Consider the cube shown below. Identify the two-dimensional shape of the cross-section if the cube is sliced horizontally.

If the cube is sliced horizontally, the two-dimensional shape of the cross-section is a square.

If the cube is sliced vertically, the two-dimensional shape of the cross-section is also a square.

The shapes are the same because no matter which direction the cube is sliced, the cross-section will always be perpendicular to the edges of the cube and will thus always be a square. The orientation of the square may be different depending on the direction of the slice, but it is still a square. Therefore, the shape of the cross-section does not depend on the direction of the slice.

Use the image to answer the question.

A composite shape is drawn using a rectangle and 2 triangles. A horizontally aligned rectangle is 9 centimeters long and 3 centimeters wide. A right triangle facing upward adjoins the rectangle on the left side marked 3 centimeters. A right triangle facing downward adjoins the rectangle on the right side. The base leg of both triangles measures 2 centimeters.

Hector designs the piece of jewelry shown below. All lengths are marked in centimeters. What is the total area of the piece of jewelry?

Responses

39 square centimeters
39 square centimeters

30 square centimeters
30 square centimeters

27 square centimeters
27 square centimeters

33 square centimeters
33 square centimeters
Be sure to use the formula 12bh for the area of each triangle.

The area of the rectangle is (length x width) = (9 cm x 3 cm) = 27 square cm.

The area of each triangle is 1/2(base x height) = 1/2(2 cm x 3 cm) = 3 square cm.

Since there are two triangles, the total area of both triangles is 2 x 3 square cm = 6 square cm.

To find the total area of the composite shape, we add the area of the rectangle and the area of the triangles.

Total area = area of rectangle + area of triangles

Total area = 27 square cm + 6 square cm

Total area = 33 square cm

Therefore, the total area of the piece of jewelry is 33 square centimeters.

The correct response is:

33 square centimeters

make it shorter

The total area of the composite shape made of a rectangle and two triangles is 33 square centimeters.

explain how but make it short

Add the area of the rectangle and the two triangles to get the total area, which is 33 square centimeters.

Use the image to answer the question.

A composite shape is drawn, starting with a horizontally aligned rectangle. There is no measurement across the top, and the right side is labeled with a question mark. A horizontally aligned rectangular area marked as 8 feet in length and unknown in width is removed from the bottom left of the original rectangle. The remaining length on the right side is 2 feet. The remaining width on the left side is 3 feet. Corners are marked with right angles.

Tessa designs a supply closet as an addition to her house. The closet is pictured, and its total area is 36 square feet. What is the length in feet of the side of the supply closet labeled with the question mark?

To find the length of the side labeled with a question mark, we need to first find the area of the original horizontally aligned rectangle.

The area of a rectangle is length x width.

We know that the remaining length on the right side is 2 feet, and the remaining width on the left side is 3 feet.

So, the area of the original rectangle is 2 feet x 3 feet = 6 square feet.

We also know that an 8 feet x unknown width rectangular area is removed, so the area of the removed rectangular area is 8 feet x unknown width = 8u.

The total area of the composite shape is then 6 square feet - 8u + 36 square feet.

Simplifying this expression, we get:

6 - 8u + 36 = 42

-8u + 42 = 42

-8u = 0

u = 0

Therefore, the width of the removed section is 0 feet, meaning no section was removed. So, the original width remains the same, and the length of the side labeled with a question mark is also 8 feet.

Therefore, the length of the side labeled with a question mark is 8 feet.