Properties of Quadrilaterals

A quadrilateral is any shape with four sides. There are different types of quadrilaterals, and each one has its own special properties. Let's take a closer look at the most common ones: the square, rectangle, parallelogram, and rhombus.

1. Square

• Sides: A square has four sides that are all the same length. No side is longer or shorter than the others.
• Angles: All four corners (angles) of a square are exactly $90°$. These are called right angles. Think of the corner of a piece of paper—that's a right angle.
• Opposite Sides: The sides that are across from each other (opposite sides) are parallel. This means they run in the same direction and will never meet, no matter how far you extend them.
• Diagonals: A diagonal is a line that connects opposite corners of a square. In a square, the diagonals do two important things:
  1. They cut each other exactly in half (this is called bisecting).
  2. They cross each other at a $90°$ angle, forming a right angle where they meet.

2. Rectangle

• Sides: In a rectangle, the opposite sides are equal in length and parallel. This means the two longer sides are equal, and the two shorter sides are equal.
• Angles: Just like a square, all four angles in a rectangle are $90°$ right angles.
• Diagonals: The diagonals of a rectangle also bisect each other, which means they cut each other in half. However, unlike in a square, the diagonals of a rectangle do not necessarily cross at a $90°$ angle.

3. Parallelogram

• Sides: In a parallelogram, the opposite sides are equal in length and parallel, just like in a rectangle. But unlike a rectangle, the sides might not be right angles.
• Angles: The angles that are across from each other (opposite angles) are equal. For example, if one angle is $60°$, the opposite angle will also be $60°$.
• Diagonals: The diagonals of a parallelogram bisect each other, meaning they cut each other in half. However, they don't form right angles where they cross.

4. Rhombus

• Sides: A rhombus is like a squished square—it has four equal sides, but the angles aren't $90°$.
• Angles: The opposite angles in a rhombus are equal, just like in a parallelogram. So if one angle is $70°$, the opposite angle will also be $70°$.
• Diagonals: The diagonals of a rhombus do two special things: 3. They bisect each other (cut each other in half). 4. They cross at a $90°$ angle, just like in a square. They also cut the angles of the rhombus in half.

Why This Matters

Knowing these properties is really helpful when solving geometry problems. For example, if you know a shape is a rectangle, you can use its properties to find missing angles or side lengths without doing too much calculation. These properties give you shortcuts that make solving problems easier.

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