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Is the vertex of the quadratic function below a maximum or minimum?

Is the vertex of the quadratic function below a maximum or minimum?-example-1
User Betsy
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A quadratic equation is of the form below:


ax^2+bx+c=y

The vertex of the quadratic equation is the value of y where the curve cut the y-axis.

To find the vertex, we would first first find the x-coordinate of the equation using


x=-(b)/(2a)

To find the vertex, we would substitute for x in the equation to get y.

Given the quadratic function below


f(x)=-3x^2-4x+7

It can be observed that


a=-3;b=-4,c=7

The x-coordinate of the vertex is as shown below:


\begin{gathered} x=-(b)/(2a) \\ x=(--4)/(2(-3)) \\ x=(4)/(-6) \\ x=-(2)/(3) \end{gathered}

The vertex would be


\begin{gathered} f(-(2)/(3))=-3(-(2)/(3))^2-4(-(2)/(3))+7 \\ f(-(2)/(3))=-3((4)/(9))+(8)/(3)+7 \\ f(-(2)/(3))=-(4)/(3)+(8)/(3)+7 \\ f(-(2)/(3))=(-4+8)/(3)+7 \\ f(-(2)/(3))=(4)/(3)+7 \\ f(-(2)/(3))=1(1)/(3)+7=8(1)/(3)=(25)/(3) \end{gathered}

Hence, the vertex of the quadratic function is (-2/3,25/3)

It should be noted that when a is positive, the quadratic graph opens upward and the vertex is minimum but when a is negative, the quadratic curve opens downward, and the vertex would be maximum

The graph of the quafratic function given is shown below

It can be observed that the vertex is maximum

Is the vertex of the quadratic function below a maximum or minimum?-example-1
User Nirup Iyer
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