A rectangle is inscribed with its base on the x-axis and its upper corners on the...

A rectangle has two of its vertices on the X axis and the other two above...

A rectangle has two of its vertices on the X axis and the other two above the X axis on the graph of the parabola y = 16-x ^ 2. Of all possible rectangles, find the dimensions of the one with the largest area.

The base of a rectangle lies along the x-axis and the upper two vertices are on...

The base of a rectangle lies along the x-axis and the upper two vertices are on the curve defined by y=3-x^2 Find the dimension (length and width) for the rectangle with the maximum area.

( PARTA) Find the dimensions (both base and height ) of the rectangle of largest area...

( PARTA) Find the dimensions (both base and height ) of the rectangle of largest area that has its base on the x-axis and its other two vertices above the x-axis and lying on the parabola below. y = 8 − x (PARTB) A box with a square base and open top must have a volume of 62,500 cm3. Find the dimensions( sides of base and the height) of the box that minimize the amount of material used.

a rectangle that is x feet wide is inscribed in a circle of radius 7 ft....

a rectangle that is x feet wide is inscribed in a circle of radius 7 ft. . a)express the area of the rectangle as a function of x. b) find the domain of the function c) graph the function with a graphing calculator d) what dimensions mazimize the area of the rectangle a(x) =

1- An open box with a square base is to have a volume of 10 ft3....

1- An open box with a square base is to have a volume of 10 ft3. (a) Find a function that models the surface area A of the box in terms of the length of one side of the base x. (b) Find the box dimensions that minimize the amount of material used. (Round your answers to two decimal places.) 2- Find the dimensions that give the largest area for the rectangle. Its base is on the x-axis and its...

Find the dimensions of the rectangle of maximum area with sides parallel to the coordinate axes...

Find the dimensions of the rectangle of maximum area with sides parallel to the coordinate axes that can be inscribed in the ellipse 128xsquaredplus2ysquaredequals128. Let length be the dimension parallel to the x-axis and let width be the dimension parallel to the y-axis.

A rectangle with side lengths given in feet is located in the first quadrant of the...

A rectangle with side lengths given in feet is located in the first quadrant of the xy-plane. It has its lower left corner located at the origin and upper right vertex at the point (x,y) belonging to the curve ?=1−19?2. We will to find the dimensions of the associated rectangle having the largest area possible. (a) Give the objective function (the function to me optimized) in terms of two variables. (b) Give the constraint/restriction, if there is one. (c) Give...

2. A cylinder is inscribed in a right-circular cone of altitude 12cm, and a base with...

2. A cylinder is inscribed in a right-circular cone of altitude 12cm, and a base with radius of 4cm. Find the dimensions of the cylinder that will make the total surface area a maximum.

Find the dimensions of a rectangle with perimeter 96 m whose area is as large as...

Find the dimensions of a rectangle with perimeter 96 m whose area is as large as possible. If a rectangle has dimensions x and y, then we must maximize the area A = xy. Since the perimeter is 2x + 2y = 96, then y =  − x.

The figure below shows three small, positively charged spheres at three corners of a rectangle. The...

The figure below shows three small, positively charged spheres at three corners of a rectangle. The particle at upper left has a charge q1 = 6.00 nC, the one at the lower left has a charge of q2 = 7.00 nC, and the one at lower right has a charge q3 = 3.00 nC. The rectangle's horizontal side has length x = 5.50 cm and its vertical side has length y = 3.50 cm. Three positive charges lie at three...