Interpretation of the Graph of a Quadratic Polynomial

Given

The graph shown in Fig. 2.17 represents the quadratic polynomial

\[ f(x) = ax^2 + bx + c \]

The coordinates of the vertex are shown as

\[ \left(-\frac{b}{2a},\; -\frac{D}{4a}\right) \]

where \(D = b^2 – 4ac\) is the discriminant.

Solution

Step 1: Sign of \(a\)

From the graph, the parabola opens downwards.

Therefore,

\[ a < 0 \]

Step 2: Nature of the Discriminant

The vertex of the parabola lies above the x-axis.

So,

\[ -\frac{D}{4a} > 0 \]

Since \(a < 0\), the denominator \(4a\) is negative.

For the fraction to be positive, the numerator must also be negative:

\[ -D < 0 \Rightarrow D > 0 \]

Hence, the quadratic polynomial has two distinct real zeroes.

Step 3: Sign of \(c\)

The graph cuts the y-axis below the x-axis.

Therefore,

\[ f(0) = c < 0 \]

Conclusion

From the given graph of the quadratic polynomial,

\[ \boxed{a < 0,\quad D > 0,\quad c < 0} \]