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Which statements are true about the area of the figure? Check all that apply. A figure can be broken into 2 rectangles. One rectangle has a base of 3 and one-half and a height of 2 and one-half. The other
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Which statements are true about the area of the figure? Check all that apply.

A figure can be broken into 2 rectangles.

One rectangle has a base of 3 and one-half and a height of 2 and one-half.

The other rectangle has a base of one-half and a height of one-half.

The area can be found by multiplying 3 by 2One-half and adding the product of One-half and One-half.

The area can be found by multiplying 3 by 3 and one-half and then subtracting the product of 3 and One-half.

The area can be found by multiplying 3 by 2One-half and adding the product of 3 and One-half.

The area can be found by multiplying 3 by 3 and one-half and then subtracting the product of 2One-half and One-half.

The area can be found by multiplying 2One-half by 3One-half and adding the product of One-half and One-half.

The area is 7Three-fourths square units.

The area is 9One-fourth square units. The area is 9 square units.

Which statements are true about the area of the figure? Check all that apply. A figure-example-1
User Astri
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2 Answers

2 votes

Answer:9 square unit.

Step-by-step explanation:The area can be found by multiplying 3 by 3 and one-half and then subtracting the product of 3 and One-half.

The area can be found by multiplying 3 by 2One-half and adding the product of 3 and One-half.

The area can be found by multiplying 3 by 3 and one-half and then subtracting the product of 2One-half

User Nirav Kotecha
by
8.3k points
2 votes

Answer:

B - The area can be found by multiplying 3 by 2One-half and adding the product of One-half and One-half.

C - The area can be found by multiplying 3 by 2One-half and adding the product of 3 and One-half.

E - The area can be found by multiplying 2One-half by 3One-half and adding the product of One-half and One-half.

H - The area is 9 square units.

Explanation:

took the test

User Ziky
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8.5k points
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