A function whose graph is symmetrical in opposite quadrants is

A function whose graph is symmetrical about y-axis is

A function whose graph is symmetrical about y-axis is

A function whose graph is symmetric about y- axis is

A function whose graph is symmetrical about the y-axis is given by:

A function whose graph is symmetrical about the origin is given by -(A)f(x+y)-f(x)+f(y)

A function whose graph is symmetrical about the y axis is given by f(x)=sin[log(x+sqrt(x^(2)+1))]

S-I : If f(x) is odd function and g(x) is even function then f(x)=g(x) is nether even nor odd S-II : Odd function is symmetrical in opposite quadrants and even function is symmetrical about the y-axis

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

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

Area of symmetrical graphs