Question

A farmer planted corn in a rectangular field 75 m by 48 m. What is the area of the cornfield?

Answer 1

Answer:

3600 m square

Step-by-step explanation:

We know that area of a rectangle = l*b

                                                        = 75*48

                                                        = 3600m square

Therefore, the area of the cornfield = 3600 m square.

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Answer 2

$\sf\underbrace{Question:}$

A farmer planted corn in a rectangular field 75 m by 48 m. What is the area of the cornfield?

$\sf\Large{\underline{\underline{Answer:-}}}$

➥3600m²

⠀

${\bold\blue{EXPLAINATION:-}}$

Given,

• Measure of rectangular field is 75m by 48m.

${\bold\pink{Find}}$

• Area of the cornfield?

As we know,

${\bold\green{Area \: of \: Rectangle= \: (l×b)}}$

ATQ,

Length = 75m

Breadth = 48m

Area = length × Breadth

⠀⠀⠀⠀= 75 × 48

⠀⠀⠀⠀= 3600m²

∴ The area of cornfield is 3600m².

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$\sf\underbrace{More \: Info:-}$

Perimeter is the total distance around a closed figure.

Whereas, the region occupied by the closed figure is called its area.

⠀

${\bold\pink{Formulae:-}}$

➱ Rectangle

✦ Area = (length × breadth) sq.units

✦ Perimeter = 2 (length + breadth)

⠀

➱ Square

✦ Area = (Side)² sq. units

✦ Perimeter = (4 × side)

⠀

➱ Triangle

✦ Area = ½ × base × height

⠀

➱ Parallelogram

✦ Area = Base × height

⠀

➱ Rhombubs

✦ Area = ½ × d1 × d2

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