As can be seen in this diagram, the three points form a right triangle with legs of length 5 and 12.

A circle through these three points circumscribes this right triangle. 

An inscribed right, or , angle intercepts a  arc, or a semicircle, making the hypotenuse a diameter of the circle. The diameter of the circle is therefore the hypotenuse of the right triangle, which we can find via the Pythagorean Theorem:

The radius of the circle is half this, or . 

The area of the circle is therefore:

The equation of a circle centered at the origin is 

where  is the radius of the circle.

The area of a circle is ; since in the equation of the circle, , we can substitute to get the area .

The larger circle has diameter one yard, or 36 inches; its radius is half that, or 18 inches, so its area is 

 square inches.

The diameter of the smaller circle is equal to the radius of the larger, or 18 inches; its radius is half that, or 9 inches, so its area is:

 square inches.

The area of the gray region is the difference of the two:

 square inches.

For a circle, .

Therefore, the area of the 12" pizza  .

The area of the two 6" pizzas  .

The area of the three 4" pizzas = .

The 12" pizza is the best option. 

Multiply the diameter of the smaller circle by 12 to convert it to inches - this will be , which is also the radius of the larger circle. The radius of the smaller circle will be half this, or .

Using the area formula for a circle , we can substitute these quantities for  and subtract the area of the smaller circle from that of the larger:

 square inches

 square inches

 square inches

The area of a circle is equal to , where is the radius.

The standard form of the area of a circle with radius  and center  is 

Once we get the equation in standard form, we know , which can be multiplied by .

Complete the squares:

so  can be rewritten as follows:

Therefore,  and .

The area of a circle with radius 12 is 

.

This is also the area of the square, so the sidelength of that square is the square root of the area:

The equation of a circle centered at the origin is 

,

where  is the radius of the circle.

The area of a circle is .

From the equation given in the question stem, we know that , so we can plug this into the area formula:

Examine the diagram below, which shows the triangle, its three altitudes, and the two circles.

The three altitudes of an equilateral triangle divide one another into two segments each, the longer of which is twice the length of the shorter. The length of each of the longer segments is the radius of the circumscribed circle, and the length of each of the shorter segments is the radius of the inscribed circle. Therefore, the inscribed circle has half the radius of the circumscribed circle.

The circumscribed circle has circumference , so its radius is

The inscribed circle has radius half this, or 5, so its area is 

Examine the diagram below, which shows the triangle, its three altitudes, and the two circles.

The three altitudes of an equilateral triangle divide one another into two segments each, the longer of which is twice the length of the shorter. The length of each of the longer segments is the radius of the circumscribed circle, and the length of each of the shorter segments is the radius of the inscribed circle. Therefore, the circumscribed circle has twice the radius of the inscribed circle.

The inscribed circle has circumference , so its radius is

The circumscribed circle has radius twice this, or 20, so its area is