The present problem presents the following equation:
It follows the general form of a polynomial that which follows:
Where a, b, c... stands for the zeros of the function, and na, nb, nc... for its multiplicity.
According to the figure and the rule is given, the F presents three zeros:
Analyzing each of them we are able to say that, P1 AND P2 have multiplicity equal to 2, and the graph touches but does not crosses the x-axis, while it crosses at P3.
The y-intercept is the point where x = 0, which implies P2.
From the solution presented above, we are able to answer the problem as follows:
Zero where the graph crosses the x-axis: x = 1
Zeros where the graph touches, buut does not cross the x-axes are: x = -1, 0
Thr y-intercept of the graph F is y = 0,0