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

If the graph of the function y = f(x) is symmetrical about the line x = 2, then

Find the equation of the parabola which is symmetric about the y-axis and passes through the point (2, -4) .

If f(x) is a real-valued function defined as f(x)=In (1-sinx), then the graph of f(x) is (A) symmetric about the line x =pi (B) symmetric about the y-axis (C) symmetric and the line x=(pi)/(2) (D) symmetric about the origin

The parabola y^(2) = 4px passes through the point (3, -2). The length of the latus-rectum 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.

For each parabola y=x^(2)+px+q , meeting coordinate axes at 3-distinct points, if circles are drawn through these points, then the family of circles must pass through

Find the equation of the parabola which is symmetric about y-axis, and passes through the point (2,-3) .

Statement I The curve y = x^2/2+x+1 is symmetric with respect to the line x = 1 . because Statement II A parabola is symmetric about its axis.

find the equation of parabola which is symmetric about y-axis,and passes through point (2,-3).

Consider a circle with its centre lying on the focus of the parabola, y^2=2px such that it touches the directrix of the parabola. Then a point of intersection of the circle & the parabola is: