Asked by hello

The total area of the piece of jewelry can be calculated as the sum of the areas of the individual shapes, which are a rectangle and two semicircles.

Area of rectangle = length * width = 9 * 3 = 27 square cm
Area of one semicircle = (1/2) * π * r^2 = 0.5 * π * 2^2 = 2π square cm
Total area = 27 + 2π + 2π = 27 + 4π

Since π is approximately 3.14:
Total area ≈ 27 + 4 * 3.14 = 27 + 12.56 = 39.56 square cm

Therefore, the total area of the piece of jewelry is approximately 39.56 square centimeters. So the closest option is 39 square centimeters.

In the supply closet shown in the image, we can see that it is a rectangle. The total area of the closet is given as 36 square feet.

To find the length of the side labeled with the question mark (let's call it x), we can set up the equation:

Area = length * width
36 = x * 6
x = 36/6
x = 6

Therefore, the length of the side of the supply closet labeled with the question mark is 6 feet.

To find the value of x in the ratio x:8 = y:16, we can use proportions since the ratio x:8 is equivalent to y:16 in this case.

Given that y = 3 units, we can set up the proportion:

x/8 = 3/16

Cross multiplying, we get:

16x = 8 * 3
16x = 24

Dividing by 16 from both sides, we get:

x = 24 / 16
x = 1.5 units

Therefore, the value of x is 1.5 units.

To find a smaller scale drawing of the original printed photograph, we must reduce the original dimensions proportionally. The original dimensions are 6 inches by 4 inches.

Let's find the scale factor first:
Original width: 6 inches
Smaller width: x inches
Scale factor = x / 6

Original height: 4 inches
Smaller height: y inches
Scale factor = y / 4

Typically, we select a scale factor that both x and y share. Let's choose 1.5 for both x and y.

New dimensions:
Width = 6 inches / 1.5 = 4 inches
Height = 4 inches / 1.5 = 2.67 inches

None of the options exactly match these dimensions, but the closest option is:
2 inches by 1 inch

Therefore, 2 inches by 1 inch represents a smaller scale drawing of the original printed photograph.

To find the area of Crystal's scale drawing of the triangle, we need to calculate the scale factor by comparing the heights of the original triangle and the scale drawing.

Scale factor = height of scale drawing / height of original triangle
Scale factor = 2 / 5
Scale factor = 0.4

Now, we can use the scale factor to find the base of the scale drawing:
Base of the scale drawing = Scale factor * base of original triangle
Base of the scale drawing = 0.4 * 8
Base of the scale drawing = 3.2 inches

Now that we have the base and height of the scale drawing, we can find its area:
Area of the scale drawing = (1/2) * base * height
Area of the scale drawing = (1/2) * 3.2 * 2
Area of the scale drawing = 3.2 square inches

Therefore, the area of Crystal's scale drawing is 3.2 square inches.