Please answer soon!

Imagine drawing a figure with the following conditions:

A quadrilateral with at least two right angles. Is the figure described unique? Explain why or why not.

To construct a quadrilateral uniquely, five measurements are required. A quadrilateral can be constructed uniquely if the lengths of its four sides and a diagonal are given or if the lengths of its three sides and two diagonals are given.

Just given two angles we cannot construct a unique quadrilateral. There may be an infinite number of quadrilaterals having atleast two right angles

Examples:

All squares with varying sides

All trapezoids with two right angles

All rectangles with different dimensions

and so on.

Answer is

No.

MrRoyal MrRoyal · Answer 2 · 2022-01-21T18:27:43+01:00

MrRoyal MrRoyal

21-01-2022

The figure described is not unique.

From the question, we understand that the quadrilateral drawn has at least two right triangles.

The following shapes have at least 2 right triangles

A right trapezoid
A rectangle
A square

Since there are more than one shape that has the described property.

We can conclude that, the figure is not unique

Please answer soon! Imagine drawing a figure with the following conditions: A quadrilateral with at least two right angles. Is the figure described unique? Explain why or why not.

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Please answer soon!

Imagine drawing a figure with the following conditions:

A quadrilateral with at least two right angles. Is the figure described unique? Explain why or why not.