of 22 Points:1 / 1 <img src="data:image/png;base64,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"> In the figure above, P is the midpoint of AB and Q is the midpoint of BC . If the area of trapezoid APQC is 20, what is the area of △ABC?

Cập nhật ngày: 01-08-2024

Chia sẻ bởi: Nguyễn Đăng An

of 22
Points:1 / 1

In the figure above, P is the midpoint of AB
and Q is the midpoint of BC . If the area of
trapezoid APQC is 20, what is the area of
△ABC?

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