How Much Fencing Is Required To Enclose A Circular Garden Whose Diameter Is 287 M?

Answers

The fencing required to enclose a circular garden whose radius is 22 m is 138.16 m.

Further Explanation Perimeter Perimeter is defined as the distance along a two dimension shape. Perimeter of different shapes is given by different formulas

For example;

The perimeter of a rectangle = 2(length+width)The perimeter of a triangle = a+b+c; where a, b and c are the sides of the triangle. etc.The Circumference of a circle = 2πr , where r is the radius of the circleArea Area is a measure of how much space is occupied by a given shape.Area of a substance is determined by the type of shape in question.

For example;

Area of a rectangle is given by; Length multiplied by widthArea of a triangle = 1/2 x base x heightArea of a circle = πr². where r is the radius of a circle,Area of a square = S², Where s is the side of the square.etc.

In this case;

The radius of the circle = 22 m

π = 3.14

But;

Circumference of a circle is given by 2πr

Thus;

Circumference = 2 × 3.14 × 22 m

= 138.12 m

Keywords; Perimeter, Area, Circumference of a circle

Learn more about:Perimeter: Area: Area of a circle: Circumference of a circle:

Level: Middle school

Subject; Mathematics

Topic: Area and Perimeter

Sub-topic: circumference of a circle

Since we are finding the amount of fencing, we can find the circumference.

Circumference Formula: C = 2πr

C = 2(3.14)(28)

C = 2(87.92)

C = 175.84m² of fencing.

Best of Luck!

About 88 m of fencing

Step-by-step explanation:

The " fencing " would, in shorter terms be the perimeter of this circular garden, but as it is in the shape of a circle you would say that the amount of fencing around the garden would be the circumference;

C = 2 * π * r, where C ⇒ circumference, and r ⇒ radius,

Now let us substitute the known values, provided r ⇒ 14 m, and π ⇒ 22 / 7;

C = 2 * 22 / 7 * 14 ⇒ Multiply 22 by 2, remaining over 7,

C = 44 / 7 * 14 ⇒ Simplify 44 / 7 * 14, such that 7 ⇒ 1, and 14 ⇒ 2,

C = 44 / 1 * 2 ⇒ Further simplify to solve for C,

C = 88 meters,

Solution; About 88 m of fencing is required to enclose the circular garden

87.92 m

Step-by-step explanation:

Formula for the circumference of a circle (which is what you're finding with this problem) is pi d

Pi being 3.14 and d being the diameter

Since the radius is 14 the diameter is 2 times that , 28m

Now just multiply 28 and 3.14 which gives you 87.92

138.16 m

Step-by-step explanation:

Circumference=2πr

r=22

C=2·3.14·22

C=138.16

126m

Step-by-step explanation:

The circumference of the circle would be the amount of fencing required for the circular garden.

Circumference, C = 2πr

π = $\frac{22}{7}$

C = 2*20* $\frac{22}{7}$

C = 125.71 m

We need 125.71 meters to fence the garden.

119.38

Step-by-step explanation:

2 pi radius

175.84 m

Step-by-step explanation:

We are looking for fencing so that is circumference

C = 2 * pi *r

= 2* 3.14 * 28

= 175.84 m

The answer to your question is 901.2 m

Step-by-step explanation:

Data

Perimeter = ?

diameter = 287 m

Process

1.- Calculate the radius of the garden

radius = diameter/2

-Substitution

radius = 287/2

-Result

radius = 143.5 m

2.- Calculate the perimeter

Perimeter = 2πr

-Substitution

Perimeter = 2(3.14)(143.5)

-Simplification and result

Perimeter = 901.18 ≈ 901.2 m

Step-by-step explanation:

Enclosing something with fencing is a perimeter thing. Since we are dealing with a circle, we need the circumference instead, which is the same thing, different formula.

$C=\pi d$