Question

A toy is in the form of a cone of radius 3.5 CM mounted on a hemisphere of the same radius the total height of the toy is 15.5 cm find the total surface area of the toy

Answer 1

$<b>Answer</b>$ :

1. Total surface area = 214.5 cm³

2. Total volume = 243.8 cm³

$<b>Step-by-step solution :</b>$

In a hemisphere, its height and radius are equal.

So if total height of toy is 15.5 cm then height of only cone = 15.5 cm - 3.5 cm = 12 cm

$<b>Curved surface area of cone = πrl</b>$

Curved surface area of cone = 22/7 × 3.5 × l

= 22 × 0.5 × l

= 11 × slant height

$<b>Since l = √( r² + h² )</b>$

l = √( 3.5² + 12² ) = √156.25

$\sf{\boxed{Slant\: Height \:= \:12.5 \:cm}}$

So, C.S.A of cone = 11 cm × 12.5 cm

= 137.5 cm²

Curved surface area of hemisphere = 2πr²

= 2 × 22/7 × 3.5 × 3.5 cm²

= 2 × 22 × 0.5 × 0.5 cm²

= 77 cm²

Total Surface area = 77 + 137.5 cm²

= 214.5 cm²

$<b>Now, we know that</b>$

Volume of cone = ⅓ πr²h and

hemisphere = ⅔πr³

$<b>Total volume = ⅓ πr²h + ⅔ πr³</b>$

= ⅓πr²( h + 2r )

= 1/3 × 22/7 × 3.5²( 12 + 2 × 3.5 ) cm³

= ⅓ × 22 × 0.5 × 3.5 × 19 cm³

= $\sf\:243.8 \:cm^3$

$\textbf{please mark as brainliest}$

Answer 2

Answer:

We have,

Radius of cone = Radius of hemisphere = 3.5 cm.

Height of the toy = 15.5 cm

To calculate the CSA of cone we have to find first the Slant Height of the cone :]

Slant Height = h² + r²

Slant Height = (15.5)² + (3.5)²

Slant Height = 12.25 + 144

Slant Height = 156.25 cm²

Slant Height = 12.5 cm

Now, we will calculate the TSA of the toy :

➳ TSA of toy = CSA of hemisphere + CSA of cone

➳ TSA of toy = 2πr² + πrl

➳ TSA of toy = 2π(3.5)² + π(3.5)(12.5)

➳ TSA of toy = 24.5π + 43.75π

➳ TSA of toy = 68.25π

➳ TSA of toy = 68.25 * 22/7

➳ TSA of toy = 214.5 cm²