Find the zeros of the polynomial function j(x)=64x^4+160x^3+48x^2−40x−16 , given its graph. Enter the zeros in order from least to greatest. Enter any non-integer numbers in decimal form.

The zeros of the polynomial function j(x) = 64x^4 + 160x^3 + 48x^2 - 40x - 16 can be found by inspecting its graph.

The graph of the function intersects the x-axis at three different points. These points represent the zeros of the function.

By inspecting the graph, the possible zeros appear to be x = -0.5, x = -0.25, and x = 0.5.

Therefore, the zeros of the polynomial function j(x) are x = -0.5, x = -0.25, and x = 0.5.