" The parabola "y=ax^(2)+2ax+b" is symme...

" The parabola "y=ax^(2)+2ax+b" is symmetric about the line "

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The parabola y= px^(2)+px+q is symmetrical about the line

The parabola y= px^(2)+px+q is symmetrical about the line

The parabola y ^(2) =x is symmetric about

The parabola y ^(2) =x is symmetric about

If the graph of y=ax^(3)+bx^(2)+cx+d is symmetric about the line x=K then the value of a+K is (y is not a constant function)

Focus of parabola y=ax^(2)+bx+c is

Statement 1: The quadratic polynomial y=ax^(2)+bx+c(a!=0 and a,b in R) is symmetric about the line 2ax+b=0 Statement 2: Parabola is symmetric about its axis of symmetry.

Statement 1: The quadratic polynomial y=ax^(2)+bx+c(a!=0 and a,b in R) is symmetric about the line 2ax+b=0 Statement 2: Parabola is symmetric about its axis of symmetry.

Statement 1: The quadratic polynomial y=ax^(2)+bx+c(a!=0 and a,b in R) is symmetric about the line 2ax+b=0 Statement 2: Parabola is symmetric about its axis of symmetry.

If the garph of the function f(x)=ax^(3)+x^(2)+bx+c is symmetric about the line x = 2, then the value of a+b is equal to

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