All squares are rectangles. Not all rectangles are squares. A quadrilateral is a rectangle if all four internal angles are 90^@. A quadrilateral is a square if all four internal angles are 90^@ and all four sides are equal in measure. Note that the first condition for a square is the same as the only condition for a rectangle, and thus all squares are rectangles. However, there is no condition which requires a rectangle to have four equal sides, and thus not all rectangles are squares. For example: The above is a rectangle, as all four angles are 90^@, but is not a square, as the two vertical sides are shorter than the two horizontal sides.
Types of Quadrilaterals: Definition, Properties, Problems & FAQs
Properties of Rectangle Definition, Formulas, and Examples
The number of lines of symmetry in a rectangle and a square are ----- (equal/ unequal)
Draw rectangular shapes with the Rectangle tool
Is a Square a Rectangle? Definition, Examples, Facts, FAQs
Lesson Explainer: Areas of Rectangles and Squares
Rectangle Definition, Properties, Area, Formula, Examples
Area of Rectangle - Definition, Formula & Examples
Difference Between a Square and a Rectangle
Rectangle (Definition, Shape, Properties, Area, Formula, Examples)
Quadrilaterals (video lessons, examples and solutions)
A square is a
A Rectangle Is a Square but a Square Is Not a Rectangle [Solved]
