A table has a length of 4 1/2 feet and width of 2 1/4 feet. Find the area of the table in square feet. (1 point)

10 1/8

To find the area of the table, you multiply the length and width.

Length = 4 1/2 feet = 9/2 feet = 4.5 feet
Width = 2 1/4 feet = 9/4 feet = 2.25 feet

Area = Length x Width
Area = 4.5 feet x 2.25 feet
Area = 10.125 square feet = 10 1/8 square feet

So, the area of the table in square feet is 10 1/8.

Byron calculated the area of the rectangle as 22 square centimeters. What is the error in his reasoning and what is the correct answer? (1 point) Responses:
Byron found the perimeter of the rectangle. The correct area is 11 square centimeters.
Byron found the perimeter of the rectangle. The correct area is 24 1/4 square centimeters.
Byron found the perimeter of the rectangle. The correct area is 29 1/4 square centimeters.* MY ANSWER
Byron found the perimeter of the rectangle. The correct area is 22 square centimeters.

Byron found the perimeter of the rectangle. The correct area is 29 1/4 square centimeters.

If Byron calculated the area as 22 square centimeters, he probably found the perimeter instead. The error in his reasoning is that he incorrectly calculated the area. The correct area of the rectangle is 29 1/4 square centimeters.

Find the area of the rectangle LMNO, with vertices L(−5,7),M(−1,7), N(−1,−3), and O(−5,−3).(1 point)
Responses:
8 units by the power of 2
28 ​units by the power of 2
40 ​units by the power of 2
100 ​units by the power of 2

To find the area of the rectangle LMNO, we can use the formula for the area of a rectangle which is length x width.

To find the length, we calculate the distance between points L and M, which is 4 units.
To find the width, we calculate the distance between points L and O, which is 10 units.

Area = length x width
Area = 4 units x 10 units
Area = 40 square units

Therefore, the area of the rectangle LMNO is 40 units by the power of 2.

So, the correct response is:
40 ​units by the power of 2

u sure???????!

Apologies for the confusion in my previous response. Let's recalculate the area of the rectangle LMNO using the coordinates provided for the vertices L(−5,7), M(−1,7), N(−1,−3), and O(−5,−3).

First, we find the length of the rectangle by calculating the distance between points L(−5,7) and M(−1,7):
Length = 4 units

Then, we find the width of the rectangle by calculating the distance between points L(−5,7) and O(−5,−3):
Width = 10 units

Now, we can calculate the area of the rectangle:
Area = Length x Width
Area = 4 units x 10 units
Area = 40 square units

Therefore, after recalculating, the correct area of the rectangle LMNO is 40 square units.

So, the correct response is:
40 ​units by the power of 2.

Rani needs to buy sod to cover his new backyard. His landscape design is graphed, and the yard has corners at (2,20), (12,20), (12,5), and (2,5). Solve for the area of his yard. (1 point) Responses:
60 sq. ft.
46 sq. ft.
80 sq. ft.
150 sq. ft. MY ANSWER IS IT CORECCT????????

To find the area of Rani's backyard, we can calculate the distance between points (2,20) and (12,20) to find the length, and between points (2,20) and (2,5) to find the width.

Length:
Distance between (2,20) and (12,20):
12 - 2 = 10 feet

Width:
Distance between (2,20) and (2,5):
20 - 5 = 15 feet

Area = Length x Width
Area = 10 feet x 15 feet
Area = 150 square feet

Therefore, the area of Rani's yard is 150 sq. ft. Based on the calculations, your answer is correct.

So, the response "150 sq. ft." is correct.

Rhonda is going to cover part of her yard in solar panels. If she adds a second panel to the right so that they are touching, what will the total area be for the two solar panels? (1 point) Responses:
40 sq. ft.
18 sq. ft.
80 sq. ft.
20 sq. ft. MY ANSWER IS CORRECT?????????????????!

To determine the total area for the two solar panels, we need to know the dimensions of one solar panel. Since this information is not provided in the question, it is not possible to determine the exact area of the two solar panels or confirm if your answer is correct.

In order to calculate the total area when the second panel is added, the length and width must be known. If the dimensions of the single solar panel are provided, the area of one panel can be calculated and then the total area for two panels can be determined.

Without additional information, it is not possible to determine the total area for the two solar panels. Therefore, the correct answer cannot be confirmed based on the information provided.