Answer Explanation:

The first side is 35 cm, leaving the other two to be 65 cm combined, ruling out (A). Splitting 65 into 5 + 8 = 13 means each part is 65 cm ÷ 13 = 5 centimeters long. The two parts must be 5 cm × 5 = 25 cm and 5 cm × 8 = 40 cm. All told, the three sides are 25 cm, 35 cm, and 40 cm. Choice (C) was just a fluke in case the students were like, "Hey, maybe the given side is the longest."

Answer Explanation:

With the given information, we can draw this picture:

Using the Pythagorean Theorem, we can find that b₁ and b₃ are each 4 inches long (because 5² = 3² + 4²). This leaves t and b₂, which are congruent. If we add the sides we already know, they total 5 + 5 + 4 + 4 = 18, leaving 42 – 18 = 24 inches unaccounted for. These are split evenly between the top t and base b₂, meaning each is 12 inches long. To find the total length of the base, we add b₁ + b₂ + b₃ = 4 + 12 + 4 = 20 inches. So our two parallel sides are 12 inches and 20 inches long.

Answer Explanation:

The front and back are congruent, per the definition of the prism, and they both have an area of 2(½ × 10 in × 12 in) = 120 in². This leaves the congruent left and right sides as well as the bottom of the box to have a combined area of 144 square inches. By the Pythagorean Theorem, we know that the longer edge of the triangular sides is 13 inches. If we call the depth x, then the left and right sides each have an area of 13x and the bottom has an area of 10x. That is, 144 = 13x + 13x + 10x = 36x, making x = 4 inches.

Answer Explanation:

Borg's maximum floor coverage will come from creating a 2 × 3 array of rugs in the space, since two will fit in the 12-foot dimension and three will fit in the 18-foot dimension. Each rug has an area of A = πr² = 3.14 × (3 ft)² = 28.26 ft², so six rugs will have an area of 6 × 28.26 ft² = 169.56 ft². The whole room is 12 ft × 18 ft = 216 ft², so the uncovered portion will be 216 ft² – 169.56 ft² = 46.44 ft².

Answer Explanation:

By definition, the cube has six congruent faces and edges of length l. Also by the definition of a cube, SA = 6l², or 486 ft² = 6l². Simplify and solve for l = 9 ft. Volume of a cube is V = l³, or V = (9 ft)³ = 729 cubic feet.

Answer Explanation:

There are 96 × 48 = 4,608 carpet tiles, which would net the cleaners 4,608 × $0.05 = $230.40 at the conference center's offer of $0.05 per tile. Those tiles cover a total of 4,608 × (0.75 ft)² = 2,592 square feet, which means the cleaners will get 2,592 × $0.10 = $259.20 at their offer of $0.10 per square foot. Their price earns them $259.20 – $230.40 = $28.80 more than that of the convention center.

Answer Explanation:

We can set up the following equations based on the information in the question: l = ⁴⁄₃w and P = 4l – 10. These can be rewritten 3l = 4w and 2l + 2w = 4l – 10. In both equations, put all variables on one side: 3l – 4w = 0 and 2l – 2w = 10. Solve this system of equations by subtracting multiplying second equation by 2 and subtracting it from the first, resulting in –l = -20, or l = 20. If we replace this for l in the first equation, we get 3(20) – 4w = 0 and can then solve for w = 15.

Answer Explanation:

Each plywood cutout will be the result of cutting a quarter circle out of a square. The circle has radius of 8 ft, and the square has side length of 8 ft. So the area of each cutout will be A = r² – ¼πr² = (8 ft)² – ¼π(8 ft)² = 13.76 ft². Two of these pieces occur together, meaning that every 16 inches there will be 27.52 ft² of plywood. Spacing them 16 inches apart for a length of 12 ft × 12 in/ft = 144 inches means that there will be 10 supports (one at the front plus ¹⁴⁴⁄₁₆ = 9), for a total of 275.2 square feet.

Answer Explanation:

The volume of the box will be V = lwh = 720 in³. Since we know the height of the box (5 inches) and that the bottom is a square, we can substitute the volume formula to be V = 5x² = 720 ft³. Solving for x gives us x = 12 inches. However, in order to create this box from a square of cardboard, we'll have to account for twice the depth as well. That means we'll need a cardboard square with a side length of 12 in + 2(5 in) = 22 inches.

Answer Explanation:

Bruiser's territory looks something like this:

If it weren't for the dog-mansion, Bruiser could mark a full circle with radius 10 feet, but since the mansion is in the way, he can only access ¾ of this circle, or A = ¾(πr²) = ¾(π × 100 ft²) = 75π ft². However, at the top and to the right of the dog-mansion, he can wrap around and has access to a quarter of two smaller circles of space. The top one has a radius of 10 ft – 5 ft = 5 ft, so the area there is A = ¼(πr²) = ¼π(25 ft) = 6.25π ft², and the smaller one at the right of his dog-mansion has a radius of 10 ft – 7 ft = 3 feet, giving him an additional 2.25π ft². All told, he can mark 75π + 6.25π + 2.25π = 83.5π ≈ 262.3 square feet of territory.