If g is an odd function which pair of points could be found on the graph of g?

If ( g ) is an odd function, it satisfies the property ( g(-x) = -g(x) ) for all ( x ). This means that if the point ( (a, g(a)) ) is on the graph, then the point ( (-a, -g(a)) ) must also be on the graph. For example, if ( (2, 3) ) is a point on the graph of ( g ), then ( (-2, -3) ) would also be a point on the graph.