A rectangle is constructed with its base on the x-axis and two of its vertices on the parabola

A rectangle ended up being made with the bottom inside x-axis plus 2 associated with vertices inside parabola y = 484 – x^2. That are the dimensions from rectangle due to the optimum place? Precisely what is that place? License a-be location utilizing the rectangle. What is the impartial function that is applicable A and x? A = the time of good interest utilizing the impartial function ended up being . In the rectangle due to the optimum place, the less measurements is concentrated on and far longer measurements is concentrated on . The most element of the rectangle is concentrated on .
A rectangle is constructed with its base on the x-axis and two of its vertices on the parabola y = 484 - x^2. What are the dimensions at the rectangle with the maximum area? What is that area? Let A be the area of the rectangle. What is the objective function that relates A and x? A = The interval of interest of the objective function is . In the rectangle with the maximum area, the shorter dimension is about and the longer dimension is about . The maximum area of the rectangle is about .

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