Area of Parallelogram: Formula and Applications

Questions and Answers

What is the relationship between the base and height of a parallelogram?

• The base and height have a sinusoidal relationship
• The base and height are directly proportional to the area (correct)
• The base and height are inversely proportional to the area
• The base and height have no effect on the area

Which term refers to the perpendicular distance between the base and the opposite side of a parallelogram?

• Altitude (correct)
• Apex
• Alleyway
• Acreage

What is the formula for finding the area of a parallelogram?

• $A = B^2 + h^2$
• $A = Bh$ (correct)
• $A = Bh^2$
• $A = \frac{1}{2}Bh$

How are parallelograms similar to rectangles?

They both have parallel sides (A)

What is the formula for the area of a rectangle?

$A = Bh$ (C)

In what real-world application can the area of a parallelogram be used?

Estimating the amount of roofing material needed for a construction project (D)

What is a special case of a parallelogram where both base lengths are equal?

Rectangle (C)

How can the area of a parallelogram be calculated using rectangles?

By dividing it into two rectangles (A)

What is the total area of a parallelogram after dividing it into two rectangles?

$A_{ABCD} = A_{ABCF} + A_{BCFD}$ (C)

What does the formula $A_{ABCD} = 2BD \times BC$ represent?

The area of a parallelogram (C)

What is the final formula for the area of a parallelogram?

$A_{ABCD} = Bh$ (B)

What does the formula $A = Bh$ represent?

Area of a parallelogram (C)

What does the base and height represent in the formula $A = Bh$?

$B$ represents width and $h$ represents length (C)

How can the area of a piece of roofing material be calculated?

$A = Bh$ using base as width and height as length (B)

Flashcards

Parallelogram

A quadrilateral with both pairs of opposite sides parallel.

Area of Parallelogram

Region enclosed by a parallelogram calculated as A = B * h.

Base of Parallelogram

One of the parallel sides of the parallelogram used in area calculation.

Height of Parallelogram

The perpendicular distance from the base to the opposite side.

Formula for Area

The formula A = Bh calculates the area of a parallelogram.

Proportional Relationship

The area of a parallelogram is directly proportional to its base and height.

Parallelogram vs Rectangle

Both have parallel sides; rectangles have equal lengths and heights.

Real-World Applications

Calculating areas, like roofing material, involves the area of parallelograms.

Proof of Area Formula

Derived by comparing with rectangles; area still as A = Bh.

Rectangle Area Formula

The area of a rectangle is calculated as A = B * h, like a parallelogram.

Dividing Parallelogram

A technique used to find area by splitting it into rectangles.

Base Lengths Equality

In a parallelogram, opposite sides (bases) are equal in length.

Summation of Areas

Total area of parallelogram = area of rectangles added together.

Perpendicularity

The height must be perpendicular to the base to measure area correctly.

Study Notes

Area of Parallelogram

A parallelogram is a quadrilateral with both pairs of opposite sides parallel. The area of a parallelogram is the region it encloses and can be calculated using its base and height. In this article, we will explore the relationship between the base and height of a parallelogram, the formula for finding the area, comparisons to other polygons, real-world applications, and various proofs and derivations.

Relationship to Base and Height

The base and height of a parallelogram are directly proportional to the area of the parallelogram. The height is the perpendicular distance between the base and the opposite side, and it is also known as the altitude or the vertical height. The base is one of the parallel sides of the parallelogram. The area of a parallelogram is given by the formula:

$$A = Bh$$

where:

• A is the area of the parallelogram
• B is the base of the parallelogram
• h is the height of the parallelogram

Formula for Finding Area

The formula for finding the area of a parallelogram is:

$$A = Bh$$

where:

• A is the area of the parallelogram
• B is the base of the parallelogram
• h is the height of the parallelogram

Comparison to Other Polygons

Parallelograms are similar to rectangles in that they both have parallel sides. However, parallelograms can have different base lengths and heights, while rectangles have equal base lengths and heights. The area of a rectangle is given by the formula:

$$A = Bh$$

where:

• A is the area of the rectangle
• B is the base of the rectangle
• h is the height of the rectangle

Real-World Applications

Parallelograms have various real-world applications, such as in construction. For example, the area of a piece of roofing material can be calculated as a parallelogram, with the base as the length of the roof and the height as the thickness of the roofing material. This allows for accurate measurement and estimation of the amount of roofing material needed for a project.

Proofs and Derivations

There are several ways to prove and derive the formula for the area of a parallelogram. One common method is to use the concept of a rectangle, which is a special case of a parallelogram where both base lengths are equal. The area of a rectangle can be calculated using the formula:

$$A = Bh$$

where:

• A is the area of the rectangle
• B is the base of the rectangle
• h is the height of the rectangle

Now, consider a parallelogram ABCD with base AD and height BC. To find the area of the parallelogram, we can divide it into two rectangles:

1. Rectangle ABCF with base AC and height BC
2. Rectangle BCFD with base CD and height BC

The area of rectangle ABCF is given by:

$$A_{ABCF} = AC \times BC$$

The area of rectangle BCFD is given by:

$$A_{BCFD} = CD \times BC$$

The total area of the parallelogram is the sum of the areas of these rectangles:

$$A_{ABCD} = A_{ABCF} + A_{BCFD}$$

Substituting the respective base and height values, we get:

$$A_{ABCD} = (AD + CD) \times BC$$

Since AD and CD are equal (as they are both base lengths of the parallelogram), we can simplify this expression to:

$$A_{ABCD} = 2BD \times BC$$

Now, if we let BD represent the base B and BC represent the height h of the parallelogram, we have:

$$A_{ABCD} = 2B \times h$$

Dividing both sides by 2, we get the final formula for the area of a parallelogram:

$$A_{ABCD} = Bh$$

This formula can be used to find the area of any parallelogram, given its base and height.

Description

Explore the relationship between the base and height of a parallelogram, the formula for finding the area, comparisons to other polygons, real-world applications, and various proofs and derivations. Understand the direct proportionality between the base, height, and area of a parallelogram, and its significance in real-world scenarios.