Calculate Rectangle Perimeter: A Comprehensive Guide
The perimeter of rectangle PQRS is the total length of its boundaries. As a rectangle has four sides (PQ, QR, RS, and SP), the perimeter is calculated by adding the lengths of all four sides. The formula for the perimeter of a rectangle is P = 2(L + W), where P is the perimeter, L is the length, and W is the width. To find the perimeter of Rectangle PQRS, simply add the lengths of each side and multiply the result by 2.
How to Calculate the Perimeter of a Rectangle: A Step-by-Step Guide
In the realm of geometry, understanding the perimeter of a rectangle, denoted by the letter P, is a fundamental concept. It represents the total length of the boundary that encompasses the shape. To calculate the perimeter of a rectangle, we embark on a journey of understanding its properties and employing a straightforward formula.
What is a Rectangle?
A rectangle, like a faithful companion, is a quadrilateral with four right angles. It possesses four sides, each forming a straight line, much like the walls of a perfectly symmetrical house. In our adventure, we’ll explore Rectangle PQRS, a specific rectangle with sides denoted as PQ, QR, RS, and SP.
Exploring the Sides of a Rectangle
The sides of a rectangle, akin to the edges of a painting, are the line segments that define its boundary. Rectangle PQRS boasts four sides: PQ, QR, RS, and SP. These sides create the rectangular frame that we’ll use to calculate its perimeter.
Understanding Length and Width
In the world of rectangles, two terms hold special significance: length and width. The length represents the horizontal side, like a river flowing from one side to another. The width, on the other hand, is the vertical side, like a waterfall cascading down. These two measurements are crucial for determining the perimeter of Rectangle PQRS.
Unlocking the Perimeter Formula
Now, we approach the crux of our journey: the perimeter formula. It’s a magical incantation that transforms the length (L) and width (W) of a rectangle into its perimeter (P). The formula reads like a secret code:
P = 2 (L + W)
Applying the Formula to Rectangle PQRS
To calculate the perimeter of Rectangle PQRS, we’ll employ this magical formula. We’ll begin by measuring its length (L) and width (W). Once we have these values, we’ll substitute them into the formula and perform the calculation, unveiling the secret of the perimeter.
Example: Calculating the Perimeter
Let’s imagine we’re given Rectangle PQRS with a length (L) of 5 centimeters and a width (W) of 3 centimeters. We’ll use our formula to calculate its perimeter:
P = 2 (L + W)
P = 2 (5 cm + 3 cm)
P = 2 (8 cm)
P = 16 cm
And just like that, we’ve successfully calculated the perimeter of Rectangle PQRS, which is 16 centimeters. It’s like unlocking a hidden treasure!
Describe rectangles as quadrilaterals with four right angles.
How to Calculate the Perimeter of Rectangle PQRS: A Step-by-Step Guide
In the realm of geometry, understanding the concept of perimeter is crucial. Perimeter, being the total length around a closed figure, plays a vital role in calculating the boundary of any polygon. So, let’s embark on a journey to unravel the secrets of calculating the perimeter of a rectangle, with Rectangle PQRS as our guide.
Understanding Rectangles
Rectangles, as we know, are quadrilaterals—four-sided figures—that boast the unique feature of having four right angles. Rectangle PQRS, in all its glory, exemplifies this very characteristic, with its sides PQ, QR, RS, and SP forming a perfect rectangle.
Defining Length and Width
Sides, the line segments that bind the rectangle’s boundaries, play a pivotal role in determining its perimeter. For Rectangle PQRS, these sides are PQ, QR, RS, and SP. However, for rectangles, we have a special distinction—the concept of length and width. Length, the horizontal side, and width, the vertical side, come together to define the dimensions of a rectangle.
The Perimeter Formula for Rectangles
Now, let’s unveil the secret formula for calculating the perimeter of rectangles. Drumroll, please! It’s the hallowed formula P = 2 (L + W), where:
- P represents the perimeter, the length of the boundary.
- L represents the length, the horizontal side.
- W represents the width, the vertical side.
Armed with this formula, we can now embark on a quest to find the perimeter of Rectangle PQRS.
Calculating the Perimeter of Rectangle PQRS
To illustrate the application of our formula, let’s use Rectangle PQRS as an example. Suppose its length, L, is 10 cm and its width, W, is 5 cm. Plugging these values into our formula, we get:
P = 2 (L + W)
P = 2 (10 cm + 5 cm)
P = 2 (15 cm)
P = 30 cm
Eureka! The perimeter of Rectangle PQRS is 30 cm. With this newfound knowledge, we can conquer any rectangle perimeter problem that comes our way.
Unveiling the Perimeter of Rectangle PQRS: A Comprehensive Guide
In the realm of geometry, rectangles emerge as captivating shapes that intrigue our curiosity. Their precise angles and uniform sides make them a cornerstone of everyday objects and architectural marvels alike. Today, we embark on a journey to unravel the secrets behind calculating the perimeter of Rectangle PQRS, equipping you with the knowledge to navigate the captivating world of geometry.
Defining Perimeter: Encapsulating the Length
Perimeter, the essence of a closed figure, embodies the totality of its enclosing boundaries. It represents the aggregate distance around the figure’s unyielding path. In the realm of rectangles, the perimeter encapsulates the collective lengths of all four sides, encircling the shape like an unbreakable embrace.
Rectangle PQRS: A Canvas for Exploration
Among the myriad of rectangles that grace the world of geometry, Rectangle PQRS stands out as our exemplar. Its four sides, distinctly labeled as PQ, QR, RS, and SP, form a harmonious quartet, each playing a crucial role in determining the rectangle’s defining trait: its perimeter.
Navigating the Sides: Length and Width
Rectangles, by their very nature, possess two fundamental dimensions: length and width. Length, stretching horizontally, emerges as the longer of the two dimensions, while width, gracing the vertical axis, assumes the role of the shorter companion. These complementary dimensions intertwine seamlessly to define the unique shape of Rectangle PQRS.
Unveiling the Perimeter Formula: A Mathematical Masterpiece
The perimeter of Rectangle PQRS, a sentinel guarding the shape’s boundary, can be precisely calculated using a timeless formula: P = 2 (L + W), where P represents the coveted perimeter, L embodies the elongated length, and W signifies the confined width. This formula, a guiding light in the realm of geometry, empowers us to decode the mystery of Rectangle PQRS’s perimeter.
Applying the Formula: A Numerical Journey
To illuminate the practical application of the formula, let us embark on a numerical expedition. Suppose Rectangle PQRS basks in the glory of a length measuring 10 units and a width gracefully spanning 5 units. Substituting these values into our treasured formula, we unveil the perimeter of Rectangle PQRS:
P = 2 (L + W)
P = 2 (10 units + 5 units)
P = 2 (15 units)
P = 30 units
Thus, Rectangle PQRS, with its majestic length and delicate width, flaunts a perimeter of 30 units, encapsulating its grand presence.
Explain that sides are the line segments forming the rectangle’s boundary.
How to Calculate the Perimeter of Rectangle PQRS: A Simple Guide
Perimeter, the total length around a closed figure, plays a crucial role in geometry. And if you have a rectangle like PQRS, calculating its perimeter is as easy as knowing its length (the longer horizontal side) and width (the shorter vertical side).
Step 1: Understand Rectangles and Their Properties
Rectangles, as you may recall, are quadrilaterals (four-sided shapes) with four right angles. This means each corner of PQRS forms a perfect 90-degree angle. Our rectangle PQRS has four sides: PQ, QR, RS, and SP.
Step 2: Identifying the Rectangle’s Sides
The sides of a rectangle are essentially the line segments that form its boundary. In our case, the sides of Rectangle PQRS are PQ, QR, RS, and SP. These four sides enclose the rectangle and give it its shape.
Step 3: Unveiling the Perimeter Formula for Rectangles
The magical formula for calculating the perimeter of a rectangle is:
P = 2 (L + W)
where:
- P represents the perimeter
- L represents the length
- W represents the width
Step 4: Finding the Perimeter of Rectangle PQRS
To find the perimeter of PQRS, we need to know its length and width. Let’s say the length (L) is 5 cm and the width (W) is 3 cm.
Plugging these values into the formula, we get:
P = 2 (5 cm + 3 cm)
P = 2 (8 cm)
P = 16 cm
Therefore, the perimeter of Rectangle PQRS is 16 cm.
Calculating the perimeter of a rectangle is a fundamental skill in geometry. By understanding the concept of perimeter, the properties of rectangles, and the handy Perimeter Formula, you can easily determine the perimeter of any rectangle you encounter.
How to Calculate the Perimeter of Rectangle PQRS: A Guide for Curious Minds
In the realm of geometry, rectangles hold a special place as familiar and widely used shapes. Understanding the perimeter of a rectangle is crucial for a variety of real-world applications. This article will guide you through a step-by-step process to calculate the perimeter of Rectangle PQRS, a specific rectangle that will serve as our example.
Understanding Perimeter
- Definition: Perimeter refers to the total length of the boundary of a closed figure. In the case of a rectangle, it is the sum of the lengths of all four sides.
Rectangles and Their Properties
- Rectangles are quadrilaterals, meaning they have four sides.
- Unlike other quadrilaterals, rectangles boast four right angles, each measuring 90 degrees
Sides of Rectangle PQRS
- PQ, QR, RS, and SP are the four sides that form the boundary of Rectangle PQRS.
Length and Width of a Rectangle
- Length is the horizontal side of a rectangle.
- Width is the vertical side of a rectangle.
Perimeter Formula for Rectangles
-
The perimeter (P) of a rectangle is calculated using the formula:
- P = 2 * (Length + Width)
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This formula takes into account that the perimeter is the sum of twice the length and twice the width.
Calculating the Perimeter of Rectangle PQRS
Example: Let’s say we have Rectangle PQRS with a length of 10 cm and a width of 5 cm.
- Step 1: Identify the length (L) as 10 cm and the width (W) as 5 cm.
- Step 2: Substitute the values into the perimeter formula:
- P = 2 * (10 cm + 5 cm)
- Step 3: Simplify the expression:
- P = 2 * 15 cm
- Step 4: Calculate the perimeter:
- P = 30 cm
Now you have a clear understanding of how to calculate the perimeter of any rectangle, including Rectangle PQRS. This knowledge will come in handy in various situations, from solving geometry problems to designing real-world projects.
How to Calculate the Perimeter of Rectangle PQRS: A Comprehensive Guide
What is Perimeter?
Imagine you’re measuring the length of a fence around your yard. The perimeter is the entire length of that fence, the boundary that encloses the entire area. In geometry, the perimeter refers to the total distance around any closed figure.
Rectangles and Their Properties
Rectangles, like your yard, are quadrilaterals with four right angles. They have four sides, let’s call them PQ, QR, RS, and SP. These sides form the perimeter of the rectangle.
Sides of a Rectangle
Think of each of these sides as a line segment that forms the boundary of the rectangle. These sides are the building blocks of the perimeter.
Length and Width of a Rectangle
Rectangles have two special sides: length and width. Length is the horizontal side, while width is the vertical side. These terms help us distinguish the longer and shorter sides.
Perimeter Formula for Rectangles
Now, let’s figure out how to calculate the perimeter of a rectangle. There’s a handy formula that we can use:
P = 2 (L + W)
where:
- P represents the perimeter
- L represents the length
- W represents the width
This formula simply adds up the length of all four sides to give us the perimeter.
Calculating the Perimeter of Rectangle PQRS
Let’s put it all together and find the perimeter of Rectangle PQRS. Let’s say its length (L) is 8 cm and its width (W) is 5 cm.
P = 2 (L + W)
P = 2 (8 cm + 5 cm)
P = 2 (13 cm)
P = 26 cm
So, the perimeter of Rectangle PQRS is 26 cm. This tells us that the total length around the entire rectangle is 26 cm.
How to Calculate the Perimeter of Rectangle PQRS: A Comprehensive Guide
Embark on a mathematical journey as we delve into the intriguing world of geometry and discover the secrets to calculating the perimeter of a rectangle.
Perimeter: The Encompassing Measure
Imagine a beautiful garden surrounded by a fence. The total length of this fence represents the perimeter of the garden, which is the sum of all its sides. In geometry, perimeter is the total distance around the boundary of a closed figure, such as a rectangle.
Rectangles: The Building Blocks of Perimeter
Rectangles are special quadrilaterals characterized by their four right angles. They resemble boxes with four sides named PQ, QR, RS, and SP for our example rectangle, PQRS.
The Sides of a Rectangle: The Framework
These sides are the line segments that form the rectangle’s boundary. PQRS has four sides: PQ, QR, RS, and SP. Understanding these sides is crucial for calculating the perimeter.
Length and Width: The Dimensions of a Rectangle
Every rectangle has a length (the horizontal side) and a width (the vertical side). These dimensions are essential for determining the perimeter.
The Perimeter Formula: The Key to Unlocking Perimeter
The perimeter of a rectangle is calculated using this simple formula:
P = 2 (L + W)
where:
- P represents the perimeter
- L represents the length
- W represents the width
Applying the Formula to Rectangle PQRS: A Practical Example
Let’s put the formula into practice by calculating the perimeter of Rectangle PQRS. Suppose its length is 10 cm and its width is 5 cm.
P = 2 (L + W)
P = 2 (10 cm + 5 cm)
P = 2 (15 cm)
P = 30 cm
Therefore, the perimeter of Rectangle PQRS is 30 centimeters.
Calculate the Perimeter of Rectangle PQRS: A Mathematical Tale
Imagine a magical rectangle named PQRS, nestling comfortably on a sheet of paper. How long is the journey around its enchanting boundary? Let’s embark on a mathematical adventure to uncover the secret of its perimeter.
Understanding Perimeter
Perimeter, akin to a magical lasso, encircles a closed figure, representing the total length of its enclosing boundary. It’s like the sum of all the footsteps you’d take to walk around your treasured rectangle.
Rectangular Wonders
Rectangles, graceful quadrilaterals, boast four right angles, like four wise guardians standing at the corners. Meet our protagonist, Rectangle PQRS, with its mesmerizing sides: PQ, QR, RS, and SP. Each side forms a vital part of its enchanting boundary.
Exploring Length and Width
Like two dancing partners, length and width gracefully define a rectangle’s proportions. Length, the horizontal charmer, stretches across the rectangle’s breadth, while width, the vertical enchantress, gracefully rises from base to peak.
Unveiling the Perimeter Formula
Behold the mystical formula that unlocks the secrets of a rectangle’s perimeter: P = 2 (L + W). Here, P represents the coveted perimeter, L denotes the tantalizing length, and W gracefully represents the enchanting width. It’s akin to a magic wand, transforming these measurements into the perimeter’s captivating value.
Embarking on the Perimeter Quest
Let’s unravel the perimeter of our beloved Rectangle PQRS. Suppose its length, L, measures 10 magical units, and its width, W, spans 5 enchanting units. Plugging these mystical values into our formula, we conjure the perimeter:
P = 2 (L + W)
P = 2 (10 + 5)
P = 2 (15)
P = **30 units**
Thus, the captivating journey around Rectangle PQRS unfolds to a perimeter of 30 enchanting units, leaving us in awe of mathematics’ enchanting powers.
How to Calculate the Perimeter of Rectangle PQRS: A Step-by-Step Guide
Defining Perimeter
Before we delve into the specifics of Rectangle PQRS, let’s establish the foundation. Perimeter, in the realm of geometry, refers to the total length around the boundary of a closed figure. In other words, it is the distance you would travel if you traced all the edges of the shape without lifting your pen or pencil.
Rectangles: Their Properties and Sides
Now, let’s turn our attention to the charming rectangle, a quadrilateral with four right angles. These right angles give rectangles their characteristic square or oblong shape. Rectangle PQRS, in particular, boasts four sides: PQ, QR, RS, and SP. Each side forms a line segment that contributes to the overall perimeter of the rectangle.
Understanding Length and Width
To calculate the perimeter of Rectangle PQRS, we need to distinguish between its length and width. Length refers to the horizontal side of the rectangle, while width represents its vertical side. In Rectangle PQRS, L denotes the length and W stands for the width.
Perimeter Formula for Rectangles: A Magical Equation
Now, here comes the key to unlocking the perimeter of Rectangle PQRS: the formula P = 2 (L + W). This equation holds the secret to finding the total perimeter. Let’s break it down:
- P: Represents the perimeter, which is what we seek to determine.
- L: Stands for the length of Rectangle PQRS.
- W: Symbolizes the width of Rectangle PQRS.
Applying the Formula: Making Sense of the Numbers
To calculate the perimeter of Rectangle PQRS, we need to know its length and width. Suppose we discover that the length is 10 cm and the width is 5 cm. We can then plug these values into the formula:
P = 2 (L + W)
P = 2 (10 cm + 5 cm)
P = 2 (15 cm)
P = **30 cm**
Therefore, the perimeter of Rectangle PQRS is 30 cm. By applying the perimeter formula and understanding the concepts of length and width, we have successfully calculated the total distance around its edges.
How to Effortlessly Calculate the Perimeter of a Rectangle: A Practical Guide
Greetings, curious minds! Embark on a mathematical adventure as we delve into the world of rectangles and unravel the secrets of their perimeter. Whether you’re a geometry enthusiast or simply seeking a practical solution, this comprehensive guide will illuminate the path to understanding.
What is Perimeter, Dear Reader?
Imagine a vibrant garden filled with colorful flowers. The perimeter of the garden represents the total length of its enclosing fence. Similarly, in geometry, the perimeter of a closed figure denotes the total distance around its boundary.
Rectangular Wonders: PQRS Unveiled
Now, let’s shift our focus to the fascinating world of rectangles. These extraordinary quadrilaterals are adorned with four right angles, making them a staple of geometry. Our rectangle, designated PQRS, boasts four sides: PQ, QR, RS, and SP.
Sides of a Rectangle: The Essence of Boundaries
Think of the sides of a rectangle as the line segments that form its protective shell. PQRS is bound by four such sides, each playing a crucial role in determining its perimeter.
Length and Width: The Dynamic Duo
Rectangles exhibit distinct characteristics, one of which is the differentiation between length and width. The length of a rectangle refers to its horizontal side, while the width represents its vertical side. Understanding this distinction is paramount for calculating the perimeter.
The Secret Formula: Perimeter of Rectangles Revealed
Lo and behold, the magical formula that unlocks the perimeter of rectangles: P = 2(L + W). Here, P signifies the perimeter, L stands for length, and W denotes width. This formula empowers you to determine the total distance around the rectangle’s boundary.
Putting Theory into Practice: PQRS Perimeter Unveiled
Let’s put our knowledge into action and calculate the perimeter of our Rectangle PQRS. Suppose the length measures 10 units, and the width spans 6 units. Inserting these values into the formula, we embark on a delightful journey:
P = 2(L + W)
P = 2(10 + 6)
P = 2(16)
P = 32 units
Eureka! The perimeter of Rectangle PQRS proudly stands at 32 units.
Congratulations, dear readers! You have successfully mastered the art of perimeter calculation for rectangles. Whether you encounter rectangles in everyday life or delve into more profound geometric explorations, this guide will serve as your trusty beacon. Remember, geometry is a realm of wonder, and with each new discovery, your knowledge blossoms.
How to Calculate the Perimeter of Rectangle PQRS: A Step-by-Step Guide
What is Perimeter?
Imagine yourself walking around the edge of a garden, following the fence line. The total distance you cover represents the perimeter of the garden. Perimeter refers to the length of the boundary of a closed figure.
Rectangles and Their Properties
Rectangles are quadrilaterals with four 90-degree angles. Think of a photo frame with four perfectly square corners. Rectangle PQRS is one such rectangle with four sides: PQ, QR, RS, and SP.
Sides of a Rectangle
The sides of a rectangle are the line segments that form its boundary. In the case of Rectangle PQRS, we have PQ, QR, RS, and SP.
Length and Width of a Rectangle
Rectangles have two pairs of parallel sides. The horizontal sides, such as PQ and RS, are called the length (L), while the vertical sides, such as QR and SP, are called the width (W).
Perimeter Formula for Rectangles
To find the perimeter of a rectangle, we use the formula:
P = 2(L + W)
where P represents the perimeter, L represents the length, and W represents the width.
Applying the Formula to Rectangle PQRS
Let’s say you have a frame shaped like Rectangle PQRS, measuring 10 cm in length and 5 cm in width. To find its perimeter:
- Substitute the values of L (10 cm) and W (5 cm) into the formula:
P = 2(L + W)
P = 2(10 cm + 5 cm)
- Calculate the sum inside the parentheses:
P = 2(15 cm)
- Multiply by 2:
P = 30 cm
Hence, the perimeter of Rectangle PQRS is 30 cm.
How to Calculate the Perimeter of Rectangle PQRS: A Comprehensive Guide
Let’s embark on a journey to demystify the concept of calculating the perimeter of a rectangle, with Rectangle PQRS as our star pupil.
What is Perimeter?
Picture a closed shape, like our rectangle. The perimeter is like a ribbon tied around it, measuring the total length of its boundary.
Rectangles and Their Unique Charm
Rectangles are quadrilaterals with four right angles, making them symmetrical and easy to work with. Rectangle PQRS, our star of the show, has four sides: PQ, QR, RS, and SP.
Sides, Length, and Width: A Love Triangle
The sides of a rectangle are the line segments that form its boundary. PQRS has four sides: PQ, QR, RS, and SP.
- Length is the horizontal side, while width is the vertical side.
Perimeter Formula: Unveiling the Mystery
Now, let’s crack the code for finding the perimeter of rectangles. The magic formula is:
P = 2 (L + W)
where:
- P is the perimeter
- L is the length
- W is the width
Calculating the Perimeter of Rectangle PQRS
To bring it all together, let’s calculate the perimeter of Rectangle PQRS, with a length of 10 cm and a width of 5 cm:
P = 2 (L + W)
P = 2 (10 cm + 5 cm)
P = 2 (15 cm)
P = 30 cm
Ta-da! Rectangle PQRS has a perimeter of 30 cm. Remember, the perimeter measures the total length around its boundary.
How to Calculate the Perimeter of Rectangle PQRS: A Comprehensive Guide
In geometry, perimeter refers to the total length around the boundary of a closed figure. Rectangles, like Rectangle PQRS, are quadrilaterals with four right angles and four sides—PQ, QR, RS, and SP. These sides form the rectangle’s boundary, and their lengths play a crucial role in calculating the perimeter.
To calculate the perimeter of Rectangle PQRS, we must first understand the difference between length and width. Length is the horizontal side, while width is the vertical side. In our case, PQ and RS represent the length, and QR and SP represent the width.
Now, let’s delve into the formula for calculating the perimeter of a rectangle:
Perimeter = 2 (Length + Width)
In this formula, “P” represents the perimeter, “L” represents the length, and “W” represents the width. Using this formula, we can easily calculate the perimeter of Rectangle PQRS if we know its length and width.
For example, let’s say that the length of PQRS is 10 units and its width is 5 units. Substituting these values into the formula, we get:
Perimeter = 2 (10 + 5)
Perimeter = 2 (15)
Perimeter = 30 units
Therefore, the perimeter of Rectangle PQRS is 30 units.
How to Calculate the Perimeter of Rectangle PQRS: A Step-by-Step Guide
Unlock the Secrets of Perimeter
Perimeter, a fundamental concept in geometry, defines the total length around a closed figure. Embark on a captivating journey to unravel the mysteries of perimeter, specifically focusing on the intriguing rectangle PQRS.
Rectangles: The Cornerstones of Our Exploration
Rectangles, distinguished by their four right angles and quadrilateral shape, are the protagonists of our quest. Meet Rectangle PQRS, with its sides PQ, QR, RS, and SP beckoning us to explore their secrets.
Sides: The Building Blocks of Rectangle PQRS
Sides, the line segments that trace Rectangle PQRS’s boundary, play a pivotal role. As we unravel their lengths, we’ll gain insights into the perimeter’s true nature.
Length and Width: The Keys to Unlocking Perimeter
Length and width, two fundamental attributes of a rectangle, hold the key to its perimeter. Length stretches across the horizontal axis, while width gracefully ascends the vertical one.
The Perimeter Formula: A Mathematical Masterpiece
Behold the formula that will guide our path: P = 2 (L + W), where P represents the elusive perimeter, L the enchanting length, and W the captivating width. Like a magical incantation, this formula transforms the lengths and widths of Rectangle PQRS into its perimeter.
Unveiling the Perimeter of Rectangle PQRS
Let’s delve into the captivating world of Rectangle PQRS. Suppose its length, L, is 5 cm and its width, W, is 3 cm. With deft precision, we substitute these values into the formula: P = 2 (5 cm + 3 cm).
With the formula at our disposal, we embark on a quest to calculate the perimeter. Summoning our mathematical prowess, we add the length and width: 5 cm + 3 cm = 8 cm. Next, we multiply this sum by 2: 2 x 8 cm = 16 cm. And there it is, like a precious jewel, the perimeter of Rectangle PQRS emerges: 16 cm.
So, dear reader, armed with this newfound knowledge, you can conquer any rectangle’s perimeter. May your journey through geometry be filled with enlightenment and the joy of discovery!
