I need help with 3 and 4

[tex]Area \: of \: rectangle = length \times breadth \\ \\ given \: - \: length = 12 \: ft \\ \therefore \:breadth = x \: ft \\ \\ Area = 108 \: ft {}^{2} \\ \\ \implies \: length \times breadth = 108 \: ft {}^{2} \\ \\ \implies \: x \times 12 = 108 \\ \\ \implies \: x = \cancel\frac{108}{12} \\ \\ \bold\red{\implies \: x = 9 \: ft}[/tex]

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( 4 )

the given figure resembles a parallelogram!

[tex]Area \: of \: parallelogram = height \times base \\ \\ \implies \: height = x \: cm\\ \\ \implies \: base = 16 \: cm \\ \\ \: Area \: = 96 \: cm {}^{2} \\ \\ \implies \: x \times 16 = 96 \\ \\ \implies \: x = \cancel\frac{96}{16} \\ \\ \bold\red{\implies \: x = 6 \: cm}[/tex]

hope helpful :D

Аноним Аноним · Answer 2 · 2022-05-03T16:23:03+02:00

[tex]\huge \underbrace \mathfrak \red{Answer}[/tex]

To find :-

To get the value of 'di in figure 3 and 4.

Figure 3

According to the figure, we know that it is a quadrilateral.
It's all sides are at 90°.
So we can assume that it can be rectangle.
In the figure, length of one side is given and area of figure is given and we have the length of another side.

Solution :-

Area of rectangle = length × width

area = 108 ft², length = 12 ft, width = x

[tex]108 = 12 \times x \\ \frac{108}{12} = x \\ 9 = x[/tex]

Therefore, the value of x in this figure is 9 ft.

[tex] \\ [/tex]

Figure 4

According to figure, we finds out that it is quadrilateral as it has 4 sides.
It has all parallel sides.
We can assume that it is parallelogram as the sides which are facing each other are parallels.
And here value of one side is given which is base and area is given, we have to find here is height.

Solution :-

Area of parallelogram = base × height

Area = 96 cm², base = 16 cm, height = x

[tex]96 = 16 \times x \\ \frac{96}{16} = x \\ 6 = x[/tex]

Therefore, the value of x is 6 cm.