Figure abcd is a parallelogram. points x and y are placed so that bx ≅ dy and cd ⊥ xy. the area of bxyc is 71.5 square units. what is the area of abcd? 99 square units 110 square units 126 square units 143 square units
Figure Abcd Is A Parallelogram. Points X And Y Are Placed So That Bx ≅ Dy And Cd ⊥ Xy. The Area Of Bxyc Is 71.5 Square Units. What Is The Area Of Abcd? 99 Square Units 110 Square Units 126 Square Units 143 Square Units
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Figure Abcd Is A Parallelogram. Points X And Y Are Placed So That Bx ≅ Dy And Cd ⊥ Xy. The Area Of Bxyc Is 71.5 Square Units. What Is The Area Of Abcd? 99 Square Units 110 Square Units 126 Square Units 143 Square Units. To prove the statements given in the question, we will follow these steps systematically. The area of bxyc is 71.5.
How to Find the Area of a Parallelogram in 3 Easy Steps — Mashup Math from www.mashupmath.com
Dilation of scale factor of 5, because it would become more wide and open by a factor of 5. Points $x$ and $y$ are placed so that $\overline {\mathrm {bx}} \cong \overline {\mathrm {dy}}$ and $\overline {\mathrm {cd}} \perp \overline {\mathrm {xy}}$. Points x and y are placed so that bx ≅ dy and cd ⊥ xy.
Y 4 C Figure Abcd Is A Parallelogram Points X And Y Are Placed So That Bx Dy And Cdj Xy The Area Of Bxyc Is 71 5 Square Units What Is The Area Of Abcd O 99 Square.
Area (abcd) = $$11 \times cd = 11. What is the area of abcd? Overline bx≌ overline dy and the area of bxyc is 71.5 square units.
Dilation Of Scale Factor Of 5, Because It Would Become More Wide And Open By A Factor Of 5.
Points x and y are placed so that bx ≅ dy and cd ⊥ xy. The area of bxyc is 71.5. The area of parallelogram abcd is calculated.
What Is The Area Of Abcd?
Points x and y are placed so that bx ≅ dy and cd ⊥ xy. Points $x$ and $y$ are placed so that $\overline {\mathrm {bx}} \cong \overline {\mathrm {dy}}$ and $\overline {\mathrm {cd}} \perp \overline {\mathrm {xy}}$. Figure abcd is a parallelogram.
What Is The Area Of Abcd?
Points x and y are placed so that overline cd⊥ overline xy. Opposite sides of a parallelogram are equal in length. Geometric modeling figure abcd is a parallelogram.
The Area Of Bxyc Is 71.5 Square Units.
To prove the statements given in the question, we will follow these steps systematically. The area of bxyc is 71.5 square units. We can infer that xy divides the parallelogram abcd into 2 trapeziums of equal areas.
