All SAT Mathematics Resources
Example Questions
Example Question #1 : Working With Inscribed Shapes
Square A is inscribed inside Circle B which is then inscribed inside Square C. If the radius of Circle B is , what is the ratio of the area of Square A to the area of Square C?
The diameter of Circle B will be the diagonal of the small Square A, but will be the length of the large Square C. You will use the diagonal information to determine the side of the small Square A, then you can calculate the area of each.
First, let's find the side of small Square A. If the radius of Circle B is , then the diameter is . You can use the diagonal to view Square A as two right isosceles () triangles. Since the hypotenuse of the triangle is , then the side of the triangle, and thus the side of Square A, is . The area of this Square A is , which simplifies to , which then equals .
The diameter of Circle B is the same as the side of large Square C is . The area is .
The ratio of their areas is then , which reduces to .
Example Question #2 : Working With Inscribed Shapes
Square ABCD is perfectly inscribed in the circle pictured above. If minor arc AD measures , what is the approximate area of the shaded region?
To answer this question, you need to find the area of the circle and then subtract out the area of the square. If minor arc AD measures then the entire circumference is . This is because the arcs formed by the vertices of the square are each exactly of the circumference. If the circumference is , then the radius is is how you'd calculate that). This then means that the area of the circle, , is .
So you know everything there is to know about the circle, and now you need to move on to the square. For the square, simply draw in the diameter of the circle and realize that this is also the diameter of the square. Since the diagonal of any square is equal to a side of the square times , the inverse is also true: the side of the square can be calculated as the diagonal divided by . This the side of this square is equal to , which can be simplified to .
The area of the square is side-squared, so that's . So your answer here will be the area of the circle, , minus the area of the square, . is approximately , so the answer is approximately .
Example Question #3 : Working With Inscribed Shapes
A circle of radius is inscribed in a square, as shown in the figure.
What percent of the square’s area is taken up by the circle?
The key here is to recognize that the diameter of the circle () is the length of the sides of the square. We can calculate the area of the square to be the square of the sides, , and the area of the circle to be . The percent of the square’s area taken up by the circle would be the part (circle) over the whole (square) times : , which simplifies to .
Example Question #4 : Working With Inscribed Shapes
Rectangle ABCD is inscribed in a circle with center X. If the area of the rectangle is eight times its width, and the distance from X to side AB is three, what is the approximate circumference of the circle?
The correct response is . To find the circumference of a circle, we must find the radius. Let’s start with what we know:
The area of a rectangle is . Here we are told that . That means the length is . We also know that from X to , so the width of the rectangle must be . Let’s re-draw the shape:
We can see that a right triangle is formed with the radius AX and half the length and width of the rectangle. Since it’s a classic Pythagorean triplet (), we don’t need to use the Pythagorean theorem!
Now that we have the radius, we can plug it into the formula for circumference: . . The circumference is approximately , or a number slightly larger than .
Example Question #5 : Working With Inscribed Shapes
In the circle above with center C, diameter . Which of the following must be true?
I. The length of minor arc BD is greater than .
II. Angle ABD measures .
III. Triangle BCD is equilateral.
I and III only
II and III only
I and II only
II only
II and III only
This problem demonstrates several important properties of a circle. Most importantly, you should recognize that all radii are the same so AC = BC = CD. This fact, while fairly simple retrospectively, is easily overlooked when analyzing a circle diagram such as this. For statement I, because all radii are the same, you should note that triangle ACB is isosceles, and thus angle ABC also equals 30° and ACB = 120°. This means that angle BCD = 60° (it is supplementary to angle ACB) and this is the central angle cutting out minor arc BD. As a result, minor arc BD must be or of the circumference, which is . Minor arc BD is thus and since is approximately 3.14 you know that 3(3.14) is less than 10 and this is not a true statement. This statement cannot be inferred from the diagram.
Statement II tests another important property of circles. If a triangle is inscribed in a circle with one side as the diameter, the opposite angle in the triangle is always 90°. This is because inscribed angles that cut out a certain arc (those drawn from a point on the circumference) are always equal to half of the central angle cutting out the same arc. If one side is the diameter, then the opposite angle is always cutting out exactly half of the circle. Since that central angle is 180°, the angle in question will always be 90°. This statement must be true based upon the diagram.
Statement III is relatively straightforward if you figured out statement I. In the first statement, you proved that angle BCD must be 60°. Since BC = BD then the other two angles must also be 60° and triangle BCD must be equilateral.
Because statements II and III must be true, but I is not true, the correct answer is II and III only.
Example Question #1 : Working With Inscribed Shapes
A square is inscribed within a circle as shown above. If the area of the square is 32 square inches, what is the area of the circle, in square inches?
Problems with inscribed circles and squares hinge on one important concept: circles and squares are perfectly symmetrical, so if you know one thing about them you tend to know everything. Here you're given the area of a square and asked to find the area of a circle. With the area of a square, you can find out its side lengths, its perimeter - really anything else about it. Since the area of the square is 32, you can quickly take the square root of 32 to find the side length: .
Now you need to find the relationship between the dimensions of the square and the dimensions of the circle. To find the area of a circle you need the length of the radius, which is half the length of the diameter. And if you look at the diagram, you should see that you can find the diameter of the circle by connecting the corners of the square:
And you know the length of that diagonal: the diagonal of a square is equal to one of its sides times , so you can multiply to get as the diameter. The area of a circle formula, requires the radius, which is half the diameter, so you can plug in to get an area of square inches.
Example Question #2 : Working With Inscribed Shapes
A circle centered on point Z is inscribed within square ABCD as shown above. If the area of square ABCD is 64 square centimeters, what is the area (in square centimeters) of the circle?
When a circle is inscribed in a square as you can see here, the diameter of the circle is the same length as one side of the square. So if you know the area of one shape, you can use that to find the other: here you'll take the area of the square and use that to find the length of a side, then because that is the diameter you can use that to find the radius and apply that to the circle area formula. Your steps should be:
1) Take the square root of the area of the square to find the length of a side. , so the length of one side of the square is . Note that this is also the length of the diameter of the circle!
2) Knowing that the diameter of the circle is , cut that in half so that you have the radius. Half of is , so the radius here is and you're ready to plug this into the area formula.
3) Use the area of a circle formula, , to solve for area. That gives you .
Example Question #24 : Circles
Three identical circles, each tangent to the adjacent circle at one point as shown, are perfectly inscribed within a rectangle. If the area of the rectangle is 108 square feet, what is the area, in square feet, of each circle?
You know two things about the rectangle here: its area of 108 is equal to its length times its width, and the length and width are made of of diameters of the circles. The width is one diameter and the length is three diameters. So you can express the area of the rectangle as:
108 = (Diameter)(3)(Diameter)
When you divide by 3, you see that the Diameter, squared, is equal to 36, meaning that the diameter is 6.
To convert from the diameter of a circle to its area, cut the diameter in half so that you have the radius. With a radius of 3, you can calculate the area:
Example Question #21 : Circles
A pizza shop wants to determine the dimensions of the smallest square box that will exactly contain its large, circular pizza, which has an area of 225 square centimeters. What is the length of each side of the smallest square box that will exactly contain the pizza?
15 centimeters
30 centimeters
30 centimeters
15 centimeters
30 centimeters
In order to tackle this question, we’ll want to be able to effectively picture the situation at hand. If the pizza shop wants to know the smallest box that will exactly fit the pizza, we’re looking at a circle perfectly inscribed within a square, as shown below:
If the area of the pizza is 225 square centimeters, and area = r2, then the radius of the circle must be 15, and the diameter must then be 30 centimeters. Since the diameter of the inscribed circle is equal to the length of each side of the square box, as shown below, the length of each side of the box must be 30 centimeters at a minimum to fit the pizza.
Example Question #22 : Circles
What is the area of the largest circular rug that will exactly fit in a square room with an area of 144 square feet?
36 square feet
12 square feet
6 square feet
12 square feet
36 square feet
In order to answer this question, we’ll want to be able to visualize the situation at hand. If we want the largest circular rug that will fit exactly in a square room, we’re looking at a circle inscribed within a square, as shown below:
In order to find the area of the circular rug, we’ll need to recognize the connection between the circle and the square. Here, the diameter of the circle is equal to the length of each side of the square, as shown below:
So, if we can find the length of the side of the square, we’ve found our diameter, and can thus find the circle’s area! If the area of the square is 144 square feet and the area of a square = (side)2, each side of the square must be 12 feet, making the diameter of the circle also 12 feet, and its radius 6 feet. From there, we can calculate the area as r2, in this case, 62 or 36 feet, our correct answer.
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