Statement I The graph of `y=sec^(2)x` is symmetrical about the Y-axis.
Statement II The graph of `y=tax` is symmetrical about the origin.

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

Draw the graph of y=sec^(-1)|x| .

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

Which of the following is a function whose graph is symmetrical about the origin ?

If graph of y=f(x) is symmetrical about the y-axis and that of y=g(x) is symmetrical about the origin and if h(x)=f(x)dotg(x),t h e n(d^3h(x))/(dx^3)a tx=0 is (a)cannot be determined (b) f(0)dotg(0) (c)0 (d) none of these

If graph of y=f(x) is symmetrical about the y-axis and that of y=g(x) is symmetrical about the origin and if h(x)=f(x)dotg(x),t h e n(d^3h(x))/(dx^3)a tx=0 is cannot be determined (b) f(0)dotg(0) 0 (d) none of these

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

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.

Statement 1: The function f (x) = sin x is symmetric about the line x = 0. Statement 2: Every even function is symmetric about y-axis.