Question

. The area of a rhombus is 93.5 cm"2. If it's perimeter is 44 cm, then find it's altitude.​

Answer 1

Answer:

Altitude = 8.5 cm

Step-by-step explanation:

First we have to find the sides,

→ Perimeter = 4 x side

→ 44 = 4 x side

→ 44/4 = side

→ 11 = side

→ side = 11 cm

⇒ Area of rhombus = base x height

→ 93.5 cm² = 11 x height

→ 935/10 = 11 x height

→ 935 /10 x 11 = height

→ 935 / 110 = height

→ 8.5 = height

Hence,

Altitude of the rhombus = 8.5 cm

________________________________________________________

Hope this helps you

Please mark as brain list

Answer 2

Answer:

Altitude is 8.5cm

Step-by-step explanation:

Given that

$perimeter = 44cm$

$area \: of \: rhombus = 93.5 {cm}^{2}$

To find

Altitude of rhombus

Solution

As we know that

$perimeter \: of \: rhombus = 4 \times side \: of \: rhombus$

hence

$44 = 4 \times side \: of \: rhombus$

$side \: of \: rhombus = \frac{44}{4}$

$side \: of \: rhombus = 11cm$

now

as we know that

$area \: of \: rhombus = base \times height$

$93.5 = 11 \times height$

hence

$height = \frac{93.5}{11} = 8.5m$

hence

$altitude = 8.5cm$