(ac)x+b=0 are simultaneously real, then

IF A,B,C are the maximum value of 2x +5 -x^2 ,x -1 -2x^2 , 5x + 2 - 3x^2 then the descending order of A,B,C is

Statement-I : If (x^(2)+3x+1)/(x^(2)+2x+1)=A+(B)/(x+1)+(C)/((x+1)^(2)) , then A+B+C=0 Statement-II: If (x^(2)+2x+3)/(x^(3))=A/x + (B)/(x^(2))+(C)/(x^(3)) , then A+B-C=0 Which of the above statements is true