How to find the perimeter of a rectangle - PSAT Math

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A rectangular garden has an area of $80: $\mbox{m^2$}$ . Its length is meters longer than its width. How much fencing is needed to enclose the garden?

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We define the variables as $w = \mbox{width}$ and $l = \mbox{length} = w + 2$ .

We substitute these values into the equation for the area of a rectangle and get .

or

Lengths cannot be negative, so the only correct answer is . If , then .

Therefore, $\mbox{perimeter }= 2w + 2l = 16 + 20 = 36:\mbox{m}$ .

A rectangle has a width of 2_x_. If the length is five more than 150% of the width, what is the perimeter of the rectangle?

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Given that w = 2_x_ and l = 1.5_w_ + 5, a substitution will show that l = 1.5(2_x_) + 5 = 3_x_ + 5.

P = 2_w_ + 2_l_ = 2(2_x_) + 2(3_x_ + 5) = 4_x_ + 6_x_ + 10 = 10_x_ + 10 = 10(x + 1)

Note: Figure NOT drawn to scale

Refer to the above figure, which shows a square garden (in green) surrounded by a dirt path (in orange) eight feet wide throughout. What is the perimeter of the garden?

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The inner square, which represents the garden, has sidelength $(75 - 2\times 8) = 59$ feet, so its perimeter is four times this:

$P = 4 \times 59 = 236$ feet.

Note: Figure NOT drawn to scale

Refer to the above figure, which shows a rectangular garden (in green) surrounded by a dirt path (in orange). The dirt path is seven feet wide throughout. Which of the following polynomials gives the perimeter of the garden in feet?

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The length of the garden, in feet, is $2 \times 7 = 14$ feet less than that of the entire lot, or

;

The width of the garden, in feet, is $2 \times 7 = 14$ less than that of the entire lot, or

.

The perimeter, in feet, is twice the sum of the two:

Farmer Dave has a rectangular field that is 50 yards wide and 40 yards long. He wants to enclose the field with a wire fence. How much wire does Farmer Dave need?

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To solve this problem, find the perimeter of the rectangle. There are two sides that each measure 50 yards and two sides that each measure 40 yards. Together these four sides measure 180 yards.

A rectangular garden has an area of $80: $\mbox{m^2$}$ . Its length is meters longer than its width. How much fencing is needed to enclose the garden?

Tap to see back →

We define the variables as $w = \mbox{width}$ and $l = \mbox{length} = w + 2$ .

We substitute these values into the equation for the area of a rectangle and get .

or

Lengths cannot be negative, so the only correct answer is . If , then .

Therefore, $\mbox{perimeter }= 2w + 2l = 16 + 20 = 36:\mbox{m}$ .

A rectangle has a width of 2_x_. If the length is five more than 150% of the width, what is the perimeter of the rectangle?

Tap to see back →

Given that w = 2_x_ and l = 1.5_w_ + 5, a substitution will show that l = 1.5(2_x_) + 5 = 3_x_ + 5.

P = 2_w_ + 2_l_ = 2(2_x_) + 2(3_x_ + 5) = 4_x_ + 6_x_ + 10 = 10_x_ + 10 = 10(x + 1)

Note: Figure NOT drawn to scale

Refer to the above figure, which shows a square garden (in green) surrounded by a dirt path (in orange) eight feet wide throughout. What is the perimeter of the garden?

Tap to see back →

The inner square, which represents the garden, has sidelength $(75 - 2\times 8) = 59$ feet, so its perimeter is four times this:

$P = 4 \times 59 = 236$ feet.

Note: Figure NOT drawn to scale

Refer to the above figure, which shows a rectangular garden (in green) surrounded by a dirt path (in orange). The dirt path is seven feet wide throughout. Which of the following polynomials gives the perimeter of the garden in feet?

Tap to see back →

The length of the garden, in feet, is $2 \times 7 = 14$ feet less than that of the entire lot, or

;

The width of the garden, in feet, is $2 \times 7 = 14$ less than that of the entire lot, or

.

The perimeter, in feet, is twice the sum of the two:

Farmer Dave has a rectangular field that is 50 yards wide and 40 yards long. He wants to enclose the field with a wire fence. How much wire does Farmer Dave need?

Tap to see back →

To solve this problem, find the perimeter of the rectangle. There are two sides that each measure 50 yards and two sides that each measure 40 yards. Together these four sides measure 180 yards.

A rectangular garden has an area of $80: $\mbox{m^2$}$ . Its length is meters longer than its width. How much fencing is needed to enclose the garden?

Tap to see back →

We define the variables as $w = \mbox{width}$ and $l = \mbox{length} = w + 2$ .

We substitute these values into the equation for the area of a rectangle and get .

or

Lengths cannot be negative, so the only correct answer is . If , then .

Therefore, $\mbox{perimeter }= 2w + 2l = 16 + 20 = 36:\mbox{m}$ .

A rectangle has a width of 2_x_. If the length is five more than 150% of the width, what is the perimeter of the rectangle?

Tap to see back →

Given that w = 2_x_ and l = 1.5_w_ + 5, a substitution will show that l = 1.5(2_x_) + 5 = 3_x_ + 5.

P = 2_w_ + 2_l_ = 2(2_x_) + 2(3_x_ + 5) = 4_x_ + 6_x_ + 10 = 10_x_ + 10 = 10(x + 1)

Note: Figure NOT drawn to scale

Refer to the above figure, which shows a square garden (in green) surrounded by a dirt path (in orange) eight feet wide throughout. What is the perimeter of the garden?

Tap to see back →

The inner square, which represents the garden, has sidelength $(75 - 2\times 8) = 59$ feet, so its perimeter is four times this:

$P = 4 \times 59 = 236$ feet.

Note: Figure NOT drawn to scale

Refer to the above figure, which shows a rectangular garden (in green) surrounded by a dirt path (in orange). The dirt path is seven feet wide throughout. Which of the following polynomials gives the perimeter of the garden in feet?

Tap to see back →

The length of the garden, in feet, is $2 \times 7 = 14$ feet less than that of the entire lot, or

;

The width of the garden, in feet, is $2 \times 7 = 14$ less than that of the entire lot, or

.

The perimeter, in feet, is twice the sum of the two:

Farmer Dave has a rectangular field that is 50 yards wide and 40 yards long. He wants to enclose the field with a wire fence. How much wire does Farmer Dave need?

Tap to see back →

To solve this problem, find the perimeter of the rectangle. There are two sides that each measure 50 yards and two sides that each measure 40 yards. Together these four sides measure 180 yards.

A rectangular garden has an area of $80: $\mbox{m^2$}$ . Its length is meters longer than its width. How much fencing is needed to enclose the garden?

Tap to see back →

We define the variables as $w = \mbox{width}$ and $l = \mbox{length} = w + 2$ .

We substitute these values into the equation for the area of a rectangle and get .

or

Lengths cannot be negative, so the only correct answer is . If , then .

Therefore, $\mbox{perimeter }= 2w + 2l = 16 + 20 = 36:\mbox{m}$ .

A rectangle has a width of 2_x_. If the length is five more than 150% of the width, what is the perimeter of the rectangle?

Tap to see back →

Given that w = 2_x_ and l = 1.5_w_ + 5, a substitution will show that l = 1.5(2_x_) + 5 = 3_x_ + 5.

P = 2_w_ + 2_l_ = 2(2_x_) + 2(3_x_ + 5) = 4_x_ + 6_x_ + 10 = 10_x_ + 10 = 10(x + 1)

Note: Figure NOT drawn to scale

Refer to the above figure, which shows a square garden (in green) surrounded by a dirt path (in orange) eight feet wide throughout. What is the perimeter of the garden?

Tap to see back →

The inner square, which represents the garden, has sidelength $(75 - 2\times 8) = 59$ feet, so its perimeter is four times this:

$P = 4 \times 59 = 236$ feet.

Note: Figure NOT drawn to scale

Refer to the above figure, which shows a rectangular garden (in green) surrounded by a dirt path (in orange). The dirt path is seven feet wide throughout. Which of the following polynomials gives the perimeter of the garden in feet?

Tap to see back →

The length of the garden, in feet, is $2 \times 7 = 14$ feet less than that of the entire lot, or

;

The width of the garden, in feet, is $2 \times 7 = 14$ less than that of the entire lot, or

.

The perimeter, in feet, is twice the sum of the two:

Farmer Dave has a rectangular field that is 50 yards wide and 40 yards long. He wants to enclose the field with a wire fence. How much wire does Farmer Dave need?

Tap to see back →

To solve this problem, find the perimeter of the rectangle. There are two sides that each measure 50 yards and two sides that each measure 40 yards. Together these four sides measure 180 yards.