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Understanding Elementary Shapes - Perpendicular Lines

Grade 6CBSE

Review the key concepts, formulae, and examples before starting your quiz.

🔑Concepts

Perpendicular lines are two lines that intersect each other such that the angle between them is a right angle (9090^{\circ}). Visually, these lines look like the intersection of the letter 'T' or the edges of a square meeting at a corner.

The symbol used to represent perpendicular lines is \perp. For example, if a line ABAB is perpendicular to line CDCD, it is written mathematically as ABCDAB \perp CD.

When two lines are perpendicular, all four angles formed at the point of intersection are equal to 9090^{\circ}. This creates a perfect 'plus' (++) shape where each quadrant is identical in angle measure.

A perpendicular bisector is a line that is perpendicular to a given line segment and passes through its midpoint, dividing the segment into two equal lengths. Visualizing a horizontal segment ABAB being cut exactly in the middle by a vertical line XYXY represents a perpendicular bisector.

In geometric tools, 'Set-Squares' are used to draw perpendicular lines. These are triangular tools where one angle is exactly 9090^{\circ}, allowing students to align one edge with a line and draw the perpendicular line along the other edge.

Perpendicular lines are frequently seen in real-world objects. For instance, the adjacent edges of a postcard, the vertical pole of a lamp post meeting the horizontal ground, and the corners of a rectangular window all represent perpendicularity.

If two lines are perpendicular to the same line in a plane, they are parallel to each other. Visualizing the two vertical sides of a ladder being perpendicular to each horizontal rung shows how the vertical sides stay parallel.

📐Formulae

If L1L2, then the angle θ=90\text{If } L_1 \perp L_2, \text{ then the angle } \theta = 90^{\circ}

For a perpendicular bisector of segment AB at midpoint M:AM=MB=12AB\text{For a perpendicular bisector of segment } AB \text{ at midpoint } M: AM = MB = \frac{1}{2} AB

Area of a Right-Angled Triangle (formed by perpendicular base and height)=12×base×height\text{Area of a Right-Angled Triangle (formed by perpendicular base and height)} = \frac{1}{2} \times \text{base} \times \text{height}

💡Examples

Problem 1:

A line segment PQPQ of length 10 cm10 \text{ cm} has a perpendicular bisector XYXY that intersects PQPQ at point OO. Find the length of POPO.

Solution:

Step 1: Identify the properties of a perpendicular bisector. A perpendicular bisector divides a line segment into two equal parts at a 9090^{\circ} angle. Step 2: Since XYXY is the perpendicular bisector of PQPQ at OO, point OO is the midpoint of PQPQ. Step 3: Use the midpoint formula: PO=12×PQPO = \frac{1}{2} \times PQ. Step 4: Substitute the given value: PO=12×10 cm=5 cmPO = \frac{1}{2} \times 10 \text{ cm} = 5 \text{ cm}.

Explanation:

The definition of a bisector ensures that the segment is split into two equal halves, so we simply divide the total length by 22.

Problem 2:

In the English alphabet 'L', if the vertical bar is line segment ABAB and the horizontal bar is BCBC, identify the relationship between ABAB and BCBC and state the measure of ABC\angle ABC.

Solution:

Step 1: Observe the shape of the letter 'L'. The two segments meet at a sharp corner. Step 2: In geometry, the edges of an 'L' shape are perpendicular to each other. Step 3: Write the relationship using the symbol: ABBCAB \perp BC. Step 4: Since the lines are perpendicular, the angle formed at the vertex BB is a right angle. Step 5: Therefore, ABC=90\angle ABC = 90^{\circ}.

Explanation:

Perpendicularity is defined by the intersection of lines at a 9090^{\circ} angle, which is the characteristic shape of the letter 'L'.