have ##4## sides and ##4## angles. The exterior angles of any convex polygon (ie no interior angle is less than ##180## degrees) add up to ##360## degrees (##4## right angles). If an interior angle is a right angle then the corresponding exterior angle must also be a right angle (interior + exterior = a straight line = ##2## right angles).
Here ##3## internal angles are each right angles so the corresponding ##3## external angles are also right angles making a total of ##3## right angles. The remaining external angle must be ##1## right angle ##(=4 – 3)## so the remaining ##4th## interior angle is also a right angle.
Therefore if ##3## internal angles are right angles the 4th angle must also be a right angle.
So no quadrilaterals have exactly ##3## right angles.